Let $X$ be a binomial random variable with parameters $n$ and $p$ that is $X \sim \mathrm{bin}(n,p)$.
Does anyone know of a good lower bound (interms of $n$ and $p$) on the probability that $P(X \geq m)$? For $m<n$.
2026-03-30 13:34:06.1774877646
binomial sum bound
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