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) Responses No, the ratios are not equivalent. No, the ratios are not equivalent. No, the table does not count consecutively. No, the table does not count consecutively. Yes, the data table has a proportional relationship. Yes, the data table has a proportional relationship. No, the ratio 7:35 is not proportional to the other ratios.
The given response correctly determines that the ratios in the data table are not equivalent and therefore, they do not have a proportional relationship.
To determine if the quantities in the data table are in a proportional relationship, we need to compare the ratios.
If the ratios are equivalent, then the quantities have a proportional relationship.
In this case, we have the ratios:
- No, the ratios are not equivalent.
- No, the ratios are not equivalent.
- No, the table does not count consecutively.
- No, the table does not count consecutively.
- Yes, the data table has a proportional relationship.
- Yes, the data table has a proportional relationship.
- No, the ratio 7:35 is not proportional to the other ratios.
Based on this information, we can see that the ratios are not consistent. Therefore, the quantities in the data table do not have a proportional relationship.
To determine if the quantities in a data table are in a proportional relationship, we need to compare the ratios between the values.
In this case, it seems like there are multiple options to choose from as a response. Let's go through each of them:
1. "No, the ratios are not equivalent." and "No, the table does not count consecutively.": It seems like these responses are not relevant to determining a proportional relationship. The question asks if the quantities have a proportional relationship, not if they are equivalent or count consecutively.
2. "Yes, the data table has a proportional relationship.": This response indicates that the data table indeed has a proportional relationship. However, without further context or information about the data table, it is not possible to confirm if it is correct or not.
3. "No, the ratio 7:35 is not proportional to the other ratios.": This response points out that the ratio 7:35 is different from the other ratios in the table. To determine if the data table has a proportional relationship, it is important to compare the ratios between all the quantities. If one ratio is not proportional to the others, then the data table does not have a proportional relationship.
To give a definitive answer, we would need specific information about the data table and the ratios between the quantities in order to determine if they have a proportional relationship or not.