Question

We have triangle `ABC` with `BC=13,AC=14,hat(C)=arccos(5/13)`.How to find the other two angles?

Answer 1

See below.

Explanation:

Using the so called sinus law

`(sin hatA)/[BC] = (sin hat B)/[AC]`

and

`hatA+hatB+hatC=pi` but `hatC=arccos(5/13)`

and

`sin hatB = sin(pi-hat A-hat C)=sin(hatA+hat C)` and

`sin(hatA+hat C)=sin hat A cos hat C+cos hat A sin hat C`

and

`sin hat C=12/31` and `cos hat C = 5/13`

so

`14 sin hat A = 13(5/13 sin hat A+12/13cos hat A)` or

`9 sin hat A = 12 cos hat A` and

`tan hat A = 12/9 = 4/3`

and `hat A = arctan(4/3)`

and now

`hat B = pi - (hat A + hat C)`

This is left to the reader.