# Recursively compute the value of base to the n power

Here is what I have for my solution:

`````` public int powerN(int base, int n) {

if(n == 0)
return 1;

else if(n % 2 == 0)
return base * base;

else
return base * powerN(base, n-1);

}
``````

However, if n > 3 then this function doesn't work. For instance, powerN(2, 4) yields 4 and powerN(2, 5) yields 8. I know that a much simpler solution exists, but it just bothers me that I can't figure out why this is not working correctly.

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## Into pseudocode

Let me translate your code into pseudocode:

``````public int powerN(int base, int exponent)  {
if the exponent is 0
then return 1
otherwise, if the exponent is even
then return base * base
otherwise
base * powerN(base, exponent - 1)
}
``````

The second branch has a logic error. What your code is saying is this: "As long as the exponent is even, the result should be `base * base` (that is, `base` squared)". You've already mentioned that this is the result you get when you run your code.

## How to solve it

What you probably want to do is to raise `base` to half the `exponent` (`base * base * base * ...` for `exponent / 2` times), and then multiply that number by itself. That way, you get `base` multiplied by itself `exponent` times.

In pseudocode:

``````otherwise, if the exponent is even
then return powerN(base, exponent / 2) * powerN(base, exponent / 2)
``````

Realistically, this would actually be the following:

``````otherwise, if the exponent is even
then {
let x = powerN(base, exponent / 2)
return x * x
}
``````

## Done. Mostly.

Translate that back to Java and you'll be set.

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Thanks for the detailed explanation. After tracing through the code, it makes sense as to why that statement is needed. –  kachilous May 5 '11 at 0:33
``````else if(n % 2 == 0)
return base * base;
``````

This bit is incorrect — it returns the square for any even power, not just 2. It looks like you’re trying to implement the square and multiply optimization. So if you want to compute `powerN(base, n)`, what recursive call can you make that takes advantage of the fact that `n` is even? What new values will you pass in for `base` and `n`? Use the identity that b2‌n = (b2)n.

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Buggy code is:

``````else if(n % 2 == 0)
return base * base;
``````

this if will catch every power of 2. So `0,2,4,8` causes wrong calculation.

The only corner case you should worry about is when `n <= 0`.

Here is corrected code:

``````public static int powerN(int base, int n) {
if (n < 0) {
throw new IllegalArgumentException("Illegal Power Argument");
}
if (n == 0) {
return 1;
} else {
return base * powerN(base, n - 1);
}
}
``````

Here is the test:

``````public static void main(String args[]) throws NullPointerException {
for (int i = 0; i < 10; i++) {
System.out.println(powerN(2, i));
}
}
``````

and output:

``````run:
1
2
4
8
16
32
64
128
256
512
BUILD SUCCESSFUL (total time: 1 second)
``````
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In the even case you need `base = powerN(base, n/2);`before returning.

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It worked!! Why did I have to add that line for it to work? –  kachilous May 5 '11 at 0:17
Because the way it was it did not depend on `n`. Now you're computing `b^(2k)` as `(b^k)^2`, when `n=2k`. –  lhf May 5 '11 at 0:19

For computing the power you only need to consider the special case of x^0, for all others (n>0) you can use the recursion of x*powerN(x, n-1)

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