Functionally Complete Logical Connectives/Conjunction, Negation and Disjunction

Theorem
The set of logical connectives:
 * $\left\{{\neg, \land, \lor}\right\}$: Not, And and Or

is functionally complete.

Proof
From the stronger results:
 * Functionally Complete Logical Connectives: Negation and Disjunction:
 * the set of logical connectives: $\left\{{\neg, \lor}\right\}$ is functionally complete
 * Functionally Complete Logical Connectives: Negation and Conjunction:
 * the set of logical connectives: $\left\{{\neg, \land}\right\}$ is functionally complete

it follows directly that $\left\{{\neg, \land, \lor}\right\}$ is likewise functionally complete.