Lapras vs. Chansey: parafusion calcs.
Apr 30, 2014 16:45:06 GMT -8
Post by magic9mushroom on Apr 30, 2014 16:45:06 GMT -8
So I've seen a lot of arguing over exactly how likely it is for Lapras to beat Thunderbolt Chansey with its vaunted parafusion. I thought this was pretty silly, since the actual probability is an undisputable fact. So I figured I'd run the numbers myself and see what popped out.
Now I realise why nobody did this before.
There are a few simplifications and assumptions I've made, so I'll go into them first.
- Simplification: Body Slam is an assumed 5HKO, and Softboiled heals 2 Body Slams.
- Justification: Modelling all 703 HP values of Chansey inflates the number of states by about 140x. The probability for Body Slam to 4HKO is about 0.2%, rising to about 2% with self-confusion damage. I split the difference by assuming it was always an "almost 4HKO".
- Simplification: No 255s.
- Justification: I didn't want to make the 1/256 exception in every single attack throughout the entire working. Also, the 255 failure of Softboiled cannot be modelled without modelling all 703 HP values, which I just said I wasn't going to do, so leaving out the other 255s balances out.
- Simplification: No PP exhaustion.
- Justification: Considering this inflates the number of states by something like 150x because it eliminates the recursion that makes Markov chains so powerful.
- Assumption: Lapras does not have Rest or Hyper Beam.
- Justification: I don't know if Rest is optimal under any circumstances; I suspect it's not given that Chansey has a nigh-assured 3HKO and Confuse Ray lasts for a limited time. Hyper Beam is certainly very useful to Lapras in this matchup, but I've never seen a Lapras with Blizzard/Body Slam/Hyper Beam/Confuse Ray.
- Assumption: Chansey has Thunderbolt and Thunder Wave, but does not have Reflect or Counter.
- Justification: If Chansey does not have Thunderbolt, the result is patently obvious. One could model Ice Beam/Thunderbolt/Reflect/Softboiled Chansey vs. Lapras, but that's both somewhat more obvious and not as common. Counter is prediction-based and therefore cannot be modelled.
- Assumption: Lapras uses Body Slam if it will OHKO, or if Chansey is confused; otherwise, it uses Confuse Ray.
- Justification: This is obvious.
- Assumption: Chansey uses Thunderbolt if it will OHKO guaranteed, or if it is at full health and Lapras is paralysed, or if it is hit once and not confused and Lapras is paralysed; it uses Thunder Wave if it is at full health and Lapras is not paralysed, or if it is hit once and not confused and Lapras is not paralysed; otherwise, it uses Softboiled.
- Justification: Basic first-approximation. You could refine it recursively by looking at the states where Thunderbolt could OHKO, and checking whether Thunderbolt or Softboiled would have a greater chance to win, or by looking at the states where Lapras isn't paralysed and checking whether Thunder Wave or Softboiled would have a greater chance to win, but I've had enough maths for now.
- Assumption: Chansey is paralysed.
- Justification: If Chansey isn't paralysed, Lapras should really be trying to freeze it, making parafusion irrelevant. Also, I didn't want to have to do these entire calculations in duplicate to account for that.
There's a couple of relevant damage calcs here, which Isa did for me. Props to Isa - every little bit helps.
- Chansey Tbolt vs. Lapras 92.1% 3HKO
- Chansey Tbolt vs. Lapras 1011/1521 2HKO with one crit
Okay, time to get down to brass tacks. Here's the Markov chain as I elucidated it:
(0) Chansey at full, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (1), 3/8 Thunder Wave (21)
(1) Chansey at full, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (12|7), 3/8*3/4 Thunder Wave (32|27), 3/4*1/4 Thunder Wave+confusion ends (30|25), 1/4*1/4 nothing+confusion ends (10|5)
(2) Chansey at full, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (13|8), 3/8*2/3 Thunder Wave (33|28), 3/4*1/3 Thunder Wave+confusion ends (30|25), 1/4*1/3 nothing+confusion ends (10|5)
(3) Chansey at full, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (14|9), 3/8*1/2 Thunder Wave (34|29), 3/4*1/2 Thunder Wave+confusion ends (30|25), 1/4*1/2 nothing+confusion ends (10|5)
(4) Chansey at full, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Thunder Wave+confusion ends (30|25), 1/4 nothing+confusion ends (10|5)
(5) Chansey hit once, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (6), 3/8 Thunder Wave (26)
(6) Chansey hit once, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (17|12), 3/8*3/4 Softboiled (7|2), 3/4*1/4 Softboiled+confusion ends (5|0), 1/4*1/4 nothing+confusion ends (15|10)
(7) Chansey hit once, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (18|13), 3/8*2/3 Softboiled (8|3), 3/4*1/3 Softboiled+confusion ends (5|0), 1/4*1/3 nothing+confusion ends (15|10)
(8) Chansey hit once, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (19|14), 3/8*1/2 Softboiled (9|4), 3/4*1/2 Softboiled+confusion ends (5|0), 1/4*1/2 nothing+confusion ends (15|10)
(9) Chansey hit once, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (5|0), 1/4 nothing+confusion ends (15|10)
(10) Chansey hit twice, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (11), 3/8 Softboiled (1)
(11) Chansey hit twice, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (Lapras win|17), 3/8*3/4 Softboiled (12|7), 3/4*1/4 Softboiled+confusion ends (10|5), 1/4*1/4 nothing+confusion ends (Lapras win|15)
(12) Chansey hit twice, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (Lapras win|18), 3/8*2/3 Softboiled (13|8), 3/4*1/3 Softboiled+confusion ends (10|5), 1/4*1/3 nothing+confusion ends (Lapras win|15)
(13) Chansey hit twice, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (Lapras win|19), 3/8*1/2 Softboiled (14|9), 3/4*1/2 Softboiled+confusion ends (10|5), 1/4*1/2 nothing+confusion ends (Lapras win|15)
(14) Chansey hit twice, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (10|5), 1/4 nothing+confusion ends (Lapras win|15)
(15) Chansey hit thrice, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (16), 3/8 Softboiled (6)
(16) Chansey hit thrice, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (Lapras win), 3/8*3/4 Softboiled (Lapras win|12), 3/4*1/4 Softboiled+confusion ends (Lapras win|10), 1/4*1/4 nothing+confusion ends (Lapras win)
(17) Chansey hit thrice, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (Lapras win), 3/8*2/3 Softboiled (Lapras win|13), 3/4*1/3 Softboiled+confusion ends (Lapras win|10), 1/4*1/3 nothing+confusion ends (Lapras win)
(18) Chansey hit thrice, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (Lapras win), 3/8*1/2 Softboiled (Lapras win|14), 3/4*1/2 Softboiled+confusion ends (Lapras win|10), 1/4*1/2 nothing+confusion ends (Lapras win)
(19) Chansey hit thrice, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (Lapras win|10), 1/4 nothing+confusion ends (Lapras win)
(20) Chansey at full, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (21), 3/8*3/4*231/256 Thunderbolt (46), 3/8*3/4*25/256 critical Thunderbolt (71), 3/4*1/4*231/256 Thunderbolt (45), 3/4*1/4*25/256 critical Thunderbolt (70), 1/4*1/4 nothing (20)
(21) Chansey at full, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (32|27|22), 3/8*3/4*231/256 Thunderbolt (57|52|47), 3/8*3/4*25/256 critical Thunderbolt (82|77|72), 3/4*1/4*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/4 nothing+confusion ends (30|25|20)
(22) Chansey at full, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (33|28|23), 3/8*2/3*231/256 Thunderbolt (58|53|48), 3/8*2/3*25/256 critical Thunderbolt (83|78|73), 3/4*1/3*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/3 nothing+confusion ends (30|25|20)
(23) Chansey at full, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (34|29|24), 3/8*1/2*231/256 Thunderbolt (59|54|49), 3/8*1/2*25/256 critical Thunderbolt (84|79|74), 3/4*1/2*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/2 nothing+confusion ends (30|25|20)
(24) Chansey at full, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4 nothing+confusion ends (30|25|20)
(25) Chansey hit once, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (26), 3/8*3/4*231/256 Thunderbolt (51), 3/8*3/4*25/256 critical Thunderbolt (76), 3/4*1/4*231/256 Thunderbolt (50), 3/4*1/4*25/256 critical Thunderbolt (75), 1/4*1/4 nothing (25)
(26) Chansey hit once, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (37|32|27), 3/8*3/4 Softboiled (27|22|22), 3/4*1/4 Softboiled+confusion ends (25|20|20), 1/4*1/4 nothing+confusion ends (35|30|25)
(27) Chansey hit once, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (38|33|28), 3/8*2/3 Softboiled (28|23|23), 3/4*1/3 Softboiled+confusion ends (25|20|20), 1/4*1/3 nothing+confusion ends (35|30|25)
(28) Chansey hit once, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (39|34|29), 3/8*1/2 Softboiled (29|24|24), 3/4*1/2 Softboiled+confusion ends (25|20|20), 1/4*1/2 nothing+confusion ends (35|30|25)
(29) Chansey hit once, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (25|20|20), 1/4 nothing+confusion ends (35|30|25)
(30) Chansey hit twice, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (31), 3/8*3/4 Softboiled (21), 3/4*1/4 Softboiled (20), 1/4*1/4 nothing (30)
(31) Chansey hit twice, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (42|37|32), 3/8*3/4 Softboiled (32|27|22), 3/4*1/4 Softboiled+confusion ends (30|25|20), 1/4*1/4 nothing+confusion ends (40|35|30)
(32) Chansey hit twice, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (43|38|33), 3/8*2/3 Softboiled (33|28|23), 3/4*1/3 Softboiled+confusion ends (30|25|20), 1/4*1/3 nothing+confusion ends (40|35|30)
(33) Chansey hit twice, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (44|39|34), 3/8*1/2 Softboiled (34|29|24), 3/4*1/2 Softboiled+confusion ends (30|25|20), 1/4*1/2 nothing+confusion ends (40|35|30)
(34) Chansey hit twice, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (30|25|20), 1/4 nothing+confusion ends (40|35|30)
(35) Chansey hit thrice, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (36), 3/8*3/4 Softboiled (26), 3/4*1/4 Softboiled (25), 1/4*1/4 nothing (35)
(36) Chansey hit thrice, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|42|37), 3/8*3/4 Softboiled (Lapras win|32|27), 3/4*1/4 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/4 nothing+confusion ends (Lapras win|40|35)
(37) Chansey hit thrice, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|43|38), 3/8*2/3 Softboiled (Lapras win|33|28), 3/4*1/3 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/3 nothing+confusion ends (Lapras win|40|35)
(38) Chansey hit thrice, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|44|39), 3/8*1/2 Softboiled (Lapras win|34|29), 3/4*1/2 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/2 nothing+confusion ends (Lapras win|40|35)
(39) Chansey hit thrice, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|30|25), 1/4 nothing+confusion ends (Lapras win|40|35)
(40) Chansey hit four times, paralysed; Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|30), 1/4 nothing (Lapras win|40)
(41) Chansey hit four times, parafused (2nd turn); Lapras paralysed
Unattainable
(42) Chansey hit four times, parafused (3rd turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|43), 3/8*2/3 Softboiled (Lapras win|33), 3/4*1/3 Softboiled+confusion ends (Lapras win|30), 1/4*1/3 nothing+confusion ends (Lapras win|40)
(43) Chansey hit four times, parafused (4th turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|44), 3/8*1/2 Softboiled (Lapras win|34), 3/4*1/2 Softboiled+confusion ends (Lapras win|30), 1/4*1/2 nothing+confusion ends (Lapras win|40)
(44) Chansey hit four times, parafused (5th turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|30), 1/4 nothing+confusion ends (Lapras win|40)
(45) Chansey at full, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (46), 3/8*3/4*231/256 Thunderbolt (96), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (121), 3/4*1/4*231/256 Thunderbolt (95), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt (120), 1/4*1/4 nothing (45)
(46) Chansey at full, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (57|52|47), 3/8*3/4*231/256 Thunderbolt (107|102|97), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (132|127|122), 3/4*1/4*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/4 nothing+confusion ends (55|50|45)
(47) Chansey at full, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (58|53|48), 3/8*2/3*231/256 Thunderbolt (108|103|98), 3/8*2/3*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*2/3*25/256*510/1521 non-fatal critical Thunderbolt (133|128|123), 3/4*1/3*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/3*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/3*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/3 nothing+confusion ends (55|50|45)
(48) Chansey at full, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (59|54|49), 3/8*1/2*231/256 Thunderbolt (109|104|99), 3/8*1/2*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*1/2*25/256*510/1521 non-fatal critical Thunderbolt (134|129|124), 3/4*1/2*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/2*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/2*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/2 nothing+confusion ends (55|50|45)
(49) Chansey at full, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4 nothing+confusion ends (55|50|45)
(50) Chansey hit once, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (51), 3/8*3/4*231/256 Thunderbolt (101), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (126), 3/4*1/4*231/256 Thunderbolt (100), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt (125), 1/4*1/4 nothing (50)
(51) Chansey hit once, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (62|57|52), 3/8*3/4 Softboiled (52|47|47), 3/4*1/4 Softboiled+confusion ends (50|45|45), 1/4*1/4 nothing+confusion ends (60|55|50)
(52) Chansey hit once, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (63|58|53), 3/8*2/3 Softboiled (53|48|48), 3/4*1/3 Softboiled+confusion ends (50|45|45), 1/4*1/3 nothing+confusion ends (60|55|50)
(53) Chansey hit once, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (64|59|54), 3/8*1/2 Softboiled (54|49|49), 3/4*1/2 Softboiled+confusion ends (50|45|45), 1/4*1/2 nothing+confusion ends (60|55|50)
(54) Chansey hit once, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (50|45|45), 1/4 nothing+confusion ends (60|55|50)
(55) Chansey hit twice, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (56), 3/8*3/4 Softboiled (46), 3/4*1/4 Softboiled (45), 1/4*1/4 nothing (55)
(56) Chansey hit twice, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (67|62|57), 3/8*3/4 Softboiled (57|52|47), 3/4*1/4 Softboiled+confusion ends (55|50|45), 1/4*1/4 nothing+confusion ends (65|60|55)
(57) Chansey hit twice, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (68|63|58), 3/8*2/3 Softboiled (58|53|48), 3/4*1/3 Softboiled+confusion ends (55|50|45), 1/4*1/3 nothing+confusion ends (65|60|55)
(58) Chansey hit twice, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (69|64|59), 3/8*1/2 Softboiled (59|54|49), 3/4*1/2 Softboiled+confusion ends (55|50|45), 1/4*1/2 nothing+confusion ends (65|60|55)
(59) Chansey hit twice, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (55|50|45), 1/4 nothing+confusion ends (65|60|55)
(60) Chansey hit thrice, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (61), 3/8*3/4 Softboiled (51), 3/4*1/4 Softboiled (50), 1/4*1/4 nothing (60)
(61) Chansey hit thrice, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|67|62), 3/8*3/4 Softboiled (Lapras win|57|52), 3/4*1/4 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/4 nothing+confusion ends (Lapras win|65|60)
(62) Chansey hit thrice, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|68|63), 3/8*2/3 Softboiled (Lapras win|58|53), 3/4*1/3 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/3 nothing+confusion ends (Lapras win|65|60)
(63) Chansey hit thrice, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|69|64), 3/8*1/2 Softboiled (Lapras win|59|54), 3/4*1/2 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/2 nothing+confusion ends (Lapras win|65|60)
(64) Chansey hit thrice, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|55|50), 1/4 nothing+confusion ends (Lapras win|65|60)
(65) Chansey hit four times, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|55), 1/4 nothing (Lapras win|65)
(66) Chansey hit four times, parafused (2nd turn); Lapras hit once, paralysed
Unattainable
(67) Chansey hit four times, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|68), 3/8*2/3 Softboiled (Lapras win|58), 3/4*1/3 Softboiled+confusion ends (Lapras win|55), 1/4*1/3 nothing+confusion ends (Lapras win|65)
(68) Chansey hit four times, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|69), 3/8*1/2 Softboiled (Lapras win|59), 3/4*1/2 Softboiled+confusion ends (Lapras win|55), 1/4*1/2 nothing+confusion ends (Lapras win|65)
(69) Chansey hit four times, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|55), 1/4 nothing+confusion ends (Lapras win|65)
(70) Chansey at full, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (71), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (121), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt (120), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (70)
(71) Chansey at full, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (82|77|72), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (132|127|122), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (80|75|70)
(72) Chansey at full, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (83|78|73), 3/8*2/3*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*2/3*231/256*510/1521 non-fatal Thunderbolt (133|128|123), 3/8*2/3*25/256 critical Thunderbolt (Chansey win), 3/4*1/3*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/3*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (80|75|70)
(73) Chansey at full, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (84|79|74), 3/8*1/2*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*1/2*231/256*510/1521 non-fatal Thunderbolt (134|129|124), 3/8*1/2*25/256 critical Thunderbolt (Chansey win), 3/4*1/2*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/2*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (80|75|70)
(74) Chansey at full, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (80|75|70)
(75) Chansey hit once, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (76), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (126), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt (125), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (75)
(76) Chansey hit once, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (87|82|77), 3/8*3/4 Softboiled (77|72|72), 3/4*1/4 Softboiled+confusion ends (75|70|70), 1/4*1/4 nothing+confusion ends (85|80|75)
(77) Chansey hit once, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (88|83|78), 3/8*2/3 Softboiled (78|73|73), 3/4*1/3 Softboiled+confusion ends (75|70|70), 1/4*1/3 nothing+confusion ends (85|80|75)
(78) Chansey hit once, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (89|84|79), 3/8*1/2 Softboiled (79|74|74), 3/4*1/2 Softboiled+confusion ends (75|70|70), 1/4*1/2 nothing+confusion ends (85|80|75)
(79) Chansey hit once, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (75|70|70), 1/4 nothing+confusion ends (85|80|75)
(80) Chansey hit twice, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (81), 3/8*3/4 Softboiled (71), 3/4*1/4 Softboiled (70), 1/4*1/4 nothing (80)
(81) Chansey hit twice, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (92|87|82), 3/8*3/4 Softboiled (82|77|72), 3/4*1/4 Softboiled+confusion ends (80|75|70), 1/4*1/4 nothing+confusion ends (90|85|80)
(82) Chansey hit twice, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (93|88|83), 3/8*2/3 Softboiled (83|78|73), 3/4*1/3 Softboiled+confusion ends (80|75|70), 1/4*1/3 nothing+confusion ends (90|85|80)
(83) Chansey hit twice, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (94|89|84), 3/8*1/2 Softboiled (84|79|74), 3/4*1/2 Softboiled+confusion ends (80|75|70), 1/4*1/2 nothing+confusion ends (90|85|80)
(84) Chansey hit twice, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (80|75|70), 1/4 nothing+confusion ends (90|85|80)
(85) Chansey hit thrice, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (86), 3/8*3/4 Softboiled (76), 3/4*1/4 Softboiled (75), 1/4*1/4 nothing (85)
(86) Chansey hit thrice, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|92|87), 3/8*3/4 Softboiled (Lapras win|82|77), 3/4*1/4 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/4 nothing+confusion ends (Lapras win|90|85)
(87) Chansey hit thrice, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|93|88), 3/8*2/3 Softboiled (Lapras win|83|78), 3/4*1/3 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/3 nothing+confusion ends (Lapras win|90|85)
(88) Chansey hit thrice, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|94|89), 3/8*1/2 Softboiled (Lapras win|84|79), 3/4*1/2 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/2 nothing+confusion ends (Lapras win|90|85)
(89) Chansey hit thrice, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|80|75), 1/4 nothing+confusion ends (Lapras win|90|85)
(90) Chansey hit four times, paralysed; Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|80), 1/4 nothing (Lapras win|90)
(91) Chansey hit four times, parafused (2nd turn); Lapras critted, paralysed
Unattainable
(92) Chansey hit four times, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|93), 3/8*2/3 Softboiled (Lapras win|83), 3/4*1/3 Softboiled+confusion ends (Lapras win|80), 1/4*1/3 nothing+confusion ends (Lapras win|90)
(93) Chansey hit four times, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|94), 3/8*1/2 Softboiled (Lapras win|84), 3/4*1/2 Softboiled+confusion ends (Lapras win|80), 1/4*1/2 nothing+confusion ends (Lapras win|90)
(94) Chansey hit four times, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|80), 1/4 nothing+confusion ends (Lapras win|90)
(95) Chansey at full, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (96), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (121), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt (120), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (95)
(96) Chansey at full, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (107|102|97), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (132|127|122), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (105|100|95)
(97) Chansey at full, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (108|103|98), 3/8*2/3*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*2/3*231/256*0.079 non-fatal Thunderbolt (133|128|123), 3/8*2/3*25/256 critical Thunderbolt (Chansey win), 3/4*1/3*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/3*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (105|100|95)
(98) Chansey at full, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (109|104|99), 3/8*1/2*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*1/2*231/256*0.079 non-fatal Thunderbolt (134|129|124), 3/8*1/2*25/256 critical Thunderbolt (Chansey win), 3/4*1/2*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/2*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (105|100|95)
(99) Chansey at full, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (105|100|95)
(100) Chansey hit once, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (101), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (126), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt (125), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (100)
(101) Chansey hit once, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (112|107|102), 3/8*3/4 Softboiled (102|97|97), 3/4*1/4 Softboiled+confusion ends (100|95|95), 1/4*1/4 nothing+confusion ends (110|105|100)
(102) Chansey hit once, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (113|108|103), 3/8*2/3 Softboiled (103|98|98), 3/4*1/3 Softboiled+confusion ends (100|95|95), 1/4*1/3 nothing+confusion ends (110|105|100)
(103) Chansey hit once, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (114|109|104), 3/8*1/2 Softboiled (104|99|99), 3/4*1/2 Softboiled+confusion ends (100|95|95), 1/4*1/2 nothing+confusion ends (110|105|100)
(104) Chansey hit once, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (100|95|95), 1/4 nothing+confusion ends (110|105|100)
(105) Chansey hit twice, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (106), 3/8*3/4 Softboiled (96), 3/4*1/4 Softboiled (95), 1/4*1/4 nothing (105)
(106) Chansey hit twice, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (117|112|107), 3/8*3/4 Softboiled (107|102|97), 3/4*1/4 Softboiled+confusion ends (105|100|95), 1/4*1/4 nothing+confusion ends (115|110|105)
(107) Chansey hit twice, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (118|113|108), 3/8*2/3 Softboiled (108|103|98), 3/4*1/3 Softboiled+confusion ends (105|100|95), 1/4*1/3 nothing+confusion ends (115|110|105)
(108) Chansey hit twice, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (119|114|109), 3/8*1/2 Softboiled (109|104|99), 3/4*1/2 Softboiled+confusion ends (105|100|95), 1/4*1/2 nothing+confusion ends (115|110|105)
(109) Chansey hit twice, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (105|100|95), 1/4 nothing+confusion ends (115|110|105)
(110) Chansey hit thrice, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (111), 3/8*3/4 Softboiled (101), 3/4*1/4 Softboiled (100), 1/4*1/4 nothing (110)
(111) Chansey hit thrice, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|117|112), 3/8*3/4 Softboiled (Lapras win|107|102), 3/4*1/4 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/4 nothing+confusion ends (Lapras win|115|110)
(112) Chansey hit thrice, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|118|113), 3/8*2/3 Softboiled (Lapras win|108|103), 3/4*1/3 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/3 nothing+confusion ends (Lapras win|115|110)
(113) Chansey hit thrice, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|119|114), 3/8*1/2 Softboiled (Lapras win|109|104), 3/4*1/2 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/2 nothing+confusion ends (Lapras win|115|110)
(114) Chansey hit thrice, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|105|100), 1/4 nothing+confusion ends (Lapras win|115|110)
(115) Chansey hit four times, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|105), 1/4 nothing (Lapras win|115)
(116) Chansey hit four times, parafused (2nd turn); Lapras hit twice, paralysed
Unattainable
(117) Chansey hit four times, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|118), 3/8*2/3 Softboiled (Lapras win|108), 3/4*1/3 Softboiled+confusion ends (Lapras win|105), 1/4*1/3 nothing+confusion ends (Lapras win|115)
(118) Chansey hit four times, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|119), 3/8*1/2 Softboiled (Lapras win|109), 3/4*1/2 Softboiled+confusion ends (Lapras win|105), 1/4*1/2 nothing+confusion ends (Lapras win|115)
(119) Chansey hit four times, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|105), 1/4 nothing+confusion ends (Lapras win|115)
(120) Chansey at full, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (121), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (120)
(121) Chansey at full, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (132|127|122), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (130|125|120)
(122) Chansey at full, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (133|128|123), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (130|125|120)
(123) Chansey at full, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (134|129|124), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (130|125|120)
(124) Chansey at full, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (130|125|120)
(125) Chansey hit once, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (126), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (125)
(126) Chansey hit once, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (137|132|127), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (135|130|125)
(127) Chansey hit once, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (138|133|128), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (135|130|125)
(128) Chansey hit once, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (139|134|129), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (135|130|125)
(129) Chansey hit once, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (135|130|125)
(130) Chansey hit twice, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (131), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (130)
(131) Chansey hit twice, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (142|137|132), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (140|135|130)
(132) Chansey hit twice, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (143|138|133), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (140|135|130)
(133) Chansey hit twice, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (144|139|134), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (140|135|130)
(134) Chansey hit twice, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (140|135|130)
(135) Chansey hit thrice, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (136), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (135)
(136) Chansey hit thrice, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|142|137), 3/8*3/4 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/4 nothing+confusion ends (Lapras win|140|135)
(137) Chansey hit thrice, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|143|138), 3/8*2/3 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/3 nothing+confusion ends (Lapras win|140|135)
(138) Chansey hit thrice, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|144|139), 3/8*1/2 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/2 nothing+confusion ends (Lapras win|140|135)
(139) Chansey hit thrice, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4 nothing+confusion ends (Lapras win|140|135)
(140) Chansey hit four times, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt (Lapras win|Chansey win), 1/4 nothing (Lapras win|140)
(141) Chansey hit four times, parafused (2nd turn); Lapras hit thrice, paralysed
Unattainable
(142) Chansey hit four times, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|143), 3/8*2/3 Thunderbolt (Lapras win|Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4*1/3 nothing+confusion ends (Lapras win|140)
(143) Chansey hit four times, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|144), 3/8*1/2 Thunderbolt (Lapras win|Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4*1/2 nothing+confusion ends (Lapras win|140)
(144) Chansey hit four times, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4 nothing+confusion ends (Lapras win|140)
Here's the 140 simultaneous equations I put into Mathematica:
Reduce[x0 == 5/8*x1+3/8*x21 && x1 == 15/128*5/8*3/4*x12+113/128*5/8*3/4*x7+15/128*3/8*3/4*x32+113/128*3/8*3/4*x27+15/128*3/4*1/4*x30+113/128*3/4*1/4*x25+15/128*1/4*1/4*x10+113/128*1/4*1/4*x5 && x2 == 15/128*5/8*2/3*x13+113/128*5/8*2/3*x8+15/128*3/8*2/3*x33+113/128*3/8*2/3*x28+15/128*3/4*1/3*x30+113/128*3/4*1/3*x25+15/128*1/4*1/3*x10+113/128*1/4*1/3*x5 && x3 == 15/128*5/8*1/2*x14+113/128*5/8*1/2*x9+15/128*3/8*1/2*x34+113/128*3/8*1/2*x29+15/128*3/4*1/2*x30+113/128*3/4*1/2*x25+15/128*1/4*1/2*x10+113/128*1/4*1/2*x5 && x4 == 15/128*3/4*x30+113/128*3/4*x25+15/128*1/4*x10+113/128*1/4*x5 && x5 == 5/8*x6+3/8*x26 && x6 == 15/128*5/8*3/4*x17+113/128*5/8*3/4*x12+15/128*3/8*3/4*x7+113/128*3/8*3/4*x2+15/128*3/4*1/4*x5+113/128*3/4*1/4*x0+15/128*1/4*1/4*x15+113/128*1/4*1/4*x10 && x7 == 15/128*5/8*2/3*x18+113/128*5/8*2/3*x13+15/128*3/8*2/3*x8+113/128*3/8*2/3*x3+15/128*3/4*1/3*x5+113/128*3/4*1/3*x0+15/128*1/4*1/3*x15+113/128*1/4*1/3*x10 && x8 == 15/128*5/8*1/2*x19+113/128*5/8*1/2*x14+15/128*3/8*1/2*x9+113/128*3/8*1/2*x4+15/128*3/4*1/2*x5+113/128*3/4*1/2*x0+15/128*1/4*1/2*x15+113/128*1/4*1/2*x10 && x9 == 15/128*3/4*x5+113/128*3/4*x0+15/128*1/4*x15+113/128*1/4*x10 && x10 == 5/8*x11+3/8*x1 && x11 == 15/128*5/8*3/4*a+113/128*5/8*3/4*x17+15/128*3/8*3/4*x12+113/128*3/8*3/4*x7+15/128*3/4*1/4*x10+113/128*3/4*1/4*x5+15/128*1/4*1/4*a+113/128*1/4*1/4*x15 && x12 == 15/128*5/8*2/3*a+113/128*5/8*2/3*x18+15/128*3/8*2/3*x13+113/128*3/8*2/3*x8+15/128*3/4*1/3*x10+113/128*3/4*1/3*x5+15/128*1/4*1/3*a+113/128*1/4*1/3*x15 && x13 == 15/128*5/8*1/2*a+113/128*5/8*1/2*x19+15/128*3/8*1/2*x14+113/128*3/8*1/2*x9+15/128*3/4*1/2*x10+113/128*3/4*1/2*x5+15/128*1/4*1/2*a+113/128*1/4*1/2*x15 && x14 == 15/128*3/4*x10+113/128*3/4*x5+15/128*1/4*a+113/128*1/4*x15 && x15 == 5/8*x16+3/8*x6 && x16 == 5/8*3/4*a+15/128*3/8*3/4*a+113/128*3/8*3/4*x12+15/128*3/4*1/4*a+113/128*3/4*1/4*x10+1/4*1/4*a && x17 == 5/8*2/3*a+15/128*3/8*2/3*a+113/128*3/8*2/3*x13+15/128*3/4*1/3*a+113/128*3/4*1/3*x10+1/4*1/3*a && x18 == 5/8*1/2*a+15/128*3/8*1/2*a+113/128*3/8*1/2*x14+15/128*3/4*1/2*a+113/128*3/4*1/2*x10+1/4*1/2*a && x19 == 15/128*3/4*a+113/128*3/4*x10+1/4*a && x20 == 5/8*3/4*x21+3/8*3/4*231/256*x46+3/8*3/4*25/256*x71+3/4*1/4*231/256*x45+3/4*1/4*25/256*x70+1/4*1/4*x20 && x21 == 3/4*15/128*5/8*3/4*x32+3/4*113/128*5/8*3/4*x27+1/4*5/8*3/4*x22+3/4*15/128*3/8*3/4*231/256*x57+3/4*113/128*3/8*3/4*231/256*x52+1/4*3/8*3/4*231/256*x47+3/4*15/128*3/8*3/4*25/256*x82+3/4*113/128*3/8*3/4*25/256*x77+1/4*3/8*3/4*25/256*x72+3/4*15/128*3/4*1/4*231/256*x55+3/4*113/128*3/4*1/4*231/256*x50+1/4*3/4*1/4*231/256*x45+3/4*15/128*3/4*1/4*25/256*x80+3/4*113/128*3/4*1/4*25/256*x75+1/4*3/4*1/4*25/256*x70+3/4*15/128*1/4*1/4*x30+3/4*113/128*1/4*1/4*x25+1/4*1/4*1/4*x20 && x22 == 3/4*15/128*5/8*2/3*x33+3/4*113/128*5/8*2/3*x28+1/4*5/8*2/3*x23+3/4*15/128*3/8*2/3*231/256*x58+3/4*113/128*3/8*2/3*231/256*x53+1/4*3/8*2/3*231/256*x48+3/4*15/128*3/8*2/3*25/256*x83+3/4*113/128*3/8*2/3*25/256*x78+1/4*3/8*2/3*25/256*x73+3/4*15/128*3/4*1/3*231/256*x55+3/4*113/128*3/4*1/3*231/256*x50+1/4*3/4*1/3*231/256*x45+3/4*15/128*3/4*1/3*25/256*x80+3/4*113/128*3/4*1/3*25/256*x75+1/4*3/4*1/3*25/256*x70+3/4*15/128*1/4*1/3*x30+3/4*113/128*1/4*1/3*x25+1/4*1/4*1/3*x20 && x23 == 3/4*15/128*5/8*1/2*x34+3/4*113/128*5/8*1/2*x29+1/4*5/8*1/2*x24+3/4*15/128*3/8*1/2*231/256*x59+3/4*113/128*3/8*1/2*231/256*x54+1/4*3/8*1/2*231/256*x49+3/4*15/128*3/8*1/2*25/256*x84+3/4*113/128*3/8*1/2*25/256*x79+1/4*3/8*1/2*25/256*x74+3/4*15/128*3/4*1/2*231/256*x55+3/4*113/128*3/4*1/2*231/256*x50+1/4*3/4*1/2*231/256*x45+3/4*15/128*3/4*1/2*25/256*x80+3/4*113/128*3/4*1/2*25/256*x75+1/4*3/4*1/2*25/256*x70+3/4*15/128*1/4*1/2*x30+3/4*113/128*1/4*1/2*x25+1/4*1/4*1/2*x20 && x24 == 3/4*15/128*3/4*231/256*x55+3/4*113/128*3/4*231/256*x50+1/4*3/4*231/256*x45+3/4*15/128*3/4*25/256*x80+3/4*113/128*3/4*25/256*x75+1/4*3/4*25/256*x70+3/4*15/128*1/4*x30+3/4*113/128*1/4*x25+1/4*1/4*x20 && x25 == 5/8*3/4*x26+3/8*3/4*231/256*x51+3/8*3/4*25/256*x76+3/4*1/4*231/256*x50+3/4*1/4*25/256*x75+1/4*1/4*x25 && x26 == 3/4*15/128*5/8*3/4*x37+3/4*113/128*5/8*3/4*x32+1/4*5/8*3/4*x27+3/4*15/128*3/8*3/4*x27+3/4*113/128*3/8*3/4*x22+1/4*3/8*3/4*x22+3/4*15/128*3/4*1/4*x25+3/4*113/128*3/4*1/4*x20+1/4*3/4*1/4*x20+3/4*15/128*1/4*1/4*x35+3/4*113/128*1/4*1/4*x30+1/4*1/4*1/4*x25 && x27 == 3/4*15/128*5/8*2/3*x38+3/4*113/128*5/8*2/3*x33+1/4*5/8*2/3*x28+3/4*15/128*3/8*2/3*x28+3/4*113/128*3/8*2/3*x23+1/4*3/8*2/3*x23+3/4*15/128*3/4*1/3*x25+3/4*113/128*3/4*1/3*x20+1/4*3/4*1/3*x20+3/4*15/128*1/4*1/3*x35+3/4*113/128*1/4*1/3*x30+1/4*1/4*1/3*x25 && x28 == 3/4*15/128*5/8*1/2*x39+3/4*113/128*5/8*1/2*x34+1/4*5/8*1/2*x29+3/4*15/128*3/8*1/2*x29+3/4*113/128*3/8*1/2*x24+1/4*3/8*1/2*x24+3/4*15/128*3/4*1/2*x25+3/4*113/128*3/4*1/2*x20+1/4*3/4*1/2*x20+3/4*15/128*1/4*1/2*x35+3/4*113/128*1/4*1/2*x30+1/4*1/4*1/2*x25 && x29 == 3/4*15/128*3/4*x25+3/4*113/128*3/4*x20+1/4*3/4*x20+3/4*15/128*1/4*x35+3/4*113/128*1/4*x30+1/4*1/4*x25 && x30 == 5/8*3/4*x31+3/8*3/4*x21+3/4*1/4*x20+1/4*1/4*x30 && x31 == 3/4*15/128*5/8*3/4*x42+3/4*113/128*5/8*3/4*x37+1/4*5/8*3/4*x32+3/4*15/128*3/8*3/4*x32+3/4*113/128*3/8*3/4*x27+1/4*3/8*3/4*x22+3/4*15/128*3/4*1/4*x30+3/4*113/128*3/4*1/4*x25+1/4*3/4*1/4*x20+3/4*15/128*1/4*1/4*x40+3/4*113/128*1/4*1/4*x35+1/4*1/4*1/4*x30 && x32 == 3/4*15/128*5/8*2/3*x43+3/4*113/128*5/8*2/3*x38+1/4*5/8*2/3*x33+3/4*15/128*3/8*2/3*x33+3/4*113/128*3/8*2/3*x28+1/4*3/8*2/3*x23+3/4*15/128*3/4*1/3*x30+3/4*113/128*3/4*1/3*x25+1/4*3/4*1/3*x20+3/4*15/128*1/4*1/3*x40+3/4*113/128*1/4*1/3*x35+1/4*1/4*1/3*x30 && x33 == 3/4*15/128*5/8*1/2*x44+3/4*113/128*5/8*1/2*x39+1/4*5/8*1/2*x34+3/4*15/128*3/8*1/2*x34+3/4*113/128*3/8*1/2*x29+1/4*3/8*1/2*x24+3/4*15/128*3/4*1/2*x30+3/4*113/128*3/4*1/2*x25+1/4*3/4*1/2*x20+3/4*15/128*1/4*1/2*x40+3/4*113/128*1/4*1/2*x35+1/4*1/4*1/2*x30 && x34 == 3/4*15/128*3/4*x30+3/4*113/128*3/4*x25+1/4*3/4*x20+3/4*15/128*1/4*x40+3/4*113/128*1/4*x35+1/4*1/4*x30 && x35 == 5/8*3/4*x36+3/8*3/4*x26+3/4*1/4*x25+1/4*1/4*x35 && x36 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x42+1/4*5/8*3/4*x37+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x32+1/4*3/8*3/4*x27+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x30+1/4*3/4*1/4*x25+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x40+1/4*1/4*1/4*x35 && x37 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x43+1/4*5/8*2/3*x38+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x33+1/4*3/8*2/3*x28+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x30+1/4*3/4*1/3*x25+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x40+1/4*1/4*1/3*x35 && x38 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x44+1/4*5/8*1/2*x39+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x34+1/4*3/8*1/2*x29+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x30+1/4*3/4*1/2*x25+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x40+1/4*1/4*1/2*x35 && x39 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x30+1/4*3/4*x25+3/4*15/128*1/4*b+3/4*113/128*1/4*x40+1/4*1/4*x35 && x40 == 3/4*3/4*b+1/4*3/4*x30+3/4*1/4*b+1/4*1/4*x40 && x42 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x43+3/4*3/8*2/3*b+1/4*3/8*2/3*x33+3/4*3/4*1/3*b+1/4*3/4*1/3*x30+3/4*1/4*1/3*b+1/4*1/4*1/3*x40 && x43 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x44+3/4*3/8*1/2*b+1/4*3/8*1/2*x34+3/4*3/4*1/2*b+1/4*3/4*1/2*x30+3/4*1/4*1/2*b+1/4*1/4*1/2*x40 && x44 == 3/4*3/4*b+1/4*3/4*x30+3/4*1/4*b+1/4*1/4*x40 && x45 == 5/8*3/4*x46+3/8*3/4*231/256*x96+3/8*3/4*25/256*1011/1521*c+3/8*3/4*25/256*510/1521*x121+3/4*1/4*231/256*x95+3/4*1/4*25/256*1011/1521*c+3/4*1/4*25/256*510/1521*x120+1/4*1/4*x45 && x46 == 3/4*15/128*5/8*3/4*x57+3/4*113/128*5/8*3/4*x52+1/4*5/8*3/4*x47+3/4*15/128*3/8*3/4*231/256*x107+3/4*113/128*3/8*3/4*231/256*x102+1/4*3/8*3/4*231/256*x97+3/8*3/4*25/256*1011/1521*c+3/4*15/128*3/8*3/4*25/256*510/1521*x132+3/4*113/128*3/8*3/4*25/256*510/1521*x127+1/4*3/8*3/4*25/256*510/1521*x122+3/4*15/128*3/4*1/4*231/256*x105+3/4*113/128*3/4*1/4*231/256*x100+1/4*3/4*1/4*231/256*x95+3/4*1/4*25/256*1011/1521*c+3/4*15/128*3/4*1/4*25/256*510/1521*x130+3/4*113/128*3/4*1/4*25/256*510/1521*x125+1/4*3/4*1/4*25/256*510/1521*x120+3/4*15/128*1/4*1/4*x55+3/4*113/128*1/4*1/4*x50+1/4*1/4*1/4*x45 && x47 == 3/4*15/128*5/8*2/3*x58+3/4*113/128*5/8*2/3*x53+1/4*5/8*2/3*x48+3/4*15/128*3/8*2/3*231/256*x108+3/4*113/128*3/8*2/3*231/256*x103+1/4*3/8*2/3*231/256*x98+3/8*2/3*25/256*1011/1521*c+3/4*15/128*3/8*2/3*25/256*510/1521*x133+3/4*113/128*3/8*2/3*25/256*510/1521*x128+1/4*3/8*2/3*25/256*510/1521*x123+3/4*15/128*3/4*1/3*231/256*x105+3/4*113/128*3/4*1/3*231/256*x100+1/4*3/4*1/3*231/256*x95+3/4*1/3*25/256*1011/1521*c+3/4*15/128*3/4*1/3*25/256*510/1521*x130+3/4*113/128*3/4*1/3*25/256*510/1521*x125+1/4*3/4*1/3*25/256*510/1521*x120+3/4*15/128*1/4*1/3*x55+3/4*113/128*1/4*1/3*x50+1/4*1/4*1/3*x45 && x48 == 3/4*15/128*5/8*1/2*x59+3/4*113/128*5/8*1/2*x54+1/4*5/8*1/2*x49+3/4*15/128*3/8*1/2*231/256*x109+3/4*113/128*3/8*1/2*231/256*x104+1/4*3/8*1/2*231/256*x99+3/8*1/2*25/256*1011/1521*c+3/4*15/128*3/8*1/2*25/256*510/1521*x134+3/4*113/128*3/8*1/2*25/256*510/1521*x129+1/4*3/8*1/2*25/256*510/1521*x124+3/4*15/128*3/4*1/2*231/256*x105+3/4*113/128*3/4*1/2*231/256*x100+1/4*3/4*1/2*231/256*x95+3/4*1/2*25/256*1011/1521*c+3/4*15/128*3/4*1/2*25/256*510/1521*x130+3/4*113/128*3/4*1/2*25/256*510/1521*x125+1/4*3/4*1/2*25/256*510/1521*x120+3/4*15/128*1/4*1/2*x55+3/4*113/128*1/4*1/2*x50+1/4*1/4*1/2*x45 && x49 == 3/4*15/128*3/4*231/256*x105+3/4*113/128*3/4*231/256*x100+1/4*3/4*231/256*x95+3/4*25/256*1011/1521*c+3/4*15/128*3/4*25/256*510/1521*x130+3/4*113/128*3/4*25/256*510/1521*x125+1/4*3/4*25/256*510/1521*x120+3/4*15/128*1/4*x55+3/4*113/128*1/4*x50+1/4*1/4*x45 && x50 == 5/8*3/4*x51+3/8*3/4*231/256*x101+3/8*3/4*25/256*1011/1521*c+3/8*3/4*25/256*510/1521*x126+3/4*1/4*231/256*x100+3/4*1/4*25/256*1011/1521*c+3/4*1/4*25/256*510/1521*x125+1/4*1/4*x50 && x51 == 3/4*15/128*5/8*3/4*x62+3/4*113/128*5/8*3/4*x57+1/4*5/8*3/4*x52+3/4*15/128*3/8*3/4*x52+3/4*113/128*3/8*3/4*x47+1/4*3/8*3/4*x47+3/4*15/128*3/4*1/4*x50+3/4*113/128*3/4*1/4*x45+1/4*3/4*1/4*x45+3/4*15/128*1/4*1/4*x60+3/4*113/128*1/4*1/4*x55+1/4*1/4*1/4*x50 && x52 == 3/4*15/128*5/8*2/3*x63+3/4*113/128*5/8*2/3*x58+1/4*5/8*2/3*x53+3/4*15/128*3/8*2/3*x53+3/4*113/128*3/8*2/3*x48+1/4*3/8*2/3*x48+3/4*15/128*3/4*1/3*x50+3/4*113/128*3/4*1/3*x45+1/4*3/4*1/3*x45+3/4*15/128*1/4*1/3*x60+3/4*113/128*1/4*1/3*x55+1/4*1/4*1/3*x50 && x53 == 3/4*15/128*5/8*1/2*x64+3/4*113/128*5/8*1/2*x59+1/4*5/8*1/2*x54+3/4*15/128*3/8*1/2*x54+3/4*113/128*3/8*1/2*x49+1/4*3/8*1/2*x49+3/4*15/128*3/4*1/2*x50+3/4*113/128*3/4*1/2*x45+1/4*3/4*1/2*x45+3/4*15/128*1/4*1/2*x60+3/4*113/128*1/4*1/2*x55+1/4*1/4*1/2*x50 && x54 == 3/4*15/128*3/4*x50+3/4*113/128*3/4*x45+1/4*3/4*x45+3/4*15/128*1/4*x60+3/4*113/128*1/4*x55+1/4*1/4*x50 && x55 == 5/8*3/4*x56+3/8*3/4*x46+3/4*1/4*x45+1/4*1/4*x55 && x56 == 3/4*15/128*5/8*3/4*x67+3/4*113/128*5/8*3/4*x62+1/4*5/8*3/4*x57+3/4*15/128*3/8*3/4*x57+3/4*113/128*3/8*3/4*x52+1/4*3/8*3/4*x47+3/4*15/128*3/4*1/4*x55+3/4*113/128*3/4*1/4*x50+1/4*3/4*1/4*x45+3/4*15/128*1/4*1/4*x65+3/4*113/128*1/4*1/4*x60+1/4*1/4*1/4*x55 && x57 == 3/4*15/128*5/8*2/3*x68+3/4*113/128*5/8*2/3*x63+1/4*5/8*2/3*x58+3/4*15/128*3/8*2/3*x58+3/4*113/128*3/8*2/3*x53+1/4*3/8*2/3*x48+3/4*15/128*3/4*1/3*x55+3/4*113/128*3/4*1/3*x50+1/4*3/4*1/3*x45+3/4*15/128*1/4*1/3*x65+3/4*113/128*1/4*1/3*x60+1/4*1/4*1/3*x55 && x58 == 3/4*15/128*5/8*1/2*x69+3/4*113/128*5/8*1/2*x64+1/4*5/8*1/2*x59+3/4*15/128*3/8*1/2*x59+3/4*113/128*3/8*1/2*x54+1/4*3/8*1/2*x49+3/4*15/128*3/4*1/2*x55+3/4*113/128*3/4*1/2*x50+1/4*3/4*1/2*x45+3/4*15/128*1/4*1/2*x65+3/4*113/128*1/4*1/2*x60+1/4*1/4*1/2*x55 && x59 == 3/4*15/128*3/4*x55+3/4*113/128*3/4*x50+1/4*3/4*x45+3/4*15/128*1/4*x65+3/4*113/128*1/4*x60+1/4*1/4*x55 && x60 == 5/8*3/4*x61+3/8*3/4*x51+3/4*1/4*x50+1/4*1/4*x60 && x61 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x67+1/4*5/8*3/4*x62+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x57+1/4*3/8*3/4*x52+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x55+1/4*3/4*1/4*x50+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x65+1/4*1/4*1/4*x60 && x62 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x68+1/4*5/8*2/3*x63+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x58+1/4*3/8*2/3*x53+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x55+1/4*3/4*1/3*x50+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x65+1/4*1/4*1/3*x60 && x63 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x69+1/4*5/8*1/2*x64+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x59+1/4*3/8*1/2*x54+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x55+1/4*3/4*1/2*x50+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x65+1/4*1/4*1/2*x60 && x64 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x55+1/4*3/4*x50+3/4*15/128*1/4*b+3/4*113/128*1/4*x65+1/4*1/4*x60 && x65 == 3/4*3/4*b+1/4*3/4*x55+3/4*1/4*b+1/4*1/4*x65 && x67 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x68+3/4*3/8*2/3*b+1/4*3/8*2/3*x58+3/4*3/4*1/3*b+1/4*3/4*1/3*x55+3/4*1/4*1/3*b+1/4*1/4*1/3*x65 && x68 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x69+3/4*3/8*1/2*b+1/4*3/8*1/2*x59+3/4*3/4*1/2*b+1/4*3/4*1/2*x55+3/4*1/4*1/2*b+1/4*1/4*1/2*x65 && x69 == 3/4*3/4*b+1/4*3/4*x55+3/4*1/4*b+1/4*1/4*x65 && x70 == 5/8*3/4*x71+3/8*3/4*231/256*1011/1521*c+3/8*3/4*231/256*510/1521*x121+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*1/4*231/256*510/1521*x120+3/4*1/4*25/256*c+1/4*1/4*x70 && x71 == 3/4*15/128*5/8*3/4*x82+3/4*113/128*5/8*3/4*x77+1/4*5/8*3/4*x72+3/8*3/4*231/256*1011/1521*c+3/4*15/128*3/8*3/4*231/256*510/1521*x132+3/4*113/128*3/8*3/4*231/256*510/1521*x127+1/4*3/8*3/4*231/256*510/1521*x122+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*15/128*3/4*1/4*231/256*510/1521*x130+3/4*113/128*3/4*1/4*231/256*510/1521*x125+1/4*3/4*1/4*231/256*510/1521*x120+3/4*1/4*25/256*c+3/4*15/128*1/4*1/4*x80+3/4*113/128*1/4*1/4*x75+1/4*1/4*1/4*x70 && x72 == 3/4*15/128*5/8*2/3*x83+3/4*113/128*5/8*2/3*x78+1/4*5/8*2/3*x73+3/8*2/3*231/256*1011/1521*c+3/4*15/128*3/8*2/3*231/256*510/1521*x133+3/4*113/128*3/8*2/3*231/256*510/1521*x128+1/4*3/8*2/3*231/256*510/1521*x123+3/8*2/3*25/256*c+3/4*1/3*231/256*1011/1521*c+3/4*15/128*3/4*1/3*231/256*510/1521*x130+3/4*113/128*3/4*1/3*231/256*510/1521*x125+1/4*3/4*1/3*231/256*510/1521*x120+3/4*1/3*25/256*c+3/4*15/128*1/4*1/3*x80+3/4*113/128*1/4*1/3*x75+1/4*1/4*1/3*x70 && x73 == 3/4*15/128*5/8*1/2*x84+3/4*113/128*5/8*1/2*x79+1/4*5/8*1/2*x74+3/8*1/2*231/256*1011/1521*c+3/4*15/128*3/8*1/2*231/256*510/1521*x134+3/4*113/128*3/8*1/2*231/256*510/1521*x129+1/4*3/8*1/2*231/256*510/1521*x124+3/8*1/2*25/256*c+3/4*1/2*231/256*1011/1521*c+3/4*15/128*3/4*1/2*231/256*510/1521*x130+3/4*113/128*3/4*1/2*231/256*510/1521*x125+1/4*3/4*1/2*231/256*510/1521*x120+3/4*1/2*25/256*c+3/4*15/128*1/4*1/2*x80+3/4*113/128*1/4*1/2*x75+1/4*1/4*1/2*x70 && x74 == 3/4*231/256*1011/1521*c+3/4*15/128*3/4*231/256*510/1521*x130+3/4*113/128*3/4*231/256*510/1521*x125+1/4*3/4*231/256*510/1521*x120+3/4*25/256*c+3/4*15/128*1/4*x80+3/4*113/128*1/4*x75+1/4*1/4*x70 && x75 == 5/8*3/4*x76+3/8*3/4*231/256*1011/1521*c+3/8*3/4*231/256*510/1521*x126+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*1/4*231/256*510/1521*x125+3/4*1/4*25/256*c+1/4*1/4*x75 && x76 == 3/4*15/128*5/8*3/4*x87+3/4*113/128*5/8*3/4*x82+1/4*5/8*3/4*x77+3/4*15/128*3/8*3/4*x77+3/4*113/128*3/8*3/4*x72+1/4*3/8*3/4*x72+3/4*15/128*3/4*1/4*x75+3/4*113/128*3/4*1/4*x70+1/4*3/4*1/4*x70+3/4*15/128*1/4*1/4*x85+3/4*113/128*1/4*1/4*x80+1/4*1/4*1/4*x75 && x77 == 3/4*15/128*5/8*2/3*x88+3/4*113/128*5/8*2/3*x83+1/4*5/8*2/3*x78+3/4*15/128*3/8*2/3*x78+3/4*113/128*3/8*2/3*x73+1/4*3/8*2/3*x73+3/4*15/128*3/4*1/3*x75+3/4*113/128*3/4*1/3*x70+1/4*3/4*1/3*x70+3/4*15/128*1/4*1/3*x85+3/4*113/128*1/4*1/3*x80+1/4*1/4*1/3*x75 && x78 == 3/4*15/128*5/8*1/2*x89+3/4*113/128*5/8*1/2*x84+1/4*5/8*1/2*x79+3/4*15/128*3/8*1/2*x79+3/4*113/128*3/8*1/2*x74+1/4*3/8*1/2*x74+3/4*15/128*3/4*1/2*x75+3/4*113/128*3/4*1/2*x70+1/4*3/4*1/2*x70+3/4*15/128*1/4*1/2*x85+3/4*113/128*1/4*1/2*x80+1/4*1/4*1/2*x75 && x79 == 3/4*15/128*3/4*x75+3/4*113/128*3/4*x70+1/4*3/4*x70+3/4*15/128*1/4*x85+3/4*113/128*1/4*x80+1/4*1/4*x75 && x80 == 5/8*3/4*x81+3/8*3/4*x71+3/4*1/4*x70+1/4*1/4*x80 && x81 == 3/4*15/128*5/8*3/4*x92+3/4*113/128*5/8*3/4*x87+1/4*5/8*3/4*x82+3/4*15/128*3/8*3/4*x82+3/4*113/128*3/8*3/4*x77+1/4*3/8*3/4*x72+3/4*15/128*3/4*1/4*x80+3/4*113/128*3/4*1/4*x75+1/4*3/4*1/4*x70+3/4*15/128*1/4*1/4*x90+3/4*113/128*1/4*1/4*x85+1/4*1/4*1/4*x80 && x82 == 3/4*15/128*5/8*2/3*x93+3/4*113/128*5/8*2/3*x88+1/4*5/8*2/3*x83+3/4*15/128*3/8*2/3*x83+3/4*113/128*3/8*2/3*x78+1/4*3/8*2/3*x73+3/4*15/128*3/4*1/3*x80+3/4*113/128*3/4*1/3*x75+1/4*3/4*1/3*x70+3/4*15/128*1/4*1/3*x90+3/4*113/128*1/4*1/3*x85+1/4*1/4*1/3*x80 && x83 == 3/4*15/128*5/8*1/2*x94+3/4*113/128*5/8*1/2*x89+1/4*5/8*1/2*x84+3/4*15/128*3/8*1/2*x84+3/4*113/128*3/8*1/2*x79+1/4*3/8*1/2*x74+3/4*15/128*3/4*1/2*x80+3/4*113/128*3/4*1/2*x75+1/4*3/4*1/2*x70+3/4*15/128*1/4*1/2*x90+3/4*113/128*1/4*1/2*x85+1/4*1/4*1/2*x80 && x84 == 3/4*15/128*3/4*x80+3/4*113/128*3/4*x75+1/4*3/4*x70+3/4*15/128*1/4*x90+3/4*113/128*1/4*x85+1/4*1/4*x80 && x85 == 5/8*3/4*x86+3/8*3/4*x76+3/4*1/4*x75+1/4*1/4*x85 && x86 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x92+1/4*5/8*3/4*x87+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x82+1/4*3/8*3/4*x77+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x80+1/4*3/4*1/4*x75+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x90+1/4*1/4*1/4*x85 && x87 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x93+1/4*5/8*2/3*x88+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x83+1/4*3/8*2/3*x78+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x80+1/4*3/4*1/3*x75+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x90+1/4*1/4*1/3*x85 && x88 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x94+1/4*5/8*1/2*x89+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x84+1/4*3/8*1/2*x79+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x80+1/4*3/4*1/2*x75+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x90+1/4*1/4*1/2*x85 && x89 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x80+1/4*3/4*x75+3/4*15/128*1/4*b+3/4*113/128*1/4*x90+1/4*1/4*x85 && x90 == 3/4*3/4*b+1/4*3/4*x80+3/4*1/4*b+1/4*1/4*x90 && x92 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x93+3/4*3/8*2/3*b+1/4*3/8*2/3*x83+3/4*3/4*1/3*b+1/4*3/4*1/3*x80+3/4*1/4*1/3*b+1/4*1/4*1/3*x90 && x93 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x94+3/4*3/8*1/2*b+1/4*3/8*1/2*x84+3/4*3/4*1/2*b+1/4*3/4*1/2*x80+3/4*1/4*1/2*b+1/4*1/4*1/2*x90 && x94 == 3/4*3/4*b+1/4*3/4*x80+3/4*1/4*b+1/4*1/4*x90 && x95 == 5/8*3/4*x96+3/8*3/4*231/256*921/1000*c+3/8*3/4*231/256*79/1000*x121+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*1/4*231/256*79/1000*x120+3/4*1/4*25/256*c+1/4*1/4*x95 && x96 == 3/4*15/128*5/8*3/4*x107+3/4*113/128*5/8*3/4*x102+1/4*5/8*3/4*x97+3/8*3/4*231/256*921/1000*c+3/4*15/128*3/8*3/4*231/256*79/1000*x132+3/4*113/128*3/8*3/4*231/256*79/1000*x127+1/4*3/8*3/4*231/256*79/1000*x122+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*15/128*3/4*1/4*231/256*79/1000*x130+3/4*113/128*3/4*1/4*231/256*79/1000*x125+1/4*3/4*1/4*231/256*79/1000*x120+3/4*1/4*25/256*c+3/4*15/128*1/4*1/4*x105+3/4*113/128*1/4*1/4*x100+1/4*1/4*1/4*x95 && x97 == 3/4*15/128*5/8*2/3*x108+3/4*113/128*5/8*2/3*x103+1/4*5/8*2/3*x98+3/8*2/3*231/256*921/1000*c+3/4*15/128*3/8*2/3*231/256*79/1000*x133+3/4*113/128*3/8*2/3*231/256*79/1000*x128+1/4*3/8*2/3*231/256*79/1000*x123+3/8*2/3*25/256*c+3/4*1/3*231/256*921/1000*c+3/4*15/128*3/4*1/3*231/256*79/1000*x130+3/4*113/128*3/4*1/3*231/256*79/1000*x125+1/4*3/4*1/3*231/256*79/1000*x120+3/4*1/3*25/256*c+3/4*15/128*1/4*1/3*x105+3/4*113/128*1/4*1/3*x100+1/4*1/4*1/3*x95 && x98 == 3/4*15/128*5/8*1/2*x109+3/4*113/128*5/8*1/2*x104+1/4*5/8*1/2*x99+3/8*1/2*231/256*921/1000*c+3/4*15/128*3/8*1/2*231/256*79/1000*x134+3/4*113/128*3/8*1/2*231/256*79/1000*x129+1/4*3/8*1/2*231/256*79/1000*x124+3/8*1/2*25/256*c+3/4*1/2*231/256*921/1000*c+3/4*15/128*3/4*1/2*231/256*79/1000*x130+3/4*113/128*3/4*1/2*231/256*79/1000*x125+1/4*3/4*1/2*231/256*79/1000*x120+3/4*1/2*25/256*c+3/4*15/128*1/4*1/2*x105+3/4*113/128*1/4*1/2*x100+1/4*1/4*1/2*x95 && x99 == 3/4*231/256*921/1000*c+3/4*15/128*3/4*231/256*79/1000*x130+3/4*113/128*3/4*231/256*79/1000*x125+1/4*3/4*231/256*79/1000*x120+3/4*25/256*c+3/4*15/128*1/4*x105+3/4*113/128*1/4*x100+1/4*1/4*x95 && x100 == 5/8*3/4*x101+3/8*3/4*231/256*921/1000*c+3/8*3/4*231/256*79/1000*x126+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*1/4*231/256*79/1000*x125+3/4*1/4*25/256*c+1/4*1/4*x100 && x101 == 3/4*15/128*5/8*3/4*x112+3/4*113/128*5/8*3/4*x107+1/4*5/8*3/4*x102+3/4*15/128*3/8*3/4*x102+3/4*113/128*3/8*3/4*x97+1/4*3/8*3/4*x97+3/4*15/128*3/4*1/4*x100+3/4*113/128*3/4*1/4*x95+1/4*3/4*1/4*x95+3/4*15/128*1/4*1/4*x110+3/4*113/128*1/4*1/4*x105+1/4*1/4*1/4*x100 && x102 == 3/4*15/128*5/8*2/3*x113+3/4*113/128*5/8*2/3*x108+1/4*5/8*2/3*x103+3/4*15/128*3/8*2/3*x103+3/4*113/128*3/8*2/3*x98+1/4*3/8*2/3*x98+3/4*15/128*3/4*1/3*x100+3/4*113/128*3/4*1/3*x95+1/4*3/4*1/3*x95+3/4*15/128*1/4*1/3*x110+3/4*113/128*1/4*1/3*x105+1/4*1/4*1/3*x100 && x103 == 3/4*15/128*5/8*1/2*x114+3/4*113/128*5/8*1/2*x109+1/4*5/8*1/2*x104+3/4*15/128*3/8*1/2*x104+3/4*113/128*3/8*1/2*x99+1/4*3/8*1/2*x99+3/4*15/128*3/4*1/2*x100+3/4*113/128*3/4*1/2*x95+1/4*3/4*1/2*x95+3/4*15/128*1/4*1/2*x110+3/4*113/128*1/4*1/2*x105+1/4*1/4*1/2*x100 && x104 == 3/4*15/128*3/4*x100+3/4*113/128*3/4*x95+1/4*3/4*x95+3/4*15/128*1/4*x110+3/4*113/128*1/4*x105+1/4*1/4*x100 && x105 == 5/8*3/4*x106+3/8*3/4*x96+3/4*1/4*x95+1/4*1/4*x105 && x106 == 3/4*15/128*5/8*3/4*x117+3/4*113/128*5/8*3/4*x112+1/4*5/8*3/4*x107+3/4*15/128*3/8*3/4*x107+3/4*113/128*3/8*3/4*x102+1/4*3/8*3/4*x97+3/4*15/128*3/4*1/4*x105+3/4*113/128*3/4*1/4*x100+1/4*3/4*1/4*x95+3/4*15/128*1/4*1/4*x115+3/4*113/128*1/4*1/4*x110+1/4*1/4*1/4*x105 && x107 == 3/4*15/128*5/8*2/3*x118+3/4*113/128*5/8*2/3*x113+1/4*5/8*2/3*x108+3/4*15/128*3/8*2/3*x108+3/4*113/128*3/8*2/3*x103+1/4*3/8*2/3*x98+3/4*15/128*3/4*1/3*x105+3/4*113/128*3/4*1/3*x100+1/4*3/4*1/3*x95+3/4*15/128*1/4*1/3*x115+3/4*113/128*1/4*1/3*x110+1/4*1/4*1/3*x105 && x108 == 3/4*15/128*5/8*1/2*x119+3/4*113/128*5/8*1/2*x114+1/4*5/8*1/2*x109+3/4*15/128*3/8*1/2*x109+3/4*113/128*3/8*1/2*x104+1/4*3/8*1/2*x99+3/4*15/128*3/4*1/2*x105+3/4*113/128*3/4*1/2*x100+1/4*3/4*1/2*x95+3/4*15/128*1/4*1/2*x115+3/4*113/128*1/4*1/2*x110+1/4*1/4*1/2*x105 && x109 == 3/4*15/128*3/4*x105+3/4*113/128*3/4*x100+1/4*3/4*x95+3/4*15/128*1/4*x115+3/4*113/128*1/4*x110+1/4*1/4*x105 && x110 == 5/8*3/4*x111+3/8*3/4*x101+3/4*1/4*x100+1/4*1/4*x110 && x111 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x117+1/4*5/8*3/4*x112+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x107+1/4*3/8*3/4*x102+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x105+1/4*3/4*1/4*x100+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x115+1/4*1/4*1/4*x110 && x112 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x118+1/4*5/8*2/3*x113+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x108+1/4*3/8*2/3*x103+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x105+1/4*3/4*1/3*x100+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x115+1/4*1/4*1/3*x110 && x113 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x119+1/4*5/8*1/2*x114+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x109+1/4*3/8*1/2*x104+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x105+1/4*3/4*1/2*x100+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x115+1/4*1/4*1/2*x110 && x114 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x105+1/4*3/4*x100+3/4*15/128*1/4*b+3/4*113/128*1/4*x115+1/4*1/4*x110 && x115 == 3/4*3/4*b+1/4*3/4*x105+3/4*1/4*b+1/4*1/4*x115 && x117 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x118+3/4*3/8*2/3*b+1/4*3/8*2/3*x108+3/4*3/4*1/3*b+1/4*3/4*1/3*x105+3/4*1/4*1/3*b+1/4*1/4*1/3*x115 && x118 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x119+3/4*3/8*1/2*b+1/4*3/8*1/2*x109+3/4*3/4*1/2*b+1/4*3/4*1/2*x105+3/4*1/4*1/2*b+1/4*1/4*1/2*x115 && x119 == 3/4*3/4*b+1/4*3/4*x105+3/4*1/4*b+1/4*1/4*x115 && x120 == 5/8*3/4*x121+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x120 && x121 == 3/4*15/128*5/8*3/4*x132+3/4*113/128*5/8*3/4*x127+1/4*5/8*3/4*x122+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x130+3/4*113/128*1/4*1/4*x125+1/4*1/4*1/4*x120 && x122 == 3/4*15/128*5/8*2/3*x133+3/4*113/128*5/8*2/3*x128+1/4*5/8*2/3*x123+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x130+3/4*113/128*1/4*1/3*x125+1/4*1/4*1/3*x120 && x123 == 3/4*15/128*5/8*1/2*x134+3/4*113/128*5/8*1/2*x129+1/4*5/8*1/2*x124+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x130+3/4*113/128*1/4*1/2*x125+1/4*1/4*1/2*x120 && x124 == 3/4*c+3/4*15/128*1/4*x130+3/4*113/128*1/4*x125+1/4*1/4*x120 && x125 == 5/8*3/4*x126+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x125 && x126 == 3/4*15/128*5/8*3/4*x137+3/4*113/128*5/8*3/4*x132+1/4*5/8*3/4*x127+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x135+3/4*113/128*1/4*1/4*x130+1/4*1/4*1/4*x125 && x127 == 3/4*15/128*5/8*2/3*x138+3/4*113/128*5/8*2/3*x133+1/4*5/8*2/3*x128+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x135+3/4*113/128*1/4*1/3*x130+1/4*1/4*1/3*x125 && x128 == 3/4*15/128*5/8*1/2*x139+3/4*113/128*5/8*1/2*x134+1/4*5/8*1/2*x129+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x135+3/4*113/128*1/4*1/2*x130+1/4*1/4*1/2*x125 && x129 == 3/4*c+3/4*15/128*1/4*x135+3/4*113/128*1/4*x130+1/4*1/4*x125 && x130 == 5/8*3/4*x131+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x130 && x131 == 3/4*15/128*5/8*3/4*x142+3/4*113/128*5/8*3/4*x137+1/4*5/8*3/4*x132+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x140+3/4*113/128*1/4*1/4*x135+1/4*1/4*1/4*x130 && x132 == 3/4*15/128*5/8*2/3*x143+3/4*113/128*5/8*2/3*x138+1/4*5/8*2/3*x133+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x140+3/4*113/128*1/4*1/3*x135+1/4*1/4*1/3*x130 && x133 == 3/4*15/128*5/8*1/2*x144+3/4*113/128*5/8*1/2*x139+1/4*5/8*1/2*x134+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x140+3/4*113/128*1/4*1/2*x135+1/4*1/4*1/2*x130 && x134 == 3/4*c+3/4*15/128*1/4*x140+3/4*113/128*1/4*x135+1/4*1/4*x130 && x135 == 5/8*3/4*x136+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x135 && x136 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x142+1/4*5/8*3/4*x137+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*c+1/4*3/8*3/4*c+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*c+1/4*3/4*1/4*c+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x140+1/4*1/4*1/4*x135 && x137 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x143+1/4*5/8*2/3*x138+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*c+1/4*3/8*2/3*c+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*c+1/4*3/4*1/3*c+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x140+1/4*1/4*1/3*x135 && x138 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x144+1/4*5/8*1/2*x139+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*c+1/4*3/8*1/2*c+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*c+1/4*3/4*1/2*c+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x140+1/4*1/4*1/2*x135 && x139 == 3/4*15/128*3/4*b+3/4*113/128*3/4*c+1/4*3/4*c+3/4*15/128*1/4*b+3/4*113/128*1/4*x140+1/4*1/4*x135 && x140 == 3/4*3/4*b+1/4*3/4*c+3/4*1/4*b+1/4*1/4*x140 && x142 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x143+3/4*3/8*2/3*b+1/4*3/8*2/3*c+3/4*3/4*1/3*b+1/4*3/4*1/3*c+3/4*1/4*1/3*b+1/4*1/4*1/3*x140 && x143 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x144+3/4*3/8*1/2*b+1/4*3/8*1/2*c+3/4*3/4*1/2*b+1/4*3/4*1/2*c+3/4*1/4*1/2*b+1/4*1/4*1/2*x140 && x144 == 3/4*3/4*b+1/4*3/4*c+3/4*1/4*b+1/4*1/4*x140, {x0, x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15, x16, x17, x18, x19, x20, x21, x22, x23, x24, x25, x26, x27, x28, x29, x30, x31, x32, x33, x34, x35, x36, x37, x38, x39, x40, x42, x43, x44, x45, x46, x47, x48, x49, x50, x51, x52, x53, x54, x55, x56, x57, x58, x59, x60, x61, x62, x63, x64, x65, x67, x68, x69, x70, x71, x72, x73, x74, x75, x76, x77, x78, x79, x80, x81, x82, x83, x84, x85, x86, x87, x88, x89, x90, x92, x93, x94, x95, x96, x97, x98, x99, x100, x101, x102, x103, x104, x105, x106, x107, x108, x109, x110, x111, x112, x113, x114, x115, x117, x118, x119, x120, x121, x122, x123, x124, x125, x126, x127, x128, x129, x130, x131, x132, x133, x134, x135, x136, x137, x138, x139, x140, x142, x143, x144}]
Here's what Mathematica spat out:
x0 == (5142175855881592750910450278590166654571522441385625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (1840561346815806553411760798027890691825539863251417120654787757846530678768289976080210618586\
> 9388311061619282625178579085441866497510333781680016986203046864744380048553570431978458346\
> 4980559941217294655104992420291469408486706961794372764837949227087115938808888409721181483
> b) / 104187228975551907725009192969949798568335253390023767910516238520914446232151988149128\
> 584486453840636983234683103122922646252115682463665146830035872881815581229069032900735497966\
> 988643531117454420134145152156172877845652091537786330759703973030839381877296598089728000000\
> 0000 + (7602516728223144429136722882455799788483616554650953383124700099178703224163642153944\
> 0273668655871539318943478991848025614795312843650680493623454856991951533448517739622070696\
> 6081894747421412777148409553881209216599963064463833611275070255865524985327578809546408870\
> 278818517 c) /
> 1041872289755519077250091929699497985683352533900237679105162385209144462321519881491285844864\
> 538406369832346831031229226462521156824636651468300358728818155812290690329007354979669886435\
> 311174544201341451521561728778456520915377863307597039730308393818772965980897280000000000 &&
> x1 == (8227481369410548401456720445744266647314435906217000 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (7662821486767818657675725392094776286655925733858414446419514004517095061100364856440305490954\
> 8662191571298443615278188034091309457663005940206906630492867578792921517819794045006058678\
> 9866255760367114702248857651906897686310528649496782506951811600408334576898170184767640765\
> 43 b) / 42675088988386061404163765440491437493590119788553735336147451298166557176689454345\
> 883068205651493124908332926199039149115904866583537117244141582693532391662071426675876141259\
> 967278548390345709330486945854323168410765579096693877281079174747353431810816940686577552588\
> 8000000000 + (2861828159277581365905575799202827514894408989337431968546126683638354353914067\
> 2943356699647115912201443276011372383247383395386957134711374957243027987552395117549337151\
> 1240095495725191951057008688514765050372329097885942261650141330636878868927108942359248472\
> 845291411235923457 c) /
> 4267508898838606140416376544049143749359011978855373533614745129816655717668945434588306820565\
> 149312490833292619903914911590486658353711724414158269353239166207142667587614125996727854839\
> 03457093304869458543231684107655790966938772810791747473534318108169406865775525888000000000\
> && x2 == (6421942165113021318195682082620438102429602863273625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (9390413663790963627604422831449869256181546120440778007411337003974302386231872649125668089037\
> 3230664437398255171931303221469325368180595070661986390270237409544573234497365226415447765\
> 58497914585178373989802421901642587185532507893155634402000774023355699446912337112399727 b)
> / 520936144877759538625045964849748992841676266950118839552581192604572231160759940745642922\
> 432269203184916173415515614613231260578412318325734150179364409077906145345164503677489834943\
> 21765558727210067072576078086438922826045768893165379851986515419690938648299044864000000000\
> + (3661090176664648442137988900026344400272156387764320389470353911747950997253222057475454007\
> 7403721043346972827546104543157144050568924837208595322054144442697802962951282955084525500\
> 0393001373858529401529731927872421743421001837061113830994320593230599413090717805268876002\
> 73 c) / 52093614487775953862504596484974899284167626695011883955258119260457223116075994074\
> 564292243226920318491617341551561461323126057841231832573415017936440907790614534516450367748\
> 983494321765558727210067072576078086438922826045768893165379851986515419690938648299044864000\
> 000000 && x3 == (4906402211664663449231710521519438427239268425897625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (7577669863904692145722807672660476719707288415893472043897399709397415696004458587634124953887\
> 9170311460300763948228688009285287039898937323271234590471546420277263519049954897873534774\
> 88992036769280685199833374925728088938176460868324376938110339968179325067510872492253561 b)
> / 416748915902207630900036771879799194273341013560095071642064954083657784928607952596514337\
> 945815362547932938732412491690585008462729854660587320143491527262324916276131602941991867954\
> 57412446981768053658060862469151138260836615114532303881589212335752750918639235891200000000\
> + (3037357940123485458312336025913287474092426602753927747135527597851924187804594354750478976\
> 8988838920755334925264452288969758743779383023090981314267298321528963886403179562114753569\
> 5282747329790993284770591039826033751227285293653264944317724938117625394938406786187077464\
> 39 c) / 41674891590220763090003677187979919427334101356009507164206495408365778492860795259\
> 651433794581536254793293873241249169058500846272985466058732014349152726232491627613160294199\
> 186795457412446981768053658060862469151138260836615114532303881589212335752750918639235891200\
> 000000 && x4 == (3014733370581001964280550642928245948543575204009625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (4708201770700076389074476961448175492232071679326586187434468917418585227577372960333527353876\
> 4494564214176841791333587731620059817747080381353431926969840459986269121891109417877953000\
> 87845038600147498385516597907705323260605418857425744153185706836770334124466995360116329 b)
> / 239855491166738204834553537772546298862354540178471983678886304508580020102795943940439906\
> 731404525207443417975489203850696407748333729301057450442297281877597074115759195937837046304\
> 79086300421161469731258050341957489646524670569514995039763575445037554485547761664000000000\
> + (1796051979115258698933018371020389045374565000969485941313648184070923315936049445638085278\
> 3702361309895571769781779574571677833825487346222057245945473420714925154044633759570389855\
> 1466634339939154373984323878667371011007645966696487063733183494140281288040553586686398836\
> 71 c) / 23985549116673820483455353777254629886235454017847198367888630450858002010279594394\
> 043990673140452520744341797548920385069640774833372930105745044229728187759707411575919593783\
> 704630479086300421161469731258050341957489646524670569514995039763575445037554485547761664000\
> 000000 && x5 == (10878616670728096299781969929094919790803654975001625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (5864583955078102644470561651610950819983309328526890552639972967045679437060359062691810989561\
> 5374739725735904597692250097773253249877347713167942364906722175582321983521480403494044651\
> 15293558444123385793337603993193475589934309745886318500126348512334354153215037716941143389
> b) / 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772\
> 114703566522900383463509859299933524680067701838837284698561147932218098599330209052823535934\
> 943636592995758541444292644868997532091060866929209162584310527136986860220073491138871296000\
> 0000000 + (2087039548152313053972167505294774357063627758442427693536395773076280325149115063\
> 9538682156859101002962737872317599686031787296948660486394468311283516236342304020455392968\
> 3998108207537834465425968962240859691078077236570036581000104322375537879066457593353102479\
> 15243058856611 c) /
> 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772114703566\
> 522900383463509859299933524680067701838837284698561147932218098599330209052823535934943636592\
> 9957585414442926448689975320910608669292091625843105271369868602200734911388712960000000000\
> && x6 == (17405786673164954079651151886551871665285847960002600 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (1463631743219342193285108240167120274190515196257634671643133051923517172819993984167201789539\
> 7733398376372461960323841009717761649450761990066229112967371218816653809748287064926328878\
> 1855589299542890825365028863977674032683488380168920697492856230040402474520494612798711229
> b) / 104187228975551907725009192969949798568335253390023767910516238520914446232151988149128\
> 584486453840636983234683103122922646252115682463665146830035872881815581229069032900735497966\
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> 0946040301894711025987284797687369688801108684446905389662448881364671491573018219064114667\
> 201288771 c) /
> 1041872289755519077250091929699497985683352533900237679105162385209144462321519881491285844864\
> 538406369832346831031229226462521156824636651468300358728818155812290690329007354979669886435\
> 311174544201341451521561728778456520915377863307597039730308393818772965980897280000000000 &&
> x7 == (14648442894099974859364644033925439060939050991654425 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2493045614096616157145751403281527782457022557563836641763453050016388165545215907922693141609\
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> 68704102358418745986871255174188376197640563461421166443743950547069886723760945199856943037
> b) / 1666995663608830523600147087519196777093364054240380286568259816334631139714431810386\
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> 7280143056963 c) /
> 1666995663608830523600147087519196777093364054240380286568259816334631139714431810386057351783\
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> 4978792707221463224344987660455304334646045812921552635684934301100367455694356480000000000\
> && x8 == (11813975973069953410774626929208868158686980698969625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (5512921130349145298810438636533184395917778376467637926928775013165322857770505940745761580295\
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> 4919 b) /
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> 788385081 c) /
> 3414007119070884912333101235239314999487209583084298826891796103853324574135156347670645456452\
> 119449992666634095923131929272389326682969379531326615482591332965714134070091300797382283871\
> 2276567464389556683458534728612463277355101824863339797882745448653552549262042071040000000000
> && x9 == (9945664064726094955957716396951164330595672303244825 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (8730995853633993649436500193310759282079160546504835858795765632153204737392426550103411617371\
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> 47 b) / 53343861235482576755204706800614296866987649735692169170184314122708196470861817932\
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> 978135277368151353 c) /
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> 436640613541615774879893639488108322942139655517697836691548957758928334484517657495909818548\
> 79321366631086823179039605134569738708673466013489684341917897635211758582219407360000000000\
> && x10 == (20950653463013208255751955146102399286233166151849625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2718521756983800667152633851060499716205106734199380563335405769619587221471277612219444511855\
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> ) / 2083744579511038154500183859398995971366705067800475358210324770418288924643039762982571\
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> 2305071 c) /
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> 62234908840268290304312345755691304183075572661519407946061678763754593196179456000000000 &&
> x11 == (28584556719174804168329095966317278869584404299229200 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2155179600611913415760157683949089849033669153154740781042874611589603185328431782928246240938\
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> 107 b) / 2133754449419303070208188272024571874679505989427686766807372564908327858834472717\
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> 56370346429978512893 c) /
> 2133754449419303070208188272024571874679505989427686766807372564908327858834472717294153410282\
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> 517285466524347292716158420538278954834693864053958737367671590540847034328877629440000000000\
> && x12 == (25704737831694234908090539777361658345776075698243225 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (5885228277716641291847471832857210785929163070413834609694122997330706312602965940698333278082\
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> ) / 5209361448777595386250459648497489928416762669501188395525811926045722311607599407456429\
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> 1770759 c) /
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> 692031849161734155156146132312605784123183257341501793644090779061453451645036774898349432176\
> 55587272100670725760780864389228260457688931653798519865154196909386482990448640000000000 &&
> x13 == (21942176734554720825990153796302939866925538648233625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (1326764633012177186512122302605756460317654160453926717005260283336860821645498749767217302119\
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> 8179816165339517982204366742485163615064360563938152743527071498981425921654010539776808203
> b) / 104187228975551907725009192969949798568335253390023767910516238520914446232151988149128\
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> 0685460232595823570126409164140210549156362581180905587289654431987670570721127455555046740\
> 223191797 c) /
> 1041872289755519077250091929699497985683352533900237679105162385209144462321519881491285844864\
> 538406369832346831031229226462521156824636651468300358728818155812290690329007354979669886435\
> 311174544201341451521561728778456520915377863307597039730308393818772965980897280000000000 &&
> x14 == (17892327485920547766495327005811709345211278346655385 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (4881236903795826651173397665414303904933865921762064707074999297756049538633633408905392561208\
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> 1442406352262126926393931919597345732644942731925981124316448986666866356403779680159828113
> b) / 333399132721766104720029417503839355418672810848076057313651963266926227942886362077211\
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> 9549596515097196821844607450651667332033923533214825511675400379449571326667595222120744745\
> 5840171887 c) /
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> 995758541444292644868997532091060866929209162584310527136986860220073491138871296000000000 &&
> x15 == (32801386299509587233436571498539142095648390839836185 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2790847499727015937082031570970400812256900926630140107232739727522139421867491991391478416139\
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> 15570242122195617546047782619104570161641059005625799064016026498952100611623199477237777353
> b) / 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772\
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> 43882762222647 c) /
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> && x16 == (42038746075316367125707823265731504353865916567736336 a) /
> 54912304248954538795489937340192423398464989015152281 +
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> 6660634105536185528333487250274496353887839688719750138820350347693454183475452824730648521
> b) / 416748915902207630900036771879799194273341013560095071642064954083657784928607952596514\
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> 269351479 c) /
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> x17 == (40140251616262058753412071073802414875523282228013593 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (9485027587498773742812301024355272311921357831673710026563901187517873464345891994190442814354\
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> 82577282443 c) /
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> && x18 == (37541322141758862494331966231331047220659235197798937 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (4603791712362812198474959010205879115911880332736827970804672940822629011448843679354581484710\
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> 958061423477063679901 c) /
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> && x19 == (32425976873106665645155609285902348839780246924020249 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (9215788756175084261647428755095094037935311828935900109707025559010400680787631105423916895191\
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> && x20 == (1008521482969540273440048110181881776100356717439346468723545311606433422580781952462\
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> 33578496999833543357511607392858394811375215140160890136147490526660833 c) /
> 1483981537287077565728635074842270325820989230282735873495363364926292539705564064682878541801\
> 262604922556769164458899644520364512845405087234227484114708070400000000 &&
> x64 == (44058857384919286063650430898854439434018824216580820624836330700885194617067180547911033\
> 766218743853021294995193070611335585833364426376684793050346647160872400763 b) /
> 1159360576005529348225496152220523692047647836158387401168252628848666046644971925533498860782\
> 23641009574747590973351534728153477566047272440174022196461568000000000 +
> (7187720021563364875889918432319792977074595939925791949198893218398141004743001200543885231200\
> 4897156553452595780280923392567644201620895755380971849814407127599237 c) /
> 1159360576005529348225496152220523692047647836158387401168252628848666046644971925533498860782\
> 23641009574747590973351534728153477566047272440174022196461568000000000 &&
> x65 == (76254362338088484791499600474969162390677738167430456967443454363308505444099023684907837\
> 5931362457205706662116024084087965601568542955744129440483610872092558009 b) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 +
> (1432068266234349553861728641725925105054474903244355874882628226549352945003940799739676090547\
> 59738181596053438455224777098097474941788571809419064798983907441991 c) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 &&
> x67 == (50143819931289928532867952546579607571810572556037098488274255815540891236387833634806381\
> 572180051435773453906739486291218314865582195002949897424793540937196679 b) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 +
> (6465583193980059173455101761063150828953481943884161334394329577460380572448686166633992489452\
> 585775932965815415470512848166324635601516796281296982075062803321 c) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 &&
> x68 == (50465019772910996870526718991568897228554413512097453174145949601160846279441991900697580\
> 579339655558898935807158143733685552573735575170707672101513192819747766809 b) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 +
> (7503009027365470540748088619457287373827978295821916884266681841272456052806604375977362459772\
> 164945888437988328532033678524165047448465512414909585037964252233191 c) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 &&
> x69 == (76254362338088484791499600474969162390677738167430456967443454363308505444099023684907837\
> 5931362457205706662116024084087965601568542955744129440483610872092558009 b) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 +
> (1432068266234349553861728641725925105054474903244355874882628226549352945003940799739676090547\
> 59738181596053438455224777098097474941788571809419064798983907441991 c) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 &&
> x70 == (14322541261266398069773632760784104910232781756855490732877362465312715051718312783396468\
> 53369 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (418064129688956866257273301322134344398682309221661016757566071816867112768485388873633499\
> 33831 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x71 == (132115324848331684284312803942953736085340031954613090483241330638000953786633723891\
> 8822277671311 b) /
> 2213819755265143113354480302504542460461645265810004518351070383524760718439442952483993435504\
> 6400 + (2081704430416811429070167498561588724376305233855391427867829052886759764652809228592\
> 1112077375089 c) /
> 2213819755265143113354480302504542460461645265810004518351070383524760718439442952483993435504\
> 6400 && x72 == (12079354718813182845585625332931403593958256269922067976136649532007636978628\
> 0829053248844569 b) /
> 2702416693438895402044043338018240308180719318615728171815271464263623923876273135356437299200\
> + (2581623146250763573588187084688926272241136755916507492053904968943547554089992306303188454\
> 631 c) / 2702416693438895402044043338018240308180719318615728171815271464263623923876273135\
> 356437299200 && x73 == (479045551724653021496388659557090069826323398148395856313798276195305\
> 61046816999823990157332017 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 400 + (13357327918682491436969113231096300308058959513164132383380391620834448879778348454785\
> 05739858383 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 400 && x74 == (117142513725830293364397138828324824437282316491679805755405740221289830736149\
> 9707893189541907 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (420672419577640234990607220200085966865186859329348526914902860260050844746588704578098072\
> 45293 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x75 == (207402735736548896029724639309999500166944249897875974733798913736051998214383236856\
> 1689703481 b) /
> 26608410520013739343202888251256519957471697906370246614796519032749527865858689332740305715200
> + (245343831626482503829056418581565249558022554073914868674585298953890078837148569641786160\
> 11719 c) /
> 26608410520013739343202888251256519957471697906370246614796519032749527865858689332740305715200
> && x76 == (593238953929030265178061391358174901342333618737906298705163357470816037332836720443\
> 5163875767 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (373062775557320237809240794947100959174681729104725877619927098535098224086920029612678329\
> 11433 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x77 == (186209897309203306926947870948178147173538598782993873463694014237635118577794504710\
> 30755916489 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 + (154333678649168975038123986538349565006212176513107215649807972289108419270302030191781\
> 231232311 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 && x78 == (2919528757685313625331606390936223427898716106004281498117873675786461854407926\
> 8518770229357390763 b) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 + (325015873265569761883400784491364559394876081469557907954992524606097096406231603878\
> 668720323351637 c) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 && x79 == (3709423751289312587451165602308104821158613014958602288357152356112383531334\
> 63973485243520139019 b) /
> 5534549388162857783386200756261356151154113164525011295877675958811901796098607381209983588761\
> 600 + (51636070130339265246410841960305456690382518630291510670419607232006634429651434077247\
> 40068622581 c) /
> 5534549388162857783386200756261356151154113164525011295877675958811901796098607381209983588761\
> 600 && x80 == (711663937471580606003715799996550120560465742136796491638147431106234222357220\
> 1367038981829829 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640149\
> 57371 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x81 == (310071056279412973365160448468304617473278081868635854063292666370511415497947040534\
> 63321757860691 b) /
> 1106909877632571556677240151252271230230822632905002259175535191762380359219721476241996717752\
> 32000 + (796838821353158583312079702783966612757544551036366405112242525391868943721774435707\
> 36350017371309 c) /
> 1106909877632571556677240151252271230230822632905002259175535191762380359219721476241996717752\
> 32000 && x82 == (3197141114981250984779335466206794653834378923563918579994536588391553735027\
> 145051791930605689 b) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> + (103149423522132260254408812238844068870692176695147222790818207329265658843542206249902558\
> 90311 c) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> && x83 == (256391473403237074953586145312986503556443167060258734802867756407376038601515564437\
> 4451851449069 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 + (1127245873637477370892964043752352534232085124070994089166551233295599410423136280865\
> 0507120454931 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 && x84 == (74539744415489153267942419186992065432786176116878057075102639115404924435465\
> 94839108665786713 b) /
> 54048333868777908040880866760364806163614386372314563436305429285272478477525462707128745984000
> + (465943594272289927140866248416655996203357687606267577287951653737319860339788678680200801\
> 97287 c) /
> 54048333868777908040880866760364806163614386372314563436305429285272478477525462707128745984000
> && x85 == (559610472423772152521730466371288305237076663069797205354162123875480915759992295884\
> 252536281877 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 000 + (11699362113771209047864572699603854919985837008442688246076116132532383955208225107438\
> 67335206123 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 000 && x86 == (230729721153268582108249448149003691027146938167262286397074331096648115756091\
> 03431986430181371 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (201656949796954682218797485933914758281768152811254221093369103185531712064112667337165666\
> 05829 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x87 == (850705732872691610516873209118098530826689503482088672934541566062487282800432477909\
> 34117358881 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 + (878840950928201446791314527213575266408970860431977357027232171066232028480382328718778\
> 69789919 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 && x88 == (1538894399690906426794520190136792102715042927037988910179678619711586762268786\
> 04626953582048316467 b) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 + (200321720873332255457264829387047583402358949825801831918203399392803038723432267770\
> 485367632425933 c) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 && x89 == (9473238615536848781143651845583242374518299599011478218353642220489651898333\
> 888064544119415767903 b) /
> 2767274694081428891693100378130678075577056582262505647938837979405950898049303690604991794380\
> 8000 + (1819950832527744013578735193572353838125226622361357826103473757356985708215914884150\
> 5798528040097 c) /
> 2767274694081428891693100378130678075577056582262505647938837979405950898049303690604991794380\
> 8000 && x90 == (18007130775480511179085593163313288092917069381277456791255884802393427335165\
> 3682029850968978629 b) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640\
> 14957371 c) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 && x92 == (1187868972352975036999826907632701978699623771603119204091201699571726775353874\
> 1641633718066299 b) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> + (163339374366472664022194761376418175390735887704744881816434032560085186584262403514846842\
> 9701 c) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> && x93 == (119407261316290552921077635824453284646056401741551107711401217552102119571761897930\
> 58149456113829 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 + (1895647338778089166357738308208061913279642737157417468554068141819542533070328659966\
> 809515790171 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 && x94 == (18007130775480511179085593163313288092917069381277456791255884802393427335165\
> 3682029850968978629 b) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640\
> 14957371 c) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 && x95 == (6628101178761046048967035316265737724923024082568344576183252000516948921420943\
> 0064284501148469 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (24922199997521721686644535171504695417384330194022248825839866177592081901952799288530\
> 52586851531 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x96 == (658436637486968839107223832032601583783175631838327008687769604508159711569493\
> 11465007838838249011 b) /
> 1309952517908368706126911421600320982521683589236689064113059398535361371857658551765676589056\
> 000000 + (12441088541596718222161890383970608241433660260528563632442824380845454007007092403\
> 00668750217750989 c) /
> 1309952517908368706126911421600320982521683589236689064113059398535361371857658551765676589056\
> 000000 && x97 == (581811986445321951761592537731998385529093603968895793930764376298992042492\
> 7348203989078982869 b) /
> 1599063132212364143221327418945704324367289537642442705216136961102736049630930849323335680000\
> 00 + (154088193356783194804516816517250448581438017724555312582306052347283684538165736728344\
> 489017131 c) /
> 1599063132212364143221327418945704324367289537642442705216136961102736049630930849323335680000\
> 00 && x98 == (2177677778240772610610002614237406623223299998109722384190744545616551788980620\
> 191427409067915917 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 0000 + (7969435459103227152232196123578265478438192432918334412287546786284353395212303929392\
> 7377748084083 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 0000 && x99 == (46434698874556068642673906889603993814851122076652549254115517054965604307620\
> 001276666960256807 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (25120663126652265605114499634235229251728121381512557790917036207094120751018693576406\
> 70127743193 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x100 == (13701321008065302684455434040230969547449667089297493850733559318374363537884\
> 21313352187260621553 b) /
> 2046800809231826103323299096250501535190130608182326662676655310211502143527591487133869670400\
> 0000 + (1909787599151173076478744755848191839715633937289351724169319717027758508148749355798\
> 6509443378447 c) /
> 2046800809231826103323299096250501535190130608182326662676655310211502143527591487133869670400\
> 0000 && x101 == (3312657751311051469233300547253979661065618296777578305356419843801763526960\
> 78042783134600123067 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (22272352364086774822307938155877289528811014305501504978101771533842013267134113161342\
> 02487876933 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x102 == (10209350379139873520282082080946902105475436839268723393987444095347956565809\
> 32647475040891547589 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 + (9213069008245143164588287273157817465403109356984760973984532141522715061057024788194\
> 307460452411 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 && x103 == (1555781611988674742734196061415679803348418901479109932663261978253030842753\
> 010761901463895579162463 b) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 + (1940345867454522455529638668418945591699851852630791509314568839831275110696952606\
> 6349361529316837537 c) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 && x104 == (1940046856109440164463891949986438646262106879293904197511616448776287022\
> 5981859889809166517913919 b) /
> 3274881294770921765317278554000802456304208973091722660282648496338403429644146379414191472640\
> 00000 + (308087660915997774887088935900215859167799828516233224053148685146077472738432778051\
> 609980746086081 c) /
> 3274881294770921765317278554000802456304208973091722660282648496338403429644146379414191472640\
> 00000 && x105 == (401280813573412298102780076834120285062695060471525758805931533405371475227\
> 169655585276013397329 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (21572201979663703310513437934790066339249681997563825695398876043590062041823197033320\
> 61074602671 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x106 == (17891550181792672030126444021423542300828342534572139340199220691977604827369\
> 10245815762342903545191 b) /
> 6549762589541843530634557108001604912608417946183445320565296992676806859288292758828382945280\
> 000000 + (47606075713625763276219127058592506825255836927262313865453749234790463765513825130\
> 12620602376454809 c) /
> 6549762589541843530634557108001604912608417946183445320565296992676806859288292758828382945280\
> 000000 && x107 == (18320792232494833631384581743817974470086955299789669198987843732526503758\
> 5505641567992884651189 b) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 + (616323643781233735296817892034672417482775215823324660618190043226102987229959783093674\
> 955348811 c) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 && x108 == (145057656480572458770625214087832986807770704259557845232914871789390410415220\
> 872793647724903876569 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 + (673662667212157982558694424412367627268281539013372819837747252295210446995815722059\
> 900143256123431 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 && x109 == (412371145386532908596041495582105879644801675007017930181831265677558504928\
> 028735910463253192213 b) /
> 3198126264424728286442654837891408648734579075284885410432273922205472099261861698646671360000\
> 000 + (27857551190381953778466133423093027690897774002778674802504426565279135943338329627362\
> 08106807787 c) /
> 3198126264424728286442654837891408648734579075284885410432273922205472099261861698646671360000\
> 000 && x110 == (32418231864592639587737654900374318979796557541626151840030137949677172438931\
> 095819575425282657377 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 00000 + (699218085969986655784272999121507577797099728674901812938026275608979347374484785371\
> 18058237342623 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 00000 && x111 == (135364552311064237781060754198232232158864244382816542442645391026388099263\
> 9486899641281141027951 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (12048554884291402513435163283308045973990208163997429039193652275004966867700024592760\
> 55946972049 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x112 == (49825703009729854315701527735830882662644196539559252708436056918757847681575\
> 93620882243787537341 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 + (5251433745186145085046342707669419409686233386955708042539670859181725949480363814787\
> 104564462659 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 && x113 == (8988301084531801819079736037949411569493148134135369611293875903752276303025\
> 427882294263271749017287 b) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 + (1197093920200209747895084670765572415085378929365165541451507447281350564669710894\
> 5956562153146982713 c) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 && x114 == (5497530518051867133819947177216384455144852033675546991481017651764369006\
> 44505928370611332141675203 b) /
> 1637440647385460882658639277000401228152104486545861330141324248169201714822073189707095736320\
> 000000 + (10876875955802741692766445592787627826376192831783066309932224829927648141775672613\
> 36484404178324797 c) /
> 1637440647385460882658639277000401228152104486545861330141324248169201714822073189707095736320\
> 000000 && x115 == (10635284859732542814719275558086627961013348101383159072189208084462882192\
> 865127091254624365397329 b) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 + (2157220197966370331051343793479006633924968199756382569539887604359006204182319703332\
> 061074602671 c) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 && x117 == (7019523724188426469567746567366098919125364148465660581154335434186502380010\
> 14300286823789801199 b) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 + (975791936873394246538890527362422702711083539746552944926349371327177868144511243748440\
> 50198801 c) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 && x118 == (705474114939516394546260558033765735391751091078610100234680970844982664724284\
> 770277427111118007729 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 + (113246208753214046783059080466434878684301152194320564835981153239618192686751824576\
> 120757041992271 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 && x119 == (106352848597325428147192755580866279610133481013831590721892080844628821928\
> 65127091254624365397329 b) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 + (2157220197966370331051343793479006633924968199756382569539887604359006204182319703332\
> 061074602671 c) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
339541108998569457275113377670359 b
> 0000 && x120 == ----------------------------------- +
25013777616939010195430294033530880
24674236507940440738155180655860521 c
> ------------------------------------- &&
25013777616939010195430294033530880
339541108998569457275113377670359 b 12167347699470935640440033639095081 c
> x121 == ----------------------------------- + ------------------------------------- &&
12506888808469505097715147016765440 12506888808469505097715147016765440
1751390855433838310185650211976149029 b 100705042263548347450296834149366335451 c
> x122 == --------------------------------------- + ----------------------------------------- &&
102456433118982185760482484361342484480 102456433118982185760482484361342484480
75991262226516031657787180650596591 b 6327535807709870578372368091933308689 c
> x123 == ------------------------------------- + --------------------------------------- &&
6403527069936386610030155272583905280 6403527069936386610030155272583905280
937305937045764022543356130943553 b 99117804530710276759177820003179967 c
> x124 == ------------------------------------ + ------------------------------------- &&
100055110467756040781721176134123520 100055110467756040781721176134123520
1815767425115854611531957 b 45211199456135005311350603 c
> x125 == --------------------------- + ---------------------------- &&
47026966881250859922882560 47026966881250859922882560
1815767425115854611531957 b 21697716015509575349909323 c
> x126 == --------------------------- + ---------------------------- &&
23513483440625429961441280 23513483440625429961441280
10147472941671735133607070867 b 182474983403931787110519894893 c
> x127 == ------------------------------- + -------------------------------- &&
192622456345603522244126965760 192622456345603522244126965760
97010509871643654974137317 b 2912715370528411380090346523 c
> x128 == ---------------------------- + ------------------------------ &&
3009725880400055035064483840 3009725880400055035064483840
2186222958706959436219497 b 91867710803794760409545623 c
> x129 == --------------------------- + ---------------------------- &&
94053933762501719845765120 94053933762501719845765120
8563780035865611 b 79848919873669109 c
> x130 == ------------------ + ------------------- &&
88412699909534720 88412699909534720
8563780035865611 b 35642569918901749 c
> x131 == ------------------ + ------------------- &&
44206349954767360 44206349954767360
56722023335254871541 b 305416395494199341579 c
> x132 == ---------------------- + ----------------------- &&
362138418829454213120 362138418829454213120
2375161352766892089 b 20258489824073996231 c
> x133 == --------------------- + ---------------------- &&
22633651176840888320 22633651176840888320
10569994226931681 b 166255405592137759 c 36295653 b 129923987 c
> x134 == ------------------- + -------------------- && x135 == ---------- + ----------- &&
176825399819069440 176825399819069440 166219640 166219640
36295653 b 46814167 c 274743359043 b 406092286397 c
> x136 == ---------- + ---------- && x137 == -------------- + -------------- &&
83109820 83109820 680835645440 680835645440
7334531061 b 13941582859 c 155554971 b 509323589 c 4 b c
> x138 == ------------ + ------------- && x139 == ----------- + ----------- && x140 == --- + - &&
21276113920 21276113920 664878560 664878560 5 5
1093 b 187 c 67 b 13 c 4 b c
> x142 == ------ + ----- && x143 == ---- + ---- && x144 == --- + -
1280 1280 80 80 5 5
But most of you aren't maths majors like me, and don't give a crap about any of that. I just put it in so you could see why this took a few weeks. (If you do find any typos in that huge morass of maths, though, let me know.)
So here's the relevant shit.
Paralysed Chansey vs. healthy Lapras
9.4% Lapras wins without being paralysed.
17.7% Lapras wins but is paralysed.
73.0% Chansey wins.
Chansey switching into Lapras Body Slam, becomes paralysed or was already paralysed
19.8% Lapras wins without being paralysed.
17.6% Lapras wins but is paralysed.
62.6% Chansey wins.
Paralysed Chansey vs. paralysed Lapras
13.3% Lapras wins.
86.7% Chansey wins.
Chansey switching into paralysed Lapras Body Slam, becomes paralysed or was already paralysed
19.8% Lapras wins.
80.2% Chansey wins.
Honestly, Lapras does better than I thought (my initial estimate was "between 2 and 3 freeze chances" ie 17-25%). Oh well, now we know.
m9m out.
Now I realise why nobody did this before.
There are a few simplifications and assumptions I've made, so I'll go into them first.
- Simplification: Body Slam is an assumed 5HKO, and Softboiled heals 2 Body Slams.
- Justification: Modelling all 703 HP values of Chansey inflates the number of states by about 140x. The probability for Body Slam to 4HKO is about 0.2%, rising to about 2% with self-confusion damage. I split the difference by assuming it was always an "almost 4HKO".
- Simplification: No 255s.
- Justification: I didn't want to make the 1/256 exception in every single attack throughout the entire working. Also, the 255 failure of Softboiled cannot be modelled without modelling all 703 HP values, which I just said I wasn't going to do, so leaving out the other 255s balances out.
- Simplification: No PP exhaustion.
- Justification: Considering this inflates the number of states by something like 150x because it eliminates the recursion that makes Markov chains so powerful.
- Assumption: Lapras does not have Rest or Hyper Beam.
- Justification: I don't know if Rest is optimal under any circumstances; I suspect it's not given that Chansey has a nigh-assured 3HKO and Confuse Ray lasts for a limited time. Hyper Beam is certainly very useful to Lapras in this matchup, but I've never seen a Lapras with Blizzard/Body Slam/Hyper Beam/Confuse Ray.
- Assumption: Chansey has Thunderbolt and Thunder Wave, but does not have Reflect or Counter.
- Justification: If Chansey does not have Thunderbolt, the result is patently obvious. One could model Ice Beam/Thunderbolt/Reflect/Softboiled Chansey vs. Lapras, but that's both somewhat more obvious and not as common. Counter is prediction-based and therefore cannot be modelled.
- Assumption: Lapras uses Body Slam if it will OHKO, or if Chansey is confused; otherwise, it uses Confuse Ray.
- Justification: This is obvious.
- Assumption: Chansey uses Thunderbolt if it will OHKO guaranteed, or if it is at full health and Lapras is paralysed, or if it is hit once and not confused and Lapras is paralysed; it uses Thunder Wave if it is at full health and Lapras is not paralysed, or if it is hit once and not confused and Lapras is not paralysed; otherwise, it uses Softboiled.
- Justification: Basic first-approximation. You could refine it recursively by looking at the states where Thunderbolt could OHKO, and checking whether Thunderbolt or Softboiled would have a greater chance to win, or by looking at the states where Lapras isn't paralysed and checking whether Thunder Wave or Softboiled would have a greater chance to win, but I've had enough maths for now.
- Assumption: Chansey is paralysed.
- Justification: If Chansey isn't paralysed, Lapras should really be trying to freeze it, making parafusion irrelevant. Also, I didn't want to have to do these entire calculations in duplicate to account for that.
There's a couple of relevant damage calcs here, which Isa did for me. Props to Isa - every little bit helps.
- Chansey Tbolt vs. Lapras 92.1% 3HKO
- Chansey Tbolt vs. Lapras 1011/1521 2HKO with one crit
Okay, time to get down to brass tacks. Here's the Markov chain as I elucidated it:
(0) Chansey at full, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (1), 3/8 Thunder Wave (21)
(1) Chansey at full, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (12|7), 3/8*3/4 Thunder Wave (32|27), 3/4*1/4 Thunder Wave+confusion ends (30|25), 1/4*1/4 nothing+confusion ends (10|5)
(2) Chansey at full, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (13|8), 3/8*2/3 Thunder Wave (33|28), 3/4*1/3 Thunder Wave+confusion ends (30|25), 1/4*1/3 nothing+confusion ends (10|5)
(3) Chansey at full, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (14|9), 3/8*1/2 Thunder Wave (34|29), 3/4*1/2 Thunder Wave+confusion ends (30|25), 1/4*1/2 nothing+confusion ends (10|5)
(4) Chansey at full, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Thunder Wave+confusion ends (30|25), 1/4 nothing+confusion ends (10|5)
(5) Chansey hit once, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (6), 3/8 Thunder Wave (26)
(6) Chansey hit once, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (17|12), 3/8*3/4 Softboiled (7|2), 3/4*1/4 Softboiled+confusion ends (5|0), 1/4*1/4 nothing+confusion ends (15|10)
(7) Chansey hit once, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (18|13), 3/8*2/3 Softboiled (8|3), 3/4*1/3 Softboiled+confusion ends (5|0), 1/4*1/3 nothing+confusion ends (15|10)
(8) Chansey hit once, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (19|14), 3/8*1/2 Softboiled (9|4), 3/4*1/2 Softboiled+confusion ends (5|0), 1/4*1/2 nothing+confusion ends (15|10)
(9) Chansey hit once, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (5|0), 1/4 nothing+confusion ends (15|10)
(10) Chansey hit twice, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (11), 3/8 Softboiled (1)
(11) Chansey hit twice, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (Lapras win|17), 3/8*3/4 Softboiled (12|7), 3/4*1/4 Softboiled+confusion ends (10|5), 1/4*1/4 nothing+confusion ends (Lapras win|15)
(12) Chansey hit twice, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (Lapras win|18), 3/8*2/3 Softboiled (13|8), 3/4*1/3 Softboiled+confusion ends (10|5), 1/4*1/3 nothing+confusion ends (Lapras win|15)
(13) Chansey hit twice, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (Lapras win|19), 3/8*1/2 Softboiled (14|9), 3/4*1/2 Softboiled+confusion ends (10|5), 1/4*1/2 nothing+confusion ends (Lapras win|15)
(14) Chansey hit twice, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (10|5), 1/4 nothing+confusion ends (Lapras win|15)
(15) Chansey hit thrice, paralysed
Lapras: Confuse Ray
Chansey: 5/8 nothing (16), 3/8 Softboiled (6)
(16) Chansey hit thrice, parafused (2nd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*3/4 nothing (Lapras win), 3/8*3/4 Softboiled (Lapras win|12), 3/4*1/4 Softboiled+confusion ends (Lapras win|10), 1/4*1/4 nothing+confusion ends (Lapras win)
(17) Chansey hit thrice, parafused (3rd turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*2/3 nothing (Lapras win), 3/8*2/3 Softboiled (Lapras win|13), 3/4*1/3 Softboiled+confusion ends (Lapras win|10), 1/4*1/3 nothing+confusion ends (Lapras win)
(18) Chansey hit thrice, parafused (4th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 5/8*1/2 nothing (Lapras win), 3/8*1/2 Softboiled (Lapras win|14), 3/4*1/2 Softboiled+confusion ends (Lapras win|10), 1/4*1/2 nothing+confusion ends (Lapras win)
(19) Chansey hit thrice, parafused (5th turn)
Lapras: 15/128 critical Body Slam, 113/128 Body Slam
Chansey: 3/4 Softboiled+confusion ends (Lapras win|10), 1/4 nothing+confusion ends (Lapras win)
(20) Chansey at full, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (21), 3/8*3/4*231/256 Thunderbolt (46), 3/8*3/4*25/256 critical Thunderbolt (71), 3/4*1/4*231/256 Thunderbolt (45), 3/4*1/4*25/256 critical Thunderbolt (70), 1/4*1/4 nothing (20)
(21) Chansey at full, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (32|27|22), 3/8*3/4*231/256 Thunderbolt (57|52|47), 3/8*3/4*25/256 critical Thunderbolt (82|77|72), 3/4*1/4*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/4 nothing+confusion ends (30|25|20)
(22) Chansey at full, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (33|28|23), 3/8*2/3*231/256 Thunderbolt (58|53|48), 3/8*2/3*25/256 critical Thunderbolt (83|78|73), 3/4*1/3*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/3 nothing+confusion ends (30|25|20)
(23) Chansey at full, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (34|29|24), 3/8*1/2*231/256 Thunderbolt (59|54|49), 3/8*1/2*25/256 critical Thunderbolt (84|79|74), 3/4*1/2*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4*1/2 nothing+confusion ends (30|25|20)
(24) Chansey at full, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256 Thunderbolt+confusion ends (55|50|45), 3/4*25/256 critical Thunderbolt+confusion ends (80|75|70), 1/4 nothing+confusion ends (30|25|20)
(25) Chansey hit once, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (26), 3/8*3/4*231/256 Thunderbolt (51), 3/8*3/4*25/256 critical Thunderbolt (76), 3/4*1/4*231/256 Thunderbolt (50), 3/4*1/4*25/256 critical Thunderbolt (75), 1/4*1/4 nothing (25)
(26) Chansey hit once, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (37|32|27), 3/8*3/4 Softboiled (27|22|22), 3/4*1/4 Softboiled+confusion ends (25|20|20), 1/4*1/4 nothing+confusion ends (35|30|25)
(27) Chansey hit once, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (38|33|28), 3/8*2/3 Softboiled (28|23|23), 3/4*1/3 Softboiled+confusion ends (25|20|20), 1/4*1/3 nothing+confusion ends (35|30|25)
(28) Chansey hit once, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (39|34|29), 3/8*1/2 Softboiled (29|24|24), 3/4*1/2 Softboiled+confusion ends (25|20|20), 1/4*1/2 nothing+confusion ends (35|30|25)
(29) Chansey hit once, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (25|20|20), 1/4 nothing+confusion ends (35|30|25)
(30) Chansey hit twice, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (31), 3/8*3/4 Softboiled (21), 3/4*1/4 Softboiled (20), 1/4*1/4 nothing (30)
(31) Chansey hit twice, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (42|37|32), 3/8*3/4 Softboiled (32|27|22), 3/4*1/4 Softboiled+confusion ends (30|25|20), 1/4*1/4 nothing+confusion ends (40|35|30)
(32) Chansey hit twice, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (43|38|33), 3/8*2/3 Softboiled (33|28|23), 3/4*1/3 Softboiled+confusion ends (30|25|20), 1/4*1/3 nothing+confusion ends (40|35|30)
(33) Chansey hit twice, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (44|39|34), 3/8*1/2 Softboiled (34|29|24), 3/4*1/2 Softboiled+confusion ends (30|25|20), 1/4*1/2 nothing+confusion ends (40|35|30)
(34) Chansey hit twice, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (30|25|20), 1/4 nothing+confusion ends (40|35|30)
(35) Chansey hit thrice, paralysed; Lapras paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (36), 3/8*3/4 Softboiled (26), 3/4*1/4 Softboiled (25), 1/4*1/4 nothing (35)
(36) Chansey hit thrice, parafused (2nd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|42|37), 3/8*3/4 Softboiled (Lapras win|32|27), 3/4*1/4 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/4 nothing+confusion ends (Lapras win|40|35)
(37) Chansey hit thrice, parafused (3rd turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|43|38), 3/8*2/3 Softboiled (Lapras win|33|28), 3/4*1/3 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/3 nothing+confusion ends (Lapras win|40|35)
(38) Chansey hit thrice, parafused (4th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|44|39), 3/8*1/2 Softboiled (Lapras win|34|29), 3/4*1/2 Softboiled+confusion ends (Lapras win|30|25), 1/4*1/2 nothing+confusion ends (Lapras win|40|35)
(39) Chansey hit thrice, parafused (5th turn); Lapras paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|30|25), 1/4 nothing+confusion ends (Lapras win|40|35)
(40) Chansey hit four times, paralysed; Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|30), 1/4 nothing (Lapras win|40)
(41) Chansey hit four times, parafused (2nd turn); Lapras paralysed
Unattainable
(42) Chansey hit four times, parafused (3rd turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|43), 3/8*2/3 Softboiled (Lapras win|33), 3/4*1/3 Softboiled+confusion ends (Lapras win|30), 1/4*1/3 nothing+confusion ends (Lapras win|40)
(43) Chansey hit four times, parafused (4th turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|44), 3/8*1/2 Softboiled (Lapras win|34), 3/4*1/2 Softboiled+confusion ends (Lapras win|30), 1/4*1/2 nothing+confusion ends (Lapras win|40)
(44) Chansey hit four times, parafused (5th turn); Lapras paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|30), 1/4 nothing+confusion ends (Lapras win|40)
(45) Chansey at full, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (46), 3/8*3/4*231/256 Thunderbolt (96), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (121), 3/4*1/4*231/256 Thunderbolt (95), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt (120), 1/4*1/4 nothing (45)
(46) Chansey at full, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (57|52|47), 3/8*3/4*231/256 Thunderbolt (107|102|97), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (132|127|122), 3/4*1/4*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/4 nothing+confusion ends (55|50|45)
(47) Chansey at full, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (58|53|48), 3/8*2/3*231/256 Thunderbolt (108|103|98), 3/8*2/3*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*2/3*25/256*510/1521 non-fatal critical Thunderbolt (133|128|123), 3/4*1/3*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/3*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/3*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/3 nothing+confusion ends (55|50|45)
(48) Chansey at full, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (59|54|49), 3/8*1/2*231/256 Thunderbolt (109|104|99), 3/8*1/2*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*1/2*25/256*510/1521 non-fatal critical Thunderbolt (134|129|124), 3/4*1/2*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*1/2*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*1/2*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4*1/2 nothing+confusion ends (55|50|45)
(49) Chansey at full, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256 Thunderbolt+confusion ends (105|100|95), 3/4*25/256*1011/1521 fatal critical Thunderbolt+confusion ends (Chansey win), 3/4*25/256*510/1521 non-fatal critical Thunderbolt+confusion ends (130|125|120), 1/4 nothing+confusion ends (55|50|45)
(50) Chansey hit once, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (51), 3/8*3/4*231/256 Thunderbolt (101), 3/8*3/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/8*3/4*25/256*510/1521 non-fatal critical Thunderbolt (126), 3/4*1/4*231/256 Thunderbolt (100), 3/4*1/4*25/256*1011/1521 fatal critical Thunderbolt (Chansey win), 3/4*1/4*25/256*510/1521 non-fatal critical Thunderbolt (125), 1/4*1/4 nothing (50)
(51) Chansey hit once, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (62|57|52), 3/8*3/4 Softboiled (52|47|47), 3/4*1/4 Softboiled+confusion ends (50|45|45), 1/4*1/4 nothing+confusion ends (60|55|50)
(52) Chansey hit once, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (63|58|53), 3/8*2/3 Softboiled (53|48|48), 3/4*1/3 Softboiled+confusion ends (50|45|45), 1/4*1/3 nothing+confusion ends (60|55|50)
(53) Chansey hit once, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (64|59|54), 3/8*1/2 Softboiled (54|49|49), 3/4*1/2 Softboiled+confusion ends (50|45|45), 1/4*1/2 nothing+confusion ends (60|55|50)
(54) Chansey hit once, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (50|45|45), 1/4 nothing+confusion ends (60|55|50)
(55) Chansey hit twice, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (56), 3/8*3/4 Softboiled (46), 3/4*1/4 Softboiled (45), 1/4*1/4 nothing (55)
(56) Chansey hit twice, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (67|62|57), 3/8*3/4 Softboiled (57|52|47), 3/4*1/4 Softboiled+confusion ends (55|50|45), 1/4*1/4 nothing+confusion ends (65|60|55)
(57) Chansey hit twice, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (68|63|58), 3/8*2/3 Softboiled (58|53|48), 3/4*1/3 Softboiled+confusion ends (55|50|45), 1/4*1/3 nothing+confusion ends (65|60|55)
(58) Chansey hit twice, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (69|64|59), 3/8*1/2 Softboiled (59|54|49), 3/4*1/2 Softboiled+confusion ends (55|50|45), 1/4*1/2 nothing+confusion ends (65|60|55)
(59) Chansey hit twice, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (55|50|45), 1/4 nothing+confusion ends (65|60|55)
(60) Chansey hit thrice, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (61), 3/8*3/4 Softboiled (51), 3/4*1/4 Softboiled (50), 1/4*1/4 nothing (60)
(61) Chansey hit thrice, parafused (2nd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|67|62), 3/8*3/4 Softboiled (Lapras win|57|52), 3/4*1/4 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/4 nothing+confusion ends (Lapras win|65|60)
(62) Chansey hit thrice, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|68|63), 3/8*2/3 Softboiled (Lapras win|58|53), 3/4*1/3 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/3 nothing+confusion ends (Lapras win|65|60)
(63) Chansey hit thrice, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|69|64), 3/8*1/2 Softboiled (Lapras win|59|54), 3/4*1/2 Softboiled+confusion ends (Lapras win|55|50), 1/4*1/2 nothing+confusion ends (Lapras win|65|60)
(64) Chansey hit thrice, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|55|50), 1/4 nothing+confusion ends (Lapras win|65|60)
(65) Chansey hit four times, paralysed; Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|55), 1/4 nothing (Lapras win|65)
(66) Chansey hit four times, parafused (2nd turn); Lapras hit once, paralysed
Unattainable
(67) Chansey hit four times, parafused (3rd turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|68), 3/8*2/3 Softboiled (Lapras win|58), 3/4*1/3 Softboiled+confusion ends (Lapras win|55), 1/4*1/3 nothing+confusion ends (Lapras win|65)
(68) Chansey hit four times, parafused (4th turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|69), 3/8*1/2 Softboiled (Lapras win|59), 3/4*1/2 Softboiled+confusion ends (Lapras win|55), 1/4*1/2 nothing+confusion ends (Lapras win|65)
(69) Chansey hit four times, parafused (5th turn); Lapras hit once, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|55), 1/4 nothing+confusion ends (Lapras win|65)
(70) Chansey at full, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (71), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (121), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt (120), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (70)
(71) Chansey at full, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (82|77|72), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (132|127|122), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (80|75|70)
(72) Chansey at full, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (83|78|73), 3/8*2/3*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*2/3*231/256*510/1521 non-fatal Thunderbolt (133|128|123), 3/8*2/3*25/256 critical Thunderbolt (Chansey win), 3/4*1/3*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/3*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (80|75|70)
(73) Chansey at full, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (84|79|74), 3/8*1/2*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*1/2*231/256*510/1521 non-fatal Thunderbolt (134|129|124), 3/8*1/2*25/256 critical Thunderbolt (Chansey win), 3/4*1/2*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/2*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (80|75|70)
(74) Chansey at full, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256*1011/1521 fatal Thunderbolt+confusion ends (Chansey win), 3/4*231/256*510/1521 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (80|75|70)
(75) Chansey hit once, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (76), 3/8*3/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*510/1521 non-fatal Thunderbolt (126), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*1011/1521 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*510/1521 non-fatal Thunderbolt (125), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (75)
(76) Chansey hit once, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (87|82|77), 3/8*3/4 Softboiled (77|72|72), 3/4*1/4 Softboiled+confusion ends (75|70|70), 1/4*1/4 nothing+confusion ends (85|80|75)
(77) Chansey hit once, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (88|83|78), 3/8*2/3 Softboiled (78|73|73), 3/4*1/3 Softboiled+confusion ends (75|70|70), 1/4*1/3 nothing+confusion ends (85|80|75)
(78) Chansey hit once, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (89|84|79), 3/8*1/2 Softboiled (79|74|74), 3/4*1/2 Softboiled+confusion ends (75|70|70), 1/4*1/2 nothing+confusion ends (85|80|75)
(79) Chansey hit once, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (75|70|70), 1/4 nothing+confusion ends (85|80|75)
(80) Chansey hit twice, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (81), 3/8*3/4 Softboiled (71), 3/4*1/4 Softboiled (70), 1/4*1/4 nothing (80)
(81) Chansey hit twice, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (92|87|82), 3/8*3/4 Softboiled (82|77|72), 3/4*1/4 Softboiled+confusion ends (80|75|70), 1/4*1/4 nothing+confusion ends (90|85|80)
(82) Chansey hit twice, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (93|88|83), 3/8*2/3 Softboiled (83|78|73), 3/4*1/3 Softboiled+confusion ends (80|75|70), 1/4*1/3 nothing+confusion ends (90|85|80)
(83) Chansey hit twice, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (94|89|84), 3/8*1/2 Softboiled (84|79|74), 3/4*1/2 Softboiled+confusion ends (80|75|70), 1/4*1/2 nothing+confusion ends (90|85|80)
(84) Chansey hit twice, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (80|75|70), 1/4 nothing+confusion ends (90|85|80)
(85) Chansey hit thrice, paralysed; Lapras critted, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (86), 3/8*3/4 Softboiled (76), 3/4*1/4 Softboiled (75), 1/4*1/4 nothing (85)
(86) Chansey hit thrice, parafused (2nd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|92|87), 3/8*3/4 Softboiled (Lapras win|82|77), 3/4*1/4 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/4 nothing+confusion ends (Lapras win|90|85)
(87) Chansey hit thrice, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|93|88), 3/8*2/3 Softboiled (Lapras win|83|78), 3/4*1/3 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/3 nothing+confusion ends (Lapras win|90|85)
(88) Chansey hit thrice, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|94|89), 3/8*1/2 Softboiled (Lapras win|84|79), 3/4*1/2 Softboiled+confusion ends (Lapras win|80|75), 1/4*1/2 nothing+confusion ends (Lapras win|90|85)
(89) Chansey hit thrice, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|80|75), 1/4 nothing+confusion ends (Lapras win|90|85)
(90) Chansey hit four times, paralysed; Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|80), 1/4 nothing (Lapras win|90)
(91) Chansey hit four times, parafused (2nd turn); Lapras critted, paralysed
Unattainable
(92) Chansey hit four times, parafused (3rd turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|93), 3/8*2/3 Softboiled (Lapras win|83), 3/4*1/3 Softboiled+confusion ends (Lapras win|80), 1/4*1/3 nothing+confusion ends (Lapras win|90)
(93) Chansey hit four times, parafused (4th turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|94), 3/8*1/2 Softboiled (Lapras win|84), 3/4*1/2 Softboiled+confusion ends (Lapras win|80), 1/4*1/2 nothing+confusion ends (Lapras win|90)
(94) Chansey hit four times, parafused (5th turn); Lapras critted, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|80), 1/4 nothing+confusion ends (Lapras win|90)
(95) Chansey at full, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (96), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (121), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt (120), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (95)
(96) Chansey at full, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (107|102|97), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (132|127|122), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (105|100|95)
(97) Chansey at full, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (108|103|98), 3/8*2/3*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*2/3*231/256*0.079 non-fatal Thunderbolt (133|128|123), 3/8*2/3*25/256 critical Thunderbolt (Chansey win), 3/4*1/3*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/3*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/3*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (105|100|95)
(98) Chansey at full, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (109|104|99), 3/8*1/2*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*1/2*231/256*0.079 non-fatal Thunderbolt (134|129|124), 3/8*1/2*25/256 critical Thunderbolt (Chansey win), 3/4*1/2*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*1/2*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*1/2*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (105|100|95)
(99) Chansey at full, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4*231/256*0.921 fatal Thunderbolt+confusion ends (Chansey win), 3/4*231/256*0.079 non-fatal Thunderbolt+confusion ends (130|125|120), 3/4*25/256 critical Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (105|100|95)
(100) Chansey hit once, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (101), 3/8*3/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/8*3/4*231/256*0.079 non-fatal Thunderbolt (126), 3/8*3/4*25/256 critical Thunderbolt (Chansey win), 3/4*1/4*231/256*0.921 fatal Thunderbolt (Chansey win), 3/4*1/4*231/256*0.079 non-fatal Thunderbolt (125), 3/4*1/4*25/256 critical Thunderbolt (Chansey win), 1/4*1/4 nothing (100)
(101) Chansey hit once, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (112|107|102), 3/8*3/4 Softboiled (102|97|97), 3/4*1/4 Softboiled+confusion ends (100|95|95), 1/4*1/4 nothing+confusion ends (110|105|100)
(102) Chansey hit once, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (113|108|103), 3/8*2/3 Softboiled (103|98|98), 3/4*1/3 Softboiled+confusion ends (100|95|95), 1/4*1/3 nothing+confusion ends (110|105|100)
(103) Chansey hit once, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (114|109|104), 3/8*1/2 Softboiled (104|99|99), 3/4*1/2 Softboiled+confusion ends (100|95|95), 1/4*1/2 nothing+confusion ends (110|105|100)
(104) Chansey hit once, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (100|95|95), 1/4 nothing+confusion ends (110|105|100)
(105) Chansey hit twice, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (106), 3/8*3/4 Softboiled (96), 3/4*1/4 Softboiled (95), 1/4*1/4 nothing (105)
(106) Chansey hit twice, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (117|112|107), 3/8*3/4 Softboiled (107|102|97), 3/4*1/4 Softboiled+confusion ends (105|100|95), 1/4*1/4 nothing+confusion ends (115|110|105)
(107) Chansey hit twice, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (118|113|108), 3/8*2/3 Softboiled (108|103|98), 3/4*1/3 Softboiled+confusion ends (105|100|95), 1/4*1/3 nothing+confusion ends (115|110|105)
(108) Chansey hit twice, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (119|114|109), 3/8*1/2 Softboiled (109|104|99), 3/4*1/2 Softboiled+confusion ends (105|100|95), 1/4*1/2 nothing+confusion ends (115|110|105)
(109) Chansey hit twice, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (105|100|95), 1/4 nothing+confusion ends (115|110|105)
(110) Chansey hit thrice, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (111), 3/8*3/4 Softboiled (101), 3/4*1/4 Softboiled (100), 1/4*1/4 nothing (110)
(111) Chansey hit thrice, parafused (2nd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|117|112), 3/8*3/4 Softboiled (Lapras win|107|102), 3/4*1/4 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/4 nothing+confusion ends (Lapras win|115|110)
(112) Chansey hit thrice, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|118|113), 3/8*2/3 Softboiled (Lapras win|108|103), 3/4*1/3 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/3 nothing+confusion ends (Lapras win|115|110)
(113) Chansey hit thrice, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|119|114), 3/8*1/2 Softboiled (Lapras win|109|104), 3/4*1/2 Softboiled+confusion ends (Lapras win|105|100), 1/4*1/2 nothing+confusion ends (Lapras win|115|110)
(114) Chansey hit thrice, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|105|100), 1/4 nothing+confusion ends (Lapras win|115|110)
(115) Chansey hit four times, paralysed; Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled (Lapras win|105), 1/4 nothing (Lapras win|115)
(116) Chansey hit four times, parafused (2nd turn); Lapras hit twice, paralysed
Unattainable
(117) Chansey hit four times, parafused (3rd turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|118), 3/8*2/3 Softboiled (Lapras win|108), 3/4*1/3 Softboiled+confusion ends (Lapras win|105), 1/4*1/3 nothing+confusion ends (Lapras win|115)
(118) Chansey hit four times, parafused (4th turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|119), 3/8*1/2 Softboiled (Lapras win|109), 3/4*1/2 Softboiled+confusion ends (Lapras win|105), 1/4*1/2 nothing+confusion ends (Lapras win|115)
(119) Chansey hit four times, parafused (5th turn); Lapras hit twice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Softboiled+confusion ends (Lapras win|105), 1/4 nothing+confusion ends (Lapras win|115)
(120) Chansey at full, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (121), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (120)
(121) Chansey at full, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (132|127|122), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (130|125|120)
(122) Chansey at full, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (133|128|123), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (130|125|120)
(123) Chansey at full, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (134|129|124), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (130|125|120)
(124) Chansey at full, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (130|125|120)
(125) Chansey hit once, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (126), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (125)
(126) Chansey hit once, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (137|132|127), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (135|130|125)
(127) Chansey hit once, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (138|133|128), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (135|130|125)
(128) Chansey hit once, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (139|134|129), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (135|130|125)
(129) Chansey hit once, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (135|130|125)
(130) Chansey hit twice, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (131), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (130)
(131) Chansey hit twice, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (142|137|132), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Chansey win), 1/4*1/4 nothing+confusion ends (140|135|130)
(132) Chansey hit twice, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (143|138|133), 3/8*2/3 Thunderbolt (Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Chansey win), 1/4*1/3 nothing+confusion ends (140|135|130)
(133) Chansey hit twice, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (144|139|134), 3/8*1/2 Thunderbolt (Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Chansey win), 1/4*1/2 nothing+confusion ends (140|135|130)
(134) Chansey hit twice, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Chansey win), 1/4 nothing+confusion ends (140|135|130)
(135) Chansey hit thrice, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Confuse Ray, 1/4 nothing
Chansey*: 5/8*3/4 nothing (136), 3/8*3/4 Thunderbolt (Chansey win), 3/4*1/4 Thunderbolt (Chansey win), 1/4*1/4 nothing (135)
(136) Chansey hit thrice, parafused (2nd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*3/4 nothing (Lapras win|142|137), 3/8*3/4 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/4 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/4 nothing+confusion ends (Lapras win|140|135)
(137) Chansey hit thrice, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|143|138), 3/8*2/3 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/3 nothing+confusion ends (Lapras win|140|135)
(138) Chansey hit thrice, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|144|139), 3/8*1/2 Thunderbolt (Lapras win|Chansey win|Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4*1/2 nothing+confusion ends (Lapras win|140|135)
(139) Chansey hit thrice, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4*15/128 critical Body Slam, 3/4*113/128 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Lapras win|Chansey win|Chansey win), 1/4 nothing+confusion ends (Lapras win|140|135)
(140) Chansey hit four times, paralysed; Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt (Lapras win|Chansey win), 1/4 nothing (Lapras win|140)
(141) Chansey hit four times, parafused (2nd turn); Lapras hit thrice, paralysed
Unattainable
(142) Chansey hit four times, parafused (3rd turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*2/3 nothing (Lapras win|143), 3/8*2/3 Thunderbolt (Lapras win|Chansey win), 3/4*1/3 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4*1/3 nothing+confusion ends (Lapras win|140)
(143) Chansey hit four times, parafused (4th turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 5/8*1/2 nothing (Lapras win|144), 3/8*1/2 Thunderbolt (Lapras win|Chansey win), 3/4*1/2 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4*1/2 nothing+confusion ends (Lapras win|140)
(144) Chansey hit four times, parafused (5th turn); Lapras hit thrice, paralysed
Lapras: 3/4 Body Slam, 1/4 nothing
Chansey: 3/4 Thunderbolt+confusion ends (Lapras win|Chansey win), 1/4 nothing+confusion ends (Lapras win|140)
Here's the 140 simultaneous equations I put into Mathematica:
Reduce[x0 == 5/8*x1+3/8*x21 && x1 == 15/128*5/8*3/4*x12+113/128*5/8*3/4*x7+15/128*3/8*3/4*x32+113/128*3/8*3/4*x27+15/128*3/4*1/4*x30+113/128*3/4*1/4*x25+15/128*1/4*1/4*x10+113/128*1/4*1/4*x5 && x2 == 15/128*5/8*2/3*x13+113/128*5/8*2/3*x8+15/128*3/8*2/3*x33+113/128*3/8*2/3*x28+15/128*3/4*1/3*x30+113/128*3/4*1/3*x25+15/128*1/4*1/3*x10+113/128*1/4*1/3*x5 && x3 == 15/128*5/8*1/2*x14+113/128*5/8*1/2*x9+15/128*3/8*1/2*x34+113/128*3/8*1/2*x29+15/128*3/4*1/2*x30+113/128*3/4*1/2*x25+15/128*1/4*1/2*x10+113/128*1/4*1/2*x5 && x4 == 15/128*3/4*x30+113/128*3/4*x25+15/128*1/4*x10+113/128*1/4*x5 && x5 == 5/8*x6+3/8*x26 && x6 == 15/128*5/8*3/4*x17+113/128*5/8*3/4*x12+15/128*3/8*3/4*x7+113/128*3/8*3/4*x2+15/128*3/4*1/4*x5+113/128*3/4*1/4*x0+15/128*1/4*1/4*x15+113/128*1/4*1/4*x10 && x7 == 15/128*5/8*2/3*x18+113/128*5/8*2/3*x13+15/128*3/8*2/3*x8+113/128*3/8*2/3*x3+15/128*3/4*1/3*x5+113/128*3/4*1/3*x0+15/128*1/4*1/3*x15+113/128*1/4*1/3*x10 && x8 == 15/128*5/8*1/2*x19+113/128*5/8*1/2*x14+15/128*3/8*1/2*x9+113/128*3/8*1/2*x4+15/128*3/4*1/2*x5+113/128*3/4*1/2*x0+15/128*1/4*1/2*x15+113/128*1/4*1/2*x10 && x9 == 15/128*3/4*x5+113/128*3/4*x0+15/128*1/4*x15+113/128*1/4*x10 && x10 == 5/8*x11+3/8*x1 && x11 == 15/128*5/8*3/4*a+113/128*5/8*3/4*x17+15/128*3/8*3/4*x12+113/128*3/8*3/4*x7+15/128*3/4*1/4*x10+113/128*3/4*1/4*x5+15/128*1/4*1/4*a+113/128*1/4*1/4*x15 && x12 == 15/128*5/8*2/3*a+113/128*5/8*2/3*x18+15/128*3/8*2/3*x13+113/128*3/8*2/3*x8+15/128*3/4*1/3*x10+113/128*3/4*1/3*x5+15/128*1/4*1/3*a+113/128*1/4*1/3*x15 && x13 == 15/128*5/8*1/2*a+113/128*5/8*1/2*x19+15/128*3/8*1/2*x14+113/128*3/8*1/2*x9+15/128*3/4*1/2*x10+113/128*3/4*1/2*x5+15/128*1/4*1/2*a+113/128*1/4*1/2*x15 && x14 == 15/128*3/4*x10+113/128*3/4*x5+15/128*1/4*a+113/128*1/4*x15 && x15 == 5/8*x16+3/8*x6 && x16 == 5/8*3/4*a+15/128*3/8*3/4*a+113/128*3/8*3/4*x12+15/128*3/4*1/4*a+113/128*3/4*1/4*x10+1/4*1/4*a && x17 == 5/8*2/3*a+15/128*3/8*2/3*a+113/128*3/8*2/3*x13+15/128*3/4*1/3*a+113/128*3/4*1/3*x10+1/4*1/3*a && x18 == 5/8*1/2*a+15/128*3/8*1/2*a+113/128*3/8*1/2*x14+15/128*3/4*1/2*a+113/128*3/4*1/2*x10+1/4*1/2*a && x19 == 15/128*3/4*a+113/128*3/4*x10+1/4*a && x20 == 5/8*3/4*x21+3/8*3/4*231/256*x46+3/8*3/4*25/256*x71+3/4*1/4*231/256*x45+3/4*1/4*25/256*x70+1/4*1/4*x20 && x21 == 3/4*15/128*5/8*3/4*x32+3/4*113/128*5/8*3/4*x27+1/4*5/8*3/4*x22+3/4*15/128*3/8*3/4*231/256*x57+3/4*113/128*3/8*3/4*231/256*x52+1/4*3/8*3/4*231/256*x47+3/4*15/128*3/8*3/4*25/256*x82+3/4*113/128*3/8*3/4*25/256*x77+1/4*3/8*3/4*25/256*x72+3/4*15/128*3/4*1/4*231/256*x55+3/4*113/128*3/4*1/4*231/256*x50+1/4*3/4*1/4*231/256*x45+3/4*15/128*3/4*1/4*25/256*x80+3/4*113/128*3/4*1/4*25/256*x75+1/4*3/4*1/4*25/256*x70+3/4*15/128*1/4*1/4*x30+3/4*113/128*1/4*1/4*x25+1/4*1/4*1/4*x20 && x22 == 3/4*15/128*5/8*2/3*x33+3/4*113/128*5/8*2/3*x28+1/4*5/8*2/3*x23+3/4*15/128*3/8*2/3*231/256*x58+3/4*113/128*3/8*2/3*231/256*x53+1/4*3/8*2/3*231/256*x48+3/4*15/128*3/8*2/3*25/256*x83+3/4*113/128*3/8*2/3*25/256*x78+1/4*3/8*2/3*25/256*x73+3/4*15/128*3/4*1/3*231/256*x55+3/4*113/128*3/4*1/3*231/256*x50+1/4*3/4*1/3*231/256*x45+3/4*15/128*3/4*1/3*25/256*x80+3/4*113/128*3/4*1/3*25/256*x75+1/4*3/4*1/3*25/256*x70+3/4*15/128*1/4*1/3*x30+3/4*113/128*1/4*1/3*x25+1/4*1/4*1/3*x20 && x23 == 3/4*15/128*5/8*1/2*x34+3/4*113/128*5/8*1/2*x29+1/4*5/8*1/2*x24+3/4*15/128*3/8*1/2*231/256*x59+3/4*113/128*3/8*1/2*231/256*x54+1/4*3/8*1/2*231/256*x49+3/4*15/128*3/8*1/2*25/256*x84+3/4*113/128*3/8*1/2*25/256*x79+1/4*3/8*1/2*25/256*x74+3/4*15/128*3/4*1/2*231/256*x55+3/4*113/128*3/4*1/2*231/256*x50+1/4*3/4*1/2*231/256*x45+3/4*15/128*3/4*1/2*25/256*x80+3/4*113/128*3/4*1/2*25/256*x75+1/4*3/4*1/2*25/256*x70+3/4*15/128*1/4*1/2*x30+3/4*113/128*1/4*1/2*x25+1/4*1/4*1/2*x20 && x24 == 3/4*15/128*3/4*231/256*x55+3/4*113/128*3/4*231/256*x50+1/4*3/4*231/256*x45+3/4*15/128*3/4*25/256*x80+3/4*113/128*3/4*25/256*x75+1/4*3/4*25/256*x70+3/4*15/128*1/4*x30+3/4*113/128*1/4*x25+1/4*1/4*x20 && x25 == 5/8*3/4*x26+3/8*3/4*231/256*x51+3/8*3/4*25/256*x76+3/4*1/4*231/256*x50+3/4*1/4*25/256*x75+1/4*1/4*x25 && x26 == 3/4*15/128*5/8*3/4*x37+3/4*113/128*5/8*3/4*x32+1/4*5/8*3/4*x27+3/4*15/128*3/8*3/4*x27+3/4*113/128*3/8*3/4*x22+1/4*3/8*3/4*x22+3/4*15/128*3/4*1/4*x25+3/4*113/128*3/4*1/4*x20+1/4*3/4*1/4*x20+3/4*15/128*1/4*1/4*x35+3/4*113/128*1/4*1/4*x30+1/4*1/4*1/4*x25 && x27 == 3/4*15/128*5/8*2/3*x38+3/4*113/128*5/8*2/3*x33+1/4*5/8*2/3*x28+3/4*15/128*3/8*2/3*x28+3/4*113/128*3/8*2/3*x23+1/4*3/8*2/3*x23+3/4*15/128*3/4*1/3*x25+3/4*113/128*3/4*1/3*x20+1/4*3/4*1/3*x20+3/4*15/128*1/4*1/3*x35+3/4*113/128*1/4*1/3*x30+1/4*1/4*1/3*x25 && x28 == 3/4*15/128*5/8*1/2*x39+3/4*113/128*5/8*1/2*x34+1/4*5/8*1/2*x29+3/4*15/128*3/8*1/2*x29+3/4*113/128*3/8*1/2*x24+1/4*3/8*1/2*x24+3/4*15/128*3/4*1/2*x25+3/4*113/128*3/4*1/2*x20+1/4*3/4*1/2*x20+3/4*15/128*1/4*1/2*x35+3/4*113/128*1/4*1/2*x30+1/4*1/4*1/2*x25 && x29 == 3/4*15/128*3/4*x25+3/4*113/128*3/4*x20+1/4*3/4*x20+3/4*15/128*1/4*x35+3/4*113/128*1/4*x30+1/4*1/4*x25 && x30 == 5/8*3/4*x31+3/8*3/4*x21+3/4*1/4*x20+1/4*1/4*x30 && x31 == 3/4*15/128*5/8*3/4*x42+3/4*113/128*5/8*3/4*x37+1/4*5/8*3/4*x32+3/4*15/128*3/8*3/4*x32+3/4*113/128*3/8*3/4*x27+1/4*3/8*3/4*x22+3/4*15/128*3/4*1/4*x30+3/4*113/128*3/4*1/4*x25+1/4*3/4*1/4*x20+3/4*15/128*1/4*1/4*x40+3/4*113/128*1/4*1/4*x35+1/4*1/4*1/4*x30 && x32 == 3/4*15/128*5/8*2/3*x43+3/4*113/128*5/8*2/3*x38+1/4*5/8*2/3*x33+3/4*15/128*3/8*2/3*x33+3/4*113/128*3/8*2/3*x28+1/4*3/8*2/3*x23+3/4*15/128*3/4*1/3*x30+3/4*113/128*3/4*1/3*x25+1/4*3/4*1/3*x20+3/4*15/128*1/4*1/3*x40+3/4*113/128*1/4*1/3*x35+1/4*1/4*1/3*x30 && x33 == 3/4*15/128*5/8*1/2*x44+3/4*113/128*5/8*1/2*x39+1/4*5/8*1/2*x34+3/4*15/128*3/8*1/2*x34+3/4*113/128*3/8*1/2*x29+1/4*3/8*1/2*x24+3/4*15/128*3/4*1/2*x30+3/4*113/128*3/4*1/2*x25+1/4*3/4*1/2*x20+3/4*15/128*1/4*1/2*x40+3/4*113/128*1/4*1/2*x35+1/4*1/4*1/2*x30 && x34 == 3/4*15/128*3/4*x30+3/4*113/128*3/4*x25+1/4*3/4*x20+3/4*15/128*1/4*x40+3/4*113/128*1/4*x35+1/4*1/4*x30 && x35 == 5/8*3/4*x36+3/8*3/4*x26+3/4*1/4*x25+1/4*1/4*x35 && x36 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x42+1/4*5/8*3/4*x37+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x32+1/4*3/8*3/4*x27+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x30+1/4*3/4*1/4*x25+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x40+1/4*1/4*1/4*x35 && x37 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x43+1/4*5/8*2/3*x38+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x33+1/4*3/8*2/3*x28+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x30+1/4*3/4*1/3*x25+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x40+1/4*1/4*1/3*x35 && x38 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x44+1/4*5/8*1/2*x39+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x34+1/4*3/8*1/2*x29+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x30+1/4*3/4*1/2*x25+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x40+1/4*1/4*1/2*x35 && x39 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x30+1/4*3/4*x25+3/4*15/128*1/4*b+3/4*113/128*1/4*x40+1/4*1/4*x35 && x40 == 3/4*3/4*b+1/4*3/4*x30+3/4*1/4*b+1/4*1/4*x40 && x42 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x43+3/4*3/8*2/3*b+1/4*3/8*2/3*x33+3/4*3/4*1/3*b+1/4*3/4*1/3*x30+3/4*1/4*1/3*b+1/4*1/4*1/3*x40 && x43 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x44+3/4*3/8*1/2*b+1/4*3/8*1/2*x34+3/4*3/4*1/2*b+1/4*3/4*1/2*x30+3/4*1/4*1/2*b+1/4*1/4*1/2*x40 && x44 == 3/4*3/4*b+1/4*3/4*x30+3/4*1/4*b+1/4*1/4*x40 && x45 == 5/8*3/4*x46+3/8*3/4*231/256*x96+3/8*3/4*25/256*1011/1521*c+3/8*3/4*25/256*510/1521*x121+3/4*1/4*231/256*x95+3/4*1/4*25/256*1011/1521*c+3/4*1/4*25/256*510/1521*x120+1/4*1/4*x45 && x46 == 3/4*15/128*5/8*3/4*x57+3/4*113/128*5/8*3/4*x52+1/4*5/8*3/4*x47+3/4*15/128*3/8*3/4*231/256*x107+3/4*113/128*3/8*3/4*231/256*x102+1/4*3/8*3/4*231/256*x97+3/8*3/4*25/256*1011/1521*c+3/4*15/128*3/8*3/4*25/256*510/1521*x132+3/4*113/128*3/8*3/4*25/256*510/1521*x127+1/4*3/8*3/4*25/256*510/1521*x122+3/4*15/128*3/4*1/4*231/256*x105+3/4*113/128*3/4*1/4*231/256*x100+1/4*3/4*1/4*231/256*x95+3/4*1/4*25/256*1011/1521*c+3/4*15/128*3/4*1/4*25/256*510/1521*x130+3/4*113/128*3/4*1/4*25/256*510/1521*x125+1/4*3/4*1/4*25/256*510/1521*x120+3/4*15/128*1/4*1/4*x55+3/4*113/128*1/4*1/4*x50+1/4*1/4*1/4*x45 && x47 == 3/4*15/128*5/8*2/3*x58+3/4*113/128*5/8*2/3*x53+1/4*5/8*2/3*x48+3/4*15/128*3/8*2/3*231/256*x108+3/4*113/128*3/8*2/3*231/256*x103+1/4*3/8*2/3*231/256*x98+3/8*2/3*25/256*1011/1521*c+3/4*15/128*3/8*2/3*25/256*510/1521*x133+3/4*113/128*3/8*2/3*25/256*510/1521*x128+1/4*3/8*2/3*25/256*510/1521*x123+3/4*15/128*3/4*1/3*231/256*x105+3/4*113/128*3/4*1/3*231/256*x100+1/4*3/4*1/3*231/256*x95+3/4*1/3*25/256*1011/1521*c+3/4*15/128*3/4*1/3*25/256*510/1521*x130+3/4*113/128*3/4*1/3*25/256*510/1521*x125+1/4*3/4*1/3*25/256*510/1521*x120+3/4*15/128*1/4*1/3*x55+3/4*113/128*1/4*1/3*x50+1/4*1/4*1/3*x45 && x48 == 3/4*15/128*5/8*1/2*x59+3/4*113/128*5/8*1/2*x54+1/4*5/8*1/2*x49+3/4*15/128*3/8*1/2*231/256*x109+3/4*113/128*3/8*1/2*231/256*x104+1/4*3/8*1/2*231/256*x99+3/8*1/2*25/256*1011/1521*c+3/4*15/128*3/8*1/2*25/256*510/1521*x134+3/4*113/128*3/8*1/2*25/256*510/1521*x129+1/4*3/8*1/2*25/256*510/1521*x124+3/4*15/128*3/4*1/2*231/256*x105+3/4*113/128*3/4*1/2*231/256*x100+1/4*3/4*1/2*231/256*x95+3/4*1/2*25/256*1011/1521*c+3/4*15/128*3/4*1/2*25/256*510/1521*x130+3/4*113/128*3/4*1/2*25/256*510/1521*x125+1/4*3/4*1/2*25/256*510/1521*x120+3/4*15/128*1/4*1/2*x55+3/4*113/128*1/4*1/2*x50+1/4*1/4*1/2*x45 && x49 == 3/4*15/128*3/4*231/256*x105+3/4*113/128*3/4*231/256*x100+1/4*3/4*231/256*x95+3/4*25/256*1011/1521*c+3/4*15/128*3/4*25/256*510/1521*x130+3/4*113/128*3/4*25/256*510/1521*x125+1/4*3/4*25/256*510/1521*x120+3/4*15/128*1/4*x55+3/4*113/128*1/4*x50+1/4*1/4*x45 && x50 == 5/8*3/4*x51+3/8*3/4*231/256*x101+3/8*3/4*25/256*1011/1521*c+3/8*3/4*25/256*510/1521*x126+3/4*1/4*231/256*x100+3/4*1/4*25/256*1011/1521*c+3/4*1/4*25/256*510/1521*x125+1/4*1/4*x50 && x51 == 3/4*15/128*5/8*3/4*x62+3/4*113/128*5/8*3/4*x57+1/4*5/8*3/4*x52+3/4*15/128*3/8*3/4*x52+3/4*113/128*3/8*3/4*x47+1/4*3/8*3/4*x47+3/4*15/128*3/4*1/4*x50+3/4*113/128*3/4*1/4*x45+1/4*3/4*1/4*x45+3/4*15/128*1/4*1/4*x60+3/4*113/128*1/4*1/4*x55+1/4*1/4*1/4*x50 && x52 == 3/4*15/128*5/8*2/3*x63+3/4*113/128*5/8*2/3*x58+1/4*5/8*2/3*x53+3/4*15/128*3/8*2/3*x53+3/4*113/128*3/8*2/3*x48+1/4*3/8*2/3*x48+3/4*15/128*3/4*1/3*x50+3/4*113/128*3/4*1/3*x45+1/4*3/4*1/3*x45+3/4*15/128*1/4*1/3*x60+3/4*113/128*1/4*1/3*x55+1/4*1/4*1/3*x50 && x53 == 3/4*15/128*5/8*1/2*x64+3/4*113/128*5/8*1/2*x59+1/4*5/8*1/2*x54+3/4*15/128*3/8*1/2*x54+3/4*113/128*3/8*1/2*x49+1/4*3/8*1/2*x49+3/4*15/128*3/4*1/2*x50+3/4*113/128*3/4*1/2*x45+1/4*3/4*1/2*x45+3/4*15/128*1/4*1/2*x60+3/4*113/128*1/4*1/2*x55+1/4*1/4*1/2*x50 && x54 == 3/4*15/128*3/4*x50+3/4*113/128*3/4*x45+1/4*3/4*x45+3/4*15/128*1/4*x60+3/4*113/128*1/4*x55+1/4*1/4*x50 && x55 == 5/8*3/4*x56+3/8*3/4*x46+3/4*1/4*x45+1/4*1/4*x55 && x56 == 3/4*15/128*5/8*3/4*x67+3/4*113/128*5/8*3/4*x62+1/4*5/8*3/4*x57+3/4*15/128*3/8*3/4*x57+3/4*113/128*3/8*3/4*x52+1/4*3/8*3/4*x47+3/4*15/128*3/4*1/4*x55+3/4*113/128*3/4*1/4*x50+1/4*3/4*1/4*x45+3/4*15/128*1/4*1/4*x65+3/4*113/128*1/4*1/4*x60+1/4*1/4*1/4*x55 && x57 == 3/4*15/128*5/8*2/3*x68+3/4*113/128*5/8*2/3*x63+1/4*5/8*2/3*x58+3/4*15/128*3/8*2/3*x58+3/4*113/128*3/8*2/3*x53+1/4*3/8*2/3*x48+3/4*15/128*3/4*1/3*x55+3/4*113/128*3/4*1/3*x50+1/4*3/4*1/3*x45+3/4*15/128*1/4*1/3*x65+3/4*113/128*1/4*1/3*x60+1/4*1/4*1/3*x55 && x58 == 3/4*15/128*5/8*1/2*x69+3/4*113/128*5/8*1/2*x64+1/4*5/8*1/2*x59+3/4*15/128*3/8*1/2*x59+3/4*113/128*3/8*1/2*x54+1/4*3/8*1/2*x49+3/4*15/128*3/4*1/2*x55+3/4*113/128*3/4*1/2*x50+1/4*3/4*1/2*x45+3/4*15/128*1/4*1/2*x65+3/4*113/128*1/4*1/2*x60+1/4*1/4*1/2*x55 && x59 == 3/4*15/128*3/4*x55+3/4*113/128*3/4*x50+1/4*3/4*x45+3/4*15/128*1/4*x65+3/4*113/128*1/4*x60+1/4*1/4*x55 && x60 == 5/8*3/4*x61+3/8*3/4*x51+3/4*1/4*x50+1/4*1/4*x60 && x61 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x67+1/4*5/8*3/4*x62+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x57+1/4*3/8*3/4*x52+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x55+1/4*3/4*1/4*x50+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x65+1/4*1/4*1/4*x60 && x62 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x68+1/4*5/8*2/3*x63+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x58+1/4*3/8*2/3*x53+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x55+1/4*3/4*1/3*x50+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x65+1/4*1/4*1/3*x60 && x63 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x69+1/4*5/8*1/2*x64+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x59+1/4*3/8*1/2*x54+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x55+1/4*3/4*1/2*x50+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x65+1/4*1/4*1/2*x60 && x64 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x55+1/4*3/4*x50+3/4*15/128*1/4*b+3/4*113/128*1/4*x65+1/4*1/4*x60 && x65 == 3/4*3/4*b+1/4*3/4*x55+3/4*1/4*b+1/4*1/4*x65 && x67 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x68+3/4*3/8*2/3*b+1/4*3/8*2/3*x58+3/4*3/4*1/3*b+1/4*3/4*1/3*x55+3/4*1/4*1/3*b+1/4*1/4*1/3*x65 && x68 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x69+3/4*3/8*1/2*b+1/4*3/8*1/2*x59+3/4*3/4*1/2*b+1/4*3/4*1/2*x55+3/4*1/4*1/2*b+1/4*1/4*1/2*x65 && x69 == 3/4*3/4*b+1/4*3/4*x55+3/4*1/4*b+1/4*1/4*x65 && x70 == 5/8*3/4*x71+3/8*3/4*231/256*1011/1521*c+3/8*3/4*231/256*510/1521*x121+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*1/4*231/256*510/1521*x120+3/4*1/4*25/256*c+1/4*1/4*x70 && x71 == 3/4*15/128*5/8*3/4*x82+3/4*113/128*5/8*3/4*x77+1/4*5/8*3/4*x72+3/8*3/4*231/256*1011/1521*c+3/4*15/128*3/8*3/4*231/256*510/1521*x132+3/4*113/128*3/8*3/4*231/256*510/1521*x127+1/4*3/8*3/4*231/256*510/1521*x122+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*15/128*3/4*1/4*231/256*510/1521*x130+3/4*113/128*3/4*1/4*231/256*510/1521*x125+1/4*3/4*1/4*231/256*510/1521*x120+3/4*1/4*25/256*c+3/4*15/128*1/4*1/4*x80+3/4*113/128*1/4*1/4*x75+1/4*1/4*1/4*x70 && x72 == 3/4*15/128*5/8*2/3*x83+3/4*113/128*5/8*2/3*x78+1/4*5/8*2/3*x73+3/8*2/3*231/256*1011/1521*c+3/4*15/128*3/8*2/3*231/256*510/1521*x133+3/4*113/128*3/8*2/3*231/256*510/1521*x128+1/4*3/8*2/3*231/256*510/1521*x123+3/8*2/3*25/256*c+3/4*1/3*231/256*1011/1521*c+3/4*15/128*3/4*1/3*231/256*510/1521*x130+3/4*113/128*3/4*1/3*231/256*510/1521*x125+1/4*3/4*1/3*231/256*510/1521*x120+3/4*1/3*25/256*c+3/4*15/128*1/4*1/3*x80+3/4*113/128*1/4*1/3*x75+1/4*1/4*1/3*x70 && x73 == 3/4*15/128*5/8*1/2*x84+3/4*113/128*5/8*1/2*x79+1/4*5/8*1/2*x74+3/8*1/2*231/256*1011/1521*c+3/4*15/128*3/8*1/2*231/256*510/1521*x134+3/4*113/128*3/8*1/2*231/256*510/1521*x129+1/4*3/8*1/2*231/256*510/1521*x124+3/8*1/2*25/256*c+3/4*1/2*231/256*1011/1521*c+3/4*15/128*3/4*1/2*231/256*510/1521*x130+3/4*113/128*3/4*1/2*231/256*510/1521*x125+1/4*3/4*1/2*231/256*510/1521*x120+3/4*1/2*25/256*c+3/4*15/128*1/4*1/2*x80+3/4*113/128*1/4*1/2*x75+1/4*1/4*1/2*x70 && x74 == 3/4*231/256*1011/1521*c+3/4*15/128*3/4*231/256*510/1521*x130+3/4*113/128*3/4*231/256*510/1521*x125+1/4*3/4*231/256*510/1521*x120+3/4*25/256*c+3/4*15/128*1/4*x80+3/4*113/128*1/4*x75+1/4*1/4*x70 && x75 == 5/8*3/4*x76+3/8*3/4*231/256*1011/1521*c+3/8*3/4*231/256*510/1521*x126+3/8*3/4*25/256*c+3/4*1/4*231/256*1011/1521*c+3/4*1/4*231/256*510/1521*x125+3/4*1/4*25/256*c+1/4*1/4*x75 && x76 == 3/4*15/128*5/8*3/4*x87+3/4*113/128*5/8*3/4*x82+1/4*5/8*3/4*x77+3/4*15/128*3/8*3/4*x77+3/4*113/128*3/8*3/4*x72+1/4*3/8*3/4*x72+3/4*15/128*3/4*1/4*x75+3/4*113/128*3/4*1/4*x70+1/4*3/4*1/4*x70+3/4*15/128*1/4*1/4*x85+3/4*113/128*1/4*1/4*x80+1/4*1/4*1/4*x75 && x77 == 3/4*15/128*5/8*2/3*x88+3/4*113/128*5/8*2/3*x83+1/4*5/8*2/3*x78+3/4*15/128*3/8*2/3*x78+3/4*113/128*3/8*2/3*x73+1/4*3/8*2/3*x73+3/4*15/128*3/4*1/3*x75+3/4*113/128*3/4*1/3*x70+1/4*3/4*1/3*x70+3/4*15/128*1/4*1/3*x85+3/4*113/128*1/4*1/3*x80+1/4*1/4*1/3*x75 && x78 == 3/4*15/128*5/8*1/2*x89+3/4*113/128*5/8*1/2*x84+1/4*5/8*1/2*x79+3/4*15/128*3/8*1/2*x79+3/4*113/128*3/8*1/2*x74+1/4*3/8*1/2*x74+3/4*15/128*3/4*1/2*x75+3/4*113/128*3/4*1/2*x70+1/4*3/4*1/2*x70+3/4*15/128*1/4*1/2*x85+3/4*113/128*1/4*1/2*x80+1/4*1/4*1/2*x75 && x79 == 3/4*15/128*3/4*x75+3/4*113/128*3/4*x70+1/4*3/4*x70+3/4*15/128*1/4*x85+3/4*113/128*1/4*x80+1/4*1/4*x75 && x80 == 5/8*3/4*x81+3/8*3/4*x71+3/4*1/4*x70+1/4*1/4*x80 && x81 == 3/4*15/128*5/8*3/4*x92+3/4*113/128*5/8*3/4*x87+1/4*5/8*3/4*x82+3/4*15/128*3/8*3/4*x82+3/4*113/128*3/8*3/4*x77+1/4*3/8*3/4*x72+3/4*15/128*3/4*1/4*x80+3/4*113/128*3/4*1/4*x75+1/4*3/4*1/4*x70+3/4*15/128*1/4*1/4*x90+3/4*113/128*1/4*1/4*x85+1/4*1/4*1/4*x80 && x82 == 3/4*15/128*5/8*2/3*x93+3/4*113/128*5/8*2/3*x88+1/4*5/8*2/3*x83+3/4*15/128*3/8*2/3*x83+3/4*113/128*3/8*2/3*x78+1/4*3/8*2/3*x73+3/4*15/128*3/4*1/3*x80+3/4*113/128*3/4*1/3*x75+1/4*3/4*1/3*x70+3/4*15/128*1/4*1/3*x90+3/4*113/128*1/4*1/3*x85+1/4*1/4*1/3*x80 && x83 == 3/4*15/128*5/8*1/2*x94+3/4*113/128*5/8*1/2*x89+1/4*5/8*1/2*x84+3/4*15/128*3/8*1/2*x84+3/4*113/128*3/8*1/2*x79+1/4*3/8*1/2*x74+3/4*15/128*3/4*1/2*x80+3/4*113/128*3/4*1/2*x75+1/4*3/4*1/2*x70+3/4*15/128*1/4*1/2*x90+3/4*113/128*1/4*1/2*x85+1/4*1/4*1/2*x80 && x84 == 3/4*15/128*3/4*x80+3/4*113/128*3/4*x75+1/4*3/4*x70+3/4*15/128*1/4*x90+3/4*113/128*1/4*x85+1/4*1/4*x80 && x85 == 5/8*3/4*x86+3/8*3/4*x76+3/4*1/4*x75+1/4*1/4*x85 && x86 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x92+1/4*5/8*3/4*x87+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x82+1/4*3/8*3/4*x77+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x80+1/4*3/4*1/4*x75+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x90+1/4*1/4*1/4*x85 && x87 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x93+1/4*5/8*2/3*x88+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x83+1/4*3/8*2/3*x78+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x80+1/4*3/4*1/3*x75+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x90+1/4*1/4*1/3*x85 && x88 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x94+1/4*5/8*1/2*x89+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x84+1/4*3/8*1/2*x79+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x80+1/4*3/4*1/2*x75+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x90+1/4*1/4*1/2*x85 && x89 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x80+1/4*3/4*x75+3/4*15/128*1/4*b+3/4*113/128*1/4*x90+1/4*1/4*x85 && x90 == 3/4*3/4*b+1/4*3/4*x80+3/4*1/4*b+1/4*1/4*x90 && x92 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x93+3/4*3/8*2/3*b+1/4*3/8*2/3*x83+3/4*3/4*1/3*b+1/4*3/4*1/3*x80+3/4*1/4*1/3*b+1/4*1/4*1/3*x90 && x93 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x94+3/4*3/8*1/2*b+1/4*3/8*1/2*x84+3/4*3/4*1/2*b+1/4*3/4*1/2*x80+3/4*1/4*1/2*b+1/4*1/4*1/2*x90 && x94 == 3/4*3/4*b+1/4*3/4*x80+3/4*1/4*b+1/4*1/4*x90 && x95 == 5/8*3/4*x96+3/8*3/4*231/256*921/1000*c+3/8*3/4*231/256*79/1000*x121+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*1/4*231/256*79/1000*x120+3/4*1/4*25/256*c+1/4*1/4*x95 && x96 == 3/4*15/128*5/8*3/4*x107+3/4*113/128*5/8*3/4*x102+1/4*5/8*3/4*x97+3/8*3/4*231/256*921/1000*c+3/4*15/128*3/8*3/4*231/256*79/1000*x132+3/4*113/128*3/8*3/4*231/256*79/1000*x127+1/4*3/8*3/4*231/256*79/1000*x122+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*15/128*3/4*1/4*231/256*79/1000*x130+3/4*113/128*3/4*1/4*231/256*79/1000*x125+1/4*3/4*1/4*231/256*79/1000*x120+3/4*1/4*25/256*c+3/4*15/128*1/4*1/4*x105+3/4*113/128*1/4*1/4*x100+1/4*1/4*1/4*x95 && x97 == 3/4*15/128*5/8*2/3*x108+3/4*113/128*5/8*2/3*x103+1/4*5/8*2/3*x98+3/8*2/3*231/256*921/1000*c+3/4*15/128*3/8*2/3*231/256*79/1000*x133+3/4*113/128*3/8*2/3*231/256*79/1000*x128+1/4*3/8*2/3*231/256*79/1000*x123+3/8*2/3*25/256*c+3/4*1/3*231/256*921/1000*c+3/4*15/128*3/4*1/3*231/256*79/1000*x130+3/4*113/128*3/4*1/3*231/256*79/1000*x125+1/4*3/4*1/3*231/256*79/1000*x120+3/4*1/3*25/256*c+3/4*15/128*1/4*1/3*x105+3/4*113/128*1/4*1/3*x100+1/4*1/4*1/3*x95 && x98 == 3/4*15/128*5/8*1/2*x109+3/4*113/128*5/8*1/2*x104+1/4*5/8*1/2*x99+3/8*1/2*231/256*921/1000*c+3/4*15/128*3/8*1/2*231/256*79/1000*x134+3/4*113/128*3/8*1/2*231/256*79/1000*x129+1/4*3/8*1/2*231/256*79/1000*x124+3/8*1/2*25/256*c+3/4*1/2*231/256*921/1000*c+3/4*15/128*3/4*1/2*231/256*79/1000*x130+3/4*113/128*3/4*1/2*231/256*79/1000*x125+1/4*3/4*1/2*231/256*79/1000*x120+3/4*1/2*25/256*c+3/4*15/128*1/4*1/2*x105+3/4*113/128*1/4*1/2*x100+1/4*1/4*1/2*x95 && x99 == 3/4*231/256*921/1000*c+3/4*15/128*3/4*231/256*79/1000*x130+3/4*113/128*3/4*231/256*79/1000*x125+1/4*3/4*231/256*79/1000*x120+3/4*25/256*c+3/4*15/128*1/4*x105+3/4*113/128*1/4*x100+1/4*1/4*x95 && x100 == 5/8*3/4*x101+3/8*3/4*231/256*921/1000*c+3/8*3/4*231/256*79/1000*x126+3/8*3/4*25/256*c+3/4*1/4*231/256*921/1000*c+3/4*1/4*231/256*79/1000*x125+3/4*1/4*25/256*c+1/4*1/4*x100 && x101 == 3/4*15/128*5/8*3/4*x112+3/4*113/128*5/8*3/4*x107+1/4*5/8*3/4*x102+3/4*15/128*3/8*3/4*x102+3/4*113/128*3/8*3/4*x97+1/4*3/8*3/4*x97+3/4*15/128*3/4*1/4*x100+3/4*113/128*3/4*1/4*x95+1/4*3/4*1/4*x95+3/4*15/128*1/4*1/4*x110+3/4*113/128*1/4*1/4*x105+1/4*1/4*1/4*x100 && x102 == 3/4*15/128*5/8*2/3*x113+3/4*113/128*5/8*2/3*x108+1/4*5/8*2/3*x103+3/4*15/128*3/8*2/3*x103+3/4*113/128*3/8*2/3*x98+1/4*3/8*2/3*x98+3/4*15/128*3/4*1/3*x100+3/4*113/128*3/4*1/3*x95+1/4*3/4*1/3*x95+3/4*15/128*1/4*1/3*x110+3/4*113/128*1/4*1/3*x105+1/4*1/4*1/3*x100 && x103 == 3/4*15/128*5/8*1/2*x114+3/4*113/128*5/8*1/2*x109+1/4*5/8*1/2*x104+3/4*15/128*3/8*1/2*x104+3/4*113/128*3/8*1/2*x99+1/4*3/8*1/2*x99+3/4*15/128*3/4*1/2*x100+3/4*113/128*3/4*1/2*x95+1/4*3/4*1/2*x95+3/4*15/128*1/4*1/2*x110+3/4*113/128*1/4*1/2*x105+1/4*1/4*1/2*x100 && x104 == 3/4*15/128*3/4*x100+3/4*113/128*3/4*x95+1/4*3/4*x95+3/4*15/128*1/4*x110+3/4*113/128*1/4*x105+1/4*1/4*x100 && x105 == 5/8*3/4*x106+3/8*3/4*x96+3/4*1/4*x95+1/4*1/4*x105 && x106 == 3/4*15/128*5/8*3/4*x117+3/4*113/128*5/8*3/4*x112+1/4*5/8*3/4*x107+3/4*15/128*3/8*3/4*x107+3/4*113/128*3/8*3/4*x102+1/4*3/8*3/4*x97+3/4*15/128*3/4*1/4*x105+3/4*113/128*3/4*1/4*x100+1/4*3/4*1/4*x95+3/4*15/128*1/4*1/4*x115+3/4*113/128*1/4*1/4*x110+1/4*1/4*1/4*x105 && x107 == 3/4*15/128*5/8*2/3*x118+3/4*113/128*5/8*2/3*x113+1/4*5/8*2/3*x108+3/4*15/128*3/8*2/3*x108+3/4*113/128*3/8*2/3*x103+1/4*3/8*2/3*x98+3/4*15/128*3/4*1/3*x105+3/4*113/128*3/4*1/3*x100+1/4*3/4*1/3*x95+3/4*15/128*1/4*1/3*x115+3/4*113/128*1/4*1/3*x110+1/4*1/4*1/3*x105 && x108 == 3/4*15/128*5/8*1/2*x119+3/4*113/128*5/8*1/2*x114+1/4*5/8*1/2*x109+3/4*15/128*3/8*1/2*x109+3/4*113/128*3/8*1/2*x104+1/4*3/8*1/2*x99+3/4*15/128*3/4*1/2*x105+3/4*113/128*3/4*1/2*x100+1/4*3/4*1/2*x95+3/4*15/128*1/4*1/2*x115+3/4*113/128*1/4*1/2*x110+1/4*1/4*1/2*x105 && x109 == 3/4*15/128*3/4*x105+3/4*113/128*3/4*x100+1/4*3/4*x95+3/4*15/128*1/4*x115+3/4*113/128*1/4*x110+1/4*1/4*x105 && x110 == 5/8*3/4*x111+3/8*3/4*x101+3/4*1/4*x100+1/4*1/4*x110 && x111 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x117+1/4*5/8*3/4*x112+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*x107+1/4*3/8*3/4*x102+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*x105+1/4*3/4*1/4*x100+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x115+1/4*1/4*1/4*x110 && x112 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x118+1/4*5/8*2/3*x113+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*x108+1/4*3/8*2/3*x103+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*x105+1/4*3/4*1/3*x100+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x115+1/4*1/4*1/3*x110 && x113 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x119+1/4*5/8*1/2*x114+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*x109+1/4*3/8*1/2*x104+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*x105+1/4*3/4*1/2*x100+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x115+1/4*1/4*1/2*x110 && x114 == 3/4*15/128*3/4*b+3/4*113/128*3/4*x105+1/4*3/4*x100+3/4*15/128*1/4*b+3/4*113/128*1/4*x115+1/4*1/4*x110 && x115 == 3/4*3/4*b+1/4*3/4*x105+3/4*1/4*b+1/4*1/4*x115 && x117 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x118+3/4*3/8*2/3*b+1/4*3/8*2/3*x108+3/4*3/4*1/3*b+1/4*3/4*1/3*x105+3/4*1/4*1/3*b+1/4*1/4*1/3*x115 && x118 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x119+3/4*3/8*1/2*b+1/4*3/8*1/2*x109+3/4*3/4*1/2*b+1/4*3/4*1/2*x105+3/4*1/4*1/2*b+1/4*1/4*1/2*x115 && x119 == 3/4*3/4*b+1/4*3/4*x105+3/4*1/4*b+1/4*1/4*x115 && x120 == 5/8*3/4*x121+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x120 && x121 == 3/4*15/128*5/8*3/4*x132+3/4*113/128*5/8*3/4*x127+1/4*5/8*3/4*x122+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x130+3/4*113/128*1/4*1/4*x125+1/4*1/4*1/4*x120 && x122 == 3/4*15/128*5/8*2/3*x133+3/4*113/128*5/8*2/3*x128+1/4*5/8*2/3*x123+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x130+3/4*113/128*1/4*1/3*x125+1/4*1/4*1/3*x120 && x123 == 3/4*15/128*5/8*1/2*x134+3/4*113/128*5/8*1/2*x129+1/4*5/8*1/2*x124+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x130+3/4*113/128*1/4*1/2*x125+1/4*1/4*1/2*x120 && x124 == 3/4*c+3/4*15/128*1/4*x130+3/4*113/128*1/4*x125+1/4*1/4*x120 && x125 == 5/8*3/4*x126+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x125 && x126 == 3/4*15/128*5/8*3/4*x137+3/4*113/128*5/8*3/4*x132+1/4*5/8*3/4*x127+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x135+3/4*113/128*1/4*1/4*x130+1/4*1/4*1/4*x125 && x127 == 3/4*15/128*5/8*2/3*x138+3/4*113/128*5/8*2/3*x133+1/4*5/8*2/3*x128+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x135+3/4*113/128*1/4*1/3*x130+1/4*1/4*1/3*x125 && x128 == 3/4*15/128*5/8*1/2*x139+3/4*113/128*5/8*1/2*x134+1/4*5/8*1/2*x129+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x135+3/4*113/128*1/4*1/2*x130+1/4*1/4*1/2*x125 && x129 == 3/4*c+3/4*15/128*1/4*x135+3/4*113/128*1/4*x130+1/4*1/4*x125 && x130 == 5/8*3/4*x131+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x130 && x131 == 3/4*15/128*5/8*3/4*x142+3/4*113/128*5/8*3/4*x137+1/4*5/8*3/4*x132+3/8*3/4*c+3/4*1/4*c+3/4*15/128*1/4*1/4*x140+3/4*113/128*1/4*1/4*x135+1/4*1/4*1/4*x130 && x132 == 3/4*15/128*5/8*2/3*x143+3/4*113/128*5/8*2/3*x138+1/4*5/8*2/3*x133+3/8*2/3*c+3/4*1/3*c+3/4*15/128*1/4*1/3*x140+3/4*113/128*1/4*1/3*x135+1/4*1/4*1/3*x130 && x133 == 3/4*15/128*5/8*1/2*x144+3/4*113/128*5/8*1/2*x139+1/4*5/8*1/2*x134+3/8*1/2*c+3/4*1/2*c+3/4*15/128*1/4*1/2*x140+3/4*113/128*1/4*1/2*x135+1/4*1/4*1/2*x130 && x134 == 3/4*c+3/4*15/128*1/4*x140+3/4*113/128*1/4*x135+1/4*1/4*x130 && x135 == 5/8*3/4*x136+3/8*3/4*c+3/4*1/4*c+1/4*1/4*x135 && x136 == 3/4*15/128*5/8*3/4*b+3/4*113/128*5/8*3/4*x142+1/4*5/8*3/4*x137+3/4*15/128*3/8*3/4*b+3/4*113/128*3/8*3/4*c+1/4*3/8*3/4*c+3/4*15/128*3/4*1/4*b+3/4*113/128*3/4*1/4*c+1/4*3/4*1/4*c+3/4*15/128*1/4*1/4*b+3/4*113/128*1/4*1/4*x140+1/4*1/4*1/4*x135 && x137 == 3/4*15/128*5/8*2/3*b+3/4*113/128*5/8*2/3*x143+1/4*5/8*2/3*x138+3/4*15/128*3/8*2/3*b+3/4*113/128*3/8*2/3*c+1/4*3/8*2/3*c+3/4*15/128*3/4*1/3*b+3/4*113/128*3/4*1/3*c+1/4*3/4*1/3*c+3/4*15/128*1/4*1/3*b+3/4*113/128*1/4*1/3*x140+1/4*1/4*1/3*x135 && x138 == 3/4*15/128*5/8*1/2*b+3/4*113/128*5/8*1/2*x144+1/4*5/8*1/2*x139+3/4*15/128*3/8*1/2*b+3/4*113/128*3/8*1/2*c+1/4*3/8*1/2*c+3/4*15/128*3/4*1/2*b+3/4*113/128*3/4*1/2*c+1/4*3/4*1/2*c+3/4*15/128*1/4*1/2*b+3/4*113/128*1/4*1/2*x140+1/4*1/4*1/2*x135 && x139 == 3/4*15/128*3/4*b+3/4*113/128*3/4*c+1/4*3/4*c+3/4*15/128*1/4*b+3/4*113/128*1/4*x140+1/4*1/4*x135 && x140 == 3/4*3/4*b+1/4*3/4*c+3/4*1/4*b+1/4*1/4*x140 && x142 == 3/4*5/8*2/3*b+1/4*5/8*2/3*x143+3/4*3/8*2/3*b+1/4*3/8*2/3*c+3/4*3/4*1/3*b+1/4*3/4*1/3*c+3/4*1/4*1/3*b+1/4*1/4*1/3*x140 && x143 == 3/4*5/8*1/2*b+1/4*5/8*1/2*x144+3/4*3/8*1/2*b+1/4*3/8*1/2*c+3/4*3/4*1/2*b+1/4*3/4*1/2*c+3/4*1/4*1/2*b+1/4*1/4*1/2*x140 && x144 == 3/4*3/4*b+1/4*3/4*c+3/4*1/4*b+1/4*1/4*x140, {x0, x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11, x12, x13, x14, x15, x16, x17, x18, x19, x20, x21, x22, x23, x24, x25, x26, x27, x28, x29, x30, x31, x32, x33, x34, x35, x36, x37, x38, x39, x40, x42, x43, x44, x45, x46, x47, x48, x49, x50, x51, x52, x53, x54, x55, x56, x57, x58, x59, x60, x61, x62, x63, x64, x65, x67, x68, x69, x70, x71, x72, x73, x74, x75, x76, x77, x78, x79, x80, x81, x82, x83, x84, x85, x86, x87, x88, x89, x90, x92, x93, x94, x95, x96, x97, x98, x99, x100, x101, x102, x103, x104, x105, x106, x107, x108, x109, x110, x111, x112, x113, x114, x115, x117, x118, x119, x120, x121, x122, x123, x124, x125, x126, x127, x128, x129, x130, x131, x132, x133, x134, x135, x136, x137, x138, x139, x140, x142, x143, x144}]
Here's what Mathematica spat out:
x0 == (5142175855881592750910450278590166654571522441385625 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (1840561346815806553411760798027890691825539863251417120654787757846530678768289976080210618586\
> 9388311061619282625178579085441866497510333781680016986203046864744380048553570431978458346\
> 4980559941217294655104992420291469408486706961794372764837949227087115938808888409721181483
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> x14 == (17892327485920547766495327005811709345211278346655385 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (4881236903795826651173397665414303904933865921762064707074999297756049538633633408905392561208\
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> 1442406352262126926393931919597345732644942731925981124316448986666866356403779680159828113
> b) / 333399132721766104720029417503839355418672810848076057313651963266926227942886362077211\
> 470356652290038346350985929993352468006770183883728469856114793221809859933020905282353593494\
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> 0000 + (1759537979438334514766717091617651024214629539003625841407468303076184046512044655421\
> 9422263325150053019707298241731923426505080044153123837864845352127400108087444636233933525\
> 9549596515097196821844607450651667332033923533214825511675400379449571326667595222120744745\
> 5840171887 c) /
> 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772114703566\
> 522900383463509859299933524680067701838837284698561147932218098599330209052823535934943636592\
> 995758541444292644868997532091060866929209162584310527136986860220073491138871296000000000 &&
> x15 == (32801386299509587233436571498539142095648390839836185 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2790847499727015937082031570970400812256900926630140107232739727522139421867491991391478416139\
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> 15570242122195617546047782619104570161641059005625799064016026498952100611623199477237777353
> b) / 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772\
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> 0000000 + (1063375918697458411003897099374432228717562550178363003009770995316674351702430803\
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> 2974271851932908187013945288470848761306810441792896704055437588378431522470891560565196537\
> 43882762222647 c) /
> 3333991327217661047200294175038393554186728108480760573136519632669262279428863620772114703566\
> 522900383463509859299933524680067701838837284698561147932218098599330209052823535934943636592\
> 9957585414442926448689975320910608669292091625843105271369868602200734911388712960000000000\
> && x16 == (42038746075316367125707823265731504353865916567736336 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (2068978815727610610279803365539712966456565382241957002521960130427837628966998420781672537384\
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> 6660634105536185528333487250274496353887839688719750138820350347693454183475452824730648521
> b) / 416748915902207630900036771879799194273341013560095071642064954083657784928607952596514\
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> 5166541933616433816536285902525538883086175015261508173561890253355237838055967578176873575\
> 269351479 c) /
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> 153625479329387324124916905850084627298546605873201434915272623249162761316029419918679545741\
> 244698176805365806086246915113826083661511453230388158921233575275091863923589120000000000 &&
> x17 == (40140251616262058753412071073802414875523282228013593 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (9485027587498773742812301024355272311921357831673710026563901187517873464345891994190442814354\
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> 1522819891742016939407553717639267463210124393850017853265823029798792271603434957422717557
> b) / 166699566360883052360014708751919677709336405424038028656825981633463113971443181038605\
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> 2829697339080161379867423537584891417386603311369036282991554835096421276014592932560888120\
> 82577282443 c) /
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> 261450191731754929649966762340033850919418642349280573966109049299665104526411767967471818296\
> 4978792707221463224344987660455304334646045812921552635684934301100367455694356480000000000\
> && x18 == (37541322141758862494331966231331047220659235197798937 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (4603791712362812198474959010205879115911880332736827970804672940822629011448843679354581484710\
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> 958061423477063679901 c) /
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> 455313492877911336691706945722492655471020364972667959576549089730710509852408414208000000000\
> && x19 == (32425976873106665645155609285902348839780246924020249 a) /
> 54912304248954538795489937340192423398464989015152281 +
> (9215788756175084261647428755095094037935311828935900109707025559010400680787631105423916895191\
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> 30646605911427406043168966238179842192270742126913586771568354541196134126644036585648580931
> b) / 1066877224709651535104094136012285937339752994713843383403686282454163929417236358647\
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> 00000000 + (344723260894407461571775056891323801351277577613007576614166976014334124276056912\
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> 022998351419069 c) /
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> 75864273326217364635807921026913947741734693202697936868383579527042351716443881472000000000\
> && x20 == (1008521482969540273440048110181881776100356717439346468723545311606433422580781952462\
> 0068470960873856180707179126139943618835623322634439545960406553558861915167864112532810201\
> 606484673376590649012205537833068395373834623741 b) /
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> 131809261296088146009521054859213012619638711374282010926082873779237343975924769256024640383\
> 6214755542174258513334763520000000000 +
> (6580832517052085227266428664361360805169198847196852238033996367517501854002160598449793201339\
> 0444236432253702333955266929756506803561947567782413555701966822624509327226437490953761730\
> 459624106529968720680266368146165376259 c) /
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> 131809261296088146009521054859213012619638711374282010926082873779237343975924769256024640383\
> 6214755542174258513334763520000000000 &&
> x21 == (66765263509650355550527140841518076415941056650154656681462272495820542267600738890191505\
> 0302288357893791801905639496195819661249925237681840389348990777962712251257199131951732112\
> 7583730306661850043385473423276420115137403179 b) /
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> 4141954837593220358827398922240000000000 +
> (3218096612914568700856444700150959437450601882592187171045238614753249438934459197164926574496\
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> 033835292987549834885404122502124862596821 c) /
> 3885749248011072256361716108566140201610012449093733737859861339711454861610466586066841624798\
> 787486341783597130756874780087917062461255020223632389594154431374969520115673481859084615876\
> 4141954837593220358827398922240000000000 &&
> x22 == (72788947173171150978404760599354234377972821632507513125801313193774053378290350534193711\
> 2310915135364114314458505722757667650832136856814749677910511255190834210861058701774967842\
> 910560562148258682552070350877669101114141 b) /
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> (4015456778281804428157500378095984269513744011572549060465450417514719014081435588977937917961\
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> 79201273962703339086732545050898885859 c) /
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> 957380788310055091255950659287008132887274194608926256828801796112023339984952980785015400239\
> 763422221385891157083422720000000000 &&
> x23 == (34514642478362815017288656171035382484871571567071642392137616656423509011832131156070325\
> 1933096513619720551086975492682962950697003889681046686535073613035248275540659609803616766\
> 097746483270084258500347766185764104354117013 b) /
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> (2083446855223292010053186006143483801157542065012867162241037170755424198388220304731072763566\
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> 76275602093091075924660526668535645882987 c) /
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> 242178963614748206723046737554948164038284387639770243496346519609355950072295926161927884922\
> 758872177349576272426712432640000000000 &&
> x24 == (10614127366761819109099102924015278457371753290753644711824820278567718165839022662460423\
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> 431832809239182444247025667611992458177 c) /
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> 131809261296088146009521054859213012619638711374282010926082873779237343975924769256024640383\
> 6214755542174258513334763520000000000 &&
> x25 == (11991557823798616275284503619336469168866933962392744241282342193820297468233247989733821\
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> 5160461205868142327376275080789757784783 c) /
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> 89718044337394068106678108160000000000 &&
> x26 == (17830372195653163623329684090509324968765581947004255654879932304502029634176027847192956\
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> (5806316780456309138373508365492310084392997369935773141269548448673732313165339766192504414104\
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> 091613431495157736927730418144434846037 c) /
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> 131809261296088146009521054859213012619638711374282010926082873779237343975924769256024640383\
> 6214755542174258513334763520000000000 &&
> x27 == (63138393559006373111947280150817195070874640319733419564197641853276630520619520210420393\
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> 2312294697175490208678007119027089630579 c) /
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> 44859022168697034053339054080000000000 &&
> x28 == (11537898299230477934196649865943594382948694408101710841721572542309801853533754388628236\
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> 591808581524131006936297304927037135038976234807 b) /
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> 26271277401491525741238382755840000000000 +
> (5063408966894667816759080787111464884281150477739802896403620889307347593223371098844122909191\
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> 1644747146394555228436311345620801023765193 c) /
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> 26271277401491525741238382755840000000000 &&
> x29 == (12571542113284914136029512165333332842029714677337850331269864425282582459778553301145655\
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> (6215440496385109079400348992247705565047052472831087539680439210763001103273041950783206809331\
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> 3292130460267868615262901491736598319693 c) /
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> 71960669953715776131296133120000000000 &&
> x30 == (19755212402570434817597352144247045194508038316151793929620345146975546215974222893148738\
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> x52 == (11124814446728614833810819276328784901446812171220064145723199289945945353419636930793207\
> 7949425061604182933180005715485341306083350799001290152105975164368734669 b) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 97756309842172443583447092050959234787795452751087638727884800000000 +
> (6133522155361696943028269023745394585153117758867914842729259001309568256189110841505047100394\
> 72694705659239263577731606709653151436996451460935532752720431265331 c) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 97756309842172443583447092050959234787795452751087638727884800000000 &&
> x53 == (19211288033455155627291975292481664458757119420830787271906745110674638016680697152825392\
> 4862283471488771446136314221482873478719047471040020272811029247083946703223 b) /
> 1483981537287077565728635074842270325820989230282735873495363364926292539705564064682878541801\
> 262604922556769164458899644520364512845405087234227484114708070400000000 +
> (1291868656952526009455715321917453681233418036074428000776295913819546159538757093154624616938\
> 979133433785323028144678161646885793797934047213954673085460986453296777 c) /
> 1483981537287077565728635074842270325820989230282735873495363364926292539705564064682878541801\
> 262604922556769164458899644520364512845405087234227484114708070400000000 &&
> x54 == (26046439792718093295279119450685077505344467776180682140019219289934136771639389298601070\
> 01760966813228620762867531451186980122467849751085925993916018184577613399 b) /
> 2318721152011058696450992304441047384095295672316774802336505257697332093289943851066997721564\
> 4728201914949518194670306945630695513209454488034804439292313600000000 +
> (2058256754083877763498201109934196609041850994554967980936313064797990725573549958080987021388\
> 3761388686328755327138855758650573045359703402108810523274129022386601 c) /
> 2318721152011058696450992304441047384095295672316774802336505257697332093289943851066997721564\
> 4728201914949518194670306945630695513209454488034804439292313600000000 &&
> x55 == (37943263377429005274060909611864316376997484075312443944276650602668775287882783390641587\
> 942464700895864489672440636995914642333755160291378352844882987292558009 b) /
> 1811500900008639606602337737844568268824449743997480314325394732576040697882768633646091969972\
> 24439077460543110895861773012739808696948863187771909681971200000000 +
> (1432068266234349553861728641725925105054474903244355874882628226549352945003940799739676090547\
> 59738181596053438455224777098097474941788571809419064798983907441991 c) /
> 1811500900008639606602337737844568268824449743997480314325394732576040697882768633646091969972\
> 24439077460543110895861773012739808696948863187771909681971200000000 &&
> x56 == (14844662228852868319050489057855888856016033778793383472588614641775834302543301406004986\
> 4655264006444586319737050470587056424667398289609817699728621435567123269311 b) /
> 4637442304022117392901984608882094768190591344633549604673010515394664186579887702133995443128\
> 94564038298990363893406138912613910264189089760696088785846272000000000 +
> (3152976081136830560996935703096505882588987966754211257414149051217080756325557561533496796576\
> 30557593712670626842935551856189242865899479942996360164410704876730689 c) /
> 4637442304022117392901984608882094768190591344633549604673010515394664186579887702133995443128\
> 94564038298990363893406138912613910264189089760696088785846272000000000 &&
> x57 == (15810744033314770104462965035894983501940978024734672527338928369015412754161815649071907\
> 110155026863459495796712991251745444552285227147490290619475800178996669 b) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 +
> (4079865909195521760186008927174777489882307647518658729532965702398585905467470415236846695147\
> 7610348246923925441965552321036637932569372255888102299815821003331 c) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 &&
> x58 == (13422192283182093586446905694441243963047917496431812758800782180327767644061508713620158\
> 082232254027700511429926543664906743889145872993394787464770362735857643649 b) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 +
> (4454583651709437382482790191658494063933447431148755729961184926210553468818708756305478495687\
> 9566477086862365560132102457332849637150642825299546327868048142356351 c) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 &&
> x59 == (42741242309548518203651163474623993175854455181535027023927891318684240877677461127381419\
> 184359329416043677963145767472441378221320995382695847871479500693593373 b) /
> 2264376125010799508252922172305710336030562179996850392906743415720050872353460792057614962465\
> 30548846825678888619827216265924760871186078984714887102464000000000 +
> (1836963701915314326216410537559470404272017628181500122667464502533208463576686180783800770621\
> 71219430782000925474059743824546539550190696288867015622963306406627 c) /
> 2264376125010799508252922172305710336030562179996850392906743415720050872353460792057614962465\
> 30548846825678888619827216265924760871186078984714887102464000000000 &&
> x60 == (26257719205899741825705749712652431985297305633116262060627223158617799681864151973688827\
> 57398583469654914281152321061978188897879615332961868455418697157729917517 b) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 977563098421724435834470920509592347877954527510876387278848000000000 +
> (4620231679444584243838775980113029876768068412678295051238856614442382823344659337215485122490\
> 394093443507443283513408942320694468262621565642420968581690270082483 c) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 977563098421724435834470920509592347877954527510876387278848000000000 &&
> x61 == (10137823606741949354596583443037586615986322928373555734790286278310364183335334966544835\
> 6772360209241397034208416831646414323096439287617257159158833513432325531 b) /
> 1811500900008639606602337737844568268824449743997480314325394732576040697882768633646091969972\
> 24439077460543110895861773012739808696948863187771909681971200000000 +
> (7977185393344446711426793935408096072258174511601247408463661047450042795492351369916084022486\
> 4229836063508902479030126598416712257661245930612750848457767674469 c) /
> 1811500900008639606602337737844568268824449743997480314325394732576040697882768633646091969972\
> 24439077460543110895861773012739808696948863187771909681971200000000 &&
> x62 == (37712307414499496384290352973995047479504060189758174892114255457624050887355893993130126\
> 1682778209103785953860256966433181086223972120523679846655886949112078981 b) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 97756309842172443583447092050959234787795452751087638727884800000000 +
> (3474772858584608787980315653978768327347392957014103768090153384541757702795485135271355263061\
> 19547206056218583326480658869873010815674929071240982840935687921019 c) /
> 7246003600034558426409350951378273075297798975989921257301578930304162791531074534584367879888\
> 97756309842172443583447092050959234787795452751087638727884800000000 &&
> x63 == (69234007205569780855095531526223237409329554744274771568780986601476547815514269632045637\
> 3883429026425556935621101388037127506118034029872094066593978560579873339167 b) /
> 1483981537287077565728635074842270325820989230282735873495363364926292539705564064682878541801\
> 262604922556769164458899644520364512845405087234227484114708070400000000 +
> (7916414652313797571776797595800379517276936828399881578075534989115270615504213683624221679178\
> 33578496999833543357511607392858394811375215140160890136147490526660833 c) /
> 1483981537287077565728635074842270325820989230282735873495363364926292539705564064682878541801\
> 262604922556769164458899644520364512845405087234227484114708070400000000 &&
> x64 == (44058857384919286063650430898854439434018824216580820624836330700885194617067180547911033\
> 766218743853021294995193070611335585833364426376684793050346647160872400763 b) /
> 1159360576005529348225496152220523692047647836158387401168252628848666046644971925533498860782\
> 23641009574747590973351534728153477566047272440174022196461568000000000 +
> (7187720021563364875889918432319792977074595939925791949198893218398141004743001200543885231200\
> 4897156553452595780280923392567644201620895755380971849814407127599237 c) /
> 1159360576005529348225496152220523692047647836158387401168252628848666046644971925533498860782\
> 23641009574747590973351534728153477566047272440174022196461568000000000 &&
> x65 == (76254362338088484791499600474969162390677738167430456967443454363308505444099023684907837\
> 5931362457205706662116024084087965601568542955744129440483610872092558009 b) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 +
> (1432068266234349553861728641725925105054474903244355874882628226549352945003940799739676090547\
> 59738181596053438455224777098097474941788571809419064798983907441991 c) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 &&
> x67 == (50143819931289928532867952546579607571810572556037098488274255815540891236387833634806381\
> 572180051435773453906739486291218314865582195002949897424793540937196679 b) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 +
> (6465583193980059173455101761063150828953481943884161334394329577460380572448686166633992489452\
> 585775932965815415470512848166324635601516796281296982075062803321 c) /
> 5660940312526998770632305430764275840076405449992125982266858539300127180883651980144037406163\
> 2637211706419722154956804066481190217796519746178721775616000000000 &&
> x68 == (50465019772910996870526718991568897228554413512097453174145949601160846279441991900697580\
> 579339655558898935807158143733685552573735575170707672101513192819747766809 b) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 +
> (7503009027365470540748088619457287373827978295821916884266681841272456052806604375977362459772\
> 164945888437988328532033678524165047448465512414909585037964252233191 c) /
> 5796802880027646741127480761102618460238239180791937005841263144243330233224859627667494303911\
> 1820504787373795486675767364076738783023636220087011098230784000000000 &&
> x69 == (76254362338088484791499600474969162390677738167430456967443454363308505444099023684907837\
> 5931362457205706662116024084087965601568542955744129440483610872092558009 b) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 +
> (1432068266234349553861728641725925105054474903244355874882628226549352945003940799739676090547\
> 59738181596053438455224777098097474941788571809419064798983907441991 c) /
> 9057504500043198033011688689222841344122248719987401571626973662880203489413843168230459849861\
> 22195387302715554479308865063699043484744315938859548409856000000000 &&
> x70 == (14322541261266398069773632760784104910232781756855490732877362465312715051718312783396468\
> 53369 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (418064129688956866257273301322134344398682309221661016757566071816867112768485388873633499\
> 33831 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x71 == (132115324848331684284312803942953736085340031954613090483241330638000953786633723891\
> 8822277671311 b) /
> 2213819755265143113354480302504542460461645265810004518351070383524760718439442952483993435504\
> 6400 + (2081704430416811429070167498561588724376305233855391427867829052886759764652809228592\
> 1112077375089 c) /
> 2213819755265143113354480302504542460461645265810004518351070383524760718439442952483993435504\
> 6400 && x72 == (12079354718813182845585625332931403593958256269922067976136649532007636978628\
> 0829053248844569 b) /
> 2702416693438895402044043338018240308180719318615728171815271464263623923876273135356437299200\
> + (2581623146250763573588187084688926272241136755916507492053904968943547554089992306303188454\
> 631 c) / 2702416693438895402044043338018240308180719318615728171815271464263623923876273135\
> 356437299200 && x73 == (479045551724653021496388659557090069826323398148395856313798276195305\
> 61046816999823990157332017 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 400 + (13357327918682491436969113231096300308058959513164132383380391620834448879778348454785\
> 05739858383 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 400 && x74 == (117142513725830293364397138828324824437282316491679805755405740221289830736149\
> 9707893189541907 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (420672419577640234990607220200085966865186859329348526914902860260050844746588704578098072\
> 45293 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x75 == (207402735736548896029724639309999500166944249897875974733798913736051998214383236856\
> 1689703481 b) /
> 26608410520013739343202888251256519957471697906370246614796519032749527865858689332740305715200
> + (245343831626482503829056418581565249558022554073914868674585298953890078837148569641786160\
> 11719 c) /
> 26608410520013739343202888251256519957471697906370246614796519032749527865858689332740305715200
> && x76 == (593238953929030265178061391358174901342333618737906298705163357470816037332836720443\
> 5163875767 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (373062775557320237809240794947100959174681729104725877619927098535098224086920029612678329\
> 11433 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x77 == (186209897309203306926947870948178147173538598782993873463694014237635118577794504710\
> 30755916489 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 + (154333678649168975038123986538349565006212176513107215649807972289108419270302030191781\
> 231232311 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 && x78 == (2919528757685313625331606390936223427898716106004281498117873675786461854407926\
> 8518770229357390763 b) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 + (325015873265569761883400784491364559394876081469557907954992524606097096406231603878\
> 668720323351637 c) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 && x79 == (3709423751289312587451165602308104821158613014958602288357152356112383531334\
> 63973485243520139019 b) /
> 5534549388162857783386200756261356151154113164525011295877675958811901796098607381209983588761\
> 600 + (51636070130339265246410841960305456690382518630291510670419607232006634429651434077247\
> 40068622581 c) /
> 5534549388162857783386200756261356151154113164525011295877675958811901796098607381209983588761\
> 600 && x80 == (711663937471580606003715799996550120560465742136796491638147431106234222357220\
> 1367038981829829 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640149\
> 57371 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x81 == (310071056279412973365160448468304617473278081868635854063292666370511415497947040534\
> 63321757860691 b) /
> 1106909877632571556677240151252271230230822632905002259175535191762380359219721476241996717752\
> 32000 + (796838821353158583312079702783966612757544551036366405112242525391868943721774435707\
> 36350017371309 c) /
> 1106909877632571556677240151252271230230822632905002259175535191762380359219721476241996717752\
> 32000 && x82 == (3197141114981250984779335466206794653834378923563918579994536588391553735027\
> 145051791930605689 b) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> + (103149423522132260254408812238844068870692176695147222790818207329265658843542206249902558\
> 90311 c) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> && x83 == (256391473403237074953586145312986503556443167060258734802867756407376038601515564437\
> 4451851449069 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 + (1127245873637477370892964043752352534232085124070994089166551233295599410423136280865\
> 0507120454931 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 && x84 == (74539744415489153267942419186992065432786176116878057075102639115404924435465\
> 94839108665786713 b) /
> 54048333868777908040880866760364806163614386372314563436305429285272478477525462707128745984000
> + (465943594272289927140866248416655996203357687606267577287951653737319860339788678680200801\
> 97287 c) /
> 54048333868777908040880866760364806163614386372314563436305429285272478477525462707128745984000
> && x85 == (559610472423772152521730466371288305237076663069797205354162123875480915759992295884\
> 252536281877 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 000 + (11699362113771209047864572699603854919985837008442688246076116132532383955208225107438\
> 67335206123 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 000 && x86 == (230729721153268582108249448149003691027146938167262286397074331096648115756091\
> 03431986430181371 b) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> + (201656949796954682218797485933914758281768152811254221093369103185531712064112667337165666\
> 05829 c) /
> 43238667095022326432704693408291844930891509097851650749044343428217982782020370165702996787200
> && x87 == (850705732872691610516873209118098530826689503482088672934541566062487282800432477909\
> 34117358881 b) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 + (878840950928201446791314527213575266408970860431977357027232171066232028480382328718778\
> 69789919 c) /
> 1729546683800893057308187736331673797235660363914066029961773737128719311280814806628119871488\
> 00 && x88 == (1538894399690906426794520190136792102715042927037988910179678619711586762268786\
> 04626953582048316467 b) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 + (200321720873332255457264829387047583402358949825801831918203399392803038723432267770\
> 485367632425933 c) /
> 3542111608424228981367168484007267936738632425296007229361712613639617149503108723974389496807\
> 42400 && x89 == (9473238615536848781143651845583242374518299599011478218353642220489651898333\
> 888064544119415767903 b) /
> 2767274694081428891693100378130678075577056582262505647938837979405950898049303690604991794380\
> 8000 + (1819950832527744013578735193572353838125226622361357826103473757356985708215914884150\
> 5798528040097 c) /
> 2767274694081428891693100378130678075577056582262505647938837979405950898049303690604991794380\
> 8000 && x90 == (18007130775480511179085593163313288092917069381277456791255884802393427335165\
> 3682029850968978629 b) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640\
> 14957371 c) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 && x92 == (1187868972352975036999826907632701978699623771603119204091201699571726775353874\
> 1641633718066299 b) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> + (163339374366472664022194761376418175390735887704744881816434032560085186584262403514846842\
> 9701 c) /
> 13512083467194477010220216690091201540903596593078640859076357321318119619381365676782186496000
> && x93 == (119407261316290552921077635824453284646056401741551107711401217552102119571761897930\
> 58149456113829 b) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 + (1895647338778089166357738308208061913279642737157417468554068141819542533070328659966\
> 809515790171 c) /
> 1383637347040714445846550189065339037788528291131252823969418989702975449024651845302495897190\
> 4000 && x94 == (18007130775480511179085593163313288092917069381277456791255884802393427335165\
> 3682029850968978629 b) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 + (361220277203065203726675354083263437252868516764836858326628691171556405584481687986640\
> 14957371 c) /
> 2161933354751116321635234670414592246544575454892582537452217171410899139101018508285149839360\
> 00 && x95 == (6628101178761046048967035316265737724923024082568344576183252000516948921420943\
> 0064284501148469 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (24922199997521721686644535171504695417384330194022248825839866177592081901952799288530\
> 52586851531 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x96 == (658436637486968839107223832032601583783175631838327008687769604508159711569493\
> 11465007838838249011 b) /
> 1309952517908368706126911421600320982521683589236689064113059398535361371857658551765676589056\
> 000000 + (12441088541596718222161890383970608241433660260528563632442824380845454007007092403\
> 00668750217750989 c) /
> 1309952517908368706126911421600320982521683589236689064113059398535361371857658551765676589056\
> 000000 && x97 == (581811986445321951761592537731998385529093603968895793930764376298992042492\
> 7348203989078982869 b) /
> 1599063132212364143221327418945704324367289537642442705216136961102736049630930849323335680000\
> 00 + (154088193356783194804516816517250448581438017724555312582306052347283684538165736728344\
> 489017131 c) /
> 1599063132212364143221327418945704324367289537642442705216136961102736049630930849323335680000\
> 00 && x98 == (2177677778240772610610002614237406623223299998109722384190744545616551788980620\
> 191427409067915917 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 0000 + (7969435459103227152232196123578265478438192432918334412287546786284353395212303929392\
> 7377748084083 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 0000 && x99 == (46434698874556068642673906889603993814851122076652549254115517054965604307620\
> 001276666960256807 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (25120663126652265605114499634235229251728121381512557790917036207094120751018693576406\
> 70127743193 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x100 == (13701321008065302684455434040230969547449667089297493850733559318374363537884\
> 21313352187260621553 b) /
> 2046800809231826103323299096250501535190130608182326662676655310211502143527591487133869670400\
> 0000 + (1909787599151173076478744755848191839715633937289351724169319717027758508148749355798\
> 6509443378447 c) /
> 2046800809231826103323299096250501535190130608182326662676655310211502143527591487133869670400\
> 0000 && x101 == (3312657751311051469233300547253979661065618296777578305356419843801763526960\
> 78042783134600123067 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (22272352364086774822307938155877289528811014305501504978101771533842013267134113161342\
> 02487876933 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x102 == (10209350379139873520282082080946902105475436839268723393987444095347956565809\
> 32647475040891547589 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 + (9213069008245143164588287273157817465403109356984760973984532141522715061057024788194\
> 307460452411 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 && x103 == (1555781611988674742734196061415679803348418901479109932663261978253030842753\
> 010761901463895579162463 b) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 + (1940345867454522455529638668418945591699851852630791509314568839831275110696952606\
> 6349361529316837537 c) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 && x104 == (1940046856109440164463891949986438646262106879293904197511616448776287022\
> 5981859889809166517913919 b) /
> 3274881294770921765317278554000802456304208973091722660282648496338403429644146379414191472640\
> 00000 + (308087660915997774887088935900215859167799828516233224053148685146077472738432778051\
> 609980746086081 c) /
> 3274881294770921765317278554000802456304208973091722660282648496338403429644146379414191472640\
> 00000 && x105 == (401280813573412298102780076834120285062695060471525758805931533405371475227\
> 169655585276013397329 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (21572201979663703310513437934790066339249681997563825695398876043590062041823197033320\
> 61074602671 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x106 == (17891550181792672030126444021423542300828342534572139340199220691977604827369\
> 10245815762342903545191 b) /
> 6549762589541843530634557108001604912608417946183445320565296992676806859288292758828382945280\
> 000000 + (47606075713625763276219127058592506825255836927262313865453749234790463765513825130\
> 12620602376454809 c) /
> 6549762589541843530634557108001604912608417946183445320565296992676806859288292758828382945280\
> 000000 && x107 == (18320792232494833631384581743817974470086955299789669198987843732526503758\
> 5505641567992884651189 b) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 + (616323643781233735296817892034672417482775215823324660618190043226102987229959783093674\
> 955348811 c) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 && x108 == (145057656480572458770625214087832986807770704259557845232914871789390410415220\
> 872793647724903876569 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 + (673662667212157982558694424412367627268281539013372819837747252295210446995815722059\
> 900143256123431 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 && x109 == (412371145386532908596041495582105879644801675007017930181831265677558504928\
> 028735910463253192213 b) /
> 3198126264424728286442654837891408648734579075284885410432273922205472099261861698646671360000\
> 000 + (27857551190381953778466133423093027690897774002778674802504426565279135943338329627362\
> 08106807787 c) /
> 3198126264424728286442654837891408648734579075284885410432273922205472099261861698646671360000\
> 000 && x110 == (32418231864592639587737654900374318979796557541626151840030137949677172438931\
> 095819575425282657377 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 00000 + (699218085969986655784272999121507577797099728674901812938026275608979347374484785371\
> 18058237342623 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 00000 && x111 == (135364552311064237781060754198232232158864244382816542442645391026388099263\
> 9486899641281141027951 b) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 + (12048554884291402513435163283308045973990208163997429039193652275004966867700024592760\
> 55946972049 c) /
> 2558501011539782629154123870313126918987663260227908328345819137764377679409489358917337088000\
> 000 && x112 == (49825703009729854315701527735830882662644196539559252708436056918757847681575\
> 93620882243787537341 b) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 + (5251433745186145085046342707669419409686233386955708042539670859181725949480363814787\
> 104564462659 c) /
> 1023400404615913051661649548125250767595065304091163331338327655105751071763795743566934835200\
> 0000 && x113 == (8988301084531801819079736037949411569493148134135369611293875903752276303025\
> 427882294263271749017287 b) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 + (1197093920200209747895084670765572415085378929365165541451507447281350564669710894\
> 5956562153146982713 c) /
> 2095924028653389929803058274560513572034693742778702502580895037656578194972253682825082542489\
> 6000000 && x114 == (5497530518051867133819947177216384455144852033675546991481017651764369006\
> 44505928370611332141675203 b) /
> 1637440647385460882658639277000401228152104486545861330141324248169201714822073189707095736320\
> 000000 + (10876875955802741692766445592787627826376192831783066309932224829927648141775672613\
> 36484404178324797 c) /
> 1637440647385460882658639277000401228152104486545861330141324248169201714822073189707095736320\
> 000000 && x115 == (10635284859732542814719275558086627961013348101383159072189208084462882192\
> 865127091254624365397329 b) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 + (2157220197966370331051343793479006633924968199756382569539887604359006204182319703332\
> 061074602671 c) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 && x117 == (7019523724188426469567746567366098919125364148465660581154335434186502380010\
> 14300286823789801199 b) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 + (975791936873394246538890527362422702711083539746552944926349371327177868144511243748440\
> 50198801 c) /
> 7995315661061820716106637094728521621836447688212213526080684805513680248154654246616678400000\
> 00 && x118 == (705474114939516394546260558033765735391751091078610100234680970844982664724284\
> 770277427111118007729 b) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 + (113246208753214046783059080466434878684301152194320564835981153239618192686751824576\
> 120757041992271 c) /
> 8187203236927304413293196385002006140760522432729306650706621240846008574110365948535478681600\
> 00000 && x119 == (106352848597325428147192755580866279610133481013831590721892080844628821928\
> 65127091254624365397329 b) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
> 0000 + (2157220197966370331051343793479006633924968199756382569539887604359006204182319703332\
> 061074602671 c) /
> 1279250505769891314577061935156563459493831630113954164172909568882188839704744679458668544000\
339541108998569457275113377670359 b
> 0000 && x120 == ----------------------------------- +
25013777616939010195430294033530880
24674236507940440738155180655860521 c
> ------------------------------------- &&
25013777616939010195430294033530880
339541108998569457275113377670359 b 12167347699470935640440033639095081 c
> x121 == ----------------------------------- + ------------------------------------- &&
12506888808469505097715147016765440 12506888808469505097715147016765440
1751390855433838310185650211976149029 b 100705042263548347450296834149366335451 c
> x122 == --------------------------------------- + ----------------------------------------- &&
102456433118982185760482484361342484480 102456433118982185760482484361342484480
75991262226516031657787180650596591 b 6327535807709870578372368091933308689 c
> x123 == ------------------------------------- + --------------------------------------- &&
6403527069936386610030155272583905280 6403527069936386610030155272583905280
937305937045764022543356130943553 b 99117804530710276759177820003179967 c
> x124 == ------------------------------------ + ------------------------------------- &&
100055110467756040781721176134123520 100055110467756040781721176134123520
1815767425115854611531957 b 45211199456135005311350603 c
> x125 == --------------------------- + ---------------------------- &&
47026966881250859922882560 47026966881250859922882560
1815767425115854611531957 b 21697716015509575349909323 c
> x126 == --------------------------- + ---------------------------- &&
23513483440625429961441280 23513483440625429961441280
10147472941671735133607070867 b 182474983403931787110519894893 c
> x127 == ------------------------------- + -------------------------------- &&
192622456345603522244126965760 192622456345603522244126965760
97010509871643654974137317 b 2912715370528411380090346523 c
> x128 == ---------------------------- + ------------------------------ &&
3009725880400055035064483840 3009725880400055035064483840
2186222958706959436219497 b 91867710803794760409545623 c
> x129 == --------------------------- + ---------------------------- &&
94053933762501719845765120 94053933762501719845765120
8563780035865611 b 79848919873669109 c
> x130 == ------------------ + ------------------- &&
88412699909534720 88412699909534720
8563780035865611 b 35642569918901749 c
> x131 == ------------------ + ------------------- &&
44206349954767360 44206349954767360
56722023335254871541 b 305416395494199341579 c
> x132 == ---------------------- + ----------------------- &&
362138418829454213120 362138418829454213120
2375161352766892089 b 20258489824073996231 c
> x133 == --------------------- + ---------------------- &&
22633651176840888320 22633651176840888320
10569994226931681 b 166255405592137759 c 36295653 b 129923987 c
> x134 == ------------------- + -------------------- && x135 == ---------- + ----------- &&
176825399819069440 176825399819069440 166219640 166219640
36295653 b 46814167 c 274743359043 b 406092286397 c
> x136 == ---------- + ---------- && x137 == -------------- + -------------- &&
83109820 83109820 680835645440 680835645440
7334531061 b 13941582859 c 155554971 b 509323589 c 4 b c
> x138 == ------------ + ------------- && x139 == ----------- + ----------- && x140 == --- + - &&
21276113920 21276113920 664878560 664878560 5 5
1093 b 187 c 67 b 13 c 4 b c
> x142 == ------ + ----- && x143 == ---- + ---- && x144 == --- + -
1280 1280 80 80 5 5
But most of you aren't maths majors like me, and don't give a crap about any of that. I just put it in so you could see why this took a few weeks. (If you do find any typos in that huge morass of maths, though, let me know.)
So here's the relevant shit.
Paralysed Chansey vs. healthy Lapras
9.4% Lapras wins without being paralysed.
17.7% Lapras wins but is paralysed.
73.0% Chansey wins.
Chansey switching into Lapras Body Slam, becomes paralysed or was already paralysed
19.8% Lapras wins without being paralysed.
17.6% Lapras wins but is paralysed.
62.6% Chansey wins.
Paralysed Chansey vs. paralysed Lapras
13.3% Lapras wins.
86.7% Chansey wins.
Chansey switching into paralysed Lapras Body Slam, becomes paralysed or was already paralysed
19.8% Lapras wins.
80.2% Chansey wins.
Honestly, Lapras does better than I thought (my initial estimate was "between 2 and 3 freeze chances" ie 17-25%). Oh well, now we know.
m9m out.