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# Double type returns -1.#IND/NaN error when calculating pi iteratively

I am working through a problem for my MCTS certification. The program has to calculate pi until the user presses a key, at which point the thread is aborted, the result returned to the main thread and printed in the console. Simple enough, right? This exercise is really meant to be about threading, but I'm running into another problem. The procedure that calculates pi returns -1.#IND. I've read some of the material on the web about this error, but I'm still not sure how to fix it. When I change double to Decimal type, I unsurprisingly get Overflow Exception very quickly. So, the question is how do I store the numbers correctly? Do I have to create a class to somehow store parts of the number when it gets too big to be contained in a Decimal?

``````Class PiCalculator

Dim a As Double = 1
Dim b As Double = 1 / Math.Sqrt(2)
Dim t As Double = 1 / 4
Dim p As Double = 1
Dim pi As Double
Dim callback As DelegateResult

Sub New(ByVal _callback As DelegateResult)
callback = _callback
End Sub

Sub Calculate()
Try
Do While True
Dim a1 = (a + b) / 2
Dim b1 = Math.Sqrt(a * b)
Dim t1 = t - p * (a - a1) ^ 2
Dim p1 = 2 * p

a = a1
b = b1
t = t1
p = p1

pi = ((a + b) ^ 2) / (4 * t)
Loop
Finally
callback(pi)
End Try

End Sub

End Class
``````
-
If I add Thread.Sleep(50) at the end of the loop, then I get the execution to slow down enough to make the program run as intended. But, I've noticed that the number returned is now always 3.14159265358979. I doesn't get more precise if I wait longer. – Antony Highsky Jun 13 '10 at 0:54
Floating-point numbers have limited precision. – lhf Jun 13 '10 at 1:24
As long as you're using the Double as your storage of pi, you're never going to get past there. – Justin L. Jun 13 '10 at 4:43
So, what's the recommended way of handling numbers that require higher precision? – Antony Highsky Jun 13 '10 at 5:00
Use an extended precision library such as qd [crd.lbl.gov/~dhbailey/mpdist/] or an arbitrary precision library such as mapm [tc.umn.edu/~ringx004/mapm-main.html] or gmp [gmplib.org/]. – lhf Jun 13 '10 at 13:00

`p` becomes `inf` at step 1025.
Because `pi` is calculated by dividing infinity by infinity, which is undefined. – Mike Seymour Jun 13 '10 at 12:27