# I am confused about Recursion in power function

Following is the code of getting power (Mathematical).

1. I am confused,it looks like every problem is divided into one Subproblem ,each of size two ,so it is not forming a tree because , usually for a recursion "tree" you need two recursive calls. With only one recursive call it is something like a simple list. .But it is a recursive function, Factorial and many other recursive functions form trees ,and their recursion look same.

2.If it is forming a tree ,So is it transversing all paths or single path ?

``````     public int GetPower(int k, int n)
{
if (n == 0)
{
return 1;
}
else {
int t = GetPower(k, n / 2);
if((n%2)==0)
{
return t*t;
}
else{
return k*t*t;
}
}
}
``````

Kindly help me ,my confusion will need some explanation .

EDIT

``````              (2,20)    ->    (2,10)  ->     (2,5)  ->    (2,2)   ->  (2,1)  ->   (2,0)
1048576 <- 1024     <-     32     <-     2^4*2  <-      2*2   <-    2    <-     1
``````
-
`Factorial and many other recursive functions form trees` Wrong – SLaks Jun 21 '13 at 16:06
1. What are you talking about? – SLaks Jun 21 '13 at 16:06
I was gonna start writing an answer, but why don't you test it? in paper, start with, I dont know, GetPower(2,4), write it down, 4 ==0 ? then it goes to the else, then t is GetPower(2, 4/2) and so on... do IT, its gonna help you more... – jsedano Jun 21 '13 at 16:08
@SLaks, it's kind of unhelpful to just say "wrong" with no further explanation. But he's right; usually for a recursion "tree" you need two recursive calls. With only one recursive call it is something like a simple list. – leo-the-manic Jun 21 '13 at 16:09
The tree is not in the code, it's in the way you structure the solution to the problem. If you understand that, you will see that the second if-condition is the one that decides between two equal or two slightly different subtrees, even it doesn't spell this out completely. – Ulrich Eckhardt Jun 21 '13 at 17:07

When you want to compute GetPower(2,6) you want the answer for 2^6.Imagine your delight if you are given the answer for 2^3 as 8.Now you will just multiply 2^3 * 2^3 =8*8=64.

This is the logic that is used.

For odd powers like:

2^5

We compute the answer of 2^2 and do:

2 * 2^2 * 2^2

Pretty simple trick, but changes the time complexity from O(N) to O(log N) where N is the power.

-

Yes, it is creating a hidden tree, which is transversing only one path

-