# Shouldn't this power function return 12 when fed \$2^4\$?

I'm learning JavaScript, and one of the exercises was to write a power function. I should also learn math because this will surely sound stupid.

I know intuitively that \$2 ^ 4 = 16\$ since \$2 * 2 * 2 * 2 = 16\$. But reading through the function, it appears that it should return 12, not 16.

If we plug the numbers in, it should look like this: \$\$2 * (2 * (4 - 1)) = 12\$\$

``````var power = function( base, exponent ) {
if ( exponent === 0 ) return 1;
return base * power( base, exponent - 1 );
};
power(2,4);
===> 16
``````

Obviously I must be reading the function wrong. But how?

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## migrated from math.stackexchange.comMay 20 '12 at 15:13

This question came from our site for people studying math at any level and professionals in related fields.

This is an example of basic tail recursion, if you are interested. – Argon May 20 '12 at 15:00

Your function is correctly written and you could start by analyzing the result of the function as the recursion advances and the exponent decreases.

1. Parameters: 2, 4. Result: 2 * power (2, 3) = 2 * 8 = 16.
2. Parameters: 2, 3. Result: 2 * power (2, 2) = 2 * 4 = 8.
3. Parameters: 2, 2. Result: 2 * power (2, 1) = 2 * 2 = 4.
4. Parameters: 2, 1. Result: 2 * power (2, 0) = 2 * 1 = 1.
5. Parameters: 2, 0. Result: 1.

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I get it. The function is calling itself over and over! Great thanks! That was really helpful! – Elmer May 20 '12 at 14:48
Yes, that's actually one of the basic principles of recursion. – Adrian Draghici May 20 '12 at 14:50

This recursively returns 16. If \$function\$ is represented by \$f\$:

f(2, 4)=2*f(2, 3)=\dots=2*2*2*2*f(2, 0)=2*2*2*2*1=16

More generally,

f(a, b)=a*...*a*1 <- n times.

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I'd give you a vote, but I can't vote up. I definitely need to work on my math because this is a little over my head \$2∗2∗2∗2∗f(2,0)\$ as in I can't see how we arrived at that from \$2*f(2,3)\$. – Elmer May 20 '12 at 14:47
@Elmer Remember, \$\$f(base, exponent)=base*f(base, exponent-1)\$\$ from the code. This recursion continues until we get \$f(2, 0)\$, which, from the code, equals 1. – Argon May 20 '12 at 14:49

It might help to consider how the function behaves, beginning from the end.

So when the exponent equals \$0\$ it will return \$1\$, this will be taken times the base, and all of this will again be multiplied by the base, and so on, so:

\$\$ (((2^0*2)*2)*2)\ldots)*2 \$\$

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The key is recursion.

``````power(2,4)
= 2 * power(2,3)
= 2 * (2 * power(2,2))
= 2 * (2 * (2 * power(2,1)))
= 2 * (2 * (2 * (2)))
= 16
``````

`power` calls itself with a smaller exponent, which calls itself etc until the exponent is 1, for which the answer is just the base.

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