Assertion (A): Let f: (e, ∞) → R defined by f(x) = log (log (log x)) is invertible. Reason (R): f is both one-one onto.

Question

Assertion (A): Let f: (e, ∞) → R defined by f(x) = log (log (log x)) is invertible. Reason (R): f is both one-one onto. (A) Both (A) (R) are individually true (R) is correct 3. explanation of (A). (B) Both (A) (R) are individually true but (R) is not the correct (proper) explanation of (A). (C) (A) is true but (R) is false. (D) (A) is false but (R) is true.

Tardigrade Admin · Accepted Answer

As x ∈ (e, ∞) ⇒ log x > 1 ⇒ log (log x) > log 1 ⇒ log (log x) > 0 ⇒ log (log (log x)) > log 0 ⇒ log (log (log x)) ∈ (-∞, ∞) ⇒ codomain of f(x) = Range of f(x) ⇒ f is onto Again log function is always 1 - 1 ∴ f(x) is both one - one onto.

Q. Assertion (A) : Let $f : (e, \infty) \to R$ defined by $f (x) = l o g (l o g (l o g x))$ is invertible.
Reason (R) : $f$ is both one-one & onto.

Both (A) & (R) are individually true & (R) is correct 3. explanation of (A).

Both (A) & (R) are individually true but (R) is not the correct (proper) explanation of (A).

(A) is true but (R) is false.

(A) is false but (R) is true.

Q. Assertion (A) : Let f:(e,∞)→R defined by f(x)=log(log(logx)) is invertible. Reason (R) : f is both one-one & onto.

Both (A) & (R) are individually true & (R) is correct 3. explanation of (A).

Both (A) & (R) are individually true but (R) is not the correct (proper) explanation of (A).

(A) is true but (R) is false.

(A) is false but (R) is true.

As x∈(e,∞) ⇒logx>1 ⇒log(logx)>log1 ⇒log(logx)>0 ⇒log(log(logx))>log0 ⇒log(log(logx))∈(−∞,∞) ⇒ codomain of f(x)= Range of f(x) ⇒f is onto Again log function is always 1−1 ∴f(x) is both one - one & onto.

Q. Assertion (A) : Let $f : (e, \infty) \to R$ defined by $f (x) = l o g (l o g (l o g x))$ is invertible.
Reason (R) : $f$ is both one-one & onto.