Question

A triangle has two corners with angles of `pi / 4` and `(5 pi )/ 8`. If one side of the triangle has a length of `15`, what is the largest possible area of the triangle?

Answer 1

Area of the largest possible triangle is `192.05` sq.unit.

Explanation:

Angle between sides `A and B` is `/_c= pi/4=180/4=45^0`

Angle between sides `BandC` is `/_a= (5pi)/8=900/8=112.5^0`

Angle between sides `C and A` is

`/_b= 180-(112.5+45)=22.5^0`. For largest area of triangle

`15` should be smallest side , which is opposite to the smallest

angle , i.e `B=15` The sine rule states if `A, B and C` are the

lengths of the sides and opposite angles are `a, b and c` in a

triangle,then, `A/sin a = B/sin b=C/sin c ; B=15 :. A/sin a=B/sin b`

`:. A= B* sin a/sin b :. A= 15 * sin 112.5/sin 22.5~~ 36.21`

Now we know sides `A=36.21 , B=15` and their included angle

`/_c = 45^0`. Area of the triangle is `A_t=(A*B*sin c)/2` or

`A_t=(36.21*15*sin 45)/2 ~~192.05` sq.unit.

Area of the largest possible triangle is `192.05` sq.unit [Ans]