Highly Composite Number/Examples/1

Example of Highly Composite Number
$1$ is a highly composite number, being the smallest positive integer with $1$ divisor or more.

Proof
From Tau Function of 1:
 * $\map \tau 1 = 1$

The positive integer $1$ has $1$ divisor, that is, $1$ itself.

Vacuously, no smaller positive integer has a greater number of divisors.

Thus, despite not actually being composite, $1$ is a highly composite number.