Let `f:[-pi//2,pi//2] rarr [-1,1]` where f(x)=sinx. Find whether f(x) is one-one or not.

Function f : [(pi)/(2), (3pi)/(2)] rarr [-1, 1], f(x) = sin x is

Let f:[0,5] to [-1,5] , where f(x)={x^2-1,0 then f(x) is : (A) one-one and onto (B) one-one and into (C) many one and onto (D) many one and into

Let f : [-(pi)/(2), (pi)/(2)] rarr [3, 11] defined as f(x) = sin^(2)x + 4 sin x + 6 . Show that f is bijective function.

Let f:[-pi/2,\ pi/2]->A be defined by f(x)=sinx . If f is a bijection, write set A .

Function f[(1)/(2)pi, (3)/(2)pi] rarr [-1, 1], f(x) = cos x is

let f:[-pi/3,pi/6]rarr B defined by f(x)=2cos^2x+sqrt3sin2x+1 . Find B such that f^-1 exists. Also find f^-1

Let f:(-pi/2,pi/2)vecR be given by f(x)=(log(sec"x"+tan"x"))^3 then f(x) is an odd function f(x) is a one-one function f(x) is an onto function f(x) is an even function

Let f:[-pi/3,(2pi)/3] rarr [0,4] be a function defined as f(x)=sqrt(3)sinx-cosx+2. Then f^(-1)(x) is given by (a) sin^(-1)((x-2)/2)-pi/6 (b) sin^(-1)((x-2)/2)+pi/6 (c) (2pi)/3+cos^(-1)((x-2)/2) (d) none of these

If f :[2,oo)rarr(-oo,4], where f(x)=x(4-x) then find f^-1(x)

In function f(x)=cos^(-1)x+cos^(-1)(x/2+(sqrt(3-3x^2))/2) , then Range of f(x) is [pi/3,(10pi)/3]] Range of f(x) is [pi/3,5pi] f(x) is one-one for x in [-1,1/2] f(x) is one-one for x in [1/2,1]