# Modular-inverse algorithm [duplicate]

Possible Duplicate:
multiplicative inverse of modulo m in scheme

I have written a code for finding to solve x and y as a pair. I need to write a modular-inverse code that finds the multiplicative inverse of e modulo n, using ax + by = 1.

Blockquote

``````(define (ax+by=1 a b)
(if (= b 0)
(cons 1 0)
(let* ((q (quotient a b))
(r (remainder a b))
(e (ax+by=1 b r))
(s (car e))
(t (cdr e)))
(cons t (- s (* q t))))))
``````

Edit : Problem Solved with the function below.

Blockquote

`````` (define inverse-mod (lambda (a m)
(if (not (= 1 (gcd a m)))
(display "**Error** No inverse exists.")
(if (> 0(car (ax+by=1 a m)))
(+ (car (ax+by=1 a m)) m)
(car (ax+by=1 a m))))))
``````
-
What do you need help with? –  robert king Oct 29 '12 at 11:33
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. –  Dr.Oz Oct 29 '12 at 12:59
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)))` . –  Dr.Oz Oct 29 '12 at 13:17
@Dr.Oz `let-values` binds to multiple variables the result of evaluating a procedure that returns multiple values, `egcd` in this case –  Óscar López Oct 29 '12 at 19:28
add comment

## marked as duplicate by Óscar López, Kjuly, Eitan T, Linger, Ryan BiggOct 30 '12 at 3:03

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

## 2 Answers

This uses the extended euclidean algorithm to find the modular inverse:

``````(define (inverse x m)
(let loop ((x x) (b m) (a 0) (u 1))
(if (zero? x)
(if (= b 1) (modulo a m)
(error 'inverse "must be coprime"))
(let* ((q (quotient b x)))
(loop (modulo b x) x u (- a (* u q)))))))
``````
-
add comment