Let the function `f: QQ` be defined by `f(x)=4x-5` for all `x in QQ`. Show that f is invertible and hence find `f^(-1)`

Let the function f:R to R be defined by f(x)=x+sinx for all x in R. Then f is -

Let the function f: RR rarr RR be defined by, f(x)=x^(3)-6 , for all x in RR . Show that, f is bijective. Also find a formula that defines f ^(-1) (x) .

Let QQ be the set of rational numbers, If f: QQ rarr QQ is defined by f(x)=ax+b , where a, b, x in QQ and a ne 0 , then show that f is invertible and hence find f^(-1)

If the function f: R to R is defined by f(x) =(x^(2)+1)^(35) for all x in RR then f is

Let the function f : R to R be defined by f(x)= 2x + cos x , then f(x)-

Let RR^(+) be the set of positive real numbers and f: RR rarr RR ^(+) be defined by f(x) =e^(x) . Show that, f is bijective and hence find f^(-1)(x)

Let t the function f:RR to RR be defined by, f(x)=a^x(a gt0 ,a ne1). Find range of f

Consider f: R to R given by f (x) = 4x + 3. Show that f is invertible. Find the inverse of f.

let A={x:-(pi)/(2) le x le (pi)/(2)} and B={x:-1 le x le 1} . Show that the function f: A rarr B defined by, f(x)= sin x for all x in A , is bijective . Hence, find a formula that defines f^(-1)

let A =RR-{-(1)/(2)} and B=RR -{(1)/(2)} . Prove that function f: A rarr B define by , f(x)=(x+2)/(2x+1) is invertible and hence find f^(-1) (x)