Can 2^n be calculated in less than n-1 successive multiplications?

I have a question which pertains to the possibility of calculating 2^n, given any n, in less than n-1 successive multiplications. What could be the best strategy which I could utilize to achieve the same operation by avoiding the task of doing n-1 multiplications? Can this be done in lesser multiplications? If yes, then how?

-Thanks

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In what language? Most of the programming languages have a `power(x, n)` function. –  sp00m Jun 22 '12 at 9:15
And what representation for the output? You can compute the binary representation of `2^n` without any multiplications :-) –  Steve Jessop Jun 22 '12 at 9:17
related: Addition-chain exponentiation, online tool to calculate Shortest Addition Chains. –  J.F. Sebastian Jun 22 '12 at 10:02
the language is not a concern. the entire point is to avoid the usage of the exponential operator in most languages. However, I am more of a perl person. C is also fine. –  ana Jun 22 '12 at 10:26

2 Answers

Yes 2^n can be computed in Log(n) multiplication, this is known as Exponentiation by squaring.

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For (2^n) and (n>=0) you might use bitwise shifting: (2^n) is (1 << n)

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