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I'm a bit stuck here. I know a particular fibonacci number can be found recursively as so:

int fib (int n)
{
    if (n <= 1)
        return n;

    else 
        return fib(n-1) + fib(n-2);
}

And I know iteratively I could call that function n times to find the sum of fibonacci numbers

int sum = 0;
for (int i = 0; i < n; i++)
{
    sum += fib(i);
}

But I'm having a hard time coming up with a recursive function to find the sum. I don't think it would be much different than the original fibonacci function. (This is for an assignment aimed at improving my ability to write ocaml syntax, not writing recursive functions)

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1  
Did you try to google it ? – alfasin Feb 9 '14 at 20:30
2  
Yes, quite a bit actually. – user2079802 Feb 9 '14 at 20:30
    
weird indeed considering that google returns 321,000 results for "fibonacci recursion" – alfasin Feb 9 '14 at 20:32
1  
fib(0) should be 0, not 1. – ooga Feb 9 '14 at 20:41
1  
that's right, thank you. I've changed it to return n in the case that n <= 1 – user2079802 Feb 9 '14 at 20:43
up vote 2 down vote accepted

Since no one else is bothering to answer your question, here you go:

int fib_sum(int n)
{
    if (n == 0)
        return 0;
    if (n == 1)
        return 1;
    return fib_sum(n-1) + fib_sum(n-2) + 1;
}
share|improve this answer

Observing that fib_sum(n) == fib(n+2) - 1 you can use more or less the same function.

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If you want a recursive solution involving only fib_sum(), here is one:

int fib_sum (int n)
{
    if (n == 0)
        return 1;
    if (n == 1)
        return 2;
    return fib_sum(n-1) + fib_sum(n - 2) + 1;
}
share|improve this answer
    
But surely fib_sum(0) should be 0 and fib_sum(1) should be 1. – ooga Feb 9 '14 at 20:44
    
I assumed the OP starts with fib(0)=1, fib(1)=1, fib(2)=2, ... – twin Feb 9 '14 at 20:45
    
That would be unusual: Fibonacci Number – ooga Feb 9 '14 at 20:47

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