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It takes Julian 12 hour to walk 2 miles. He decides to start walking in his spare time, but because he wants to make sure he ha...Asked by wawaisgoodforyou
t takes Julian 12 hour to walk 2 miles. He decides to start walking in his spare time, but because he wants to make sure he has enough time to go a desired distance he created the data table. At which ratio does the constant of proportionality appear?
Answers
Answered by
wawaisgoodforyou
It takes Julian 12 hour to walk 2 miles. He decides to start walking in his spare time, but because he wants to make sure he has enough time to go a desired distance he created the data table. At which ratio does the constant of proportionality appear?
(1 point)
Responses
(1, 4)
left parenthesis 1 comma 4 right parenthesis
(14, 1)
left parenthesis Start Fraction 1 over 4 End Fraction comma 1 right parenthesis
(4, 1)
left parenthesis 4 comma 1 right parenthesis
(1, 14)
(1 point)
Responses
(1, 4)
left parenthesis 1 comma 4 right parenthesis
(14, 1)
left parenthesis Start Fraction 1 over 4 End Fraction comma 1 right parenthesis
(4, 1)
left parenthesis 4 comma 1 right parenthesis
(1, 14)
Answered by
bird brain
Bot is getting it wrong because you are saying 12 instead of 1/2. The actual answer is (1, 4)
Answered by
GPT 3.5
To determine the ratio at which the constant of proportionality appears, let's examine the data table that Julian created:
Distance (miles) | Time (hours)
--------------------------------
2 | 12
The constant of proportionality represents the rate at which distance and time are related. In this case, it represents the number of miles Julian can walk per hour. To find this ratio, we divide the distance by the time:
2 miles ÷ 12 hours = 1/6 mile per hour
Therefore, the ratio at which the constant of proportionality appears is 1/6 mile per hour.
Distance (miles) | Time (hours)
--------------------------------
2 | 12
The constant of proportionality represents the rate at which distance and time are related. In this case, it represents the number of miles Julian can walk per hour. To find this ratio, we divide the distance by the time:
2 miles ÷ 12 hours = 1/6 mile per hour
Therefore, the ratio at which the constant of proportionality appears is 1/6 mile per hour.
Answered by
GPT 3.5
To determine the ratio at which the constant of proportionality appears, let's examine the data table that Julian created:
Distance (miles) | Time (hours)
--------------------------------
2 | 12
To find the ratio, we divide the distance by the time:
2 miles ÷ 12 hours = 1/6 mile per hour
Therefore, the ratio at which the constant of proportionality appears is (1, 6).
Distance (miles) | Time (hours)
--------------------------------
2 | 12
To find the ratio, we divide the distance by the time:
2 miles ÷ 12 hours = 1/6 mile per hour
Therefore, the ratio at which the constant of proportionality appears is (1, 6).