Question

A triangle has sides A, B, and C. If the angle between sides A and B is `(7pi)/12`, the angle between sides B and C is `pi/3`, and the length of B is 1, what is the area of the triangle?

Answer 1

Area of the triangle is `1.62` sq.unit.

Explanation:

Angle between Sides `A and B` is `/_c= (7pi)/12=(7*180)/12=105^0`

Angle between Sides `B and C` is `/_a= pi/3=180/3=60^0 :.`

Angle between Sides `C and A` is `/_b= 180-(105+60)=15^0`

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/sina = B/sinb=C/sinc ; B=1 :. B/sinb=C/sinc` or

`1/sin15=C/sin105 or C= 1* (sin105/sin15) ~~ 3.73 (2dp)`

Now we know sides `B=1 , C=3.73` and their included angle

`/_a = 60^0`. Area of the triangle is `A_t=(B*C*sina)/2`

`:.A_t=(1*3.73*sin60)/2 ~~ 1.62(2dp)` sq.unit.

Area of the triangle is `1.62` sq.unit [Ans]