How much would a package with 18 slices cost at the same price per slice? Explain or show your reasoning.

How many copies can it print in 10 minutes?

A teacher printed 720 copies. How long did it take to print?

Order these objects from heaviest to lightest.[br](Note: 1 pound = 16 ounces, 1 kilogram ≈ 2.2 pounds, and 1 ton = 2,000 pounds)[br][br][img]data:image/png;base64,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[/img]

Andre sometimes mows lawns on the weekend to make extra money. Two weeks ago, he mowed a neighbor’s lawn for [math]\frac{1}{2}[/math] hour and earned $10. Last week, he mowed his uncle’s lawn for [math]\frac{3}{2}[/math] hours and earned $30. This week, he mowed the lawn of a community center for 2 hours and earned $30.[br][br]Which jobs paid better than others? Explain your reasoning.

[math]\frac{1}{2}\cdot17[/math]

[math]\frac{3}{4}\cdot200[/math]

[math]\left(0.2\right)\cdot40[/math]

[math]\left(0.25\right)\cdot60[/math]

Calculate its area. Organize your work so that it can be followed by others.