GMAT Exam  >  GMAT Tests  >  Test: Mixture Problems - GMAT MCQ

Test: Mixture Problems - GMAT MCQ


Test Description

10 Questions MCQ Test - Test: Mixture Problems

Test: Mixture Problems for GMAT 2024 is part of GMAT preparation. The Test: Mixture Problems questions and answers have been prepared according to the GMAT exam syllabus.The Test: Mixture Problems MCQs are made for GMAT 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Mixture Problems below.
Solutions of Test: Mixture Problems questions in English are available as part of our course for GMAT & Test: Mixture Problems solutions in Hindi for GMAT course. Download more important topics, notes, lectures and mock test series for GMAT Exam by signing up for free. Attempt Test: Mixture Problems | 10 questions in 20 minutes | Mock test for GMAT preparation | Free important questions MCQ to study for GMAT Exam | Download free PDF with solutions
Test: Mixture Problems - Question 1

A mixture consists of flaxseed and cornmeal in the ratio 1 to 4, respectively. How many cups of flaxseed are used to make the mixture?

(1) There are a total of 15 cups in the mixture.
(2) The ratio of the number of cups of flaxseed to the total number of cups in the mixture is 1 to 5.

Detailed Solution for Test: Mixture Problems - Question 1

Statement (1): There are a total of 15 cups in the mixture.
From this statement alone, we cannot determine the specific amounts of flaxseed and cornmeal in the mixture. It only provides the total quantity, but not the ratio or specific amounts of each ingredient. Statement (1) alone is not sufficient.

Statement (2): The ratio of the number of cups of flaxseed to the total number of cups in the mixture is 1 to 5.
From this statement alone, we know that the ratio of flaxseed to the total mixture is 1:5. However, we still don't have the specific total quantity of the mixture. Without knowing the total cups in the mixture, we cannot determine the exact amount of flaxseed. Statement (2) alone is not sufficient.

Combining both statements, we have the following information:

  • The total quantity is 15 cups (Statement 1).
  • The ratio of flaxseed to the total mixture is 1:5 (Statement 2).

Using this information, we can determine the amounts of flaxseed and cornmeal in the mixture. Since the ratio of flaxseed to the total mixture is 1:5, we can calculate that the amount of flaxseed is (1/6) * 15 = 2.5 cups. Therefore, both statements together are sufficient to answer the question.

Hence, the correct answer is (C) BOTH statements (1) and (2) TOGETHER are sufficient to answer the question asked, but NEITHER statement ALONE is sufficient.

Test: Mixture Problems - Question 2

What is the volume of milk present in a mixture of milk and water?

(1) When 2 liters of milk is added to the mixture, the resultant mixture has equal quantities of milk and water.
(2) The initial mixture had 2 parts of water to 1 part milk.

Detailed Solution for Test: Mixture Problems - Question 2

Statement (1): When 2 liters of milk is added to the mixture, the resultant mixture has equal quantities of milk and water.
From this statement alone, we know that when 2 liters of milk is added, the resulting mixture has equal quantities of milk and water. However, we don't have any information about the initial quantities or proportions of milk and water in the mixture. Statement (1) alone is not sufficient.

Statement (2): The initial mixture had 2 parts of water to 1 part milk.
From this statement alone, we know the initial ratio of water to milk in the mixture. However, we don't have any information about the actual volumes or quantities of the mixture. Statement (2) alone is not sufficient.

Combining both statements, we have the following information:

When 2 liters of milk is added, the resulting mixture has equal quantities of milk and water (Statement 1).
The initial mixture had a ratio of 2 parts water to 1 part milk (Statement 2).
Using this information, we can determine the volume of milk in the mixture. Since the resultant mixture has equal quantities of milk and water when 2 liters of milk is added, we can infer that the initial mixture had 2 liters of water and 1 liter of milk. Therefore, the volume of milk in the mixture is 1 liter.

Hence, the correct answer is (C) BOTH statements (1) and (2) TOGETHER are sufficient to answer the question asked, but NEITHER statement ALONE is sufficient.

1 Crore+ students have signed up on EduRev. Have you? Download the App
Test: Mixture Problems - Question 3

A certain granola recipe calls for a simple mixture of raisins costing $3.50 per pound with oats. At a cost of $2.00 per pound for the granola mixture, how many pounds of oats must be added to 10 pounds of raisins?

(1) The granola mixture is packaged in one-pound bags.
(2) Oats cost $1.00 per pound.

Detailed Solution for Test: Mixture Problems - Question 3

Statement (1): The granola mixture is packaged in one-pound bags.
From this statement alone, we know that the granola mixture is packaged in one-pound bags. However, we don't have any information about the proportion or ratio of oats to raisins in the mixture or the total weight of the mixture. Statement (1) alone is not sufficient.

Statement (2): Oats cost $1.00 per pound.
From this statement alone, we know the cost per pound of oats. Since we are told that the granola mixture costs $2.00 per pound, and the raisins cost $3.50 per pound, we can deduce that the oats constitute the difference in cost between the granola mixture and the raisins. Therefore, for every pound of oats added, the cost of the mixture decreases by $1.50 per pound. With this information, we can calculate the number of pounds of oats needed to balance the cost.

Since 10 pounds of raisins are used and the cost difference is $1.50 per pound, the total cost difference for the 10 pounds of raisins is $1.50 * 10 = $15.00. Since oats cost $1.00 per pound, the number of pounds of oats needed to balance the cost is $15.00 / $1.00 = 15 pounds.

Hence, statement (2) alone is sufficient to answer the question, but statement (1) alone is not sufficient. Therefore, the correct answer is (B).

Test: Mixture Problems - Question 4

Each day, Sergio feeds his cat a 500-gram mixture of Brand X and Brand Y cat foods. If Sergio’s cat eats only this mix of cat food and she consumes 103 grams of fat per day, what is the amount of Brand X cat food that she receives each day?

(1) Brand X cat food consists of 35 percent fat.
(2) Brand Y cat food consists of 11 percent fat.

Detailed Solution for Test: Mixture Problems - Question 4

Statement (1): Brand X cat food consists of 35 percent fat.
Statement (2): Brand Y cat food consists of 11 percent fat.

From Statement (1), we know the fat content of Brand X cat food. From Statement (2), we know the fat content of Brand Y cat food. In order to determine the amount of Brand X cat food in the mixture, we need to consider the fat content and weight of both brands.

Let's assume that Sergio feeds x grams of Brand X cat food and y grams of Brand Y cat food. We are given that the total mixture weighs 500 grams and contains 103 grams of fat.

From Statement (1), we can write the equation: 0.35x = (35/100)x grams of fat from Brand X cat food.
From Statement (2), we can write the equation: 0.11y = (11/100)y grams of fat from Brand Y cat food.

Since the cat consumes 103 grams of fat per day, we have the equation: (35/100)x + (11/100)y = 103.

Combining these equations, we have a system of two equations with two variables:
(35/100)x + (11/100)y = 103,
x + y = 500.

With these equations, we can solve for x, the amount of Brand X cat food in grams.

Therefore, BOTH statements (1) and (2) TOGETHER are sufficient to answer the question asked, but NEITHER statement ALONE is sufficient.

Test: Mixture Problems - Question 5

A mixture consists of two spirits A and B; A evaporates at the rate of 2 ml per minute and B at 3 ml per minute. What will be the volume of the mixture after 10 minutes?

(1) Initial ratio of A and B in the mixture was 4 : 5.
(2) The final ratio of A and B in the mixture was 5 : 4.

Test: Mixture Problems - Question 6

A nut-mix contains peanuts and cashews. Cashews are more expensive than peanuts by what percentage?

(1) The nut-mix contains 10% peanuts.
(2) The nut-mix costs 20% more than pure peanuts.

Test: Mixture Problems - Question 7

Two solutions, A and B, are produced by mixing milk and water in different quantities. The percentages of milk present in solution A and solution B are 60% and 70% respectively. What is the volume of solution A?

I. The sum of the volume of milk present in solution A and solution B is 50 litres.
II. The sum of the volume of solution A and solution B is 80 litres.

Test: Mixture Problems - Question 8

From a cask containing y liters of milk, x liters of milk is drawn out and z liters of water are then added to the cask. This process is repeated one more time. What is the fraction of milk finally present in the mixture in the cask?

(1) x = 20, y = 100
(2) x and z form 20% and 10% of y, respectively

Test: Mixture Problems - Question 9

Brand W nut mix contains 24% cashews by weight, and Brand X nut mix contains 9% cashews by weight. If w pounds of Brand W nut mix are combined with x pounds of Brand X nut mix to produce y pounds of nut mix that is 15% cashews by weight, what is the value of x?

(1) w = 30
(2) y = 75

Test: Mixture Problems - Question 10

In what ratio should Solution 1 and Solution 2 be mixed to get a solution which contains water and milk in the ratio of 3:7?

(1) Solution 1 contains water and milk in the ratio 1:9 and Solution 2 contains water and milk in the ratio 2:3
(2) The amount of milk in 100 gallon of solution 1 is 80 gallons more than that of water in the same solution. Further, 50 gallons of Solution 2 contains 10 gallons more milk than water.

Information about Test: Mixture Problems Page
In this test you can find the Exam questions for Test: Mixture Problems solved & explained in the simplest way possible. Besides giving Questions and answers for Test: Mixture Problems, EduRev gives you an ample number of Online tests for practice

Top Courses for GMAT

Download as PDF

Top Courses for GMAT