# Recursive Function

Given the following recursive function:

``````// Pre-condition: y is non-negative.
int mysterious(int x, int y) {
if (y == 0) return x;
return 2*mysterious(x, y-1);
}
``````

What is the return value of mysterious(3, 2)?

Here is my call stack:

``````return 2*mysterious(3, 2-1) => 2*3 => 6, 2*1 => mysterious(6,2)
return 2*mysterious(6, 2-1) => 6*2 => 12, 2*2 => mysterious(12, 2)
``````

But it seems like y will never reach 0. What am I doing wrong?

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To understand recursion, you must first understand recursion. –  Adam Rosenfield Dec 17 '10 at 4:40
See my comment on this question: stackoverflow.com/questions/4467799/recursive-function –  JeremyP Dec 17 '10 at 9:12

```mysterious(3, 2)

= 2 * mysterious(3, 1)
= 2 * 2 * mysterious(3, 0)
= 2 * 2 * 3
= 12
```
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thanks! silly mistake on my behalf –  kachilous Dec 17 '10 at 4:37

It's nothing else than

``````x * 2**y
``````

or

``````mysterious(x, y) == x*pow(2, y)
``````

so it could be very well defined for any value of `y`

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``````mysterious(3, 2)
y(==2) is not 0 therefore it
returns 2 * mysterious(3, 1)
mysterious(3,1)
y(==1) is not 0 so it
returns 2 * mysterious(3 , 0)
mysterious(3 , 0)
return 3 because y == 0
2 * 3 = 6
2 * 6 = 12
``````

`x` is never modified, but with each recursive call `y` is reduced by one and when reaches the ground clause (`if y == 0`) it returns x (which from the first call is 3)

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Each time mysterious is called (once by you, twice by recursion), y is decremented by 1.

So, you get (in mysterious)

3 2
3 1
3 0

the final value is 12 (3*2*2)

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if you expand that call you effectively have

``````(2*(2*(3))) == 12
``````

Y only ever decreases (by 1 each call) so the function is clearly recursive and should terminate for `y>=0`

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