If the function `g:(-oo,oo)->(-pi/2,pi/2)` is given by `g(u)=2tan^-1(e^u)-pi/2.` Then, `g` is

Let the function g: (-oo,oo)rarr (-pi //2,pi//2) be given by g(u) = 2 tan^(-1) (e^u)-pi/2 Then g is

If the function g:(-oo,oo)rarr(-(pi)/(2),(pi)/(2)) is given by g(u)=2tan^(-1)(e^(u))-(pi)/(2). Then g is

If g(x)=2tan^-1(e^x)-pi/2 is Even /odd

Consider the function f:(-oo,oo)rarr(-oo,oo) defined by f(x)=(x^2-ax+1)/(x^2+ax+1), 0ltalt2 , and let g(x)=int_0^(e^x) (f\'(t)dt)/(1+t^2) . Which of the following is true? (A) g\'(x) is positive on (-oo,0) and negative on (0,oo) (B) g\'(x) is negative on (-oo,0) and positive on (0,oo) (C) g\'(x) changes sign on both (-oo,0) and (0,oo) (D) g\'(x) does not change sign on (-oo,oo)

f: (0,oo) to (-pi/2,pi/2)" be defined as, "f(x)=tan^(-1) (log_(e)x) . The above function can be classified as :

f:(-(pi)/(2),(pi)/(2))rarr(-oo,oo) defined by f(x)=tan x is

f(x)=tan x,x in(-(pi)/(2),(pi)/(2)) and g(x)=sqrt(1-x^(2)) then g(f(x)) is

If f:(-(pi)/(2),(pi)/(2))rarr(-oo,oo) is defined by f(x)=tan x then f^(-1)(2+sqrt(3))=

A function g(x) satisfies the following conditions (i) Domain of g is (-oo,oo) (ii) Range is g is [-1,7] (iii) g has a period pi and (iv) g(2)=3 Then which of the following may be possible.