1. Why does the inequality sign change when both sides of the inequality are multiplied or divided by a negative number? Does this happen with equations? Why or why not?

2. Write an inequality for your classmates to solve. In your inequality, use both the multiplication and addition properties of inequalities. Example: 3x + 5 < 5x + 17
I answered the first part can I get some help on number 2??

They give an example. You are supposed to write this inequality.

Sure! I can help you with the second part.

To create an inequality that uses both the multiplication and addition properties of inequalities, we can start by choosing two numbers and two variables. Let's say we choose the number 2 and the number 3, and the variables x and y.

Our inequality could look like this: 2x + 3y > 4x - 2

In this inequality, we have used the multiplication property of inequalities by multiplying the variables x and y by positive numbers (2 and 3, respectively) on both sides of the inequality sign.

We have also used the addition property of inequalities by adding a positive number (3) to both sides of the inequality sign.

Now, it's your classmates' turn to solve the inequality!

Please note that you can choose different numbers and variables in your inequality, as long as you follow the principles of using the multiplication and addition properties of inequalities correctly.