# Horner's Algorithm with recursion returning wrong result [duplicate]

Possible Duplicate:
Horner's recursive algorithm for fractional part - Java

I am writing a program for Horne'r Algorithm, and I will be honest, I do not have much experience with recursion. I have this method set up to accept a fraction only (there is another method which accepts and returns the whole number) and it will return the result converted from base 'r' to base 10. I am unsure why, but the method does not seem to be going through the final iteration. Any suggestions as to what I need to do to correct this problem would be greatly appreciated.

``````(ex: c = 011, xFinal = 2, i = 2)

public static double getHornerFraction(long[] c, int xFinal, int i) {
if (i == 0) {
return ((double)c[i])/xFinal;
}
return (getHornerFraction(c, xFinal, i-1) + c[i])/xFinal;
}
``````
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## marked as duplicate by bmargulies, Mark, Ben Jackson, ronalchn, GravitonSep 27 '12 at 4:08

Could you provide the Mathematical formula you are trying to implement via recursion? I'm not familiar with Horner's Algorithm and wiki was not that helpful :D – gtgaxiola Sep 24 '12 at 18:29
I had the same issue, so I just inferred the algorithm from what the OP expected. – Tim Bender Sep 24 '12 at 18:33
Doesn't appear to be the same Kwariz. That problem deals with forgetting to divide by the base, not for getting the recursive direction wrong. – IronMan84 Sep 24 '12 at 18:36

From looking at what you specified and what you expect, I think the problem is that you are walking the array `c` in the wrong direction or otherwise specifying it incorrectly. I think that what you want to do is actually walk the array from index `0` to `c.length`.

``````public static double getHornerFraction(long[] c, int xFinal, int i) {
if (i == c.length) {
return 0;
}
return (getHornerFraction(c, xFinal, i+1) + c[i])/xFinal;
}
``````

Call the above function with `c = {0,1,1}, xFinal = 2, i = 0` and it should give what you expect.

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This gives the expected result certainly. – gtgaxiola Sep 24 '12 at 18:32
Thanks Tim Bender. You were spot on. Your help was greatly appreciated – gotguts Sep 25 '12 at 4:05