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How to calculate the Modular Multiplicative inverse of a number in the context of RSA encryption?

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Use the Extended Euclidean Algorithm, which is significantly faster than direct modular exponentiation in practice.

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Direct Modular Exponentiation

The direct modular exponentiation method, as an alternative to the extended Euclidean algorithm, is as follows:


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This method requires the order of the group in which you take the inverse. In the case of RSA you usually don't know this. – abc Jul 28 '10 at 9:20
You know it if the modulus is prime - it's P-1. For an RSA key at the time of key generation you may know it as well (P-1)*(Q-1). Once the key pairs are created, the factorization of the modulus is thrown away, as knowing the order of the group is required to create a key pair and is equivalent to finding the private key. – phkahler Jul 28 '10 at 13:47
Since in RSA, to find the private key you need to find the inverse of e (mod φ(n)), using this method requires you to calculate φ(φ(n)), which is equivalent to factoring φ(n). So, @abc is right: you can't use this method; I did not even think about this earlier. – BlueRaja - Danny Pflughoeft Jul 28 '10 at 21:23
It's easy to compute phi(phi(n)) if the RSA primes are safe primes. See my comment to…. But it's just fun to think about and tinker with, the extended euclidean algorithm always works fast. – James K Polk Jul 29 '10 at 0:03

There are two algorithms explained in detail in the Modular multiplicative inverse Wikipedia article.

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If You need to calculate w for DSA alghoritm, you can use this:

w = s^-1 mod q

is actually

w = s^(q-2) mod q


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I worked out a an simpler inverse function

def privateExponent(p,q,e):
    for k in range(1,e):
        if (totient*k+1) % e==0:
            return (totient*k+1)/e
    return -1 # shouldnt get here

The equation d*e=1 (mod totient) can be rewritten as d*e=1+k*totient (for some value of k) and the program just searches for first value of k which makes the equation divisible by e (the public exponent). This will work if e is small (as is usually recommended).

We can move all the bignum operations out of the loop to improve its performance.

def privateExponent(p,q,e):
    t_mod_e=totient % e
    while total!=0:
        total=(total+t_mod_e) % e
    return (k*totient+1)/e

It turns out that for e=3, we don't really have to search as the answer is always 2*((p-1)*(q-1)+1)/3

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