A triangle has sides A,B, and C. If the angle between sides A and B is #pi/6#, the angle between sides B and C is #pi/12#, and the length of B is 8, what is the area of the triangle?

1 Answer
Nov 14, 2017

Area of the triangle is #5.86# sq.unit.

Explanation:

Angle between Sides # A and B# is # /_c= pi/6=180/6=30^0#

Angle between Sides # B and C# is # /_a= pi/12=180/12=15^0 :.#

Angle between Sides # C and A# is # /_b= 180-(30+15)=135^0#

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=8 :. A/sina=B/sinb# or

#A/sin15=8/sin135 :. A = 8* sin15/sin135 ~~ 2.93(2dp)#unit

Now we know sides #A=2.93 , B=8# and their included angle

#/_c = 30^0#. Area of the triangle is #A_t=(A*B*sinc)/2#

#:.A_t=(2.93*8*sin30)/2 ~~ 5.86# sq.unit

Area of the triangle is #5.86# sq.unit [Ans]