Complex Addition is Closed

Theorem
$$\forall z, w \in \mathbb{C}: z + w \in \mathbb{C}$$.

Proof
From the definition of complex numbers, we define the following:


 * $$z = x_1 + \imath y_1$$
 * $$w = x_2 + \imath y_2$$

where $$\imath = \sqrt {-1}$$ and $$x_1, x_2, y_1, y_2$$.

Then $$z + w = \left({x_1 + x_2}\right) + \imath \left({y_1 + y_2}\right)$$.

Real Addition is closed, from Additive Group of Real Numbers so $$\left({x_1 + x_2}\right) \in \mathbb{R}$$ and $$\left({y_1 + y_2}\right) \in \mathbb{R}$$.

Hence the result.