In a `Delat ABC`,a,b,c are the sides of the triangle opposite to the angles A,B,C, respectively. Then , the value of `a^3 sin (B-C) +b^3 sin (C-A)+c^3 sin (A-B)` is

In a Delta ABC,a,b,c are the sides of the triangle opposite to the angles A,B,C respectively. Then, the value of a^3 sin(B-C)+b^3 sin(C-A)+c^3 sin(A) is equal to (B) 1 (C) 3 (D) 2

In Delta ABC,a,b,c are the opposite sides of the angles A,B and C respectively,then prove (sin B)/(sin(B+C))=(b)/(a)

If the angles A, B and C of a triangle are in an arithmetic progression and if a, b and c denote the lengths of the sides opposite to A, B and C respectively, then the value of the expression (a)/(c) sin 2C + (c)/(a) sin 2A is

In any triangle ABC,prove that a sin (B-C)+b sin(C-A)+c sin(A-B)=0

Prove that in any Delta ABC,a sin(B-C)+b sin(C-A)+c sin(A-B)=0

In a Delta ABC , a, b, c are sides and A, B, C are angles opposite to them, then the value of the determinant |(a^(2),b sin A,c sin A),(b sin A,1,cos A),(c sin A,cos A,1)| , is

In any triangle ABC, prove that: a^(3)sin(B-C)+b^(3)sin(C-A)+c^(3)sin(A-B)=0

If the angle A,B and C of a triangle are in an arithmetic propression and if a,b and c denote the lengths of the sides opposite to A,B and C respectively,then the value of the expression (a)/(c)sin2C+(c)/(a)sin2A is (1)/(2)(b)(sqrt(3))/(2) (c) 1(d) sqrt(3)

If a,b, and c are the sides of a triangle and A,B and C are the angles opposite to a,b, and c, respectively,then a^(2)quad b sin A,c sin Ab=det[[b sin A,1,cos Ac sin A,cos A,1]]

If the angle A , B and C of a triangle are in arithmetic progession and if a , b and c denote the lengths of the sides to A , B and C respectively , then the value of the expression a/b sin 2C + c/a sin 2A is