A chemical company makes two brands of antifreeze. The first brand is 65% pure antifreeze, and the second brand is 90% pure antifreeze. In order to obtain 50
gallons of a mixture that contains 70% pure antifreeze, how many gallons of each brand of antifreeze must be used?
Let x = amount of 65% antifreeze Let y = amount of 90% antifreeze EQUATION 1: x + y = 50 (total of 50 gallons mixed) EQUATION 2: .65x + .90y = .70(x + y) Simplify and solve the system of equations Multiply second equation by 100 on both sides to remove the decimals 65x + 90y = 70(x + y) Combine like terms 65x + 90y = 70x + 70y 65x -70x+ 90y-70y = 0 -5x + 20y = 0 Now we have the following system of equations: x + y = 50 -5x + 20y = 0 Multiply the first equation by 5 to get opposite coefficients for x; add the equations to eliminate x 5x + 5y = 250 -5x + 20y = 0 ------------------------------ 25y = 250 Solve for y y = 10 Since the total mixed gallons is 50, x = 50 - 10 = 40 So we need 40 gallons of the 65% antifreeze and 10 gallons of the 90% antifreeze
