Question

It it takes jewelry 1 / 2 hours to walk 2 miles he decides to start walking and his spare time but because he wants to make sure he has enough time to desire your distance he created the data table at which ratio does the constant of proportionality appear
Answer
Who take Julian 1/2 hour to walk 2 miles he decides to start walking in his spare time but because he wants to make sure he has enough time to go a desired distance he created the data table. At which ratio does the constant of proportionality appear
Answer
Hours. Miles walked.
1,2,3,4


1/4
1/2
3/4
1
Answer
Btw the answer are 1,4
1/4 1
4, 1
1, 1/4
Answer
Which answer
Answer
Luke Perry 15 pages and 30 minutes she decides to create a table to keep track of her progress from the data provided at which ratio the constant of proportionality
Answer
Ruth can read 15 pages in 30 minutes she decided to create a table to keep track of her progress from the data provided at what ratio is the constant of proportionality answers
2,60
1 1/2, 30
15, 1/2 1,30
Answer
Omg tyyyy
Answer
I got three more
Answer
One sec
Answer
Determine if the quantities in the data table re in a proportion relationship if the do not have a proportional relationship indicate why
Answer
Time 1,2,4,7,10
Water 5,10,15,35,50
Answers no the ratios are not equivalent
No,the ratio 7 :35 is not proportional to the other ratios
Yes the data table has proportional relationships
No the table does not count consecutively
Answered by GPT 3.5
I'm sorry, but I'm having trouble understanding your question. Could you please provide more clarity or rephrase your sentence?
Answered by GPT 3.5
Based on the given information, Julian takes 1/2 hour to walk 2 miles. To determine the ratio at which the constant of proportionality appears, we can analyze the data table that Julian created. However, you haven't provided the data table, so I cannot give you a specific ratio. Please provide the data table or any additional information, and I will be happy to assist you further.
Answered by GPT 3.5
Thank you for providing the data table. The ratio at which the constant of proportionality appears can be determined by comparing the hours and the corresponding miles walked.

Looking at the data table:
- After 1 hour, Julian walks 1/4 mile.
- After 2 hours, Julian walks 1/2 mile.
- After 3 hours, Julian walks 3/4 mile.
- After 4 hours, Julian walks 1 mile.

To find the ratio, we can compare the miles walked and the corresponding hours:

- Between 1/4 mile and 1 hour: the ratio is 1/4.
- Between 1/2 mile and 2 hours: the ratio is also 1/4.
- Between 3/4 mile and 3 hours: the ratio is 1/4.
- Between 1 mile and 4 hours: the ratio is again 1/4.

Thus, the constant of proportionality in this case is 1/4, as it appears consistently in the ratios of miles walked to the corresponding hours.
Answered by GPT 3.5
Apologies for the confusion. Based on the revised data table:

Hours | Miles walked
1 | 1/4
2 | 1/2
3 | 3/4
4 | 1

Now, let's examine the ratios between the hours and the corresponding miles walked:

- Between 1 hour and 1/4 mile: the ratio is 1/4.
- Between 2 hours and 1/2 mile: the ratio is 1/4.
- Between 3 hours and 3/4 mile: the ratio is 1/4.
- Between 4 hours and 1 mile: the ratio is 1/4.

Therefore, the constant of proportionality in this case is 1/4, as it appears consistently in the ratios between the miles walked and the corresponding hours.
Answered by GPT 3.5
Apologies for the confusion. Based on the revised data table:

Hours | Miles walked
1 | 1/4
2 | 1/2
3 | 3/4
4 | 1

The constant of proportionality appears in the ratio between the Miles walked and the corresponding Hours.

The ratio is as follows:

1/4 : 1
1/2 : 2
3/4 : 3
1 : 4

The constant ratio of 1:4 appears consistently in the ratios provided. Therefore, the answer is 1:4.
Answered by GPT 3.5
I'm sorry, but I cannot ascertain the question you are asking from the given information about Luke Perry. Could you please provide more context or clarify your question?
Answered by GPT 3.5
Based on the information given, Ruth can read 15 pages in 30 minutes.

To determine the constant of proportionality, we need to compare the number of pages read with the corresponding time taken.

Looking at the data:

- In 30 minutes, Ruth can read 15 pages.

To find the ratio, we can compare the number of pages read and the corresponding time taken:

- Between 15 pages and 30 minutes: the ratio is 15/30, which simplifies to 1/2.

Therefore, the constant of proportionality in this case is 1/2, as it appears in the ratio between the number of pages read and the corresponding time taken.

So, the correct answer is: 1/2, 30.
Answered by GPT 3.5
You're welcome! If you have any more questions, feel free to ask.
Answered by GPT 3.5
Sure, go ahead and ask your three questions. I'm here to help you.
Answered by GPT 3.5
Certainly, take your time. Whenever you're ready, let me know your questions, and I'll be here to assist you.
Answered by GPT 3.5
Apologies, but I still need the data table in order to determine the proportionality of the quantities. Please provide the data table, and I will be able to assist you further.
Answered by GPT 3.5
Thank you for providing the data table. Let's analyze it to determine if the quantities have a proportional relationship:

Time | Water
-------------------
1 | 5
2 | 10
4 | 15
7 | 35
10 | 50

To determine if the quantities are in a proportional relationship, we need to check if the ratios between the quantities are equivalent.

- The ratio between 1 and 5 is 1:5.
- The ratio between 2 and 10 is also 1:5.
- The ratio between 4 and 15 is approximately 4:15, which reduces to 4:3.
- The ratio between 7 and 35 is 7:35, which simplifies to 1:5.
- The ratio between 10 and 50 is also 10:50, which simplifies to 1:5.

Since all the ratios are equivalent (1:5), the quantities in the data table have a proportional relationship.

Therefore, the correct answer is: Yes, the data table has proportional relationships.