# Tricky Recursive Function

``````public class look
{
public int takeALook (int a)
{
if (a == 1)
return 1;
else if (a == 0)
return 0;
else
return takeALook(a-2) + takeALook(a-1);

}
}
``````

Main program,

``````int a = 6;

look lk = new look();

int r = lk.takeALook(a);

Console.WriteLine("r is" + r);
``````

the answer is 8. but can anyone please explain why? It's confusing me because it is calling itself 2x.

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Take debugger and see yourself. –  zerkms Nov 1 '12 at 3:43
Haven't you heard of Fibonacci number: en.wikipedia.org/wiki/Fibonacci_number –  horgh Nov 1 '12 at 3:54
All you've done is write the Fibonacci sequence. –  Gabe Nov 1 '12 at 3:54
@Konstantin yes I know about the fibonacci, but I'm confused on following the logic of the function itself on how to make it simple to understand. I tried to debug but can't understand. –  kentdenns Nov 1 '12 at 4:16

``````takeALook(0) == 0
takeALook(1) == 1
takeALook(2) == takeALook(0) + takeALook(1) == 0 + 1 == 1
takeALook(3) == takeALook(1) + takeALook(2) == 1 + 1 == 2
takeALook(4) == takeALook(2) + takeALook(3) == 1 + 2 == 3
takeALook(5) == takeALook(3) + takeALook(4) == 2 + 3 == 5
takeALook(6) == takeALook(4) + takeALook(5) == 3 + 5 == 8
``````
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Great! thanks. you really know how to keep it simple for me to understand :) –  kentdenns Nov 1 '12 at 4:06

It boils down like this:

``````takeALook(6) =>
(takeALook(4) + takeALook(5)) =>
(((2 + 3)) + ((3 + 4))) =>
((((0 + 1) + (1 + 2))) + (((1 + 2) + (2 + 3)))) =>
((((0 + 1) + (1 + (0 + 1)))) + (((1 + (0 + 1)) + ((0 + 1) + (1 + 2))))) =>
((((0 + 1) + (1 + (0 + 1)))) + (((1 + (0 + 1)) + ((0 + 1) + (1 + (0 + 1)))))) =>
0 + 1 + 1 + 0 + 1 + 1 + 0 + 1 + 0 + 1 + 1 + 0 + 1 =>
8
``````
-

Just modified your program with a tracer that may come real handy for any recursive function.

``````const string space = "  ";
static string StrMultiplier(string str,int multiplier)
{
return string.Concat(Enumerable.Repeat(str,multiplier).ToArray());
}

static int F(int a,int level = 0)
{
Console.WriteLine("{0}->F({1})",StrMultiplier(space,level),a);//Trace line
if (a == 1)
return 1;
else if (a == 0)
return 0;
else
return F(a-2,level + 1) + F(a-1,level+1);

}
``````

Result:

``````->F(6)
->F(4)
->F(2)
->F(0)
->F(1)
->F(3)
->F(1)
->F(2)
->F(0)
->F(1)
->F(5)
->F(3)
->F(1)
->F(2)
->F(0)
->F(1)
->F(4)
->F(2)
->F(0)
->F(1)
->F(3)
->F(1)
->F(2)
->F(0)
->F(1)
``````
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@Anthony , nice this is really helpful. thanks –  kentdenns Nov 1 '12 at 5:30
@kentdenns then you should upvote this answer. –  stigok Nov 1 '12 at 18:51