I was playing around with Desmos and noticed that the graph of $y=(x^2+1)^{-1}$ looks like a distribution. I know that distributions like the normal distribution follow the form of $a^{-x^2}$. Are these functions related at all? Does the function I've mentioned have any use? Thanks.
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The density function $$f(x)=\frac1{\pi(1+x^2)}$$ defines the Cauchy distribution. It's a great example in probability theory. It has no mean, no variance, and does not satisfy the central limit theorem!
Angina Seng
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