Use the table to answer the question.
Number of Cases Ordered Number of Rolls of Paper Towels
1 12
3 36
5 60
10 120
A restaurant is placing an order for paper towels. The data table shows the amount of paper towel rolls compared to the number of cases. At which ratio in the data table does the constant of proportionality appear? Write your answer as an ordered pair inside the parentheses provided.
(1 point)
(
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15 answers
(3, 36)
nope try again
I apologize for the mistake. The correct answer is (5, 60).
nope
I apologize again for the mistake. The correct answer is (10, 120).
A restaurant is placing an order for paper towels. The data table shows the amount of paper towel rolls compared to the number of cases. At which ratio in the data table does the constant of proportionality appear? Write your answer as an ordered pair inside the parentheses provided.
(1 point)
(
)
(1 point)
(
)
The constant of proportionality appears at the ratio of (1, 12).
Use the table to answer the question.
Number of Adults 1 2 3 5 10 100
Cost of Tickets ($) 75 150 225 375 750 7,500
Determine if the quantities in the data table are in a proportional relationship. If the quantities have a proportional relationship, answer 1. If the quantities do not have a proportional relationship, answer 2.
Number of Adults 1 2 3 5 10 100
Cost of Tickets ($) 75 150 225 375 750 7,500
Determine if the quantities in the data table are in a proportional relationship. If the quantities have a proportional relationship, answer 1. If the quantities do not have a proportional relationship, answer 2.
To determine if the quantities in the data table are in a proportional relationship, we can compare the ratios of the cost of tickets to the number of adults:
For 1 adult, the cost of tickets is $75.
For 2 adults, the cost of tickets is $150.
For 3 adults, the cost of tickets is $225.
For 5 adults, the cost of tickets is $375.
For 10 adults, the cost of tickets is $750.
For 100 adults, the cost of tickets is $7,500.
Let's calculate the ratios for each:
For 1 adult, the ratio is 75/1 = 75.
For 2 adults, the ratio is 150/2 = 75.
For 3 adults, the ratio is 225/3 = 75.
For 5 adults, the ratio is 375/5 = 75.
For 10 adults, the ratio is 750/10 = 75.
For 100 adults, the ratio is 7,500/100 = 75.
We can see that the ratios are all equal, which means that the quantities in the data table are in a proportional relationship. Therefore, the answer is 1.
For 1 adult, the cost of tickets is $75.
For 2 adults, the cost of tickets is $150.
For 3 adults, the cost of tickets is $225.
For 5 adults, the cost of tickets is $375.
For 10 adults, the cost of tickets is $750.
For 100 adults, the cost of tickets is $7,500.
Let's calculate the ratios for each:
For 1 adult, the ratio is 75/1 = 75.
For 2 adults, the ratio is 150/2 = 75.
For 3 adults, the ratio is 225/3 = 75.
For 5 adults, the ratio is 375/5 = 75.
For 10 adults, the ratio is 750/10 = 75.
For 100 adults, the ratio is 7,500/100 = 75.
We can see that the ratios are all equal, which means that the quantities in the data table are in a proportional relationship. Therefore, the answer is 1.
A bakery is making loaves of French bread. The recipe calls for 2 cups of flour per loaf of bread. The data table shows how much flour the bakery needs depending on the number of loaves it intends to make. At which ratio in the data table does the constant of proportionality appear? Write your answer as an ordered pair inside the parentheses provided.
To determine at which ratio in the data table does the constant of proportionality appear, we need to examine the relationship between the number of loaves of bread and the amount of flour needed.
Number of Loaves of Bread: 1,2,3,4,5
Amount of Flour Needed (in cups): 2, 4, 6, 8, 10
Let's calculate the ratios for each:
For 1 loaf of bread, the ratio is 2/1 = 2.
For 2 loaves of bread, the ratio is 4/2 = 2.
For 3 loaves of bread, the ratio is 6/3 = 2.
For 4 loaves of bread, the ratio is 8/4 = 2.
For 5 loaves of bread, the ratio is 10/5 = 2.
We can see that the ratios are all equal, which means that the constant of proportionality (2 cups of flour per loaf of bread) appears at each ratio in the data table. Therefore, any ordered pair in the form (n, 2n) would represent the constant of proportionality. Examples would be (1, 2), (2, 4), (3, 6), (4, 8), and (5, 10).
Number of Loaves of Bread: 1,2,3,4,5
Amount of Flour Needed (in cups): 2, 4, 6, 8, 10
Let's calculate the ratios for each:
For 1 loaf of bread, the ratio is 2/1 = 2.
For 2 loaves of bread, the ratio is 4/2 = 2.
For 3 loaves of bread, the ratio is 6/3 = 2.
For 4 loaves of bread, the ratio is 8/4 = 2.
For 5 loaves of bread, the ratio is 10/5 = 2.
We can see that the ratios are all equal, which means that the constant of proportionality (2 cups of flour per loaf of bread) appears at each ratio in the data table. Therefore, any ordered pair in the form (n, 2n) would represent the constant of proportionality. Examples would be (1, 2), (2, 4), (3, 6), (4, 8), and (5, 10).
bro bot ur not helpful
I apologize if my previous response was not helpful. If you could provide more specific information or clarify your question, I will do my best to assist you.
nope i am gonna leave
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