RD SHARMA SOLUTION CHAPTER – 6 Exponents | CLASS 7TH MATHEMATICS-EDUGROWN

Exercise 6.1

Question: 1

Find the values of each of the following:

(i) 132

 (ii) 73

 (iii) 34

Solution:

(i) 13² =  13 × 13

= 169

(ii) 7³ = 7 × 7 × 7

= 343

(iii) 3⁴ = 3 × 3 × 3 × 3

= 81

Question: 2

Find the value of each of the following:

(i) (-7)²

(ii) (-3)⁴

(iii)  (-5)⁵

Solution:

We know that if ‘a’ is a natural number, then

We have,

(i)  (-7)² = (-7) × (-7)

= 49

(ii) (-3)⁴ = (-3) × (-3) × (-3) × (-3)

= 81

(iii) (-5)⁵ = (-5) × (-5) × (-5) × (-5) × (-5)

= -3125

Question: 3

Simply:

(i) 3 × 10²

(ii) 2² × 5³

(iii) 3³ × 5²

Solution:

(i) 3 × 10² = 3 × 10 × 10

= 3 × 100

= 300

(ii) 2² × 5³ = 2 × 2 × 5 × 5 × 5

= 4 × 125

= 500

(iii) 3³ × 5² = 3 × 3 × 3 × 5 × 5

= 27 × 25

= 675

Question: 4

Simply:

(i)  3² × 10⁴

(ii)  2⁴ × 3²

(iii) 5² × 3⁴

Solution:

(i)  3² × 10⁴ = 3 × 3 × 10 × 10 × 10 × 10

= 9 × 10000

= 90000

(ii) 2⁴ × 3² = 2 × 2 × 2 × 2 × 3 × 3

= 16 × 9

= 144

(iii) 5² × 3⁴ = 5 × 5 × 3 × 3 × 3 × 3

= 25 × 81

= 2025

Question: 5

Simply:

(i) (-2) × (-3)³

(ii) (-3)² × (-5)³

(iii) (-2)⁵ × (-10)²

Solution:

(i) (-2) × (-3)³ = (-2) × (-3) × (-3) × (-3)

= (-2) × (-27)

= 54

(ii) (-3)² × (-5)³ = (-3) × (-3) × (-5) × (-5) × (-5)

= 9 × (-125)

= -1125

(iii) (-2)⁵ × (-10)² = (-2) × (-2) × (-2) × (-2) × (-2) × (-10) × (-10)

= (-32) × 100

= -3200

Question: 6

Simply:

(i) (3/4)²

(ii) (-2/3)⁴

(iii) (- 4/5)⁵

Solution:

Question: 7

Identify the greater number in each of the following

(i) 2⁵ or 5²

(ii) 3⁴ or 4³

(iii) 3⁵ or 5³

Solution:

(i) 2⁵ or 5²

2⁵ = 2 × 2 × 2 × 2 × 2

= 32

5² = 5 × 5

= 25

Therefore, 2⁵ 5²

(ii) 3⁴ or 4³

= 3⁴ = 3 × 3 × 3 × 3

= 81

= 4³ = 4 × 4 × 4

= 64

Therefore, 3⁴ 4³

(iii) 3⁵ or 5³

= 3⁵ = 3 × 3 × 3 × 3 × 3

= 243

= 5³ = 5 × 5 × 5

= 125

Therefore, 3⁵ 5³

Question: 8

Express each of the following in exponential form

(i) (-5) × (-5) × (-5)

Solution:

(i) (-5) × (-5) × (-5) = (-5)³

Question: 9

Express each of the following in exponential form

(i) x × x × x × x × a × a × b × b × b

(ii) (-2) × (-2) × (-2) × (-2) × a × a × a

(iii) (-2/3) × (-2/3) × x × x × x

Solution:

(i) x × x × x × x × a × a × b × b × b = x⁴a²b³

(ii) (-2) × (-2) × (-2) × (-2) × a × a × a = (-2)⁴a³

(iii) (-2/3) × (-2/3) × x × x × x = (-2/3)² x³

Question: 10

Express each of the following numbers in exponential form

(i) 512

(ii) 625

(iii) 729

Solution:

(i) 512 = 2⁹

(iii) 625 = 5⁴

(iii) 729 = 3⁶

Question: 11

Express each of the following numbers as a product of powers of their prime factors

(i) 36

(ii) 675

(iii) 392

Solution:

(i) 36 = 2 × 2 × 3 × 3

= 2² × 3²

(ii) 675 = 3 × 3 × 3 × 5 × 5

= 3³ × 5²

(iii) 392 = 2 × 2 × 2 × 7 × 7

= 2³ × 7²

Question: 12

Express each of the following numbers as a product of powers of their prime factors

(i) 450

(ii) 2800

(iii) 24000

Solution:

(i) 450 = 2 × 3 × 3 × 5 × 5

= 2 × 3² × 5²

(ii) 2800 = 2 × 2 × 2 × 2 × 5 × 5 ×7

= 2⁴ × 5² × 7

(iii) 24000 = 2 × 2 × 2 × 2 × 2 × 2 × 3 × 5 × 5 × 5

= 2⁵ × 3 × 5³

Question: 13

Express each of the following as a rational number of the form p/q

(i) (3/7)²

(ii) (7/9)³

(iii) (-2/3)⁴

Solution:

Question: 14

Express each of the following rational numbers in power notation

(i) 49/64

(ii) – 64/125

(iii) -12/16

Solution:

(i) 49/64 = (7/8)²

Because 7² = 49 and 8² = 64

(ii) – 64/125 = (- 4/5)³

Because 4³ = 64 and 5³ = 125

(iii) – (1/216) = – (1/6)³

Because 1³ = 1 and 6³ = 216

Question: 15

Find the value of the following

(i) (-1/2)² × 2³ × (3/4)²

(ii) (-3/5)⁴ × (4/9)⁴ × (-15/18)²

Solution:

(i) (-1/2)² × 2³ × (3/4)² = 1/4 × 8 × 9/16

= 9/8

(ii) (-3/5)⁴ × (4/9)⁴ × (-15/18)² = 81/625 × 256/6561 × 225/324 = 64/18225

Question: 16

If a = 2 and b= 3, the find the values of each of the followimg

(i) (a + b)^a

(ii) (ab)^b

(iii) (b/a)^b

(iv) (a/b + b/a)^a

Solution:

(i) (a + b)^a = (2 + 3)²

= (5)²

= 25

(ii) (ab)^b = (2 × 3)³

= (6)³

= 216

(iii) (b/a)^b = (3/2)³

= 27/8

(iv) (a/b + b/a)^a = (2/3 + 3/2)²

= 169/36

Exercise 6.2

Question: 1

Using laws of exponents, simplify and write the answer in exponential form

(i) 2³ × 2⁴ × 2⁵

(ii) 5¹² ÷ 5³

(iii) (7²)³

(iv) (3²)⁵ ÷ 3⁴

(v) 3⁷ × 2⁷

(vi) (5²¹ ÷ 5¹³) × 5⁷

Solution:

Question: 2

Simplify and express each of the following in exponential form

(i) ((2³)⁴ × 28) ÷ 212

(ii) (8² × 8⁴) ÷ 8³

(iii) (5⁷/5²) × 5³

Solution:

Question: 3

Simplify and express each of the following in exponential form

Solution:

Question: 4

Write 9 × 9 × 9 × 9 × 9 in exponential form with base 3

Solution:

9 × 9 × 9 × 9 × 9 = (9)⁵ = (3²)⁵

= 3¹⁰

Question: 5

Simplify and write each of the following in exponential form

Solution:

Question: 6

Simplify

Solution:

Question: 7

Find the values of n in each of the following

Solution:

Question: 8

Solution:

Exercise 6.3

Question: 1

Express the following numbers in the standard form

(i) 3908.78

(ii) 5, 00, 00, 000

(iii) 3, 18, 65, 00, 000

(iv) 846 × 10⁷

(v) 723 × 10⁹

Solution:

(i) 3908.78 = 3.90878 × 10³

Since, the decimal point is moved three places to the left

(ii) 5, 00, 00, 000 = 5, 00, 00, 000.00

= 5 × 10⁷

Since, the decimal point is moved seven places to the left

(iii) 3, 18, 65, 00, 000 = 3, 18, 65, 00, 000.00

= 3.1865 × 10⁹

Since, the decimal point is moved nine places to the left

(iv) 846 × 10⁷ = 8.46 × 10² × 10⁷

= 8.46 × 10⁹

Since, the decimal point is moved two places to the left

(v) 723 × 10⁹ = 7.23 × 10² × 10⁹

= 7.23 × 10¹¹

Since, the decimal point is moved two places to the left

Question: 2

Write the following numbers in the usual form

(i) 4.83 × 10⁷

(ii) 3.21 × 10⁵

(iii) 3.5 × 10³

Solution:

(i) 4.83 × 10⁷ = 483 × 10^(7–2)

= 483 × 10⁵

= 4, 83, 00, 000

Since, the decimal point is moved two places to the right

(ii) 3.21 × 10⁵ = 321 × 10^(5–2)

= 321 × 103

= 3, 21, 000

Since, the decimal point is moved two places to the right

(ii) 3.5 × 10³ = 35 × 10^(3–1)

= 35 × 10²

= 3,500

Since, the decimal point is moved one place to the right

Question: 4

Express the numbers appearing in the following statements in the standard form

(i) The distance between the earth and the moon is 384,000,000 metres.

(ii) Diameter of the earth is 1, 27, 56,000 metres.

(iii) Diameter of the sun is 1, 400, 000, 000 metres.

(iv) The universe is estimated to be about 12,000,000,000 years old.

Solution:

(i) The distance between the earth and the moon is 3.84 × 10⁸ metres.

Since, the decimal point is moved eight places to the left

(ii) Diameter of the earth is 1.2756 × 10⁷ metres.

Since, the decimal point is moved seven places to the left

(ii) Diameter of the sun is 1.4 × 10⁹ metres.

Since, the decimal point is moved nine places to the left

(iv) The universe is estimated to be about 1.2 × 10¹⁰ years old.

Since, the decimal point is moved ten places to the left