Let X be binomially distributed with parameters n and p. Show that as k goes from 0
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Let X be binomially distributed with parameters n and p. Show that as k goes from 0 to n,P(X = k) increases monotonically, then decreases monotonically, reaching its largest value
(a) in the case that (n + 1)p is an integer, when k equals either (n + 1)p − 1 or (n+ 1)p,
(b) in the case that (n+1)p is not an integer, when k satisfies (n+1)p−1 <
k <(n+1)p.
Hint: Consider P{X = k}/P {X = k − 1} and see for what values of k it is greater or less than 1.
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Anoop V
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