# Finding an approximation of the constant Pi within error [ PYTHON ]

I just started learning Python and I am having a problem writing the function.

The following is an inﬁnite series that calculates an approximation of π : π = 4/1 − 4/3 + 4/5 - 4/7 + 4/9 - 4/11 ...

I am trying to write a function that takes as a parameter a floating point value error and approximates the constant π within error by computing the above sum, term by term, until the absolute value of the difference between the current sum and the previous sum (with one fewer terms) is no greater than error. Once the function finds that the difference is less than error, it should return the new sum.

The following shows the execution of this function on some examples:

``````>>> aprPi(0.01)
3.1465677471829556
>>> aprPi(0.0000001)
3.1415927035898146
``````

I still don't know how to compute it. Can someone help me?

This is what I have so far:

``````def aprPi(err):
first  = 4/test(0) - 4/test(1)
second = first + 4/test(2) - 4/test(3)
n=4
while abs(first - second) > err:
first = second
second = second + test(n)
n +=1
return second

def test(n):
sum = 1
for i in range(n):
sum += 2

return sum
``````

Thank you

-
Can you please fix your indentation? –  yasar11732 Nov 4 '11 at 20:52
this also doesn't really sound like a python question, more like general programming. –  samb8s Nov 4 '11 at 20:55
A Calculus note: That serie for PI is a veeery slowly converging one. –  Avaris Nov 4 '11 at 20:59
By the way, you can sum up all you do into a `first= 0` and `second = 0` until the loop part, and you won't ever enter the loop, unless err is negative. And when you enter the loop, you won't ever get out of that loop, as first and second is always 0. –  yasar11732 Nov 4 '11 at 21:11
–  J.F. Sebastian Nov 4 '11 at 21:22

You can do something like this:

``````mypie = 0
denominator = 1
sign = 1

while denominator < 100:
mypie = mypie + (4.0 / denominator) * sign
sign = -sign
denominator = denominator + 2
``````
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I guess it depends on the version of python, but you might need to make it a float division, e.g. 4.0 –  samb8s Nov 4 '11 at 20:58
You are right, I edited my post. I also should't have used sum as variable name as it is a built-in function name. –  yasar11732 Nov 4 '11 at 21:03