bio | website | |
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location | ||
age | ||
visits | member for | 1 year, 10 months |
seen | May 24 '13 at 10:17 | |
stats | profile views | 5 |
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 |