NCERT Solutions Class 8th Maths Chapter – 1 Rational Numbers Exercise 1.2

NCERT Solutions Class 8th Maths Chapter – 1 Rational Numbers 

TextbookNCERT
Class 8th
Subject Mathematics
Chapter1st
Chapter NameRational Numbers
CategoryClass 8th Maths
Medium English
SourceLast Doubt

NCERT Solutions Class 8th Maths Chapter – 1 Rational Numbers Exercise 1.2 In this chapter we will read about Rational Numbers, Natural number, Whole number, Integers (positive and negative), Addition, Subtraction, Multiplication, Division, The role of zero (0), The role of 1, Reciprocal, Properties of rational number and solve Class 8th Maths Chapter – 1 Rational Numbers Exercise 1.2

NCERT Solutions Class 8th Maths Chapter – 1 Rational Numbers

Chapter – 1

Rational Numbers

Exercise 1.2

1. Represent these numbers on the number line.
(i) 7/4
(ii) -5/6Solution:
(i) 7/4
Divide the line between the whole numbers into 4 parts. i.e., divide the line between 0 and 1 to 4 parts, 1 and 2 to 4 parts and so on.
Thus, the rational number 7/4 lies at a distance of 7 points away from 0 towards the positive number line.

Rational Numbers

(ii) -5/6
Divide the line between the integers into 4 parts. i.e., divide the line between 0 and -1 to 6 parts, -1 and -2 to 6 parts and so on. Here since the numerator is less than the denominator, dividing 0 to – 1 into 6 parts is sufficient.
Thus, the rational number -5/6 lies at a distance of 5 points, away from 0, towards the negative number line

Rational Numbers

2. Represent -2/11, -5/11, -9/11 on a number line.

Solution: Divide the line between the integers into 11 parts.
Thus, the rational numbers -2/11, -5/11, and -9/11 lie at a distance of 2, 5, 9 points away from 0, towards the negative number line respectively.

Rational Numbers

3. Write five rational numbers which are smaller than 2.

Solution: The number 2 can be written as 20/10
Hence, we can say that the five rational numbers which are smaller than 2 are:
2/10, 5/10, 10/10, 15/10, 19/10

4. Find the rational numbers between -2/5 and ½.

Solution: Let us make the denominators same, say 50.
-2/5 = (-2 × 10)/(5 × 10) = -20/50
½ = (1 × 25)/(2 × 25) = 25/50
Ten rational numbers between -2/5 and ½ = ten rational numbers between -20/50 and 25/50
Therefore, ten rational numbers between -20/50 and 25/50 = -18/50, -15/50, -5/50, -2/50, 4/50, 5/50, 8/50, 12/50, 15/50, 20/50

5. Find five rational numbers.
(i) 2/3 and 4/5
(ii) -3/2 and 5/3
(iii) ¼ and ½Solution:
(i) 2/3 and 4/5
Let us make the denominators the same, say 60
i.e., 2/3 and 4/5 can be written as:
2/3 = (2 × 20)/(3 × 20) = 40/60
4/5 = (4 × 12)/(5 × 12) = 48/60
Five rational numbers between 2/3 and 4/5 = five rational numbers between 40/60 and 48/60
Therefore, Five rational numbers between 40/60 and 48/60 = 41/60, 42/60, 43/60, 44/60, 45/60

(ii) -3/2 and 5/3
Let us make the denominators same, say 6
i.e., -3/2 and 5/3 can be written as:
-3/2 = (-3 × 3)/(2× 3) = -9/6
5/3 = (5 × 2)/(3 × 2) = 10/6
Five rational numbers between -3/2 and 5/3 = five rational numbers between -9/6 and 10/6
Therefore, Five rational numbers between -9/6 and 10/6 = -1/6, 2/6, 3/6, 4/6, 5/6

(iii) ¼ and ½
Let us make the denominators the same, say 24.
i.e., ¼ and ½ can be written as:
¼ = (1 × 6)/(4 × 6) = 6/24
½ = (1 × 12)/(2 × 12) = 12/24
Five rational numbers between ¼ and ½ = five rational numbers between 6/24 and 12/24
Therefore, Five rational numbers between 6/24 and 12/24 = 7/24, 8/24, 9/24, 10/24, 11/24

6. Write five rational numbers greater than -2.

Solution:
-2 can be written as – 20/10
Hence, we can say that the five rational numbers greater than -2 are
-10/10, -5/10, -1/10, 5/10, 7/10

7. Find ten rational numbers between 3/5 and 3/4.

Solution: Let us make the denominators the same, say 80.
3/5 = (3 × 16)/(5× 16) = 48/80
3/4 = (3 × 20)/(4 × 20) = 60/80
Ten rational numbers between 3/5 and ¾ = ten rational numbers between 48/80 and 60/80
Therefore, ten rational numbers between 48/80 and 60/80 = 49/80, 50/80, 51/80, 52/80, 54/80, 55/80, 56/80, 57/80, 58/80, 59/80

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