Question

PetSmart.com sold the following varieties of dog food in June 2003.

Nature's Recipe Venison Meal & Rice Canine 20 percent protein, $21.99 per 20-lb bag

Nutro Max Natural Dog Food 27 percent protein, $12.99 per 17.5-lb bag

PetSmart Premier Oven Baked Lamb 25 percent protein, $22.99 per 30-lb bag

A dog breeder wants to make 300 pounds of a mix containing 22 percent protein. How many bags of each dog food variety should the breeder buy? (Hint: Note that each bag is a different weight and fractions of bags may not be purchased.)

Answer 1

Let x be the number of bags of Nature's Recipe Venison Meal & Rice Canine 20 percent protein, y be the number of bags of Nutro Max Natural Dog Food 27 percent protein and z be the number of bags of PetSmart Premier Oven Baked Lamb 25 percent protein a dog breeder buys. He wants to make 300 pounds of a mix. Then

20x+17.5y+30z=300.

Now

• in 20x pounds of Nature's Recipe Venison Meal & Rice Canine 20 percent protein is 0.2·20x=4x pounds of protein;
• in 17.5y pounds of Nutro Max Natural Dog Food 27 percent protein is 0.27·17.5y=4.725y pounds of protein;
• in 30z pounds of PetSmart Premier Oven Baked Lamb 25 percent protein is 0.25·30z=7.5z pounds of protein;
• in 300 pounds of mix containing 22 percent protein is 0.22·300=66 pounds of protein.

Then 4x+4.725y+7.5z=66.

You get a system

`\left\{\begin{array}{l}20x+17.5y+30z=300\\4x+4.725y+7.5z=66.\end{array}\right.`

From the first equation
`z=10-(2)/(3)x-(7)/(12)y.` Substitute it into the second equation:

`4x+4.725y+7.5(10-(2)/(3)x-(7)/(12)y)=66.`

Simplify it:

`-x+(7)/(20)y=-9,\\ \\ 20x-7y=180.`

y must be divided by 20, then

• y=0, x=9, z=10-6=4;
• y=20, x=16, z is not a whole number;
• y=40, x=23, z is not a whole number;
• y=60, x=30, z=10-20-35<0;
• thus, all other possible z will be <0.

Answer: 9 bags with 1st mix, 0 bags with 2nd mix and 4 bags with 3rd mix.