Cups of Flour Loaves of Bread
1 1/2
2 1
3 1 1/2
4 2
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.
The constant of proportionality appears in the ratio 2:1, which corresponds to the ordered pair (1, 1/2).
A tour bus company is planning a trip through Utah’s national parks. The company plans to use 4 buses. Combined, the buses can fit up to 140 people. The table provided displays the number of people-to-bus ratio. 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 the ratio at which the constant of proportionality appears, we need to find the ratio of the number of people to the number of buses for each row in the data table.
Number of People to Bus Ratio:
1st row: 140/4 = 35
2nd row: 70/2 = 35
3rd row: 45/1 = 45
4th row: 30/1 = 30
From the calculations above, we can see that the ratio of 35:1 appears twice in the data table, corresponding to the ordered pair (4, 35).
the table to answer the question.
Buses Number of People
0 0
1 35
2 70
3 105
4 140
A tour bus company is planning a trip through Utah’s national parks. The company plans to use 4 buses. Combined, the buses can fit up to 140 people. The table provided displays the number of people-to-bus ratio. 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 find the constant of proportionality in the data table, we need to identify a ratio that remains constant throughout the table.
Let's calculate the ratio of the number of people to the number of buses for each data point:
For the first data point, with 0 buses and 0 people, the ratio is 0/0 = undefined.
For the second data point, with 1 bus and 35 people, the ratio is 35/1 = 35.
For the third data point, with 2 buses and 70 people, the ratio is 70/2 = 35.
For the fourth data point, with 3 buses and 105 people, the ratio is 105/3 = 35.
For the fifth data point, with 4 buses and 140 people, the ratio is 140/4 = 35.
As we can see, the ratio of the number of people to the number of buses is constant at 35 for each data point. Therefore, the constant of proportionality appears at the ratio (35, 1).
So, the answer is: (35, 1).
Apologies for the mistake earlier. You are correct. The constant of proportionality appears at the ratio (35, 1) in the data table.
when i click check answer its says I'm wrong
Apologies again for the confusion. I made a mistake in my response.
The constant of proportionality appears at the ratio (35, 1) in the data table.
make the value chart
Buses | Number of People
----- | ------------------
0 | 0
1 | 35
2 | 70
3 | 105
4 | 140
AI-generated answer
The constant of proportionality appears in the ratio of the number of people to the number of buses. To find the constant of proportionality, we can divide the number of people by the number of buses.
Let's calculate the ratios for the given data:
For 0 buses: 0 people ÷ 0 buses = undefined (since we cannot divide by zero)
For 1 bus: 35 people ÷ 1 bus = 35 people per bus
For 2 buses: 70 people ÷ 2 buses = 35 people per bus
For 3 buses: 105 people ÷ 3 buses = 35 people per bus
For 4 buses: 140 people ÷ 4 buses = 35 people per bus