ABC is an isosceles right triangle, right-angled at `C` . Prove that: `A B^2=2A C^2dot`

A B C is an isosceles right triangle right-angled at C . Prove that A B^2=2A C^2 .

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

In figure ABC is an isosceles triangle , right angled at C . Therefore

A B C is an isosceles right-triangle right angled at C such that A C=5\ c mdot Then, A B= (a) 2.5 cm (b) 5sqrt(2) cm (c) 10 cm (d) 5 cm

A B C is a right triangle right-angled at Ca n dA C=sqrt(3)B C . Prove that /_A B C=60^0dot

D and E are points on the sides CA and CB respectively of a triangle ABC right angled at C. Prove that A E^2+B D^2=A B^2+D E^2 .

D and E are points on the sides CA and CB respectively of a triangle ABC right angled at C. Prove that A E^2+B D^2=A B^2+D E^2 .

ABC is a triangle, right angled at B, M is a point on BC. Prove that : AM^(2) + BC^(2) = AC^(2) + BM^(2)

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

Let the complex numbers Z_(1), Z_(2) and Z_(3) are the vertices A, B and C respectively of an isosceles right - angled triangle ABC with right angle at C, then the value of ((Z_(1)-Z_(2))^(2))/((Z_(1)-Z_(3))(Z_(3)-Z_(2))) is equal to