Cups of flour 1 loafs of bread 1/2 cups of flour 2 loafs of bread 1 cups of flour 3 loafs of bread 1 1/2 cups of flour 4 loafs of bread 2 A bakery is making loafs of bread the recipe call for 2?cups of flour per loaf the data table shows how much flour the bakery needs depending on the number of loafs it intends to make at which ratio in the data table does the constant of proportionality appear
The constant of proportionality appears in the ratio of cups of flour to loafs of bread. In this case, the constant of proportionality is 2 cups of flour per loaf of bread.
The constant of proportionality appears in the ratio of cups of flour to loafs of bread. In this case, the constant ratio is 2 cups of flour per loaf of bread.
To find the ratio in the data table where the constant of proportionality appears, we need to look for a consistent relationship between the number of loaves of bread and the amount of flour required.
Let's analyze the data table:
- 1 loaf of bread requires 1/2 cup of flour.
- 2 loaves of bread require 1 cup of flour.
- 3 loaves of bread require 1 1/2 cups of flour.
- 4 loaves of bread require 2 cups of flour.
To determine the ratio, we need to compare the number of loaves to the corresponding amount of flour required. Let's calculate the ratios for each entry:
- Ratio for 1 loaf of bread: 1/2 cup of flour ÷ 1 loaf = 1/2
- Ratio for 2 loaves of bread: 1 cup of flour ÷ 2 loaves = 1/2
- Ratio for 3 loaves of bread: 1 1/2 cups of flour ÷ 3 loaves = 1/2
- Ratio for 4 loaves of bread: 2 cups of flour ÷ 4 loaves = 1/2
We can notice that the ratios for all the entries are the same: 1/2. This means that the ratio is constant for each row of the data table.
Therefore, the constant of proportionality appears in the ratio 1/2 in the data table.