Question

A triangle has corners at `(5 , 8 )`, `(2 ,3 )`, and `(3 ,1 )`. What is the radius of the triangle's inscribed circle?

Answer 1

`r= 0.716`

Explanation:

Given the coordinates of three vertices of `DeltaABC` are

`"Corodinate of A " x_A=5,y_A=8`

`"Corodinate of B " x_B=2,y_B=8`

`"Corodinate of C " x_C=3,y_C=1`

Lengths of three sides

`AB=sqrt((x_A-x_B)^2+(y_A-y_B)^2)`

`=sqrt((5-2)^2+(8-3)^2)=sqrt34`

`BC=sqrt((x_B-x_C)^2+(y_B-y_C)^2)`

`=sqrt((2-3)^2+(3-1)^2)=sqrt5`

`CA=sqrt((x_C-x_A)^2+(y_C-y_A)^2)`

`=sqrt((3-5)^2+(1-8)^2)=sqrt53`

Now area of `DeltaABC`

`=|1/2(y_A(x_B-x_C)+y_B(x_C-x_A)+y_C(x_A-x_B))|`

`=|1/2(8(2-3)+3(3-5)+1(5-2))|`

`=|1/2(-8-6+3)|=5.5`

If the radius of the incircle of `DeltaABC " "be" "r` then

`1/2(AB+BC+CA)xxr="area "DeltaABC`

`=>1/2(sqrt34+sqrt5+sqrt53)*r=5.5`

`=>r=(2xx5.5)/(sqrt34+sqrt5+sqrt53)`

`:.r= 0.716`