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seen May 24 '13 at 10:17

Nov
12
awarded  Scholar
Nov
12
comment Accessing to an input in higher order procedures in scheme
Thanks for the code but, @Oscarlopez is right.
Nov
12
accepted Accessing to an input in higher order procedures in scheme
Nov
11
awarded  Student
Nov
11
asked Accessing to an input in higher order procedures in scheme
Oct
29
awarded  Citizen Patrol
Oct
29
revised multiplicative inverse of modulo m in scheme
Explanation added.
Oct
29
answered multiplicative inverse of modulo m in scheme
Oct
29
revised Modular-inverse algorithm
Problem solved.
Oct
29
awarded  Editor
Oct
29
comment Modular-inverse algorithm
after examining more, 'egcd' in the link I have given is an equivalent process to my 'ax+by=1' , but i still did not get the logic of this statement. ` (let-values (((g x y) (egcd a m)))` .
Oct
29
comment Modular-inverse algorithm
In here they did the same thing but i'm new to scheme. i did not get how they did it in the confirmed answer.
Oct
29
asked Modular-inverse algorithm