Determine if the quantities in the data table are in a proportional relationship. If they are not in a proportional relationship, indicate why. (1 point) O No, the ratios are not equivalent. O Yes, the ratios are in a proportional relationship. © No, the ratio of 3 hours to $27 is not proportional. O No, the ratio of 1 hour to $9 is not proportional
The correct answer is:
© No, the ratio of 3 hours to $27 is not proportional.
To determine if the quantities in the data table are in a proportional relationship, we need to check if the ratios between the two quantities are equivalent for different values.
The given options are:
O No, the ratios are not equivalent.
O Yes, the ratios are in a proportional relationship.
© No, the ratio of 3 hours to $27 is not proportional.
O No, the ratio of 1 hour to $9 is not proportional.
Now let's analyze the ratios in the data table:
1) Ratio of 3 hours to $27: 3 hours / $27 = 1/9
2) Ratio of 1 hour to $9: 1 hour / $9 = 1/9
Since both ratios reduce to 1/9, the ratios are equivalent. Therefore, the correct answer is:
O Yes, the ratios are in a proportional relationship.
To determine if the quantities in the data table are in a proportional relationship, we need to compare the ratios.
The given options are as follows:
A) No, the ratios are not equivalent.
B) Yes, the ratios are in a proportional relationship.
C) No, the ratio of 3 hours to $27 is not proportional.
D) No, the ratio of 1 hour to $9 is not proportional.
Since we do not have the specific data table mentioned in the question, we cannot determine the correct answer. To determine if the quantities are in a proportional relationship, we need the actual data table and calculate the ratios.