Question

Two corners of a triangle have angles of `(7 pi )/ 12` and `pi / 4`. If one side of the triangle has a length of `15`, what is the longest possible perimeter of the triangle?

Answer 1

The perimeter is `=65.2u`

Explanation:

The angles are

`hatA=7/12pi`

`hatB=1/4pi`

`hatC=pi-(7/12pi+1/4pi)=pi-(7/12pi+3/12pi)=2/12pi=1/6pi`

To have the longest perimeter, the side `=15` must be opposite the smallest angle

Therefore,

`c=15`

Applying the sine rule to the triangle

`a/sin hatA=b/sin hatB=c/sin hatC`

`a/sin(7/12pi)=b/sin(1/4pi)=15/sin(1/6pi)=30`

So,

`a=30sin(7/12pi)=29`

`b=30sin(1/4pi)=21.2`

The perimeter is

`P=15+29+21.2=65.2u`