Question

Two corners of a triangle have angles of `(3 pi )/ 8` and `( pi ) / 2`. If one side of the triangle has a length of `9`, what is the longest possible perimeter of the triangle?

Answer 1

`Perimeter = 23.5 + 21.7 + 9 = 54.2`

Explanation:

Let `angle C = pi/2`

Let `angle B = (3pi)/8`

Then `angle A = pi - angle C - angle B = pi/8`

Make the length 9 side be "a" so that it is opposite the smallest angle, A; this will give us the longest possible perimeter:

Let side `a = 9`

Find the length of side b, using the Law of Sines:

`b/ sin(B) = a/sin(A)`

`b = asin(B)/sin(A)`

`b = 9sin(3pi/8)/sin(pi/8) ~~ 21.7`

Because side c is opposite a right angle, we can use:

`c = sqrt(a^2 + b^2)`

`c = sqrt(9^2 + 21.7^2)`

`c ~~ 23.5`

`Perimeter = 23.5 + 21.7 + 9 = 54.2`