Statement I For any `DeltaABC.`
`sin((A+B+C)/(3))ge(sinA+sinB+sinC)/(3)`
Statement II y= sin x is concave downward for `x in (0,pi]`

In any DeltaABC, find sin A+sin B+ sin C.

In Delta ABC, if (Sin A + SinB + SinC) (SinA + SinB - SinC) = 3SinA SinB then C =

Solve |sqrt(3) cos x - sin x |ge 2 for x in [0,4pi] .

Statement I y=asin x+bcos x is general solution of y''+y=0. Statement II y=a sin x+b cos x is a trigonometic function.

Consider f(x) = {{:(2 sin (a cos^(-1) x)",","if",x in (0, 1)),(sqrt(3)",","if",x = 0),(ax + b",","if",x lt 0):} Statement I If b = sqrt(3) and a = (2)/(3) , then f(x) is continuous in (-oo, 1) . Statement II If a function is defined on an interval I and limit exists at every point of interval I, then function is continuous in I.

Statement I The number of solution of the equation |sin x|=|x| is only one. Statement II |sin x| ge 0 AA x in R .

If x+y=(4pi)/(3) and sin x = 2 sin y , then

In DeltaABC ,prove that: a) sin2A + sin2B-sin2C=4cosA cosB sinC

In a DeltaABC,3 sin A+4 cos B=6 and 3 cos A+4 sinB=1 , then angleC can be

Statement I In any triangle ABC a cos A+b cos B+c cos C le s. Statement II In any triangle ABC sin ((A)/(2))sin ((B)/(2))sin ((C)/(2))le 1/8