Question

A triangle has sides A, B, and C. If the angle between sides A and B is `(pi)/4`, the angle between sides B and C is `(5pi)/12`, and the length of B is 4, what is the area of the triangle?

Answer 1

`Area=4/3*(3+sqrt(3))`

`Area=6.3094` square units

Explanation:

Try drawing the triangle
Angle `A=(5pi)/12` and angle `C=pi/4` and side `b=4`
side `b` is the base of the triangle. There 's a need to solve for the height `h` from angle B to side b to compute the area.

`h cot A+h cot C=b`
`h=b/(cot A+cot C)=4/(cot ((5pi)/12)+cot (pi/4)`
From double angle formulas:

`cot ((5pi)/12)=cos(pi/4+pi/6)/sin(pi/4+pi/6)=(cos (pi/4)*cos (pi/6)-sin (pi/4)*sin (pi/6))/(sin (pi/4)*cos (pi/6)+cos (pi/4)*sin (pi/6))`

`cot ((5pi)/12)=(sqrt3-1)/(sqrt3+1)`
Solve `h` now
`h=4/(cot ((5pi)/12)+cot (pi/4))=4/((sqrt3-1)/(sqrt3+1)+1)`
`h=2/3*(3+sqrt3)`
Solve `Area=1/2*b*h`
`Area=1/2*4*2/3*(3+sqrt3)`

`Area=4/3*(3+sqrt(3))`

`Area=6.3094` square units

Have a nice day !!! from the Philippines .