The value of k, for which
`(cos x+ sin x)^(2) +k sin x cos x-1 =0` is an identity, is

The values of x for which min(sin x, cos x) > min(-sin x,-cos x) where x in(0,2 pi) equals:

The value of k for which f(x)= {((1-cos 2x )/(x^2 )", " x ne 0 ),(k ", "x=0):} continuous at x=0, is :

The minimum value of sin x((1-cos x)/(sin x)+(sin x)/(1-cos x)) is

The value of (sin x cos y + cos x sin y)^2+(cos x cos y -sin x sin y)^2 is equal to

" The values of "x" for which "min(sin x,cos x)>min(-sin x,-cos x)" where "x in(0,2 pi)" equals: "

Maximum value of cos x((cos x)/(1-sin x)+(1-sin x)/(cos x))

The values of k,for which the system of equations cos x cos2y=(k^(2)-4)^(2)+1 and sin x sin2y=k+2 holds,is (are) given by

The set of value(s) of k for which f(x)=sin x-cos x-kx is decreasing for all values of x ,is

The set of values of x for which sin x*cos^(3)x>cos x*sin^(3)x,0<=x<=2 pi, is NOT satisfied is :

If the function (cos x+K sin x)/(2cos x+3sin x) is decreasing in its domain then K is