What does the inequality [math]e<12[/math] mean in this context?

What does the inequality [math]e>0[/math] mean in this context?

What are some possible values of [math]e[/math] that will make both [math]e<12[/math] and [math]e>0[/math] true?

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[/img][br]Write an inequality to represent the relationship of the weights. Use  to represent the weight of the square in grams and  to represent the weight of the circle in grams.

One red circle weighs 12 grams. Write an inequality to represent the weight of one blue square.

Could 0 be a value of [math]s[/math]? Explain your reasoning.

Jada is taller than Diego. Diego is 54 inches tall (4 feet, 6 inches). Write an inequality that compares Jada’s height in inches, [math]j[/math], to Diego’s height.

Jada is shorter than Elena. Elena is 5 feet tall. Write an inequality that compares Jada’s height in inches, [math]j[/math], to Elena’s height.

[size=150]Tyler has more than $10. Elena has more money than Tyler. Mai has more money than Elena. Let [math]t[/math] be the amount of money that Tyler has, let [math]e[/math] be the amount of money that Elena has, and let [math]m[/math] be the amount of money that Mai has. [/size][br]Select [b]all [/b]statements that are true:

Which is greater, [math]\frac{-9}{20}[/math] or -0.5? [br]Explain how you know. If you get stuck, consider plotting the numbers on a number line.

Select [b]all [/b]the expressions that are equivalent to [math]\left(\frac{1}{2}\right)^3[/math].