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

Let f :[1/2,oo)rarr[3/4,oo), where f(x)=x^2-x+1. Find the inverse of f(x). Hence or otherwise solve the equation, x^2-x+1=1/2+sqrt(x-3/4.

f:[-(pi)/2,pi/2]rarr[-1,1] is a bijection , if ......

If f(x)=x sin x then f'(pi/2) = ……

If f(x)=|cosx-sinx| , then f'(pi/4) is equal to

Show that the function f: R rarr R , defined as f(x) = x^2 , is neither one-one nor onto.

Let f:[-(pi)/(3),(2pi)/(3)]rarr[0,4] be a function defined as f(x) = sqrt(3)sin x -cosx +2 . Then f^(-1)(x) is given by

Show that f : [-1,1] rarr R , given by f(x) = (x)/(x+2) is one - one . Find the inverse of the function f:[-1,1] rarr Range f. (Hint: For y in Range f,y=f(x) = x/(x+2) , for some x in [-1,1] , i.e., x = (2y)/(1-y) ).

If f'(x)=sinx+sin4x.cosx, then f'(2x^(2)+pi/2) is

Let f(x) = ax^3 + bx^2 + cx + d sin x . Find the condition that f(x) is always one-one function.

Let f : N to N : f(x) =2 x for all x in N Show that f is one -one and into.