# Pi value estimation with series

Here's my problem:

Compute the value of π using the following series:

``````((π^2)-8)/16=[sum from 1 to pos. infinity] 1/(((2n−1)^2)*((2n+1)^2))
``````

• Find the smallest number of terms required to obtain an absolute value of the error on π smaller than 10e−8.

Here's my code:

``````x=0;
for i=1:1000

x=x+(1/((((2*i)-1)^2)*(((2*i)+1)^2)));
z=sqrt((x*16)+8);
error=abs(z-pi);
if (error < 10e-8)
i
break
end
end
``````

The answer that I get is 81 when the loop breaks, but it is not the right answer. I have been trying to figure out what is wrong with my code that it doesn't do what I need.

I've been staring at the code for quite a while and cant see where I made a mistake.

-
umm.. don't you want to look at z when you break out of the loop? In fact.. I might print out the difference between z and pi. –  Justin Peel Jan 24 '12 at 2:16
>but it is not the right answer Why not? Everything looks right. Mathematica gives the same result –  Cheery Jan 24 '12 at 2:35
I believe it is the right answer too, but am being told that it is not with no clues as to where I am making a mistake. –  Johnny Hieu Le Jan 24 '12 at 2:44
When I do this I get `abs(z-pi)=9.7997e-08`, so your code does work. Furthermore, with `i=80` you get an error of ~1.01e-7 which is > 10e-8. What answer were you expecting? The only thing I can think of is you misread and it was (say) 1e-8 instead of 10e-8? –  mathematical.coffee Jan 24 '12 at 2:51
@Johnny Hieu Le May be this an error not on value of pi, but on ((π^2)-8)/16 ? it will give you 59 terms in this case. –  Cheery Jan 24 '12 at 2:51