`f(x)=e^(lncot), g(x)=cot^(- 1)x`

f(x)=In" "e^(x), g(x)=e^(Inx) . Identical function or not?

If f(x)=sinx+cosx, g(x)=x^(2)-1, then g(f(x)) is invertible in the domain

Which of the following pairs of function are identical? a. f(x)=e^(In sec^(-1)x) " and " g(x)=sec^(-1)x b. f(x)=tan(tan^(-1)x) " and " g(x)=cot(cot^(-1)x) c. f(x)=sgn(x) and g(x)=sgn(sgn(x)) d. f(x)=cot^(2)*cos^(2)x " and " g(x)=cot^(2)x-cos^(2)x

f(x)=cot^(2)x*cos^(2)x , and g(x)=cot^(2)x-cos^(2)x prove that f(x)=g(x)

f(x)=log_(e)x, g(x)=1/(log_(x)e) . Identical function or not?

The interval in which f(x)=cot^(-1)x+x increases , is

f(x)=sgn(cot^(- 1)x),g(x)=sgn(x^2-4x+5)

Let f,g and h be real-valued functions defined on the interval [0,1] by f(x)=e^(x^2)+e^(-x^2) , g(x)=x e^(x^2)+e^(-x^2) and h(x)=x^2 e^(x^2)+e^(-x^2) . if a,b and c denote respectively, the absolute maximum of f,g and h on [0,1] then

Consider two functions f(x)=1+e^(cot^(2)x) " and " g(x)=sqrt(2abs(sinx)-1)+(1-cos2x)/(1+sin^(4)x). bb"Statement I" The solutions of the equation f(x)=g(x) is given by x=(2n+1)pi/2, forall "n" in I. bb"Statement II" If f(x) ge k " and " g(x) le k (where k in R), then solutions of the equation f(x)=g(x) is the solution corresponding to the equation f(x)=k.

f(x) =e^x and g(x) = log e^x, then which of the following is TRUE?