# Recursive Sine function

I'm writing a sine function that has to be recursive. I have written a sine function but am not really sure how to do it recursively. Could someone explain how to get started on this?

This is what I have so far:

``````/*--------------------------------------------------------------
Name: sine( double X );

Return: Function "sine" will return the
sine of X, where X is measured in radians.
--------------------------------------------------------------*/

double sine(double X)
{
double result = 0;
double term;
int k;
double lim;

k = 0;
lim = power(10, -8);
term = power(-1, k)*power(X, ((2*k) + 1)) / (factorial((2*k)+1));
result = term;
while (absolute(term) > lim)
{
k += 1;
term = power(-1, k)*power(X, ((2*k) + 1)) / (factorial((2*k)+1));
result += term;
}

return result;
}
``````

EDIT: I used a wrapper function to solve this. Basically created another function called

``````double sine_rec(double X, double k)
``````

and changed around the current code to fit in with that.

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Is this homework? Because then I'd rather give you a hint than a complete answer and spoil the fun for you. –  Mads Apr 26 '12 at 21:01
@Mads it has a homework tag....perhaps just added? –  kenny Apr 26 '12 at 21:02
Have you tried Googling this? There seems to be plenty of examples out there –  Paula Bean Apr 26 '12 at 21:02

The way I would approach this would be to have another function `sine(double X, int n)` which takes another integer parameter - the number of terms to include in the power series approximation. Then this function could return something like `[nth term in series] + sine(X, n - 1)` (just remember a prior `if` statement to deal with n = 1).

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I think this is what I did. I used a wrapper function. –  SimplyZ Apr 26 '12 at 21:52

You can eliminate the `while` loop by recursion in following way:

``````double sine(double X, int k = 0)
{
double result = 0;
double term;
double lim;

lim = power(10, -8);
term = power(-1, k)*power(X, ((2*k) + 1)) / (factorial((2*k)+1));
if (absolute(term) > lim)
{
return sine(X, k+1) + term;
}
else
{
return term;
}
}
``````

But I cannot recommend doing this at all. (There are better solutions even to this recursion, but find them on your own)

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