IM 7.2.7 Practice: Comparing Realtionships with Tables

Decide whether each table could represent a proportional relationship. If the relationship could be proportional, what would the constant of proportionality be?
How loud a sound is depending on how far away you are:[br] 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[/img]
The cost of fountain drinks at Hot Dog Hut.[br][br][img]data:image/png;base64,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[/img]
A taxi service charges $1.00 for the first ⅒ mile then $0.10 for each additional ⅒ mile after that. Fill in the table with the missing information and answer the question below.
Is this relationship between distance traveled and price of the trip a proportional relationship? How do you know?
A rabbit and turtle are in a race. Is the relationship between distance traveled and time proportional for either one? If so, write an equation that represents the relationship.[br][br][table][tr][td]Turtle’s run:[/td][td]Rabbit’s run:[/td][/tr][tr][td][img]data:image/png;base64,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[/img][/td][td][img]data:image/png;base64,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[/img][/td][/tr][/table]
For each table, answer: What is the constant of proportionality?
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[/img]
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[/img]
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[/img]
[img]data:image/png;base64,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[/img]
Kiran and Mai are standing at one corner of a rectangular field of grass looking at the diagonally opposite corner. Kiran says that if the the field were twice as long and twice as wide, then it would be twice the [br]distance to the far corner. Mai says that it would be more than twice as far, since the diagonal is even longer than the side lengths. Do you agree with either of them? Why or why not?
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Information: IM 7.2.7 Practice: Comparing Realtionships with Tables