Arccotangent is of Exponential Order Zero

Theorem
Let $\operatorname{arccot}: \R \to \left({0 \,.\,.\, \pi}\right)$ be the real arccotangent.

Then $\operatorname{arccot}$ is of exponential order $0$.

Proof
Follows from Function with Limit at Infinity of Exponential Order Zero.