A coffee shop plans to blend a coffee that sells for $12 per pound with coffee that sells for $9 per pound to produce a blend that sells for $10 per pound. How much of each should be used to produce 20 pounds of the new blend?

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wifilethbridge wifilethbridge · Answer 1 · 2020-03-31T08:56:51+02:00

Answer:

20/3 pounds of coffee that costs $12 per pound and 40/3 pounds of coffee that costs $9 per pound are required

Step-by-step explanation:

Let x be the amount of coffee that costs $12 per pound

Cost of x amount of this type coffee = 12x

We are supposed to find How much of each should be used to produce 20 pounds of the new blend that costs $10 per pound

So, Amount of coffee required that costs $9 per pound = 20-x

Cost of (20-x) amount of this type of coffee = 9(20-x)

So, [tex]12x+9(20-x)=10(20)\\12x+180-9x=200\\3x=20\\x=\frac{20}{3}[/tex]

Amount of coffee that costs $12 per pound required is[tex]\frac{20}{3} pounds[/tex]

Amount of coffee that costs $9 per pound required = 20-x=[tex]20-\frac{20}{3}=\frac{40}{3} pounds[/tex]

Hence 20/3 pounds of coffee that costs $12 per pound and 40/3 pounds of coffee that costs $9 per pound are required