BL and CM are medians of a triangle ABC right angled at A. Prove that `4(B L^2+C M^2)=5B C^2`

BL and CM are medians of a triangle ABC right angled at A.Prove that 4(BL^(2)+CM^(2))=5BC^(2)

BL and CM are medians of DeltaABC , right - angled a A. Prove that 4("BL"^(2)+"CM"^(2))=5" BC"^(2)

ABC is an isosceles right triangle right- angled at C. Prove that AB^(2)=2AC^(2)

ABC is a isosceles right angled triangle, right angled at C. prove that AB^(2) = 2AC^(2)

ABC is an isosceles right triangle,right-angled at C. Prove that: AB^(2)=2AC^(2).

seg AN and seg CM are the medians of /_ABC in which /_B=90^(@) Prove that 4(AN^(2)+CM^(2))=5AC^(2)

The points A(2,9),B(a,5),C(5,5) are the vertices of a triangle ABC right angled at B Find the value of a and hence the area of ABC.

In figure ABC and AMP are two right triangles, right angles at B and M respectively. Prove that(i) DeltaA B C~ DeltaA M P (ii) (C A)/(P A)=(B C)/(M P)