The table shows the number of apples and the total weight of the apples.[br][br][center][img]data:image/png;base64,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[/img][/center][br][br]Estimate the weight of 6 apples.

Select [b]all [/b]stories that the tape diagram can represent.[br][br][img]data:image/png;base64,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[/img]

Andre wants to save $40 to buy a gift for his dad. Andre’s neighbor will pay him weekly to mow the lawn, but Andre always gives a $2 donation to the food bank in weeks when he earns money. Andre calculates that it will take him 5 weeks to earn the money for his dad’s gift. He draws a tape diagram to represent the situation.[br][center][img]data:image/png;base64,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[/img][/center][br][br]Explain how the parts of the tape diagram represent the story.

How much does Andre’s neighbor pay him each week to mow the lawn?

Without evaluating each expression, determine which value is the greatest.

[i]Explain [/i]how you know.

[math]\left(8.5\right)\cdot\left(-3\right)=a[/math]

[math]\left(-7\right)+b=\left(-11\right)[/math]

[math]c-\left(-3\right)=15[/math]

[math]d\cdot\left(-4\right)=32[/math]