Two corners of an isosceles triangle are at #(5 ,2 )# and #(2 ,1 )#. If the triangle's area is #7 #, what are the lengths of the triangle's sides?

1 Answer
Feb 14, 2017

Lengths of three sides of triangle are #3.16, 4.70,4.70# unit

Explanation:

The base of the isosceles triangle, #b=sqrt( (x_1-x_2)^2+(y_1-y_2)^2) = sqrt( (5-2)^2+(2-1)^2) =sqrt10=3.16(2dp)unit #

The area of the isosceles triangle is #A_t = 1/2 * b *h =1/2*3.16 *h ; A_t=7 :. h = (2* A_t )/b = (2*7)/3.16=14/3.16= 4.43(2dp) unit#. Where #h# is the altitude of triangle.

The legs of the isosceles triangle are #l_1=l_2= sqrt(h^2+(b/2)^2)=sqrt(4.43^2+(3.16/2)^2) =4.70(2dp) unit#

Hence the length of three sides of triangle are #3.16(2dp), 4.70(2dp) ,4.70(2dp)# unit [Ans]