[Maths Class Notes] on Comparing Quantities MCQs Pdf for Exam

In mathematics, one of the most basic tasks is to compare quantities. This can be done in several ways, including by using comparison symbols such as >, <, or =. To help students become comfortable with this skill, multiple-choice questions about comparing quantities are often included on math tests.

Types of Comparing Quantities MCQs

There are many different types of questions that can be asked on comparing quantities multiple-choice tests. Here are some examples:

Questions that ask students to determine if one number is greater than another. For example, “Is 5 > 4?” This type of question requires an understanding of numbers and their order.

Questions that ask students to determine if one number is greater than or equal to another. For example, “Is 5 > or = 4?” This type of question requires an understanding of the order of operations, specifically the order of inequalities.

Questions that ask students to determine if two numbers are equivalent. For example, “Are 5 and 2 equal?” This type of question requires an understanding of numbers and the symbols used to indicate equivalency.

Questions about Comparing Quantities MCQs

The following list contains examples of multiple-choice questions that can be asked on comparing quantities tests:

Is 5 > 4?

Are 5 and 2 equal?

Are 1/8 and 3/4 equal?

Is -3 > -5?

The best way to become comfortable with answering questions about comparing quantities is to practice. Many online resources offer to practise questions, and many math textbooks also include practice problems. By practicing these types of questions, students will be better prepared to answer them correctly on a test. Comparing quantities are often included on math tests. With the help of comparing quantities, students are more capable of answering this type of question and can also understand the basic mathematics and understand the concepts of comparing Quantities score higher. 

The best way to become comfortable with answering questions about comparing quantities is to practice. Many online resources offer practice questions, and many math textbooks also include practice problems. By practicing these types of questions, students will be better prepared to answer them correctly on a test. Math skills are essential for students of all ages. To help students become comfortable with basic math skills, multiple-choice questions about comparing quantities are often included on math tests. By practicing these types of questions, students will be better prepared to answer them correctly on a test.

Key Features of NCERT Solutions of Class 8 Maths Chapter 8 Comparing Quantities MCQs

Learning the chapter Comparing Quantities helps the students to:

• Slightly advanced problems involving applications on percentages, applications on profit & loss, overhead expenses, Discounts as well as tax.

• Difference between compound interest and simple interest, arriving at the formula for compound interest through patterns and using it for simple problems.

• Direct variation – Simple as well as direct word problems

• Inverse variation – Simple as well as direct word problems

• Time & work problems– Simple as well as direct word problems

Let’s discuss the class 8 Maths chapter 8 comparing quantities MCQs.

MCQs on Class 8 Comparing Quantities

Multiple choice questions (MCQs on Class 8 Comparing Quantities) are available for Class 8 Chapter 8 Comparing Quantities. All the problems generally have four multiple options, in which one is the right answer. 

Students have to solve each question and have to choose the correct answer in class 8 Maths chapter 8 comparing quantities MCQs.

1. The Ratio of the Speed of Cycle 12 Km Per Hour to the Speed of a Scooter 36 Km Per Hour is Equal To

A. 1:2

B. 1:3

C. 1:4

D. None of the above

Answer: B

Explanation: Speed of cycle/Speed of scooter equals 12/36 = ⅓

2. The Ratio of 10m to 10 Km is Equal To:

A. 1/10

B. 1/100

C. 1/1000

D. 1000

Answer: C

Explanation: 10m/10km = 10m/10000m = 1/1000

3. The Percentage of 3:4 is

A. 75%

B. 50%

C. 25%

D. 100%

Answer: A

Explanation: 3:4 = ¾

(3×100)/(4×100) = ¾ x 100% = 0.75 x 100% = 75%

4. The Percentage of 2:5

A. 20%

B. 50%

C. 60%

D. 40%

Answer: D

Explanation: 2:5 equals ⅖ = ⅖ x 100% = 0.4 x 100% = 40%

5. If 50% of Students Are Good at Science Out of 20 Students. Then the Number of Students Good at the Subject Science Is:

A. 10

B. 15

C. 5

D. 11

Answer: A

Explanation: 50% of students out of 20 students equals 50% of 20

= (50/100) x 20

= ½ x 20

= 10

6. The Price of a Motorcycle Was Rs. 34,000 Last Year. It Has Increased by 20% This Year. the Price of Motorcycle Now Is:

A. Rs. 36,000

B. Rs. 38,800

C. Rs. 40,800

D. Rs. 32,000

Answer: C

Explanation: 20% of Rs.34,000 equals 20/100 x 34,000 equals Rs.6800

New price = Rs. 34,000+Rs.6800

= Rs. 40,800

7. An Item Marked at Rs. 840 Is Sold for Rs. 714. the Discount % is:

A. 10%

B. 15%

C. 20%

D. 25%

Answer: B

Explanation: Discount equals Marked Price – Sale Price

= 840 – 714

= Rs. 126

Discount % = (126/840) x 100% = 15%

8. A Person Got an Increase of 10% in His Salary. If His Salary Was Equal to Rs. 50000, Then the New Salary Is:

A. Rs. 55000

B. Rs. 60000

C. Rs. 45000

D. Rs. 65000

Answer: A

Explanation: Previous salary = Rs. 50000

10% of Rs.50000 = (10/100) x 50000 = Rs. 5000

New salary = Rs. 50000 + Rs. 5000

= Rs. 55000/-

9. The Cost of the Article Was Rs. 15500 and Rs. 500 Was Spent on Its Repairing. Suppose it Is Sold for a Profit Equal to 15 Percent. The Selling Price of the Article Is:

A. Rs.16400

B. Rs.17400

C. Rs.18400

D. Rs.19400

Answer: C

Explanation: Total cost = 15500 + 500 = 16000

Profit % = (Profit/Cost price) x 100

Profit = (Profit% x Cost price)/100

P = (15×16000)/100 = 2400

Selling Price equals Profit + cost price = 2400 + 16000 = Rs.18400

10. Waheeda Bought an Air Cooler for Rs. 3300, Including a Tax of 10%. The Price of the Air Cooler Before Value Added Tax Was Added Is:

A. Rs. 2000

B. Rs. 3000

C. Rs. 2500

D. Rs. 2800

Answer: B

Explanation:10% VAT on Rs.100 will make it Rs.110

So, for price including VAT Rs.110, the original price is equal to Rs.100

Then, Price including VAT Rs. 3300, the original price = Rs. (100/110) x 3300 = Rs. 3000

Conclusion

The article has covered the majority of aspects about the Quantities with examples to get proper insights.