Infinite series that converges to pi

AI Thread Summary
The infinite series presented converges to π and is expressed as 4∑(√(n²-i²)/n²) for i = 1 to n as n approaches infinity. The series can be interpreted as a Riemann sum for the function f(x) = √(1-x²) over the interval [0,1], which relates to the area of a quarter unit circle. Similar series that converge to π exist, as referenced in resources like Wikipedia and Wolfram MathWorld. The discussion highlights the mathematical significance of the series and invites further exploration into its proof of convergence. Understanding this series contributes to the broader study of convergent series related to π.
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I stumbled upon this infinite series that converges to \pi:

4\sum\frac{\sqrt{n^2-i^2}}{n^2} for i = 1:n as n{\rightarrow∞}

I haven't been able to find any similar series online and I'm really curious how to prove this does indeed converge to \pi. Any insight would be greatly appreciated.
 
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This series appear if you try to compute the area of a quarter unit circle, by approximating with n rectangles in the obvious way (one side being 1/n).

EQuivalently, your sum is a Riemann sum of f(x)=√(1-x2) in the interval [0,1].
 
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