Choose the better buy. $12.95 for 3 pounds of nuts or $21.45 for 5 pounds of nuts.
To determine the better buy, we need to calculate the cost per pound of nuts for each option.
For the first option, $12.95 for 3 pounds of nuts, we divide the total cost by the number of pounds:
Cost per pound = $12.95 ÷ 3 = $4.32 per pound
For the second option, $21.45 for 5 pounds of nuts, we divide the total cost by the number of pounds:
Cost per pound = $21.45 ÷ 5 = $4.29 per pound
Comparing the two prices, we can see that the second option has a lower cost per pound, making it the better buy. Therefore, $21.45 for 5 pounds of nuts is the better option.
what the simple answer
The simple answer is that $21.45 for 5 pounds of nuts is the better buy.
To determine the better buy, we need to compare the prices per pound for both options.
For the first option of $12.95 for 3 pounds of nuts:
Price per pound = $12.95 / 3 pounds = $4.32 per pound
For the second option of $21.45 for 5 pounds of nuts:
Price per pound = $21.45 / 5 pounds = $4.29 per pound
Comparing the two prices per pound, we can see that the second option, $21.45 for 5 pounds of nuts, has a lower price per pound ($4.29) compared to the first option ($4.32). Therefore, the second option is the better buy as it offers nuts at a slightly lower price per pound.
To determine which option is the better buy, you need to compare the prices per pound for each option.
For the first option, you are getting 3 pounds of nuts for $12.95. To find the price per pound, divide the total price by the number of pounds:
Price per pound = $12.95 / 3 lb
For the second option, you are getting 5 pounds of nuts for $21.45. Again, divide the total price by the number of pounds to find the price per pound:
Price per pound = $21.45 / 5 lb
Now, let's calculate the price per pound for both options:
Price per pound for option 1 = $12.95 / 3 lb
Price per pound for option 2 = $21.45 / 5 lb
Comparing the two prices per pound will tell us which option is the better buy. The option with the lower price per pound is the better deal.
Please perform the calculations to find the price per pound for each option and compare them to determine which one is the better buy.