Two corners of an isosceles triangle are at #(8 ,5 )# and #(6 ,1 )#. If the triangle's area is #15 #, what are the lengths of the triangle's sides?

1 Answer
Binayaka C.
Jun 7, 2017

The length of three sides of triangle are #2sqrt5 ,5sqrt2 ,5sqrt2# unit

Explanation:

Base of the isocelles triangle is #B= sqrt((x_2-x_1)^2+(y_2-y_1)^2)) = sqrt((8-6)^2+(5-1)^2)) =sqrt(4+16)=sqrt20 =2sqrt5#unit

We know area of triangle is #A_t =1/2*B*H# Where #H# is altitude.
#:. 15=1/cancel2*cancel2sqrt5*H or H= 15/sqrt5#unit

Legs are #L = sqrt(H^2+(B/2)^2)= sqrt(( 15/sqrt5)^2+((cancel2sqrt5)/cancel2)^2)=sqrt(45+5) = sqrt 50 = 5sqrt2 #unit

The length of three sides of triangle are #2sqrt5 ,5sqrt2 ,5sqrt2# unit [Ans]

Related questions
See all questions in Perimeter and Area of Triangle
Impact of this question
984 views around the world
You can reuse this answer
Creative Commons License