We need 22.8 lbs of the first type of chocolate and 7.2 lbs of the second type of chocolate
Explanation:
Step 1 :
Let x represent the quantity of the first type of chocolate
and y represent the quantity of the second type of chocolate
The quantity of the final mixture required = 30 lbs
Hence
x + y = 30
Step 2 :
Price of the first type of chocolate = $ 2.40 / lb
Price of the second type of chocolate = $9.90/lb
The total price of the final mixture = $4.20 / lb
Hence the price for 30 lbs = 4.2 × 30 = $126
Hence the equation representing this would be
2.4 x + 9.9 y = 126
Step 3 :
Solving the equations obtained in step 1 and 2 for x and y we get,
2.4 x + 2.4 y = 72
2.4 x + 9.9 y = 126
Subtracting equation 2 from 1 we get,
-7.5 y = -54 = > y = 7.2
x + y = 30 = > x = 30 - y = 30 - 7.2 = 22.8
Step 4 :
Answer :
We need 22.8 lbs of the first type of chocolate and 7.2 lbs of the second type of chocolate