Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why. (1 point) O No, the table does not count consecutively. O No, the ratios are not equivalent. O No, the ratio 7 : 35 is not proportional to the other ratios O Yes, the data table has a proportional relationship
O No, the ratios are not equivalent.
To determine if the quantities in the data table are in a proportional relationship, we need to check if the ratios between the quantities are equivalent.
If the ratios are not equivalent, then the quantities do not have a proportional relationship.
The given answer choices are as follows:
No, the table does not count consecutively. This answer choice does not directly address the question of a proportional relationship.
No, the ratios are not equivalent. This answer choice indicates that the ratios are not the same, which suggests that the quantities may not have a proportional relationship.
No, the ratio 7 : 35 is not proportional to the other ratios. This answer choice points out that one ratio in the table is different from the other ratios, which implies that the quantities may not be proportional.
Yes, the data table has a proportional relationship. This answer choice states that the data table does have a proportional relationship.
Based on these options, the correct answer is:
O No, the ratios are not equivalent.
This answer choice best addresses the question and indicates that the quantities in the data table do not have a proportional relationship, as the ratios between them are not equivalent.
To determine if the quantities in the data table are in a proportional relationship, we need to examine the ratios between the quantities.
First, let's go through each option:
Option A: "No, the table does not count consecutively." This option is not relevant to determining if the quantities are proportional or not. Counting consecutively is not a requirement for a proportional relationship.
Option B: "No, the ratios are not equivalent." This option suggests that the ratios between the quantities are not the same. In a proportional relationship, the ratios should be equivalent, meaning they should have the same value.
Option C: "No, the ratio 7 : 35 is not proportional to the other ratios." This option indicates that one of the ratios (7:35) is not proportional to the others. This could imply that there is not a consistent relationship between the quantities.
Option D: "Yes, the data table has a proportional relationship." This option states that the quantities in the data table are indeed in a proportional relationship.
Based on the given information, it seems that option C is the correct answer. The ratio 7:35 is not proportional to the other ratios, which suggests that the quantities do not have a proportional relationship.