When i put in Python interpreter a ** b % c with large a (20 figures) b (4 figures) c (20 figures) I saw that Python calculate it pretty fast almost like pow (a,b,c). I expect another behavior that Python first calculate a ** b then get the modulo (%) of result and such calc will take significally more time. Where is the magic behind the scene?
20 figures is laughably small on a modern computer. Try 2000 figures and you might see a difference. Also, this past question is related: How did Python implement the builtin function pow()? 


If you are typing into the Python interpreter something like:
Then seeing a couple of seconds wait. Then trying:
And seeing no wait, and wondering why there is a difference, then the delay that you see in the first instance is actually the time your terminal takes to buffer and print the huge number you just created to the screen. 


Today's computers are amazingly fast, very complicated calculations can occur in what seems like no time at all. You need to repeat such calculations very many times to see the delay; I'd start with a million. 


There is no magic behind the scenes, other than Python supports arbitraryprecision integers, and is wellimplemented. It really did calculate a**b, then %c. 


pow
to calculate(x ** y) % z
efficiently. See stackoverflow.com/questions/101268/hiddenfeaturesofpython/… – Paolo Moretti Aug 10 '11 at 17:26