Question

A triangle has corners at points A, B, and C. Side AB has a length of `42`. The distance between the intersection of point A's angle bisector with side BC and point B is `16`. If side AC has a length of `32`, what is the length of side BC?

Answer 1

`~~28.19`

Explanation:

Let `"M"` be the point of intersection of the angle bisector of `"A"`

We need to find the length of `"BC"`

For that, we use the angle bisector theorem

`color(blue)(("BM")/("CM")=("AB")/("AC")`

So,

`rarr16/("MC")=42/32`

`rarr16/("MC")=21/16`

Cross multiply

`rarr"MC"*21=16*16`

`rarr"MC"*21=256`

`rarr"MC"=256/21`

`rArr"MC"~~12.19`

So the length of `"BC"` will be `"BM"+"CM"=16+12.19=color(PURPLE)(28.19`