Question

A triangle has corners at points A, B, and C. Side AB has a length of `33`. The distance between the intersection of point A's angle bisector with side BC and point B is `15`. If side AC has a length of `27`, what is the length of side BC?

Answer 1

`BC=27 3/11` units

Explanation:

Please refer to figure below.

Here let `a=BC`,
`b=AC=27` and
`c=AB=33`.

Further, bisector of angle `A` cuts `AB` at `D` and `BD=15`

In such a triangle according to angle bisector theorem, bisector of angle `A`, divides `BC`

in the ratio of the two sides containing the angle.

In other words, `(AB)/(AC)=(BD)/(DC)` and hence here we have

`33/27=15/(DC)` or `33xxDC=27xx15` and

`DC=(27xx15)/33=(9cancel(27)xx15)/(11cancel(33))=135/11=12 3/11`

Hence `BC=15+12 3/11=27 3/11`