Create a table for each set of values. Test each table for equivalent ratios to find which set of values describes the proportional relationship of the two quantities.
66 ounces of peanuts to 89.1 ounces of walnuts
I have no idea.
Create a table for each set of values. Test each table for equivalent ratios to find which set of values describes the proportional relationship of the two quantities.
66 ounces of peanuts to 89.1 ounces of walnuts
66 ounces of peanuts to 89.1 ounces of walnuts
rf533jhlekrlfroif4rjfn4jgnto4jgnnfekki4444444444j5oi4g43n4uf4njh4ub4i3re34b5hgtvrfu4gitnmoyhi5b4fr3ndewmdijort4u5gbyhigtkjrm3oi54thjgoutn5ugboutbou5gihoguhgbg FNF MOD is the answer
To determine if the set of values describes a proportional relationship between two quantities, we need to check if the ratios are equivalent. Let's create a table with different values and calculate the ratios.
Table 1:
| Amount of Peanuts | Amount of Walnuts |
| -- | -- |
| 66 | 89.1 |
| 132 | 178.2 |
| 198 | 267.3 |
Now, let's calculate the ratios by dividing the amount of peanuts by the amount of walnuts:
| Amount of Peanuts | Amount of Walnuts | Ratio |
| -- | -- | -- |
| 66 | 89.1 | 0.740024 |
| 132 | 178.2 | 0.740024 |
| 198 | 267.3 | 0.740024 |
As we can see, all the ratios are equal to approximately 0.740024. Therefore, the set of values (66 ounces of peanuts to 89.1 ounces of walnuts) describes a proportional relationship between the two quantities.