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# 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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Not really. The case where n ==2 is an important optimization that saves a recursion. – EJP Jun 17 at 11:20

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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class Square{
int r=1;
int power(int n, int p) throws Exception
{
int s=n;
if(n<0||p<0)
{
throw new Exception("n and p must be positive");
}

if(p==2)
{
return n*n*r;
}
else
{
r=r*n;
return power(n,p-1);
}

}
}
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Your problem is the code

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

This makes your function return square of the base whenevr the power (n) is even and cube whenever it is odd. The only terminating condition u need is n==0 return 1 and it should work to your specification of base to the power n recursively

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public int powerN(int base, int power) {
if (power == 1)
return base;
else if (power % 2 == 0) {
int x = powerN(base, power / 2);
return x * x;
} else {
int x = powerN(base, (power - 1) / 2);
return x * x * base;
}
}
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Provide explanation how this code solves the OP's problem. What is the difference of your code to the OP's code? How does your code solve the problem? – Keale Oct 16 '15 at 1:16