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At: gcd sat pred 1 2 2
1. b : 
2. b1:. |b1|<|b (a:. GCD(a;b1;gcd(a;b1)))
3. a : 
4. b = 0
5. GCD(b;a rem b;gcd(b;a rem b))
  GCD(a;b;gcd(b;a rem b))
By: SeqOnM
[RWN 1 (LemmaC Thm* a:n:. (a rem n) = a-(a  n)n) 5
;Using [`k',(a  b)] (FwdThru Thm* a,b,y,k:. GCD(a;b;y GCD(a;b+ka;y) [5])
;ArithSimp 6]

Generated subgoal:

1 5. GCD(b;a-(a  b)b;gcd(b;a rem b))
6. GCD(b;a;gcd(b;a rem b))
  GCD(a;b;gcd(b;a rem b))
1 step

About:
intnatural_numberaddsubtractmultiplydivideremainderless_thanequalimpliesall
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(7steps total) PrintForm Definitions Lemmas num thy 1 Sections StandardLIB Doc