Question

Two corners of an isosceles triangle are at `(7 ,2 )` and `(3 ,9 )`. If the triangle's area is `24`, what are the lengths of the triangle's sides?

Answer 1

The lengths of the sides of the isoceles triangle are `8.1u`, `7.2u` and `7.2u`

Explanation:

The length of the base is

`b=sqrt((3-7)^2+(9-2)^2)=sqrt(16+49)=sqrt65=8.1u`

The area of the isoceles triangle is

`area=a=1/2*b*h`

`a=24`

Therefore,

`h=(2a)/b=(2*24)/sqrt65=48/sqrt65`

Let the length of the sides be `=l`

Then, by Pythagoras

`l^2=(b/2)^2+h^2`

`l^2=(sqrt65/2)^2+(48/sqrt65)^2`

`=65/4+48^2/65`

`=51.7`

`l=sqrt51.7=7.2u`