Question

A triangle has corners at `(4 , 5 )`, `(3 ,2 )`, and `(1 ,3 )`. What is the radius of the triangle's inscribed circle?

Answer 1

`color(cyan)("Radius of inscribed circle " r = A_t / s = 3.62/ 4.529 = 0.8 " units"`

Explanation:

`"Incircle radius " r = A_t / s`

`A(4,5), B(3,2), C(1,3)`

`a = sqrt((3-1)^2 + (2-3)^2) = 2.236`

`b = sqrt((1-4)^2 + (3-5)^2) = 3.606`

`c = sqrt((4-3)^2 + (5-2)^2) = 3.162`

`"Semi-perimeter " s = (a + b + c) / 2 = (2.236 + 3.606 + 3.162) / 2 = 4,529`

`"A_t = sqrt(s (s-a) s-b) (s-c))`

`A_t = sqrt(4.529 (4.529-2.236) (4.529 - 3.606) (4.529 - 3.162)) = 3.62`

`color(cyan)("Radius of inscribed circle " r = A_t / s = 3.62/ 4.529 = 0.8 " units"`