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

In a triangle sin^(4)A + sin^(4)B + sin^(4)C = sin^(2)B sin^(2)C + 2sin^(2) C sin^(2)A + 2sin^(2)A sin^(2)B , then its angle A is equal to-

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

(i) If in a triangle ABC, a^(4) + b^(4) +c^(4) - 2b^(2) c^(2) -2c^(2)a^(2)=0 , then show that, C=45^(@) or 135^(@) . (ii) In in a triangle ABC, sin^(4)A + sin^(4)B + sin^(4)C = sin^(2)B sin^(2)C + 2sin^(2) C sin^(2)A + 2sin^(2)A sin^(2)B , show that, one of the angles of the triangle is 30^(@) or 150^(@)

If in a triangle ABC, b sin B = c sin C, then the triangle is-

If in a triangle ABC, sin^2A+sin^2B+sin^2C=2 then the triangle is always

In triangle ABC if sin^2B+sin^2C=sin^2A then

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.

The perimeter of a triangle ABC iws equal to 2 (sin A+sin B+ sin C). If a=1, then the value of angle A is-

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

If sin^2(A/2), sin^2(B/2), and sin^2(C/2) are in H.P. , then prove that the sides of triangle are in H.P.