If the angles A, B, C of a triangle are in A.P. and the sides a, b, c opposite to these angles are in G. P. then `a^2, b^2, c^2` are in

If the angles A lt B lt C of a triangle are in A.P, then

If the angles A,B, and C of a triangle ABC are in AP and the sides a,b and c opposite to these angles are in GP,then a^(2),b^(2) and c^(2) a are related as

If the angle A,B,C of a DeltaABC are in A.P then

If the angles A,B,C of a triangle are in A.P.and sides a,b,c are in G.P. ,then a2,b2,c2 are in

If the angles A,B,C of a triangle are in A.P. and sides a,b,c, are in G.P., then prove that a^2, b^2,c^2 are in A.P.

If the angles A,B,C of Delta ABC are in A.P. And its sides a,b,c are in G.P., then a^(2), b^(2), c^(2) are in

If the angles of the triangle are in A.P. and 3a^(2)=2b^(2) , then angle C ,is