Mixture Problems - GMAT Quantitative Reasoning

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Question

If Audrey is currently years old, and Matt’s age is 2 years more than $\frac{1}{3}$ of Audrey’s age, what will be Matt’s age in 5 years?

Answer

$\frac{1}{3}$ of Audrey’s age is $\frac{N}{3}$ .

2 years more than $\frac{1}{3}$ of Audrey’s age is

$\frac{N}{3}+2$ .

However, be careful because the question is asking for Matt’s age in 5 years, so you need to add 5 years to Audrey’s current age:

$\frac{N}{3}+2+5=\frac{N}{3}+7$

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Question

Some dimes and some quarters are together worth $8.95.

Which of the following is a possible number of dimes in this mixture?

Answer

If the dimes are removed, the amount of money remaining, being only quarters, must be a multiple of $0.25. We can test each choice accordingly.

$17: $8.95 - 17 \times $0.10 = $8.95 - $1.70 = $7.25$

$18: $8.95 - 18 \times $0.10 = $8.95 - $1.80 = $7.15$

$19: $8.95 - 19 \times $0.10 = $8.95 - $1.90 = $7.05$

$20 : $8.95 - 20 \times $0.10 = $8.95 - $2.00 = $6.95$

$21: $8.95 - 21 \times $0.10 = $8.95 - $2.10 = $6.85$

Of the choices given, only the removal of 17 dimes leaves an amount that coud possibly be made up only of quarters.

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Question

Charlie, the barrista at Sunday Coffee, has a problem. He must mix together Licorice Dream tea, which costs $20/lb, and Strawberry Explosion tea, which costs $12/lb to make sixty pounds of a new flavor of tea. Unfortunately, he forgot the correct proportions. He does know that the new tea costs $14/lb.

How many pounds of the Licorice Dream tea go into the mix?

(You may assume that the tea is to sell for the same amount of money as if it had been sold separately.)

Answer

Let be the number of pounds of Licorice Dream tea; then is the number of pounds of Strawberry Explosion. Then the total value of each ingredient tea, as well as the total value of the new tea, will be:

Licorice: $x \cdot 20$ or

Strawberry: $(60-x) \cdot12$ or

New tea: $60 \cdot14 = 840$

Add the individual costs of the ingredient teas to get the total cost of the new tea.

Charlie will use 15 pounds of the Licorice Dream; as this is not one of the given answers, the correct answer is "None of the answers are correct".

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Question

A scientist needs a 10% saline solution for an experiment. In his closet he finds a 20 ounce bottle of 25% saline solution. How many ounces of pure water should he add to the mixture to produce the correct saline solution?

Answer

The solution he needs has only a 10% salt level. Currently we know that his solution has 20 ounces at 25% salt. We can calculate the amount of salt in the 20 ounce container by utilizing the given information. (20)(.25) = 5 ounces of salt. Let x be the volume of pure water (in ounces) added.

Therefore, we know the total volume of our new solution will be 20+x. We know we want our solution to have 10% salt, so our salt amount in the new solution will have to be (20+x) (.10). Since we are not adding any salt when we add our "pure water", we know the total salt in the solution will not change. Therefore, we can write the equation. (20+x)*(.10) = 5

Solve for x and you get x = 30 ounces of pure water.

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Question

Mike, the barista at Moose Jaw Coffee, has to mix together two kinds of coffee beans - Mocha Madness, which costs $12 a pound, and Sumatra Sweetness, which costs $20 a pound - to produce forty pounds of a coffee that costs $14 a pound. The beans in the mixture sell for the same price as they would separately.

How many pounds of Mocha Madness coffee will Mike put into the mixture?

Answer

Let be the number of pounds of Mocha Madness coffee beans Mike uses. Then he will use pounds of Sumatra Sweetness coffee beans.

The Mocha Madness coffee costs $12 a pound times pounds, or dollars; similarly, the Sumatra Sweetness coffee costs . The total cost of the coffee will be $14 \cdot 40 = $ 560$ . Since the beans will sell for the same price as unmixed, we can add the prices to obtain and solve this equation:

$-8 M \div \left ( -8 \right ) = -240\div \left ( -8 \right )$

30 pounds of the Mocha Madness will go into the mixture.

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Question

24 coins, all nickels and dimes, are together worth $1.75.

How many of the coins are nickels?

Answer

Let be the number of nickels. Then there are dimes.

The amount of money is defined by the expression . Set this equal to 1.75 and solve:

$- 0.05n \div (-0.05)= -0.65\div (-0.05)$

The mix includes 13 nickels.

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Question

How much of a 20% acid solution would a chemist have to mix with one liter of a 40% acid solution to yield a 36% acid solution?

Answer

Let be the amount of 20% acid solution used in milliliters. Then the amount of total solution will be (one liter being 1,000 milliliters). The amount of acid in each solution will be as follows:

In the 20% solution:

In the 40% solution: $0.40 \cdot 1,000 = 400$

In the 36% solution:

Add the acid in the two source solutions to get the acid in the resulting solution; then solve for :

$40 \div 0.16 =0.16V \div 0.16$

The chemist must add 250 milliliters of the 20% acid solution.

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Question

A chemist wants to make one liter of hydrochloric acid solution. He only has two concentrations on hand - and . If is the amount in milliliters of the solution he is to use, then which equation can be used to solve for ?

Answer

If the chemist is to use milliliters of 12% to make the solution, then he will mix it with milliliters (1,000 milliliters being equal to 1 liter) of the 30% solution. The result will be 1,000 milliliters of 12% solution.

The amount of pure acid in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of acid in the three solutions, in milliliters, will be:

12% solution:

30% solution: $0.30 \left (1,000-x \right )$

15% solution (result): $0.15 \cdot 1,000 = 150$

Since the first two solutions are added to yield the third, the amounts of acid are also being added, so the equation to solve is

$0.12 x + 0.30 \left (1,000-x \right ) = 150$

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Question

A chemist has milliliters of a solution of alcohol on hand, and he wants to mix it with enough pure alcohol to turn it into a alcohol solution. If is the amount of pure alcohol he needs, which equation can he use to solve for ?

Answer

If the chemist adds 300 milliliters of a solution of 25% alcohol to milliliters of pure alcohol, he will have milliliters of the 40% alcohol solution.

The amount of pure alcohol in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of alcohol in the three solutions, in milliliters, will be:

25% solution: $0. 25 \cdot 300 = 75$

40% solution (result):

Since the first solution is being added to milliliters of pure alcohol, the following equation can be set up:

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Question

A chemist has milliliters of a solution of alcohol on hand, and she wants to mix it with enough alcohol solution to turn it into a alcohol solution. If is the amount of alcohol she needs, which equation can she use to solve for ?

Answer

The chemist will add 400 milliliters of 20% solution to milliliters of 60% solution to make milliliters of 30% solution.

The amount of pure alcohol in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of alcohol in the three solutions, in milliliters, will be:

20% solution: $0.20 \cdot 400 = 80$

60% solution:

30% solution (result):

Since the first two solutions are added to yield the third, the amounts of alcohol are also being added, so the equation to solve is

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Question

A chemist has 400 milliliters of a solution of 20% alcohol on hand, and he wants to mix it with enough pure alcohol to turn it into a 30% alcohol solution. How much pure alcohol will this require?

Select the response that is closest to the correct answer.

Answer

If the chemist adds 400 milliliters of a solution of 20% alcohol to milliliters of pure alcohol, he will have milliliters of the 30% alcohol solution.

The amount of pure alcohol in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of alcohol in the three solutions, in milliliters, will be:

20% solution: $0.20 \cdot 400 = 80$

30% solution (result):

Since the alcohol in the first solution is being added to milliliters of pure alcohol to yield the alcohol in the second, the following equation can be set up:

$x = 40 \div 0.7 = 57\frac{1}{7}$ milliliters.

The closest response is 60 milliliters.

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Question

A chemist has 600 milliliters of a solution of 20% alcohol on hand, and she wants to mix it with enough 50% alcohol solution to turn it into a 30% alcohol solution. How much of the 50% solution will she need?

Answer

The chemist will add 600 milliliters of a solution of 20% alcohol to milliliters of 50% alcohol solution to make milliliters of 30% solution.

The amount of pure alcohol in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of alcohol in the three solutions, in milliliters, will be:

20% solution: $0.20 \cdot 600 = 120$

50% solution:

30% solution (result):

Since the first two solutions are added to yield the third, the amounts of alcohol are also being added, so the equation to solve is

$x = 60 \div 0.20 = 300$ milliliters, the correct response.

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Question

A chemist wants to make one liter of hydrochloric acid solution. He only has two concentrations on hand - and . How much of the solution will the chemist use?

Answer

The choices are given in milliliters, so we will convert one liter to 1,000 milliliters.

If the chemist is to use milliliters of 10% to make the solution, then he will mix it with milliliters of the 50% solution. The result will be 1,000 milliliters of 25% solution.

The amount of pure acid in each solution will be the amount of solution multiplied by the concentration expressed as a decimal. Therefore, the amounts of acid in the three solutions, in milliliters, will be:

10% solution:

50% solution: $0.50 \left (1,000-x \right )$

25% solution (result): $0.25 \cdot 1,000 = 250$

Since the first two solutions are added to yield the third, the amounts of acid are also being added, so the equation to solve is:

$0.10 x + 0.50 \left (1,000-x \right ) = 250$

$x = 250 \div 0.40 = 625$ milliliters of the weaker solution.

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Question

A nut mixture consists of peanuts, pistachios, and macadamia nuts in the ratio , respectively, by weight. What amount of pistachios will be in 40 pounds of the mixture?

Answer

Using the ratio, we can write the following equation:

There are pounds of peanuts, pounds of pistachios, and pounds of macadamia nuts in the mixture, so that means that in 40 pounds of the mixture, there are

$5x=5\cdot4=20$ pounds of peanuts

$3x=3\cdot4=12$ pounds of pistachios

$2x=2\cdot4=8$ pounds of macadamia nuts

Since the question asked about pistachios, the correct answer is that there are pounds of pistachios in pounds of the mixture.

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Question

A chemist is diluting of a pure acid solution with water in order to obtain a solution that is only acid. What is the total amount of the resulting solution?

Answer

Let be the amount of water used to dilute the acid. The resulting solution will then have . The amount of acid in the final solution is: $0.15 \cdot (30+x)$ . That amount of acid in the final solution is equal to the original of acid, since there is no acid in water.

$30+x=\frac{30}{0.15}=\frac{3000}{15}=200$

The amount of the final solution is , and the amount of water used to dilute the original acid solution is .

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Question

A certain solution is glycol by volume. How many liters of this solution must be added to liters of a glycol solution in order to produce a solution with an overall concentration of ?

Answer

Let x equal the number of liters of the 77% solution, the value we need to solve for. If the first solution is 77% glycol, then 0.77x will give us the number of liters of glycol in the first solution. Accordingly, 0.53(42 liters) will give us the number of liters of glycol in the second solution. If we are mixing these two solutions, then the number of liters of glycol in the final mixture will equal the sum of the number of liters of glycol in each solution. The amount of glycol in the final mixture will be its desired concentration times the volume of the total mixture, 0.60(x+42), so we can write the following equation and solve for x:

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Question

Read the following problem:

A scientist needs one liter of 20% hydrochloric acid solution; however, he only has two one-liter bottles of solution on hand, one of which is 15% acid and one of which is 35% acid. How much of each solution must he mix together to get the solution he wants?

Let be the number of milliliters of 15% solution he will use and be the number of milliliters of 35% solution he will use. Which of the following systems of equations will yield the correct values of both?

Answer

Since and are being set to numbers of milliliters, we convert one liter to 1,000 milliliters. The sum of the amounts of the two solutions and is 1,000, so

is one equation of the system.

The other equation will add the acid. The amount of acid in an acid solution is the concentration, as a decimal, multiplied by the amount of solution. The amount of acid in the pre-mixture solutions are and ; add these to get the amount of acid in 1,000 milliliters of a 20% solution, or $0.20 \times 1,000 = 200$ milliliters:

The correct system is:

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Question

A scientist has one liter of a 40% sulfuric acid solution; he needs to dilute it to 25%. How much water will he need to dilute it to the appropriate strength?

Round your answer to the nearest tenth of a liter, if applicable.

Answer

40% of one liter is 0.4 liters of acid, which is the amount of acid that will be in the solution at the end as well.

After liters of water is added, there will be liters of solution. the amount of acid in the solution will be 25% of this, or .

The amount of acid in the solutions remains constant, so we set up and solve this equation:

$w = 0.15 \div 0.25$

The scientist will need to add 0.6 liters of water.

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Question

A scientist has one liter of a 40% sulfuric acid solution; he needs to strengthen it to 50%. How much pure sulfuric acid will he need to strengthen it to the appropriate concentration?

Answer

40% of one liter of the original solution is 0.4 liters of acid.

Suppose the scientist adds liters of acid. Then the scientist will have liters of solution and liters of acid, and the concentration will be

$\frac{A + 0.4}{A+1} \cdot 100 = 50$ percent. Solve for :

$\frac{100A + 40}{A+1} = 50$

$\frac{100A + 40}{A+1} \cdot (A+1) = 50 (A+1)$

The scientist will need to add 0.2 liters of pure acid to the solution.

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Question

Pieces of Rainbow Candy come in six colors, including green; the machines are carefully set to make sure each batch of sixty pounds contains an equal amount of candy of each color.

One day, something went wrong, and one sixty-pound batch only contained half as much green candy as it was supposed to; the other five colors were distributed equally. How many pounds of green candies needed to be added to this batch in order to restore the correct distribution of colors?

Answer

Since a normal batch of candies is one-sixth green candies, then it contains $\frac{1}{6} \times 60 = 10$ pounds of green candies; the defective batch contained half this, or 5 pounds. If we let be the number of pounds of green candies that were added, then, after the addition, there were pounds of green candies in a batch of candies. One sixth of the candies are green, so set and solve the equation:

$\frac{G+5}{G+60} = \frac{1}{6}$

$6\left (G+5 \right )= 1 (G+60)$

Six pounds of green candies are added.

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