If `(a^(2) + b^(2))sin (A-B) = (a^(2)-b^(2)) sin(A+B)` then show that, the triangle is either isoscelels or right angled.

In /_\ABC ,if (a^2+b^2)sin(A-B)=(a^2-b^2)sin (A+B) ,show that the triangle is either isosceles or right angled.

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 any triangle ABC, if (cos A + 2 cos C)/(cos A + 2 cos B) = (sin B)/(sin C) then prove that, the triangle is either isosceles or right angled.

In any triangle ABC, if (cosB+ 2 cosA)/(cos B + 2cosC ) = (sin C)/(sinA) then prove that, the triangle is either isosceles or right angled.

If 2 cos A = (sin B)/(sin C) then show that the triangle is isosceles.

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

in triangleABC if (a^2+b^2)/(a^2-b^2)=sin(A+B)/sin(A-B) then prove that it is either a right angled or an isosceles triangle.

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

If sin^(2)B+ sin^(2)C = sin^(2)A , then the triangle ABC is-

In any triangle ABC, if cosA cos B + sin A sin B sinC =1 then prove that the triangle in an isosceles right angled.