Question

A triangle has vertices A, B, and C. Vertex A has an angle of `pi/6`, vertex B has an angle of `(pi)/12`, and the triangle's area is `12`. What is the area of the triangle's incircle?

Answer 1

`color(indigo)("Area of incircle " = A_i = pi * (12/15.5)^2 = 1.88 " sq units"`

Explanation:

`hat A = pi/6, hat B = pi/12, hat C = (3pi) / 4, A_t = 12`

`A_t = (1/2) a b sin C = (1/2) bc sin A = (1/2) ca sin B`

`ab = (2 A_t) / sin C = 24 / sin ((3pi)/4) = 33.94`

`bc = 24 / sin A = 24/ sin (pi/6) = 48`

`ca = 24 / sin C = 24 / sin(pi/12) = 92.73`

`a = (abc) / (bc) = sqrt(33.94 * 48 * 92.73) / 48 = 8.1`

`b = (abc) / (ac) = sqrt(33.94 * 48 * 92.73) / 92.73 = 4.19`

`c = (abc) / (ab) = sqrt(33.94 * 48 * 92.73) / 33.94 = 11.45`

`"Semiperimeter " = s = (a + b + c) / 2 = (8.1 + 4.19 + 11.45) / 2 = 15.5`

`"Incircle radius " = r = A_t / s = 12 / 15.5`

`color(indigo)("Area of incircle " = A_i = pi * (12/15.5)^2 = 1.88 " sq units"`