In /\ABC, P is a midpoint on the bisecto...

In `/_\ABC`, P is a midpoint on the bisector of `/_B`. PM and PN are perpendiculars drawn on BC and AB respectively. Show that `/_\PMB` ~= `/_\PNB` and `bar(PM)` = `bar(PN)`.

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In `/_\ABC`, P is a midpoint on the bisector of `/_B`. PM and PN are perpendiculars drawn on BC and AB respectively. Show that `/_\PMB` ~= `/_\PNB` and `bar(PM)` = `bar(PN)`.

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