Two corners of a triangle have angles of # (7 pi )/ 12 # and # pi / 8 #. If one side of the triangle has a length of # 6 #, what is the longest possible perimeter of the triangle?

1 Answer
sankarankalyanam
Oct 19, 2017

Perimeter # = a + b + c = 6 + 15.1445 + 12.4388 = 33.5833

Explanation:

Three angles are #(7pi)/12, pi/8, (7pi)/24#

To get the longest perimeter, side with length 6 should correspond to least angle of the triangle #(pi/8)#

#6/sin (pi/8) = b / sin ((7pi)/12) = c / sin ((7pi)/ 24)#

#b = (6*sin ((7pi)/12))/sin (pi/8) = 15.1445#

#c =( 6 * sin ((7pi)/24))/sin (pi/8) = 12.4388#

Perimeter # = a + b + c = 6 + 15.1445 + 12.4388 =33.5833

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