Two corners of a triangle have angles of # (5 pi )/ 12 # and # ( pi ) / 3 #. If one side of the triangle has a length of # 1 #, what is the longest possible perimeter of the triangle?

1 Answer
Kalyanam S.
Jun 2, 2018

Longest possible perimeter #color(orange)(P = 1 + 1.22 + 1.37 = 3.59#

Explanation:

#hat A = (5pi)/12, hat B = pi/3, hat C = pi/4#

Side 1 should correspond to #hat C = pi/4# the least angle to get the longest perimeter.

As per Law of Sines, #a / sin A = b / sin B = c / sin C#

#:. a = (sin ((5pi)/12) * 1) / sin (pi/4) = 1.37#

#b = (sin (pi/3) * 1) / sin(pi/4) = 1.22#

Longest possible perimeter #color(orange)(P = 1 + 1.22 + 1.37 = 3.59#

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