In any triangle ABC, if `8R^(2) =a^(2) + b^(2) +c^(2)`, prove that, the triangle is right angled.

If r_1 =r_2+r_3+r, prove that the triangle is right angled.

If in a triangle ABC, cos^(2)A + cos^(2)B + cos^(2)C =1 , then show that the triangle is right angled.

In any triangle ABC "if" (b+c)/(a)="cot"(A)/(2) , prove that the triangle is right-angled.

If 8R^2=a^2+b^2+c^2 then show that the triangle is right angled

In any triangle ABC, if sin^(2)A + sin^(2)B + sin^(2)C = 9/4 , show that the triangle is equilateral.

If in a triangle ABC, (bc)/(2 cos A) = b^(2) + c^(2) - 2bc cos A then prove that the triangle must be isosceles.

In a triangle ABC, if (a^(2)+ b^(2))sin(A-B) = (a^(2)-b^(2))sin(A+B) (where a ne b ), prove that the triangle is right angled.

In Delta ABC ,AD is a perpendicular drawn from A to the side BC. If AD^(2)=BD . CD , then prove that the triangle is a right-angled triangle.

In any triangle ABC, If b^(2) = a(c+a), c^(2) = b(a+b) , then prove that, cosAcosB cosC =-1/8 .

In any triangle ABC if cosA=sinB-cosC then show that any angle of the triangle is a right angle.