[list][*]5 miles in 15 minutes[/*][*]3 minutes per mile[/*][*]20 miles per hour[/*][*]32 kilometers per hour[/*][/list]

What do you notice about the values in this table?

Noah bought [math]b[/math] burritos and paid [math]c[/math] dollars. Lin bought twice as many burritos as Noah and paid twice the cost he did. How much did Lin pay per burrito?[br][br][img]data:image/png;base64,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[/img]

Explain why, if you can buy [math]b[/math] burritos for [math]c[/math] dollars, or buy [math]2⋅b[/math] burritos for [math]2⋅c[/math] dollars, the cost per item is the same in either case.

Explain the strategy you used to complete the table.[br]

Next, compare your results with those in the first table in the previous activity. Do they match? Explain why or why not.

Jada eats 2 scoops of ice cream in 5 minutes. Noah eats 3 scoops of ice cream in 5 minutes. How long does it take them to eat 1 scoop of ice cream working together (if they continue eating ice cream at the same rate they do individually)?

The garden hose at Andre's house can fill a 5-gallon bucket in 2 minutes. The hose at his next-door neighbor’s house can fill a 10-gallon bucket in 8 minutes. If they use both their garden hoses at the same time, and the hoses continue working at the same rate they did when filling a bucket, how long will it take to fill a 750-gallon pool?