Identity Element of Natural Number Multiplication is One

Theorem
Let $\N$ be the natural numbers. Let $1$ be the element one of $\N$.

Then $1$ is the identity element of multiplication:
 * $\forall n \in \N: n \times 1 = n = 1 \times n$

Proof
Firstly, by definition of multiplication:

Next, recall that multiplication is recursively defined as:


 * $\forall m, n \in \N: \begin{cases}

m \times 0 & = 0 \\ m \times \paren {n + 1} & = m \times n + m \end{cases}$

From the Principle of Recursive Definition, there is only one mapping $f$ satisfying this definition for $m = 1$; that is, such that:


 * $\forall n \in \N: \begin {cases}

\map f 0 = 0 \\ \map f {n + 1} = \map f n + 1 \end{cases}$

Consider now $f'$ defined as $\map {f'} n = n$.

Then evidently $\map {f'} 0 = 0$.

Also:

showing that $f'$ also satisfies the definition for $1 \times n$.

Hence $n \times 1 = 1 \times n = n$ for all $n \in \N$.

That is, $1$ is the identity element for multiplication.