f :(0, ∞) arrow(-(π/2), (π/2)) be defined as, f ( x )= arctan (ℓ nx ) The above function can be classified as

Question

f :(0, ∞) arrow(-(π/2), (π/2)) be defined as, f ( x )= arctan (ℓ nx ) The above function can be classified as (A) injective but not surjective (B) surjective but not injective (C) neither injective nor surjective (D) both injective as well as surjective

Tardigrade Admin · Accepted Answer

f(x)= tan -1( ln x) ∵ tan -1( x ) ℓ n x are increasing functions. ⇒ f(x) is also increasing function.

Q. $f : (0, \infty) \to (- \frac{π}{2}, \frac{π}{2})$ be defined as, $f (x) = arctan (ℓ n x)$
The above function can be classified as

injective but not surjective

surjective but not injective

neither injective nor surjective

both injective as well as surjective

$f (x) = tan^{- 1} (ln x)$
$∵ tan^{- 1} (x) & ℓ n x$ are increasing functions.
$\Rightarrow f (x)$ is also increasing function.

Q. f:(0,∞)→(−2π​,2π​) be defined as, f(x)=arctan(ℓnx) The above function can be classified as