A triangle has two corners with angles of # pi / 2 # and # (3 pi )/ 8 #. If one side of the triangle has a length of #7 #, what is the largest possible area of the triangle?

1 Answer
sankarankalyanam
Oct 8, 2017

Area of the largest triangle possible #=87.4551#

Explanation:

The angles are #pi/2,(3pi)/8,pi/8#
It is a right angle triangle.

Smallest side #=7# It is also the height.
#:.a/sin(pi/12)=b/sin((3pi)/8)=c/sin(pi/2)#
#7/sin(pi/12)=b/sin((3pi)/8)=c/1#
#c=7/sin(pi/12)=27.0459= # hypotenuse of the triangle.
#b=((7*sin((3pi)/8))/sin(pi/12))#
#=24.9872#. It is also the base.

Area of the triangle#=(1/2)*b*h=(1/2)*7*24.9872=87.4551#

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