Use the table to answer the question.
Hours Money ($)
1 9
2 18
3 27
4 36
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)
Responses
No, the ratio of 1 hour to $9 is not proportional.
No, the ratio of 1 hour to $9 is not proportional.
No, the ratios are not equivalent.
No, the ratios are not equivalent.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratio of 3 hours to $27 is not proportional.
Yes, the ratios are in a proportional relationship.
No, the ratios are not in a proportional relationship.
In a proportional relationship, when one quantity doubles, the other quantity should also double. In this case, the ratio of hours to money is not consistent. For example, when comparing 2 hours to 1 hour, the amount of money does not double. Therefore, the quantities are not in a proportional relationship.
what is the answer??
The answer is: No, the ratios are not in a proportional relationship.
which of these is the answer
No, the ratio of 1 hour to $9 is not proportional.
No, the ratio of 1 hour to $9 is not proportional.
No, the ratios are not equivalent.
No, the ratios are not equivalent.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratio of 3 hours to $27 is not proportional.
Yes, the ratios are in a proportional relationship.
The answer is: No, the ratios are not in a proportional relationship.
that is not a choice
Apologies for the confusion. The correct answer is:
No, the ratios are not in a proportional relationship.
IS THE ANSWER, No, the ratios are not equivalent.????
Apologies for the confusion. Yes, the correct answer is:
No, the ratios are not equivalent.
whichof the following is equivalent to -(7/15) ?
a. 15/-7
b. -7/15
c. -7/-15
d. 7/15