Use the table to answer the question.
Time (hours) Pages read
1/2 15
1 30
1 1 2 45
2 60
Ruth can read 15 pages in 30 minutes. She decides to create a table to keep track of her progress. From the data provided, at what ratio is the constant of proportionality?
(1, 30)
(15, 1/2)
(2, 60)
(1 1/2, 30)
Use the table to answer the question.
Time (min) 1 2 3 7 10
Water Used (gal) 5 10 15 35 50
Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why.
No, the ratio 7:35 is not proportional to the other ratios.
No, the table does not count consecutively
No, the ratios are not equivalent.
Yes, the data table has a proportional relationship.
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.
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional.
Use the table to answer the question.
Hours Biked Miles Traveled
1 12
2 26
3 30
4 48
Determine if the quantities in the data table are in a proportional relationship. If they do not have a proportional relationship, indicate why.
Yes, this data table has a proportional relationship.
No, none of the ratios have equivalence
No, you can’t bike 12 miles in an hour.
No, not all of the ratios are proportional or have equivalence.
28 answers
No, not all of the ratios are proportional or have equivalence. Specifically, the ratio of 2 hours to 26 miles and the ratio of 3 hours to 30 miles do not have the same value.
Use the table to answer the question.
Time (hours) Pages read
1/2 15
1 30
1 1 2 45
2 60
Ruth can read 15 pages in 30 minutes. She decides to create a table to keep track of her progress. From the data provided, at what ratio is the constant of proportionality?
(1, 30)
(15, 1/2)
(2, 60)
(1 1/2, 30)
Time (hours) Pages read
1/2 15
1 30
1 1 2 45
2 60
Ruth can read 15 pages in 30 minutes. She decides to create a table to keep track of her progress. From the data provided, at what ratio is the constant of proportionality?
(1, 30)
(15, 1/2)
(2, 60)
(1 1/2, 30)
From the data provided, the ratio (time, pages read) that represents the constant of proportionality is (1, 30).
Use the table to answer the question.
Hours Biked Miles Traveled
1 12
2 26
3 30
4 48
Determine if the quantities in the data table are in a proportional relationship. If they do not have a proportional relationship, indicate why.
Yes, this data table has a proportional relationship.
No, none of the ratios have equivalence
No, you can’t bike 12 miles in an hour.
No, not all of the ratios are proportional or have equivalence.
Hours Biked Miles Traveled
1 12
2 26
3 30
4 48
Determine if the quantities in the data table are in a proportional relationship. If they do not have a proportional relationship, indicate why.
Yes, this data table has a proportional relationship.
No, none of the ratios have equivalence
No, you can’t bike 12 miles in an hour.
No, not all of the ratios are proportional or have equivalence.
No, not all of the ratios are proportional or have equivalence. Specifically, the ratio of 2 hours to 26 miles and the ratio of 3 hours to 30 miles do not have the same value.
Use the table to answer the question.
Time (min) 1 2 3 7 10
Water Used (gal) 5 10 15 35 50
Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why.
No, the ratio 7:35 is not proportional to the other ratios.
No, the table does not count consecutively
No, the ratios are not equivalent.
Yes, the data table has a proportional relationship.
Time (min) 1 2 3 7 10
Water Used (gal) 5 10 15 35 50
Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why.
No, the ratio 7:35 is not proportional to the other ratios.
No, the table does not count consecutively
No, the ratios are not equivalent.
Yes, the data table has a proportional relationship.
No, the ratios in the data table are not in a proportional relationship. This is because the ratio 7:35 is not proportional to the other ratios in the table.
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.
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional.
Hours Money ($)
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.
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional.
No, the ratios in the data table are not in a proportional relationship. This is because the ratio of 3 hours to $27 is not proportional to the other ratios in the table.
Use the table to answer the question.
Hours Money ($)
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.
The answers are:
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional.
Hours Money ($)
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.
The answers are:
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional.
I apologize for the confusion in my previous response. The correct answer is: Yes, the ratios in the data table are in a proportional relationship. The ratio of hours to money is consistent at 1 to 9 throughout the table.
Use the table to answer the question.
Time (min) 1 2 3 7 10
Water Used (gal) 5 10 15 35 50
Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why.
The answers are:
No, the ratio 7:35 is not proportional to the other ratios.
No, the table does not count consecutively
No, the ratios are not equivalent.
Yes, the data table has a proportional relationship.
Time (min) 1 2 3 7 10
Water Used (gal) 5 10 15 35 50
Determine if the quantities in the data table re in a proportional relationship. If they do not have a proportional relationship, indicate why.
The answers are:
No, the ratio 7:35 is not proportional to the other ratios.
No, the table does not count consecutively
No, the ratios are not equivalent.
Yes, the data table has a proportional relationship.
No, the quantities in the data table are not in a proportional relationship. The ratios between time and water used are not equivalent, indicating that the relationship is not proportional.
BOT YOU WERE SUPPOSED TO CHOICE ONE OF THE ANSWERS GOD LEE I BEEN ON THIS APP FOR HOURS AND GOT OTHER THINGS TO DO WITH MY DAY
I apologize for the confusion. Based on the information provided, the correct answer is: No, the ratios in the data table are not in a proportional relationship. The ratio of 7 minutes to 35 gallons is not proportional to the other ratios in the table.
Bot that was not one of the answers
I apologize for the mistake. From the options provided, the correct answer is: No, the ratios are not equivalent.
Use the table to answer the question.
Hours Money ($)
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.
The ANSWERS ARE:
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional
CHOICE one of these as a answer
Hours Money ($)
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.
The ANSWERS ARE:
Yes, the ratios are in a proportional relationship.
No, the ratio of 3 hours to $27 is not proportional.
No, the ratios are not equivalent.
No, the ratio of 1 hour to $9 is not proportional
CHOICE one of these as a answer
The correct answer is: Yes, the ratios are in a proportional relationship. The ratio of hours to money ($9) remains constant throughout the table.
Use the table to answer the question.
Hours Biked Miles Traveled
1 12
2 26
3 30
4 48
Determine if the quantities in the data table are in a proportional relationship. If they do not have a proportional relationship, indicate why.
THE ANSWERS ARE
Yes, this data table has a proportional relationship.
No, none of the ratios have equivalence
No, you can’t bike 12 miles in an hour.
No, not all of the ratios are proportional or have equivalence.
CHOICE ONE OF THESE AS A ANSWER
Hours Biked Miles Traveled
1 12
2 26
3 30
4 48
Determine if the quantities in the data table are in a proportional relationship. If they do not have a proportional relationship, indicate why.
THE ANSWERS ARE
Yes, this data table has a proportional relationship.
No, none of the ratios have equivalence
No, you can’t bike 12 miles in an hour.
No, not all of the ratios are proportional or have equivalence.
CHOICE ONE OF THESE AS A ANSWER
The correct answer is: Yes, this data table has a proportional relationship. The ratio of hours biked to miles traveled remains constant throughout the table.
Are all of these answers correct
4,1
(1, 30)
G No, the ratios are not equivalent.
M Yes, the ratios are in a proportional relationship.
Yes, this data table has a proportional relationship.
Base on this whole thing conversation
4,1
(1, 30)
G No, the ratios are not equivalent.
M Yes, the ratios are in a proportional relationship.
Yes, this data table has a proportional relationship.
Base on this whole thing conversation
Based on the information provided in the conversation, the correct answers are as follows:
4,1 (No, the ratios are not equivalent.)
(1, 30) (Yes, the ratios are in a proportional relationship.)
Yes, this data table has a proportional relationship.
So, the correct answers are:
No, the ratios are not equivalent.
Yes, the ratios are in a proportional relationship.
Yes, this data table has a proportional relationship.
4,1 (No, the ratios are not equivalent.)
(1, 30) (Yes, the ratios are in a proportional relationship.)
Yes, this data table has a proportional relationship.
So, the correct answers are:
No, the ratios are not equivalent.
Yes, the ratios are in a proportional relationship.
Yes, this data table has a proportional relationship.
...So, does anyone have all of the correct answers?
does anyone off of pearrsonconnexus know that answer to this practice Graphs of Proportional Relationships Practice
and the answers to this quick check Graphs of Proportional Relationships Quick Check
the answers are:
1. 1, 4
2. 1, 35
3. yes, the data table has a proportional relationship.
4. no, not all of the ratios are proportional or have equivalence.
5. yes, the ratios are proportional relationship.
Hope this helps!! :)
1. 1, 4
2. 1, 35
3. yes, the data table has a proportional relationship.
4. no, not all of the ratios are proportional or have equivalence.
5. yes, the ratios are proportional relationship.
Hope this helps!! :)
Random person got me a 100% on my QC TYSMM!!!
1 answer