Number of packages of red peppers to number of packages of green packages is ratio of 8:13. Peppers are sold in 2-pound packages. What is the least possible weight of red peppers in bin?
You need both numbers to be multiples of 2. So, use
16:26
42 lbs is the least possible weight.
To find the least possible weight of red peppers in the bin, we need to determine the ratio of the weights of red peppers to green peppers.
Given that the ratio of the number of packages of red peppers to green peppers is 8:13, we can assume that the ratio of the weights of the red peppers to green peppers is also 8:13.
Now, since each package of peppers weighs 2 pounds, let's consider a scenario where the number of packages of red peppers is at its minimum value.
If we let the number of packages of red peppers be 8, then the number of packages of green peppers would be 13 (as per the ratio). So, the total weight of red peppers in this case would be 8 packages * 2 pounds/package = 16 pounds.
Therefore, the least possible weight of red peppers in the bin is 16 pounds.
To find the least possible weight of red peppers in the bin, we need to consider the ratio of the number of packages of red peppers to the number of packages of green peppers.
The ratio given is 8:13, which means that for every 8 packages of red peppers, there are 13 packages of green peppers.
Since both red and green peppers are sold in 2-pound packages, we can assume that each package of red peppers weighs 2 pounds. Therefore, the weight of the green peppers is 13 x 2 = 26 pounds.
In order to minimize the weight of red peppers, we can assume that there is only one package of green peppers, which weighs 26 pounds. This would give us 8 packages of red peppers.
So, the least possible weight of red peppers in the bin would be 8 x 2 = 16 pounds.