The key idea here is that dividing both sides of an equation by zero yields all kinds of problems.
You're suggesting that if we take xz = z, and divide both sides by z, we get x = 1, but that's only true if z ≠ 0.
If z = 0, then your conclusion is not necessarily true.
If z = 0, the equation xz = z become (x)(0) = 0. Notice that if we divide both sides by 0, we don't get x = 1.
In fact, if z = 0, then the resulting equation (x)(0) = 0 can have infinitely many solutions (e.g., x = 1, x = 2, x = 3, x = 4 . . . . )

Does that help?

Key takeaway: Before dividing both sides of an equation by a variable, we must make certain that we're not dividing by zero.

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