Does the data in this table represent a proportional relationship?
Yes, the table represents a proportional relationship because the ratios of all data points are equivalent.
Yes, the table represents a proportional relationship because the ratios of all data points are equivalent.
Yes, the table represents a proportional relationship because the unit rate is 1.
Yes, the table represents a proportional relationship because the unit rate is 1.
No, there is no unit rate for gallons of water used.
No, there is no unit rate for gallons of water used.
No, the unit rate is not equivalent to the other ratios.
No, the unit rate is not equivalent to the other ratios.
A caterpillar can crawl 1/2
of an inch in 1/4
of a minute. How far can he crawl in 1 minute?(1 point)
To find out how far the caterpillar can crawl in 1 minute, we need to calculate how many times 1/4 of a minute fits into 1 minute.
1 minute is equal to 4 quarters of a minute (1/4 * 4 = 1).
Therefore, the caterpillar can crawl 1/2 inch * 4 = 2 inches in 1 minute.
To determine if the data in a table represents a proportional relationship, you can check if the ratios of the data points are equivalent. In a proportional relationship, the ratios between the values in the table will be constant.
For example, if the table shows the number of hours worked and the amount earned:
Hours Worked | Amount Earned
----------------------------
1 | 10
2 | 20
3 | 30
We can calculate the ratios for each data point:
Ratio 1: 10 / 1 = 10
Ratio 2: 20 / 2 = 10
Ratio 3: 30 / 3 = 10
Since all the ratios are equal to 10, we can conclude that this table represents a proportional relationship.
In the case of the table you provided, if the ratios of the data points are equivalent, then it represents a proportional relationship. If the unit rate is 1 for all data points, it also indicates a proportional relationship. However, if there is no unit rate or if the unit rate is not equivalent to the other ratios, then it does not represent a proportional relationship.