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

So I have decided to learn Sage programming since it can handle very large numbers which is useful for RSA encrypting/decrypting.

(1) I was following an example but I am not quite sure how they got 100 inside the ZZ() function.

(2) Also another question is there a way to go from integer to plain text using a sage function?

sage: m = "HELLOWORLD"
sage: m = map(ord, m); m
[72, 69, 76, 76, 79, 87, 79, 82, 76, 68]
sage: m = ZZ(list(reversed(m)), 100) ; m           <------ this line

sage: m = 72697676798779827668
sage: c = 630913632577520058415521090
sage: d = 4460824882019967172592779313
sage: n = 4951760154835678088235319297
sage: power_mod(c, d, n)
72697676798779827668                <--- how do i convert this number back to plain text
sage: power_mod(c, d, n) == m
share|improve this question

The 100 tells you how much to multiply each element of the list by, in powers. Think of it as "base 100".

sage: ZZ([1,2,3],100)
sage: ZZ([1,2,3],2)
sage: ZZ([1,2,3],10) # 1*10^0+2*10^1+3*10^2

This question has a zillion ways to go backwards from ord. Then we use chr.

sage: a = 72697676798779827668
sage: ''.join([chr(int(str(a)[i:i+2])) for i in range(0, len(str(a)), 2)])

I agree that this is not ideal in readability. Actually, Sage has some other built-in ways to do crypto on a pedagogical basis in its crypto module. That has some built-in stuff for alphabets as well. (I presume that this is not an industrial-strength version of RSA you are currently creating.)

share|improve this answer
how do i determine what base i should multiply by? for my problem my m is very large, my m is 350 characters long which turns into 2x350 = 700 integers long, I have tried to use base 100 but it does not spit out the correct numbers – jaymeister Oct 4 '12 at 4:50
I think they just did 100 so as to easily have enough room for the 26 letters of the alphabet. Remember that this is a toy example. That said, 100 should work fine, just because one can decompose the string neatly; in general you'd have to do something more complicated to get the letters back. – kcrisman Oct 4 '12 at 16:44

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.