f(x)=cos sqrt(x)," correct statement is - "

Statement 1 : The domain of the function f(x)=sqrt(x-[x])" is "R^(+) Statement 2 : The domain of the function sqrt(f(x)) is {x : f (x) ge 0} .

Statement 1 : The domain of the function f(x)=sqrt(x-[x])" is "R^(+) Statement 2 : The domain of the function sqrt(f(x)) is {x : f (x) ge 0} .

If f:A rarr B defined as f(x)=2sinx-2 cos x+3sqrt2 is an invertible function, then the correct statement can be

If f:A rarr B defined as f(x)=2sinx-2 cos x+3sqrt2 is an invertible function, then the correct statement can be

Let F(x) =int_(a)^(x^(2)) cos sqrt(t)dt Statement-1: F'(x)=cos x Statement-2: If f(x) =int_(a)^(x) phi(t) dt , then f'(x)= phi (x).

Let F(x) =int_(a)^(x^(2)) cos sqrt(t)dt Statement-1: F'(x)=cos x Statement-2: If f(x) =int_(a)^(x) phi(t) dt , then f'(x)= phi (x).

If f:A rarr B defined by f(x)=sinx-cosx+3sqrt2 is an invertible function, then the correct statement can be

If f:A rarr B defined by f(x)=sinx-cosx+3sqrt2 is an invertible function, then the correct statement can be

Let f(x)=cos(x cos((1)/(x))) statement- -1:f(x) is discontinuous at x=0. Statement- 2: Lim -(x rarr0)f(x) does not exist.

Identify the correct statement The period of f(x)=sin cos((x)/(2))+cos(sin x) is 2 pi