If A , B and C are interior angles of triangle ABC ,then show that sin ` ((B+C)/( 2) )=cos (A) /(2) `

If A , B and C are interior angles of a triangle ABC, then show that tan ((A+B) /(2)) =cot ©/(2)

If A, B, C are the angles of a triangle such that sin^(2)A+sin^(2)B=sin^(2)C , then

In a Delta ABC, prove that a sin ((A)/(2) + B) = (b + c) sin ""(A)/(2)

In a triangle ABC , a =2,b=3 and sin A = (2)/(3) then cos C=

In triangle A B C ,a , b , c are the lengths of its sides and A , B ,C are the angles of triangle A B Cdot The correct relation is given by (a) (b-c)sin((B-C)/2)=acosA/2 (b) (b-c)cos(A/2)=as in(B-C)/2 (c) (b+c)sin((B+C)/2)=acosA/2 (d) (b-c)cos(A/2)=2asin(B+C)/2

In a triangle ABC, prove that b^(2) sin 2C+c^(2) sin 2B=2bc sin A .

Show that cos[(B-C)/2]=(b+c)/a sin(A/2)

If in a triangle ABC , a=15 , b= 36 , c = 39 then sin"" (C )/(2) =

If triangleABC is a right triangle and if angleA=pi/2 , then prove that (i) cos^(2) B+cos^(2)C=1 (ii) sin^(2) B+sin^(2) C=1 cos B-cos C=-1+2 sqrt2 cos""B/2sin ""C/2