Let `CC` and `RR` be the sets of complex numbers and real numbers respectively . Show that, the mapping `f:CC rarr RR` defined by, `f(z)=|z|`, for all `z in CC` is niether injective nor surjective.

Prove that the mapping f: RR rarr RR defined by , f(x)=x^(2)+1 for all x in RR is neither one-one nor onto.

Let f:R rarr R defined by f(x)= x^2/(1+x^2) . Prove that f is neither injective nor surjective.

Prove that the function f: RR rarr RR defined by, f(x)=sin x , for all x in RR is neither one -one nor onto.

Let NN be the set of natural numbers and D be the set of odd natural numbers. Then show that the mapping f:NN rarr D , defined by f(x)=2x-1, for all x in NN is a surjection.

Show that, the mapping f: RR rarr RR defined by f(x)=mx +n , where m,n, x in RR and m ne 0 , is a bijection.

Let RR and QQ be the set of real numbers and rational numbers respectively and f:RR to RR be defined as follows: f(x) =x^2 Find pre-image of (9).

Let RR and QQ be the sets of real numbers and rational numbers respectively. If a in QQ and f: RR rarr RR is defined by , f(x)={(x " when" x in QQ ),(a-x" when " x notin QQ ):} then show that , (f o f ) (x) = x , for all x in RR

If R denotes the set of all real numbers then the mapping f:R to R defined by f(x)=|x| is -

Show that , the function f: RR rarr RR defined by f(x) =x^(3)+x is bijective, here RR is the set of real numbers.

Let RR be the set of all real numbers and A={x in RR : 0 lt x lt 1} . Is the mapping f : A to RR defined by f(x) =(2x-1)/(1-|2x-1|) bijective ?