Complex Subtraction/Examples/(7 + i) - (4 - 2i)/Proof 2

Proof

 * Complex-Subtraction-(7+i)-(4-2i).png

By definition of complex subtraction:


 * $\paren {7 + i} - \paren {4 - 2 i} = \paren {7 + i} + \paren {-4 + 2 i}$

Let the complex numbers $7 + i$ and $-4 + 2 i$ be represented by the points $P_1$ and $P_2$ respectively in the complex plane.

Complete the parallelogram with $OP_1$ and $OP_2$ as the adjacent sides.

Using Geometrical Interpretation of Complex Addition, the point $P$ represents the complex number $3 + 3 i$, which is the sum of $7 + i$ and $-4 + 2 i$.

Hence, $3 + 3 i$ is the difference of $7 + i$ and $2 - 5 i$.