Question

A chef is going to use a mixture of two brands of Italian dressing. The first brand contains 7% vinegar, and the second brand contains 12% vinegar. The chef wants to make 220 milliliters of a dressing that is 9% vinegar. How much of each brand should she use?

Answer 1

132 ml of 7% vinegar of first brand must be mixed with 88 ml of 12% vinegar of second brand to obtain 220 ml of 9% vinegar.

SOLUTION:

First, set up table. Fill in the unknowns with variables x and y. The table is attached below.

From the table, we can easily set up the two equations.

Sum of values of two brands vinegar = Value of mixture

0.07x+0.12y=19.8

For convenience, we'll multiply the entire equation by 100,

7 x + 12 y = 1980 ------ eqn (1)

Now, Sum of amounts of each vinegar brand = Amount of mixture

x + y = 220 --------- eqn (2)

multiply eqn (2) with 7 for easy calculation and derive the equation into one variable.

7x + 7y = 1540 ---- eqn 3

Subtracting equation (3) from (1),

0 + 5y = 440

Thus,

5y = 440

`y = (440)/(5) = 88`

Substituting y = 88 in eqn (2),

7x + 7( 88 ) = 1540

7x + 616 = 1540

7 x = 1540 - 616 = 924

`x = (924)/(7) = 132`

So, we have x = 132 and y = 88

We can conclude that 132 ml of 7% vinegar of first brand must be mixed with 88 ml of 12% vinegar of second brand to obtain 220 ml of 9% vinegar.