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Kevin Vermeer · Answer 1 · 2018-06-10T20:22:13+0000

$\mathbb P(X>1)=1-\mathbb P(X\le1)=1-\mathbb P(X=0)-\mathbb P(X=1)$

The coin is unbiased, so either side has the same probability of
$\frac12$ of occurring, where

$\mathbb P(X=x)=\dbinom4x\left(\frac12\right)^x\left(\frac12\right)^(4-x)=\dbinom4x\left(\frac12\right)^4=\frac1{16}\dbinom4x$

So the probability of getting heads more than once is

$\mathbb P(X>1)=1-\frac1{16}\dbinom40-\frac1{16}\dbinom41=(11)/(16)$

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