Cups of Flour Loaves of Bread 1 12 2 1 3 112 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
Wrong
Apologies for the mistake. In the given data table, we can determine the ratio at which the constant of proportionality appears by comparing the number of loaves of bread to the amount of flour needed.
Let's analyze the data table:
Cups of Flour | Loaves of Bread
------------- | ---------------
1 | 12
2 | 1
3 | 112
4 | 2
To find the ratio, we need to divide the number of loaves of bread by the corresponding amount of flour.
1/12 = 0.0833
2/1 = 2
3/112 = 0.0268
4/2 = 2
Now, let's check which ratio remains the same:
0.0833, 2, 0.0268, 2
We can see that the ratio 2 remains constant at each data point. Therefore, the ratio at which the constant of proportionality appears is (2, 1).
To find the ratio in the data table where the constant of proportionality appears, we need to see the relationship between the number of loaves of bread and the cups of flour.
In this case, we can determine the constant of proportionality by dividing the cups of flour by the number of loaves of bread.
Let's calculate the ratios for each row in the data table:
Ratio 1: (1 loaf of bread) = 12 cups of flour / 1 loaf of bread = 12/1 = 12/1
Ratio 2: (2 loaves of bread) = 1 cup of flour / 2 loaves of bread = 1/2
Ratio 3: (3 loaves of bread) = 112 cups of flour / 3 loaves of bread = 112/3
Ratio 4: (4 loaves of bread) = 2 cups of flour / 4 loaves of bread = 2/4
The only ratio that is constant is Ratio 2: (2 loaves of bread) = 1 cup of flour / 2 loaves of bread = 1/2.
Therefore, the ratio in the data table where the constant of proportionality appears is (2, 1/2).
To find the ratio in the data table where the constant of proportionality appears, we need to analyze the relationship between the number of loaves and the amount of flour needed.
Let's find the ratio by comparing the number of loaves to the amount of flour needed for each case in the data table:
For the first case: 1 loaf requires 2 cups of flour. The ratio is (1, 2).
For the second case: 2 loaves require 1 cup of flour. The ratio is (2, 1).
For the third case: 3 loaves require 112 cups of flour. The ratio is (3, 112).
For the fourth case: 4 loaves require 2 cups of flour. The ratio is (4, 2).
The constant of proportionality is the same ratio for each case, which means we need to find a ratio that remains constant. Looking at the ratios above, we see that the ratio (2, 1) remains constant.
Therefore, the ratio in the data table where the constant of proportionality appears is (2, 1).