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Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots

Q1: How many numbers lie between squares of the following numbers?
(i) 12 and 13
(ii) 25 and 26
(iii) 99 and 100
Ans: 
As we know, between n2 and (n+1)2, the number of non–perfect square numbers are 2n.
(i) Between 122 and 132 there are 2 × 12 = 24 natural numbers.
(ii) Between 252 and 262 there are 2 × 25 = 50 natural numbers.
(iii) Between 992 and 1002 there are 2 × 99 =198 natural numbers.

Q2: Write a Pythagorean triplet whose one member is:
(i) 6
(ii) 14
(iii) 16
(iv) 18
Ans: 
We know, for any natural number m, 2m, m2– 1, m+ 1 is a Pythagorean triplet.
(i) 2m = 6
⇒ m = 6/2 = 3
m2–1= 32 – 1 = 9–1 = 8
m2+1= 32+1 = 9+1 = 10
Therefore, (6, 8, 10) is a Pythagorean triplet.
(ii) 2m = 14
⇒ m = 14/2 = 7
m2–1= 72–1 = 49–1 = 48
m2+1 = 72+1 = 49+1 = 50
Therefore, (14, 48, 50) is not a Pythagorean triplet.
(iii) 2m = 16
⇒ m = 16/2 = 8
m2–1 = 82–1 = 64–1 = 63
m2+ 1 = 82+1 = 64+1 = 65
Therefore, (16, 63, 65) is a Pythagorean triplet.
(iv) 2m = 18
⇒ m = 18/2 = 9
m2–1 = 92–1 = 81–1 = 80
m2+1 = 92+1 = 81+1 = 82
Therefore, (18, 80, 82) is a Pythagorean triplet.

Q3: (n+1)2-n2 = ?
Ans: 
(n+1)2-n2
= (n2 + 2n + 1) – n2
= 2n + 1

Q4: Show that 121 is the sum of 11 odd natural numbers.
Ans: 
As 121 = 112
We know that the sum of first n odd natural numbers is n2.
Therefore, 121 = sum of first 11 odd natural numbers
= 1 + 3 + 5+ 7 + 9 + 11 +13 + 15 + 17 + 19 + 21

Q5: Show that the sum of two consecutive natural numbers is 132.
Ans: Let 2n + 1 = 13
So, n = 6
So, ( 2n + 1)2 = 4n2 + 4n + 1
= (2n2 + 2n) + (2n2 + 2n + 1)
Substitute n = 6,
(13)2 = ( 2 x 62 + 2 x 6) + (2 x 62 + 2 x 6 + 1)
= (72 + 12) + (72 + 12 + 1)
= 84 + 85

Q6: Use the identity and find the square of 189.
(a – b)2 = a2 – 2ab + b2
Ans: 189 = (200 – 11)2
= 40000 – 2 x 200 x 11 + 112
= 40000 – 4400 + 121
= 35721

Q7: What would be the square root of 625 using the identity (a +b)2 = a2 + b+ 2ab?
Ans: 
(625)2
= (600 + 25)2
= 6002 + 2 x 600 x 25 +252
= 360000 + 30000 + 625
= 390625

Q8: Find the square roots of 100 and 169 by the method of repeated subtraction.
Ans:
Let us find the square root of 100 first. 

  • 100 – 1 = 99
  • 99 – 3 = 96
  • 96 – 5 = 91
  • 91 – 7 = 84
  • 84 – 9 = 75
  • 75 – 11 = 64
  • 64 – 13 = 51
  • 51 – 15 = 36
  • 36 – 17 = 19
  • 19 – 19 = 0

Here, we have performed a subtraction ten times.
Therefore, √100 = 10
Now, the square root of 169:

  • 169 – 1 = 168
  • 168 – 3 = 165
  • 165 – 5 = 160
  • 160 – 7 = 153
  • 153 – 9 = 144
  • 144 – 11 = 133
  • 133 – 13 = 120
  • 120 – 15 = 105
  • 105 – 17 = 88
  • 88 – 19 = 69
  • 69 – 21 = 48
  • 48 – 23 = 25
  • 25 – 25 = 0

Here, we have performed subtraction thirteen times.
Therefore, √169 = 13

Q9: Find the square root of 729 using factorisation method.
Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots
729 = 3×3×3×3×3×3×1
⇒ 729 = (3×3)×(3×3)×(3×3)
⇒ 729 = (3×3×3)×(3×3×3)
⇒ 729 = (3×3×3)2
Therefore,
⇒ √729 = 3×3×3 = 27

Q10: Find the smallest whole number by which 2800 should be divided so as to get a perfect square.
Ans: 
Let us first factorise the number 2800.
Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots
2800 = 2 × 2 × 2 × 2 × 5 × 5 × 7
= (2 × 2) × (2 × 2) × (5 × 5) ×7
Here, 7 cannot be paired.
Therefore, we will divide 2800 by 7 to get a perfect square.
New number = 2800 ÷ 7 = 400

Q11: 2025 plants are to be planted in a garden in such a way that each row contains as many plants as the number of rows. Find the number of rows and the number of plants in each row.
Ans: Let the number of rows be, x.
Therefore, the number of plants in each row = x.
Total many contributed by all the students = x × x = x2
Given, x2 = Rs.2025
Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots
x2 = 3 × 3 × 3 × 3 × 5 × 5
⇒ x2 = (3 × 3) × (3 × 3) × (5 × 5)
⇒ x2 = (3 × 3 × 5) × (3 × 3 × 5)
⇒ x2 = 45 × 45
⇒ x = √(45 × 45)
⇒ x = 45
Therefore,
Number of rows = 45
Number of plants in each rows = 45

Q12: Find the smallest square number that is divisible by each of the numbers 8, 15 and 20.
Ans: 
Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots
L.C.M of 8, 15 and 20 is (2 × 2 × 5 × 2 × 3) = 120.
120 = 2 × 2 × 3 × 5 × 2 = (2 × 2) × 3 × 5 × 2
Here, 3, 5 and 2 cannot be paired.
Therefore, we need to multiply 120 by (3 × 5 × 2) i.e. 30 to get a perfect square.
Hence, the smallest squared number which is divisible by numbers 8, 15 and 20 = 120 × 30 = 3600

The document Class 8 Maths Chapter 5 HOTS Questions - Squares and Square Roots is a part of the Class 8 Course Mathematics (Maths) Class 8.
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