Counterexamples John says that if one side of an inequality is 0, you
don’t have to reverse the inequality symbol when you multiply or divide
both sides by a negative number. Find an inequality that you can use
to disprove John’s statement. Explain your thinking.

He may be wrong. If he was wrong, this is the example.

0 < -10x

If we were to divide both sides by -10, even though the answer would be undefined or just end up as zero, it is just a common rule to always flip the sign whenever you divide or multiply by a negative.

Don't quote me on it, but I think I'm right.

Hope this helped!

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Аноним Аноним · Answer 2 · 2019-08-27T15:54:52+02:00

Answer with explanation:

Mathematically , john's statement is wrong which is:→ if one side of an inequality is 0, you don’t have to reverse the inequality symbol when you multiply or divide both sides by a negative number.

Counterexample :Consider an example

→ 4x ≥ 0, where x is a positive integer.

If we multiply or divide both sides by , -1, the inequality would result into

→ -4x ≤ 0

This transformed inequality is valid only when ,x is a Positive Integer.Here after multiplying by negative integer ,if we will not change the inequality sign, it will be an invalid Inequality.

Counterexamples John says that if one side of an inequality is 0, you don’t have to reverse the inequality symbol when you multiply or divide both sides by a negative number. Find an inequality that you can use to disprove John’s statement. Explain your thinking.

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Counterexamples John says that if one side of an inequality is 0, you
don’t have to reverse the inequality symbol when you multiply or divide
both sides by a negative number. Find an inequality that you can use
to disprove John’s statement. Explain your thinking.