Final answer:
To create a 20-pound coffee blend priced at $7.30 per pound, use 6 pounds of Kenyan French Roast coffee and 14 pounds of Sumatran coffee by solving the system of linear equations based on the given prices.
Step-by-step explanation:
To determine how much of each type of coffee should be used to make a 20-pound blend that sells for $7.30 per pound, we can set up a system of equations based on the given prices and weights.
Let x be the amount of Kenyan French Roast coffee at $8 per pound, and y be the amount of Sumatran coffee at $7 per pound. We have two equations:
- The total weight of the blend: x + y = 20 pounds
- The total cost of the blend: 8x + 7y = 7.30 × 20
Solving the system of equations, we can find:
- x + y = 20 (Equation 1)
- 8x + 7y = 146 (Equation 2, because 7.30 × 20 = 146)
Next, we solve for y in Equation 1:
y = 20 - x
We substitute the value of y into Equation 2:
8x + 7(20 - x) = 146
Expanding and simplifying gives us:
8x + 140 - 7x = 146
x = 146 - 140
x = 6 pounds of Kenyan French Roast coffee
Then we use x to find y:
y = 20 - 6 = 14 pounds of Sumatran coffee
Therefore, to make the 20-pound coffee blend priced at $7.30 per pound, you'd need 6 pounds of Kenyan French Roast coffee and 14 pounds of Sumatran coffee.