Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

This is as a personal challenge in my introductory programming class taught using Scheme, but I would be equally happy with Python examples.

I've already implemented the binary method of modular exponentiation in scheme as follows:

(define (pow base expo modu)
  (if (zero? expo)
      (if (even? expo)
          (mod (expt (pow base (/ expo 2) modu) 2) modu)
          (mod (* base (pow base (sub1 expo) modu)) modu))))

This is necessary as Chez Scheme doesn't have any implementation similar to python's pow (base expo modu).

Now I am trying to implement the Montgomery method of solving modular multiplication. As an example, I have:

Trying to solve:
    (a * b) % N
N = 79
a = 61
b = 5
R = 100
a' = (61 * 100) % 79 = 17
b' = (5 * 100) % 79 = 26
RR' - NN' = 1

I'm trying to understand how to solve RR' - NN' = 1. I realize that the answer to R' should be 64 and N' should be 81, but don't understand how to use the Euclidean Algorithm to get this answer.

share|improve this question

The extended Euclidean algorithm is:

(define (euclid x y)
  (let loop ((a 1) (b 0) (g x) (u 0) (v 1) (w y))
    (if (zero? w) (values a b g)
      (let ((q (quotient g w)))
        (loop u v w (- a (* q u)) (- b (* q v)) (- g (* q w)))))))

Thus, on your example,

> (euclid 79 100)

You can read more at my blog.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.