In any triangle ABC, `sum(sin^(2)A+sinA+1)/(sinA)` is always greater than

In any triangle ABC sum(sin^(2)A+sin A+1)/(sin A) is always greater than or equal

In any !ABC , (Sigma)((sin^(2)A+sinA+1)/(sinA)) is always greater than

In any Delta ABC, sum a(sin B - sin C) =

In any Delta ABC, sum a sin (B -C) =

In triangle ABC, (sinA+sinB+sinC)/(sinA+sinB-sinC) is equal to

In any triangle ABC, sinA -cosB=cosC , then angle B is

Prove that in a triangle ABC , sinA/2 * sin B/2 *sin C/2 le 1/8 Also prove that equality holds if the triangle is equilateral.

In a triangle ABC , prove that ,(sinA+sinB)/2lt=sin((A+B)/2)