Question

A triangle has corners at `(5 ,1 )`, `(7 ,6 )`, and `(2 ,3 )`. What is the radius of the triangle's inscribed circle?

Answer 1

The radius of the incircle is `=1.28`

Explanation:

The area of the triangle is

`A=1/2|(x_1,y_1,1),(x_2,y_2,1),(x_3,y_3,1)|`

`A=1/2|(5,1,1),(7,6,1),(2,3,1)|`

`=1/2(5*|(6,1),(3,1)|-1*|(7,1),(2,1)|+1*|(7,6),(2,3)|)`

`=1/2(5(6-3)-1(7-2)+1(21-12))`

`=1/2(15-5+9)`

`=1/2|19|=19/2`

The length of the sides of the triangle are

`a=sqrt((7-5)^2+(6-1)^2)=sqrt(29)`

`b=sqrt((7-2)^2+(6-3)^2)=sqrt34`

`c=sqrt((5-2)^2+(1-3)^2)=sqrt13`

Let the radius of the incircle be `=r`

Then,

The area of the circle is

`A=1/2r(a+b+c)`

The radius of the incircle is

`r=(2a)/(a+b+c)`

`=(19)/(sqrt29+sqrt34+sqrt13)`

`=19/14.82=1.28`