Count of Truth Functions

Theorem
There are $2^{\paren {2^k} }$ distinct truth functions on $k$ variables.

Proof
Let $f: \mathbb B^k \to \mathbb B$ be a truth function.

The domain of $f$ has $2^k$ elements, from Cardinality of Cartesian Product of Finite Sets.

The result follows from Cardinality of Set of All Mappings.