Question

Two corners of an isosceles triangle are at `(1 ,3 )` and `(9 ,7 )`. If the triangle's area is `64`, what are the lengths of the triangle's sides?

Answer 1

The sides of the triangle are `a = c = 15 and b = sqrt(80)`

Explanation:

Let the length of side b equal the distance between the two given points:

`b = sqrt((9 - 1)^2 + (7 - 3)^2)`

`b = sqrt((8)^2 + (4)^2)`

`b = sqrt(80)`

`Area = 1/2bh`

`2Area = bh`

`h = (2Area)/b`

`h = (2(64))/sqrt(80)`

`h = 128/sqrt(80)`

If side b is NOT one of the equal sides then the height is one of the legs of a right triangle and half of the length side b, `sqrt(80)/2` is the other leg. Therefore, we can use the Pythagorean Theorem to find the length of hypotenuse and this will be one of the equal sides:

`c = sqrt((128/sqrt(80))^2 + (sqrt(80)/2)^2)`

`c ~~ 15`

We need to find whether a triangle with sides, `a = c = 15 and b = sqrt(80)` has an area of 64.

I used a Heron's Formula Calculator and discovered that the area is 64.

The sides of the triangle are `a = c = 15 and b = sqrt(80)`