In `Delta ACB, angle C = 90^(@)` and CD`bot` AB
Prove that `(BC^(2))/(AC^(2)) = (BD)/(AD)`.

In Delta ABC,/_A = right angle. If CD is a median, then prove that BC^(2) = CD^(2)+ 3AD^(2) .

In Delta ABC , AD is a median and AM _|_ BC.Prove that (a) AC^(2) = AD^(2) +BC.DM+ ((BC)/(2))^(2) (b) AB^(2) = AD^(2) -BC.DM+ ((BC)/(2))^(2) (c ) AC^(2) + AB^(2) = 2AD^(2) +(1)/(2) BC^(2)

In Delta ABC, /_B = 90^@ If AB = BC then prove /_C= 45^@

In DeltaABC, angle C = 2 angle A, and AC = 2BC , then the value of (a^(2) + b^(2)+ c^(2))/(R^(2)) (where R is circumradius of triangle) is ______

In Delta ABC, AD_|_ BC . Prove that AB^(2) - BD^(2) =AC^(2) -CD^(2)

In triangleABC , angleB is an acute angle and AD botBC . Prove that AC^2= AB^2+BC^2-2BC.BD.

ABC is a right-angled isoscels triangles of which /_C is a right angle. If D is any point on AB. Then prove that AD^(2) + BD^(2) = 2CD^(2)

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

ABC is an equilateral triangle. AD is perpendicular to BC. Prove that AB^(2) + BC^(2) + CA^(2) =4AD^(2)

In the given figure, ABC is a triangle right angled at B. D and E are ponts on BC trisect it. Prove that 8AE^(2) = 3AC^(2) + 5AD^(2) .