# Calculating powers (e.g. 2^11) quickly [duplicate]

How can I calculate powers with better runtime?

E.g. 2^13.

I remember seeing somewhere that it has something to do with the following calculation:

2^13 = 2^8 * 2^4 * 2^1

But I can't see how calculating each component of the right side of the equation and then multiplying them would help me.

Any ideas?

Edit: I did mean with any base. How do the algorithms you've mentioned below, in particular the "Exponentation by squaring", improve the runtime / complexity?

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duplicate: stackoverflow.com/questions/101439/… –  Nick Dandoulakis Feb 4 '10 at 8:14
"Exponentation by squaring" calculates base^exp in log(exp) steps, where log is the logarithm with base 2. –  Nick Dandoulakis Feb 4 '10 at 9:01
@Nick D, I know I state that in my answer, but I've realized I'm slightly wrong. It's basically correct if you're using standard integers. But once you get to using bignums it becomes basically O(log(n)^2) because the multiplies take more than O(1) time. –  Omnifarious Feb 4 '10 at 9:21
@Omnifarious, I said log(exp) steps, I didn't specify the O. I agree with you that if we take account of the "multiplication" operation the actual runtime complexity may not be O(logn). –  Nick Dandoulakis Feb 4 '10 at 9:41

## marked as duplicate by Nick Dandoulakis, Natrium, Murph, Mark Byers, Josh LeeFeb 4 '10 at 13:48

There is a generalized algorithm for this, but in languages that have bit-shifting, there's a much faster way to compute powers of 2. You just put in 1 << exp (assuming your bit shift operator is << as it is in most languages that support the operation).

I assume you're looking for the generalized algorithm and just chose an unfortunate base as an example. I will give this algorithm in Python.

def intpow(base, exp):
if exp == 0:
return 1
elif exp == 1:
return base
elif (exp & 1) != 0:
return base * intpow(base * base, exp // 2)
else:
return intpow(base * base, exp // 2)

This basically causes exponents to be able to be calculated in log2 exp time. It's a divide and conquer algorithm. :-) As someone else said exponentiation by squaring.

If you plug your example into this, you can see how it works and is related to the equation you give:

intpow(2, 13)
2 * intpow(4, 6)
2 * intpow(16, 3)
2 * 16 * intpow(256, 1)
2 * 16 * 256 == 2^1 * 2^4 * 2^8
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Use bitwise shifting. Ex. 1 << 11 returns 2^11.

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2 was used as an example base only. Question is more generic. –  Roman D. Boiko Feb 4 '10 at 8:29

You can use exponentiation by squaring. This is also known as "square-and-multiply" and works for bases != 2, too.

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It's really easy to link to wikipedia, and I think links to wikipedia make great supplements to answers, but a link to wikipedia is not an answer except when the answer is really too huge to write down here. –  Omnifarious Feb 4 '10 at 8:24
Why invent the wheel twice? Often, the only crucial thing is to get the right keyword to name a problem. –  SebastianK Feb 4 '10 at 8:27

Powers of two are the easy ones. In binary 2^13 is a one followed by 13 zeros.

You'd use bit shifting, which is a built in operator in many languages.

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