Apparently an alternative method (to just using the extended Euclidean algorithm) of obtaining the exponent for deciphering is to do d = e**(phi(phi(n))1) mod(phi(n)). Why does this work?
1 Answer
The general requirement for the RSA operation to function properly is that e*d = 1 mod X
, where X
is typically (p1)*(q1)
.
In this case, X
is phi(n)
, e
is e
, and d
is e^[phi(phi(n))1]
= e^[phi(X)1]
.
Notice that e*d mod X
is e*e^[phi(X)1] mod X
= e^phi(X) mod X
.
Euler's Theorem states that a^phi(X) = 1 mod X
, for any a
which is relatively prime to X
, thus the requirement holds.

All true except that X is not p*q. X is (p1)*(q1) where n=pq and p and q are both prime.– Jason SJun 11, 2011 at 15:28