`cosec^(-1)(cos x)` is real if

If cosec^(-1) ( cosec x) " and " cosec ( cosec^(-1) x) are equal functions, then the maximum range of value of x is

Find the value of x for which csc^(-1)(cos x) is defined.

If cosec^(-1) (cosec x) and cosec (cosec^(-1) x) are equal function then the maximum range of value of x is

(cotx)/(1+cosec x)+ (1+cosec x)/(cot x) is equal to: (cotx)/(1+cosec x)+ (1+cosec x)/(cot x) का मान है:

D(cos x csc x)=

The value of int(x^(2)+cos^(2)x)/(1+x^(2))"cosec"^(2)x dx is equal to:

lim_(x rarr0+)((sin x)^((1)/(x))+(cos x)^(1/x)+(cosec x)^(x)) is equal to

int(x^(2)+cos^(2)x)/(x^(2)+1)."cosec"^(2)xdx is equal to

If y = sec^(-1) [ "cosec x"] + "cosec"^(-1) [sec x] + sin^(-1) [cos x] + cos^(-1)[sinx ], "then "(dy)/(dx) is equal to

The domain of the function f(x)=cos^(-1)(sec(cos^-1 x))+sin^(-1)(cosec(sin^(-1)x)) is