In $\triangle pqr$, we have $pq = qr = 34$ and $pr = 32$. point $m$ is the midpoint of $\overline{qr}$. find $pm$.

asked Aug 18, 2020 204k views

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In triangle PQR, by the law of cosines we have

$34^2=32^2+34^2-2\cdot32\cdot34\cos(m\angle PQR)\implies\cos(m\angle PQR)=\frac8{17}$

In triangle PMQ, we have

$PM^2=32^2+17^2-2\cdot32\cdot17\cos(m\angle PQR)\implies PM^2=801\implies PM=\boxed{3√(89)}$

$In $\triangle pqr$, we have $pq = qr = 34$ and $pr = 32$. point $m$ is the midpoint-example-1$

Barbushin answered Aug 25, 2020

8.1k points

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