Find the value of `x` for which `f(x)=sqrt(sinx-cosx)` is defined, `x in [0,2pi)dot`

The set of values of x for which sinx.cos^3x>cosx.sin^3x "in" [0,2pi] ,is

Find the value of x in [-pi,pi] for which f(x)=sqrt(log_(2)(4sin^(2)x-2sqrt(3)sin x-2sin x+sqrt(3)+1)) is defined.

Find the values of x where function f(X)m = (sin x + cosx)(e^(x)) in (0,2pi) has point of inflection

Find the value of a' for which the function f defined by f(x)={a(sin pi)/(2)(x+1),quad x 0 is continuous at x=0

Find the value of a for which the function f defined by f(x)={a(sin pi)/(2)(x+1),x 0 is continous at x=0

Find the values of x for which the following function is defined: f(x)=sqrt((1)/(|x-2|-(x-2)))

Find the values of x for which the follwing function is defined: f(x)=sqrt(1)/(|x-2|-(x-2))

Find the value of the following: int_0^(pi/4) (1+sin2x)/(cosx+sinx)dx

Find the values of x, if any, for which f(x) has local maximum and local minimum when f(x)=sinx+cosx, x in [0, 2pi]

The maximum value of f(x)=(sin2x)/(sinx+cosx) in the interval (0, (pi)/(2)) is