Answer :
Sure, let's determine which Diet Coke option offers the best deal by comparing the price per ounce of each option.
1. Option 1: 12 oz for [tex]$0.99
- To find the price per ounce, we need to divide the total price by the number of ounces.
\[
\text{Price per ounce} = \frac{0.99}{12} = 0.0825 \text{ dollars per ounce}
\]
2. Option 2: 640 oz for $[/tex]2.99
- Again, we'll divide the total price by the number of ounces.
[tex]\[
\text{Price per ounce} = \frac{2.99}{640} = 0.004671875 \text{ dollars per ounce}
\][/tex]
3. Option 3: 128 oz for [tex]$4.99
- Similarly, we will divide the total price by the number of ounces.
\[
\text{Price per ounce} = \frac{4.99}{128} = 0.038984375 \text{ dollars per ounce}
\]
Now, let's compare the prices per ounce:
- Option 1: \(0.0825\) dollars per ounce
- Option 2: \(0.004671875\) dollars per ounce
- Option 3: \(0.038984375\) dollars per ounce
Conclusion:
The option with the lowest price per ounce is the best deal. In this case, Option 2 offers the best deal at approximately \(0.004671875\) dollars per ounce.
So, buying 640 oz for $[/tex]2.99 is the best deal.
1. Option 1: 12 oz for [tex]$0.99
- To find the price per ounce, we need to divide the total price by the number of ounces.
\[
\text{Price per ounce} = \frac{0.99}{12} = 0.0825 \text{ dollars per ounce}
\]
2. Option 2: 640 oz for $[/tex]2.99
- Again, we'll divide the total price by the number of ounces.
[tex]\[
\text{Price per ounce} = \frac{2.99}{640} = 0.004671875 \text{ dollars per ounce}
\][/tex]
3. Option 3: 128 oz for [tex]$4.99
- Similarly, we will divide the total price by the number of ounces.
\[
\text{Price per ounce} = \frac{4.99}{128} = 0.038984375 \text{ dollars per ounce}
\]
Now, let's compare the prices per ounce:
- Option 1: \(0.0825\) dollars per ounce
- Option 2: \(0.004671875\) dollars per ounce
- Option 3: \(0.038984375\) dollars per ounce
Conclusion:
The option with the lowest price per ounce is the best deal. In this case, Option 2 offers the best deal at approximately \(0.004671875\) dollars per ounce.
So, buying 640 oz for $[/tex]2.99 is the best deal.
