# Can't understand how recursion works in this example

I was given the following code:

``````public int func(int n){
if(n == 1)
return 2;
else
return 3 * func(n-1)+1;
}
``````

I can understand recursion in things like factorial and fibonacci, but for this one I cant. I tried to trace the logic:

``````if n is 3:
return 3 * func(2) + 1
return 3 * func(1) + 1
return 3 * 2 + 1
return 7
``````

I always end up with 7 with any other number and I know this is wrong because I get different values when I run the program. Can you help me understand how recursion works here?

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I think this is self-explanatory, if you need more informations just comment !

``````if n is 3:
return 3 * func(2) + 1
return 3 * (3 * func(1) + 1) + 1 //func(2) is equals to 3 * func(1) + 1
return 3 * (3 * 2 + 1) + 1 //func(1) is equals to 2
return 22
``````
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• If `n` is 1 it returns `2` (so `func(1) = 2`).
• If `n` is 2 it returns `3 * func(1) + 1`, which is `3 * 2 + 1 = 7` (so `func(2) = 7`).
• If `n` is 3 it returns `3 * func(2) + 1`, which is `3 * 7 + 1 = 22` (so `func(3) = 22`).
• If `n` is 4 it returns `3 * func(3) + 1`, which is `3 * 22 + 1 = 67` (so `func(4) = 67`).
• ...

And so on. In other words, when `n = 1` it simply returns 2 and it all other cases it returns the value for `func(n - 1)` times three and with one added.

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upvote for best plain-text explanation –  Jason Fingar Jan 15 at 23:00

if n is 3

``````func(3)
=3*func(2)+1
=3*(3*func(1)+1)+1
=3*(3*2+1)+1
=22
``````

if n is 4

``````func(4)
=3*func(3)+1
=3*22+1
=67
``````
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You're close, but missing a key point:

``````func(3) is: 3 * func(2) + 1
func(2) is: 3 * func(1) + 1
func(1) is: 2

Therefore, func(2) is 3*2+1 = 7.
And func(3) is 3*7+1 = 22
``````
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when `n=3` you get

``````func(3) = > return 3 * func(2) + 1
``````

where `func(2)` is

``````func(2) = > return 3 * func(1) + 1
``````

where `func(1)` is

``````func(1) = > return 2
``````

once you combine them you get that

``````func(3) => return 3 * (3 * (2) + 1) + 1

func(3) => return 22
``````
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You have to reinput that value you get for the deepest recursion call into the previous level and so forth.

``````func(1) = 2
func(2) = 3 * func(1) + 1 = 7
func(3) = 3 * func(2) + 1 = 22
func(4) = 3 * func(3) + 1 = 67
``````
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