Answer
Case 1: $x$ is negative and $y$ is negative
Case 2: $x$ is negative and $y$is non-negative
Case 3: $x$ is nonnegative and $y$ is negative
Case 4: $x$ is nonnegative and $y$ is nonnegative
Work Step by Step
We want to proof $|x y|=|x| \cdot|y|$ with a proof by Cases.
The absolute value of $x$ has two options:
If $x$ is negative, then $|x|=-x$
If $x$ is non-negative, then $|x|=x$
The absolute value of $y$ has two options
If $y$ is negative, then $|y|=-y$
If $y$ is nonnegative, then $|y|=y$
The cases of the proof by cases should then be any combination of the two possibilities of $x$ and $y$
Case 1: $x$ is negative and $y$ is negative
Case 2: $x$ is negative and $y$ is non-negative
Case 3: $x$ is nonnegative and $y$ is negative
Case 4: $x$ is nonnegative and $y$ is nonnegative
Hence with the help of these cases, we can say that $|x y|=|x| \cdot|y|$
