Rational Numbers Class 7 Extra Questions Maths Chapter 9

Chapter 9, "Rational Numbers," is a key topic in the Class 7 Maths curriculum that help students understand numbers beyond integers, including positive and negative fractions. This FREE PDF offers a well-organized set of extra questions designed to strengthen your grasp on rational numbers through regular practice.  

Perfectly aligned with the latest CBSE Class 7 Maths syllabus, these questions give students the opportunity to revise and apply core concepts in a clear and structured way. Use this resource for flexible self-study sessions and boost your exam preparation with confidence.

Rational Numbers Class 7 Extra Questions with Solutions

1. Find three rational numbers equivalent to:

(a) -2/5

Multiplying both numerator and denominator by 2, 3, and 4: - (-4/10), (-6/15), (-8/20)

(b) 3/7

Multiplying both numerator and denominator by 2, 3, and 4: - (6/14), (9/21), (12/28)

2. Reduce the following rational numbers to their standard form:

(a) 35/-15

GCD of 35 and 15 is 5. Simplified form: -7/3

(b) -36/-216

GCD of 36 and 216 is 36. Simplified form: 1/6

3. Represent the following rational numbers on the number line:

(a) 3/2

Convert to decimal: 3/2 = 1.5. Mark 1.5 between 1 and 2 on the number line.

(b) -3/4

Convert to decimal: -3/4 = -0.75. Mark -0.75 between 0 and -1 on the number line.

4. Compare and state which is greater:

(a) 3/4 and 1/2

Convert to decimal: 3/4 = 0.75, 1/2 = 0.5. Hence, 3/4 is greater.

(b) -3/2 and -3/4

Convert to decimal: -3/2 = -1.5, -3/4 = -0.75. Hence, -3/4 is greater.

5. Find the sum:

(a) 2/5 + 3/7

LCM of 5 and 7 is 35. (14/35) + (15/35) = 29/35

(b) -4/9 + 5/12

LCM of 9 and 12 is 36. (-16/36) + (15/36) = -1/36

6. Subtract:

(a) 3/5 - 7/10

LCM of 5 and 10 is 10. (6/10) - (7/10) = -1/10

(b) -2/3 - 4/9

LCM of 3 and 9 is 9. (-6/9) - (4/9) = -10/9

7. Multiply:

(a) 2/3 × 4/5

(2 × 4) / (3 × 5) = 8/15

(b) -7/9 × 3/4

(-7 × 3) / (9 × 4) = -21/36 = -7/12

8. Divide:

(a) 5/6 ÷ 2/3

(5/6) ÷ (2/3) = (5/6) × (3/2) = (5 × 3) / (6 × 2) = 15/12 = 5/4

(b) -3/8 ÷ 9/10

(-3/8) ÷ (9/10) = (-3/8) × (10/9) = (-3 × 10) / (8 × 9) = -30/72 = -5/12

Rational Numbers Class 7 Extra Questions - Very Short Answer Type

Below are some advanced level Rational Numbers Class 7 Extra Questions with answers and short explanations. Try each question and check your solution.

1. If x = 5/6 and y = -3/4, find x + y. 

x + y = 5/6 - 3/4 = (10 - 9)/12 = 1/12 

Find the LCM of 6 and 4 (12), convert to like denominators, then add. 

2. Simplify: 7/8 ÷ 14/16. 

7/8 * 16/14 = 112/112 = 1

Dividing by a fraction = multiply by its reciprocal.

3. Multiply -5/9 × 27/10.

(-5 × 27)/(9 × 10) = -135/90 = -3/2

Simplify numerator and denominator by dividing by 45.

4. Write the additive inverse of 11/13.

-11/13

Additive inverse means the number that gives 0 when added to the original.

5. Find the multiplicative inverse of -3/5.

-5/3

Flip numerator and denominator while keeping the sign.

6. If a = 2/3 and b = 3/2, find a × b × a.

2/3 × 3/2 × 2/3 = 4/9

Simplify step-by-step; one pair cancels out.

7. Simplify: 4/7 + (-3/7).

4/7 - 3/7 = 1/7

Combine like denominators carefully with signs.

8. Find the product: -2/5 × -15/8.

(−2 × −15)/(5 × 8) = 30/40 = 3/4

Negative × Negative = Positive.

9. Divide -7/9 by 14/27.

-7/9 × 27/14 = -189/126 = -3/2

Multiply by the reciprocal and reduce.

10. Which of the following is a rational number? (a) √2 (b) π (c) 0 (d) √3

(c) 0

Rational numbers can be written as p/q; 0 = 0/1 fits this form.

11. Simplify: 5/6 − (−4/9).

5/6 + 4/9 = (15 + 8)/18 = 23/18

Subtracting a negative becomes addition.

12. If x = -7/8, find -x.

-x = 7/8

Negative of a negative gives a positive.

13. Compare -2/3 and -3/4.

-2/3 = -0.666, -3/4 = -0.75 ⇒ -2/3 > -3/4

The number closer to zero is greater on the number line.

14. Find the value of 3/5 × 10/9 × 15/2.

(3 × 10 × 15) / (5 × 9 × 2) = 450 / 90 = 5

Multiply and simplify step by step.

15. Check if 2/3 and 6/9 are equal.

Yes, 6/9 = 2/3

Simplify 6/9 by dividing by 3.

16. Express -0.4 as a rational number.

-0.4 = -4/10 = -2/5

Move the decimal one place and reduce.

17. Find the average of 1/4, 1/2, 3/4.

(1/4 + 1/2 + 3/4) = 6/4 ÷ 3 = 2/1 = 2

Add all numbers and divide by 3.

18. If a = 1/3 and b = -2/5, find a − b.

1/3 − (−2/5) = 1/3 + 2/5 = 11/15

Subtracting a negative adds the number.

19. Find three rational numbers between 1/2 and 3/4.

Between them: 9/16, 10/16, 11/16

Multiply numerator and denominator to get more divisions.

20. The sum of two rational numbers is 7/9. One number is 2/9. Find the other.

x + 2/9 = 7/9 ⇒ x = 5/9