In triangle ABC , the value of `sin^(2)A-cosB(cosAcosC+cosB)-cosC(cosAcosB_cosC)` is

In triangle ABC , prove that sinA=sin(B+C)

In triangle ABC, the value of (cot""A/2cot ""B/2-1)/(cot ""A/2 cot ""B/2) is

In a triangle ABC, if a,b,c are the sides opposite to angles A,B,C respectively,then value of |(bcosC,a,c cosB),(c cosA,b,acosC),(acosB,c,bcosA)| is a)1 b)-1 c)0 d)a cos A + b cos B + cos C

In a triangle ABC, (b+c)(bc)cosA+(a+c)(ac)cosB+(a+b)(ab)cosC is

For any triangle ABC, prove that sin((B-C)/2)=(b-c)/acos(A/2)