NCERT Solutions for Concepts of Squares and Square Roots Class 8 Chapter 5 - FREE PDF Download
NCERT Chapter square and square roots for class 8, you will learn about the different techniques used to determine whether a given natural number is a perfect square or not. The Chapter also covers various methods for finding the square roots of square numbers. If you are familiar with exponents, understanding the concept of square roots will be easy. It's recommended to review the Chapter before solving the NCERT Solutions for Class 8 Maths square and square roots. Class 8 Maths NCERT Solutions are prepared by Vedantu which contains various problems with square and square roots. Download the free NCERT Solutions for CBSE Class 8 Maths Syllabus to prepare well for exams.


Access Exercise wise NCERT Solutions for Chapter 5 Maths Class 8
Current Syllabus Exercises of Class 8 Maths Chapter 5 |
NCERT Solutions of Class 8 Maths Squares and Square Roots Exercise 5.1 |
NCERT Solutions of Class 8 Maths Squares and Square Roots Exercise 5.2 |
NCERT Solutions of Class 8 Maths Squares and Square Roots Exercise 5.3 |
NCERT Solutions of Class 8 Maths Squares and Square Roots Exercise 5.4 |
Exercises Under NCERT Solutions for Class 8 Maths Chapter 5 Squares and Square Roots
Exercise 5.1 Introduces students to square numbers, helping them identify and list perfect squares. The exercise includes basic problems that focus on recognizing and calculating the squares of various numbers. Students learn to distinguish between perfect and non-perfect squares, setting the foundation for more complex concepts.
Exercise 5.2 Delves into finding square roots using the prime factorization method. It provides practice problems that require students to break down numbers into their prime factors, enabling them to calculate the square roots of given numbers accurately. This exercise reinforces the importance of understanding prime factors and their role in determining square roots.
Exercise 5.3 Focuses on the long division method for finding square roots. Students are guided through detailed steps to use the long division method effectively, followed by a series of problems that necessitate applying this technique to find square roots. This exercise helps students grasp the procedural aspect of calculating square roots through long division.
Access NCERT Solutions for Class 8 Maths Chapter 5 – Squares and Square Roots
Exercise 5.1
1. What will be the unit digit of the square of the following numbers?
i. $\text{81}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is $1$,its square will end with the unit digit of the multiplication \[\left( 1\times 1=1 \right)\] i.e., 1.
ii. $\text{272}$
Ans:
It is known to us that, the square of the number having unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’..
Now, in the given number, the unit’s place digit is 2, its square will end with the unit digit of the multiplication \[\left( 2\times 2=4 \right)\]i.e., 4.
iii. $\text{799}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 9, its square will end with the unit digit of the multiplication \[\left( 9\times 9=81 \right)\]i.e., 1.
iv. $\text{3853}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 3, its square will end with the unit digit of the multiplication \[\left( 3\times 3=9 \right)\] i.e., 9.
v. $\text{1234}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is $4$,its square will end with the unit digit of the multiplication $\left( 4\times 4=16 \right)$ i.e., 6.
vi. $\text{26387}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 7, its square will end with the unit digit of the multiplication $\left( 7\times 7=49 \right)$ i.e., 9.
vii. $\text{52698}$
Ans:
It is known to us that, the square of the number having a unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 8, its square will end with the unit digit of the multiplication $\left( 8\times 8=64 \right)$ i.e., 4.
viii. $\text{99880}$
Ans:
It is known to us that, the square of the number having unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is $0$,its square will have two zeroes at the end. Hence, the unit digit of the square of the given number is $0$.
ix. $\text{12796}$
Ans:
It is known to us that, the square of the number having unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 6, its square will end with the unit digit of the multiplication $\left( 6\times 6=36 \right)$ i.e., 6.
x. $\text{55555}$
Ans:
It is known to us that, the square of the number having unit place digit as ‘a’, will end up with the unit digit of ‘a\[\times \]a’.
Now, in the given number, the unit’s place digit is 5, its square will end with the unit digit of the multiplication $\left( 5\times 5=25 \right)$ i.e., 5.
2. The following numbers are obviously not perfect squares. Give reason.
i. $\text{1057}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$. Also, a perfect square has an even number of zeroes at the end of it.
We can see that $1057$has its unit place digit as $7$.
Hence, $1057$cannot be a perfect square.
ii. $\text{23453}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeroes at the end of it.
We can see that $23453$ has its unit place digit as $3$.
Hence, $23453$ cannot be a perfect square.
iii. $\text{7928}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeroes at the end of it.
We can see that $7928$ has its unit place digit as $8$.
Hence, $7928$ cannot be a perfect square.
iv. $\text{222222}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeroes at the end of it.
We can see that $222222$ has its unit place digit as $2$.
Hence, $222222$ cannot be a perfect square.
v. $\text{64000}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$ Also, a perfect square has an even number of zeroes at the end of it.
We can see that $64000$ has three zeroes at the end of it.
Since a perfect square cannot end with an odd number of zeroes, therefore, $64000$ is not a perfect square.
vi. $\text{89722}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeroes at the end of it.
We can see that $89722$ has its unit place digit as $2$.
Hence, $89722$ cannot be a perfect square.
vii. $\text{222000}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeroes at the end of it.
We can see that $222000$ has three zeroes at the end of it.
Since a perfect square cannot end with an odd number of zeroes, therefore, $222000$ is not a perfect square.
viii. $\text{505050}$
Ans:
The square of numbers may end with any one of the digits $0$, $1$\[,4\], $5$, $6$, or $9$Also, a perfect square has an even number of zeros at the end of it.
We can see that $505050$ has three zeroes at the end of it.
Since a perfect square cannot end with an odd number of zeroes, therefore, $505050$ is not a perfect square.
3. The squares of which of the following would be odd numbers?
(i) 431 (ii) 2826 (iii) 7779 (iv) 82004
Ans: We know that the square of an odd number is odd and the square of an even number is even.
So,
(i) The square root of 431 is an odd number.
(ii) The square root of 2826 is an even number.
(iii) The square root of 7779 is an odd number.
(iv) The square root of 82004 is an even number.
4. Observe the following pattern and find the missing digits.
$\text{1}{{\text{1}}^{\text{2}}}\text{=121}$
$\text{10}{{\text{1}}^{\text{2}}}\text{=10201}$
$\text{100}{{\text{1}}^{\text{2}}}\text{=1002001}$
$\text{10000}{{\text{1}}^{\text{2}}}\text{=1}...\text{2}...\text{1}$
$\text{1000000}{{\text{1}}^{\text{2}}}\text{=}...$
Ans:
It can be observed from the given pattern that after doing the square of the number, there are a same number of zeroes before the digit and a same number of zeroes after the digit as there are in the original number.
So, the square of the number $100001$ will have four zeroes before $2$ and four zeroes after $2$.
Similarly, the square of the number $10000001$ will have six zeroes before $2$ and six zeroes after $2$.
Hence,
${{100001}^{2}}=10000200001$
${{10000001}^{2}}=100000020000001$
5. Observe the following pattern and supply the missing numbers.
$\text{1}{{\text{1}}^{\text{2}}}\text{=121}$
$\text{10}{{\text{1}}^{\text{2}}}\text{=10201}$
$\text{1010}{{\text{1}}^{\text{2}}}\text{=102030201}$
$\text{101010}{{\text{1}}^{\text{2}}}\text{=}...$
${{...}^{\text{2}}}\text{=10203040504030201}$
Ans:
It can be observed from the given pattern that:
the square of the numbers has odd number of digits
the first and the last digit of the square of the numbers is $1$
the square of the numbers is symmetric about the middle digit
Since there are four $1$ in $1010101$, so the square of this number will have natural numbers up to $4$ with $0$ in between every consecutive number and then making the number symmetric about $4$
That is, ${{1010101}^{2}}=1020304030201$
Now, \[10203040504030201\] has natural numbers up to \[5\]and the number is symmetric about.
So, the number whose square is \[10203040504030201\], is \[101010101\]
That is, \[{{101010101}^{2}}=10203040504030201\]
Hence,
${{1010101}^{2}}=1020304030201$
\[{{101010101}^{2}}=10203040504030201\]
6. Using the given pattern, find the missing numbers.
\[{{\text{1}}^{\text{2}}}\text{+}{{\text{2}}^{\text{2}}}\text{+}{{\text{2}}^{\text{2}}}\text{=}{{\text{3}}^{\text{2}}}\]
\[{{\text{2}}^{\text{2}}}\text{+}{{\text{3}}^{\text{2}}}\text{+}{{\text{6}}^{\text{2}}}\text{=}{{\text{7}}^{\text{2}}}\]
\[{{\text{3}}^{\text{2}}}\text{+}{{\text{4}}^{\text{2}}}\text{+1}{{\text{2}}^{\text{2}}}\text{=1}{{\text{3}}^{\text{2}}}\]
\[{{\text{4}}^{\text{2}}}\text{+}{{\text{5}}^{\text{2}}}\text{+}{{...}^{\text{2}}}\text{=2}{{\text{1}}^{\text{2}}}\]
\[{{\text{5}}^{\text{2}}}\text{+}{{...}^{\text{2}}}\text{+3}{{\text{0}}^{\text{2}}}\text{=3}{{\text{1}}^{\text{2}}}\]
\[{{\text{6}}^{\text{2}}}\text{+}{{\text{7}}^{\text{2}}}\text{+}{{...}^{\text{2}}}\text{=}{{...}^{\text{2}}}\]
Ans:
It can be observed from the given pattern that:
The third number in the addition is the product of first two numbers.
The R.H.S can be obtained by adding to the third number.
That is, in the first three patterns, it can be observed that
${{1}^{2}}+{{2}^{2}}+{{\left( 1\times 2 \right)}^{2}}={{\left( 2+1 \right)}^{2}}$
${{2}^{2}}+{{3}^{2}}+{{\left( 2\times 3 \right)}^{2}}={{\left( 6+1 \right)}^{2}}$
$ {{3}^{2}}+{{4}^{2}}+{{\left( 3\times 4 \right)}^{2}}={{\left( 12+1 \right)}^{2}}$
Hence, according to the pattern, the missing numbers are as follows:
${{4}^{2}}+{{5}^{2}}+{{\underline{20}}^{2}}={{21}^{2}}$
${{5}^{2}}+{{\underline{6}}^{2}}+{{30}^{2}}={{31}^{2}}$
${{6}^{2}}+{{7}^{2}}+{{\underline{42}}^{2}}={{\underline{43}}^{2}}$
7. Without adding, find the sum.
i. \[\text{1+3+5+7+9}\]
Ans:
Since, the sum of first n odd natural numbers is n2.
So, the sum of the first five odd natural numbers is \[{{\left( 5 \right)}^{2}}=25\]
Thus, \[1+3+5+7+9={{\left( 5 \right)}^{2}}=25\]
ii. \[\text{1+3+5+7+9+11+13+15+17+19}\]
Ans:
Since, the sum of first n odd natural numbers is n2.
So, the sum of the first ten odd natural numbers is \[{{\left( 10 \right)}^{2}}=100\]
Thus, \[1+3+5+7+9+11+13+15+17+19={{\left( 10 \right)}^{2}}=100\]
iii. \[\text{1+3+5+7+9+11+13+15+17+19+21+23}\]
Ans:
Since, the sum of first n odd natural numbers is n2.
So, the sum of the first twelve odd natural numbers is \[{{\left( 12 \right)}^{2}}=144\]
Thus, \[1+3+5+7+9+11+13+15+17+19+21+23={{\left( 12 \right)}^{2}}=144\]
8.
i. Express \[\text{49}\] as the sum of \[\text{7}\] odd numbers.
Ans:
Since, the sum of first n odd natural numbers is n2.
We know that \[49={{\left( 7 \right)}^{2}}\]
\[49=\] Sum of \[7\]odd natural numbers
Hence, \[49=1+3+5+7+9+11+13\]
ii. Express \[\text{121}\] as the sum of \[\text{11}\]odd numbers.
Ans:
Since, the sum of first n odd natural numbers is n2.
We know that \[121={{\left( 11 \right)}^{2}}\]
\[121=\] Sum of \[11\] odd natural numbers
Hence, \[121=1+3+5+7+9+11+13+15+17+19+21\]
9.
How many numbers lie between squares of the following numbers?
i. \[\text{12}\] and \[\text{13}\]
Ans:
Between the squares of the numbers n and (n+1), there will be 2n numbers.
So, there will be \[2\times 12=24\] numbers between \[{{\left( 12 \right)}^{2}}\]and \[{{\left( 13 \right)}^{2}}\].
ii. \[\text{25}\] and \[\text{26}\]
Ans:
Between the squares of the numbers n and (n+1), there will be 2n numbers.
So, there will be \[2\times 25=50\] numbers between \[{{\left( 25 \right)}^{2}}\]and \[{{\left( 26 \right)}^{2}}\] .
iii. \[\text{99}\] and \[\text{100}\]
Ans:
Between the squares of the numbers n and (n+1), there will be 2n numbers.
So, there will be \[2\times 99=198\] numbers between \[{{\left( 99 \right)}^{2}}\] and \[{{\left( 100 \right)}^{2}}\] .
Exercise 5.2
1. Find the square of the following numbers.
i. \[\text{32}\]
Ans:
\[32=30+2\]
Squaring on Both sides
\[{{\left( 32 \right)}^{2}}={{\left( 30+2 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 30+2 \right)}^{2}}={{30}^{2}}+2\times 30\times 2+{{2}^{2}}\]
\[=900+120+4\]
\[=1024\]
ii. \[\text{35}\]
Ans:
\[35=30+5\]
Squaring on Both sides
\[{{\left( 35 \right)}^{2}}={{\left( 30+5 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 30+5 \right)}^{2}}={{30}^{2}}+2\times 30\times 5+{{5}^{2}}\]
\[=900+300+25\]
\[=1225\]
iii. \[\text{86}\]
Ans:
\[86=80+6\]
Squaring on Both sides
\[{{\left( 86 \right)}^{2}}={{\left( 80+6 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 80+6 \right)}^{2}}={{80}^{2}}+2\times 80\times 6+{{6}^{2}}\]
\[=6400+960+36\]
\[=7396\]
iv. \[\text{93}\]
Ans:
\[93=90+3\]
Squaring on Both sides
\[{{\left( 93 \right)}^{2}}={{\left( 90+3 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 90+3 \right)}^{2}}={{90}^{2}}+2\times 90\times 3+{{3}^{2}}\]
\[=8100+540+9\]
\[=8649\]
v. \[\text{71}\]
Ans:
\[71=70+1\]
Squaring on Both sides
\[{{\left( 71 \right)}^{2}}={{\left( 70+1 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 70+1 \right)}^{2}}={{70}^{2}}+2\times 70\times 1+{{1}^{2}}\]
\[=4900+140+1\]
\[=5041\]
vi. \[\text{46}\]
Ans:
\[46=40+6\]
Squaring on Both sides
\[{{\left( 46 \right)}^{2}}={{\left( 40+6 \right)}^{2}}\]
Since, (a+b)2=a2 +2ab+b2
So, \[{{\left( 40+6 \right)}^{2}}={{40}^{2}}+2\times 40\times 6+{{6}^{2}}\]
\[=1600+480+36\]
\[=2116\]
2. Write a Pythagoras triplet whose one number is
i. \[\text{6}\]
Ans:
We know that 2m, m2-1, m2+1 is the Pythagoras triplet for any natural number m >1
It is given that one number in the triplet is \[6\].
If we take m2-1=6, then we get m2 \[=7\]
And m\[=\sqrt{7}\] which is not an integer.
Similarly, if we take m2+1=6, then we get m2 \[=5\]
And m\[=\sqrt{5}\] which is not an integer.
So let 2m\[=6\]
Then we get, m\[=3\]
Now, m2\[-1={{3}^{2}}-1\]
\[=9-1\]
\[=8\]
Similarly, m2\[+1={{3}^{2}}+1\]
\[=9+1\]
\[=10\]
Therefore \[\left( 6,8,10 \right)\] is the Pythagoras triplet.
ii. \[\text{14}\]
Ans:
We know that 2m, m2-1, m2+1 is the Pythagoras triplet for any natural number m >1
It is given that one number in the triplet is \[14\].
If we take m2-1=14, then we get m2-1=6
And m\[=\sqrt{15}\] which is not an integer.
Similarly, if we take m2+1=14, then we get m2+1=14
And m\[=\sqrt{13}\] which is not an integer.
So let 2m=14
Then we get, m=7
Now, m2-1=72-1
\[=49-1\]
\[=48\]
Similarly, m2+1=72+1
\[=49+1\]
\[=50\]
Therefore \[\left( 14,48,50 \right)\] is the Pythagoras triplet.
iii. \[\text{16}\]
Ans:
We know that 2m, m2-1, m2+1 is the Pythagoras triplet for any natural number m >1
It is given that one number in the triplet is \[16\].
If we take m2-1=16, then we get m2=17
And m\[=\sqrt{17}\] which is not an integer.
Similarly, if we take m2+1=16, then we get m2=15
And m\[=\sqrt{15}\] which is not an integer.
So let 2m=16
Then we get, m=8
Now, m2-1=82-1
\[=64-1\]
\[=63\]
Similarly, m2+1=82+1
\[=64+1\]
\[=65\]
Therefore \[\left( 16,63,65 \right)\] is the Pythagoras triplet.
iv. \[\text{18}\]
Ans:
We know that 2m, m2-1, m2+1 is the Pythagoras triplet for any natural number m >1
It is given that one number in the triplet is \[18\].
If we take m2-1=18, then we get m2=19
And m\[=\sqrt{19}\] which is not an integer.
Similarly, if we take m2+1=18, then we get m2=17
And m\[=\sqrt{17}\] which is not an integer.
So let 2m=18
Then we get, m=9
Now, m2-1=92-1
\[=81-1\]
\[=80\]
Similarly, m2+1=92-1
\[=81+1\]
\[=82\]
Therefore \[\left( 18,80,82 \right)\] is the Pythagoras triplet.
Exercise 5.3
1. What could be the possible ‘one’s’ digits of the square root of each of the following numbers?
i. \[\text{9801}\]
Ans: We know that the one’s digit of the square root of the number ending with \[1\] can be \[1\] or \[9\].
Thus, the possible one’s digit of the square root of \[9801\] is either \[1\] or \[9\].
ii. \[\text{99856}\]
Ans: We know that the one’s digit of the square root of the number ending with \[6\] can be \[6\] or \[4\].
Thus, the possible one’s digit of the square root of \[99856\] is either \[6\] or \[4\].
iii. \[\text{998001}\]
Ans: We know that the one’s digit of the square root of the number ending with \[1\] can be \[1\] or \[9\].
Thus, the possible one’s digit of the square root of \[998001\] is either \[1\] or \[9\].
iv. \[\text{657666025}\]
Ans: We know that the one’s digit of the square root of the number ending with \[5\] will be \[5\] .
Thus, the only possible one’s digit of the square root of \[657666025\] is \[5\] .
2. Without doing any calculations, find the numbers which are surely not perfect squares
i. \[\text{153}\]
Ans:
The perfect square of numbers may end with any one of the digits $0$, $1$ ,\[4\], $5$, $6$, or $9$. Also, a perfect square has even number of zeroes at the end of it, if any.
We can see that \[153\] has its unit place digit as \[3\].
Hence, \[153\]cannot be a perfect square.
ii. \[\text{257}\]
Ans:
The perfect square of numbers may end with any one of the digits $0$, $1$ ,\[4\], $5$, $6$, or $9$. Also, a perfect square has even number of zeroes at the end of it, if any.
We can see that \[257\] has its unit place digit as \[7\].
Hence, \[257\]cannot be a perfect square.
iii. \[\text{408}\]
Ans:
The perfect square of numbers may end with any one of the digits $0$, $1$ ,\[4\], $5$, $6$, or $9$. Also, a perfect square has even number of zeroes at the end of it, if any.
We can see that \[408\] has its unit place digit as \[8\].
Hence, \[408\]cannot be a perfect square.
iv. \[\text{441}\]
Ans:
The perfect square of numbers may end with any one of the digits $0$, $1$ ,\[4\], $5$, $6$, or $9$. Also, a perfect square has even number of zeroes at the end of it, if any.
We can see that \[441\] has its unit place digit as \[1\].
Hence, \[441\]is a perfect square.
3. Find the square roots of \[\text{100}\] and \[\text{169}\] by the method of repeated subtraction.
Ans:
It is already known to us that the sum of the first n odd natural numbers is n2.
For \[\sqrt{100}\]
\[100-1=99\]
\[99-3=96\]
\[96-5=91\]
\[91-7=84\]
\[84-9=75\]
\[75-11=64\]
\[64-13=51\]
\[51-15=36\]
\[36-17=19\]
\[19-19=0\]
After subtracting successive odd numbers from \[1\] to \[100\] , we are getting a \[0\] at the 10th step.
Hence, \[\sqrt{100}=10\]
For \[\sqrt{169}\]
\[169-1=168\]
\[168-3=165\]
\[165-5=160\]
\[160-7=153\]
\[153-9=144\]
\[144-11=133\]
\[133-13=120\]
\[120-15=105\]
\[105-17=88\]
\[88-19=69\]
\[69-21=48\]
\[48-23=25\]
\[25-25=0\]
After subtracting successive odd numbers from \[1\] to \[169\] , we are getting a \[0\] at the 13th step.
Hence, \[\sqrt{169}=13\]
4. Find the square roots of the following numbers by Prime Factorisation Method.
i. \[\text{729}\]
Ans:
The factorization of \[729\] is as follows:
\[3\] | \[729\] |
\[3\] | \[243\] |
\[3\] | \[81\] |
\[3\] | \[27\] |
\[3\] | \[9\] |
\[3\] | \[3\] |
\[1\] |
\[729=\underline{3\times 3}\times \underline{3\times 3}\times \underline{3\times 3}\]
\[\sqrt{729}=3\times 3\times 3\]
So, \[\sqrt{729}=27\]
ii. \[\text{400}\]
Ans:
The factorization of \[400\] is as follows:
\[2\] | \[400\] |
\[2\] | \[200\] |
\[2\] | \[100\] |
\[2\] | \[50\] |
\[5\] | \[25\] |
\[5\] | \[5\] |
\[1\] |
\[400=\underline{2\times 2}\times \underline{2\times 2}\times \underline{5\times 5}\]
\[\sqrt{400}=2\times 2\times 5\]
So, \[\sqrt{400}=20\]
iii. \[\text{1764}\]
Ans:
The factorization of \[1764\] is as follows:
\[2\] | \[1764\] |
\[2\] | \[882\] |
\[3\] | \[441\] |
\[3\] | \[147\] |
\[7\] | \[49\] |
\[7\] | \[7\] |
\[1\] |
\[1764=\underline{2\times 2}\times \underline{3\times 3}\times \underline{7\times 7}\]
\[\sqrt{1764}=2\times 3\times 7\]
So, \[\sqrt{1764}=42\]
iv. \[\text{4096}\]
Ans:
The factorization of \[4096\] is as follows:
\[2\] | \[4096\] |
\[2\] | \[2048\] |
\[2\] | \[1024\] |
\[2\] | \[512\] |
\[2\] | \[256\] |
\[2\] | \[128\] |
\[2\] | \[64\] |
\[2\] | \[32\] |
\[2\] | \[16\] |
\[2\] | \[8\] |
\[2\] | \[4\] |
\[2\] | \[2\] |
\[1\] |
\[4096=\underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\]
\[\sqrt{4096}=2\times 2\times 2\times 2\times 2\times 2\]
So, \[\sqrt{4096}=64\]
v. \[\text{7744}\]
Ans:
The factorization of \[7744\] is as follows:
\[2\] | \[7744\] |
\[2\] | \[3872\] |
\[2\] | \[1936\] |
\[2\] | \[968\] |
\[2\] | \[484\] |
\[2\] | \[242\] |
\[11\] | \[121\] |
\[11\] | \[11\] |
\[1\] |
\[7744=\underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{11\times 11}\]
\[\sqrt{7744}=2\times 2\times 2\times 11\]
So, \[\sqrt{7744}=88\]
vi. \[\text{9604}\]
Ans:
The factorization of \[9604\] is as follows:
\[2\] | \[9604\] |
\[2\] | \[4802\] |
\[7\] | \[2401\] |
\[7\] | \[343\] |
\[7\] | \[49\] |
\[7\] | \[7\] |
\[1\] |
\[9604=\underline{2\times 2}\times \underline{7\times 7}\times \underline{7\times 7}\]
\[\sqrt{9604}=2\times 7\times 7\]
So, \[\sqrt{9604}=98\]
vii. \[\text{5929}\]
Ans:
The factorization of \[5929\] is as follows:
\[7\] | \[5929\] |
\[7\] | \[847\] |
\[11\] | \[121\] |
\[11\] | \[11\] |
\[1\] |
\[5929=\underline{7\times 7}\times \underline{11\times 11}\]
\[\sqrt{5929}=7\times 11\]
So, \[\sqrt{5929}=77\]
viii. \[\text{9216}\]
The factorization of \[9216\] is as follows:
\[2\] | \[9216\] |
\[2\] | \[4608\] |
\[2\] | \[2304\] |
\[2\] | \[1152\] |
\[2\] | \[576\] |
\[2\] | \[288\] |
\[2\] | \[144\] |
\[2\] | \[72\] |
\[2\] | \[36\] |
\[2\] | \[18\] |
\[3\] | \[9\] |
\[3\] | \[3\] |
\[1\] |
\[9216=\underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{3\times 3}\]
\[\sqrt{9216}=2\times 2\times 2\times 2\times 2\times 3\]
So, \[\sqrt{9216}=96\]
ix. \[\text{529}\]
The factorization of \[529\] is as follows:
\[23\] | \[529\] |
\[23\] | \[23\] |
\[1\] |
\[529=\underline{23\times 23}\]
So, \[\sqrt{529}=23\]
x. \[\text{8100}\]
The factorization of \[8100\] is as follows:
\[2\] | \[8100\] |
\[2\] | \[4050\] |
\[3\] | \[2025\] |
\[3\] | \[675\] |
\[3\] | \[225\] |
\[3\] | \[75\] |
\[5\] | \[25\] |
\[5\] | \[5\] |
\[1\] |
\[8100=\underline{2\times 2}\times \underline{3\times 3}\times \underline{3\times 3}\times \underline{5\times 5}\]
\[\sqrt{8100}=2\times 3\times 3\times 5\]
So, \[\sqrt{8100}=90\]
5. For each of the following numbers, find the smallest whole number by which it should be multiplied so as to get a perfect square number. Also, find the square root of the square number so obtained.
i. \[\text{252}\]
Ans:
The factorization of \[252\] is as follows:
\[2\] | \[252\] |
\[2\] | \[126\] |
\[3\] | \[63\] |
\[3\] | \[21\] |
\[7\] | \[7\] |
\[1\] |
Here, \[252=\underline{2\times 2}\times \underline{3\times 3}\times 7\]
We can see that \[7\]is not paired
So, we have to multiply \[252\] by \[7\] to get a perfect square.
The new number will be \[252\times 7=1764\]
\[1764=\underline{2\times 2}\times \underline{3\times 3}\times \underline{7\times 7}\] which is a perfect square
\[\sqrt{1764}=2\times 3\times 7\]
So, \[\sqrt{1764}=42\]
ii. \[\text{180}\]
Ans:
The factorization of \[180\] is as follows:
\[2\] | \[180\] |
\[2\] | \[90\] |
\[3\] | \[45\] |
\[3\] | \[15\] |
\[5\] | \[5\] |
\[1\] |
Here, \[180=\underline{2\times 2}\times \underline{3\times 3}\times 5\]
We can see that \[5\]is not paired
So, we have to multiply \[180\] by \[5\] to get a perfect square.
The new number will be \[180\times 5=900\]
\[900=\underline{2\times 2}\times \underline{3\times 3}\times \underline{5\times 5}\] which is a perfect square
\[\sqrt{900}=2\times 3\times 5\]
So, \[\sqrt{900}=30\]
iii. \[\text{1008}\]
Ans:
The factorization of \[1008\] is as follows:
\[2\] | \[1008\] |
\[2\] | \[504\] |
\[2\] | \[252\] |
\[2\] | \[126\] |
\[3\] | \[63\] |
\[3\] | \[21\] |
\[7\] | \[7\] |
\[1\] |
Here, \[1008=\underline{2\times 2}\times \underline{2\times 2}\times \underline{3\times 3}\times 7\]
We can see that \[7\]is not paired
So, we have to multiply \[1008\] by \[7\] to get a perfect square.
The new number will be \[1008\times 7=7056\]
\[7056=\underline{2\times 2}\times \underline{2\times 2}\times \underline{3\times 3}\times \underline{7\times 7}\] which is a perfect square
\[\sqrt{7056}=2\times 2\times 3\times 7\]
So, \[\sqrt{7056}=84\]
iv. \[\text{2028}\]
Ans:
The factorization of \[2028\] is as follows:
\[2\] | \[2028\] |
\[2\] | \[1014\] |
\[3\] | \[507\] |
\[13\] | \[169\] |
\[13\] | \[13\] |
\[1\] |
Here, \[2028=\underline{2\times 2}\times 3\times \underline{13\times 13}\]
We can see that \[3\]is not paired
So, we have to multiply \[2028\] by \[3\] to get a perfect square.
The new number will be \[2028\times 3=6084\]
\[6084=\underline{2\times 2}\times \underline{3\times 3}\times \underline{13\times 13}\] which is a perfect square
\[\sqrt{6084}=2\times 3\times 13\]
So, \[\sqrt{6084}=78\]
v. \[\text{1458}\]
Ans:
The factorization of \[1458\] is as follows:
\[2\] | \[1458\] |
\[3\] | \[729\] |
\[3\] | \[243\] |
\[3\] | \[81\] |
\[3\] | \[27\] |
\[3\] | \[9\] |
\[3\] | \[3\] |
\[1\] |
Here, \[1458=2\times \underline{3\times 3}\times \underline{3\times 3}\times \underline{3\times 3}\]
We can see that \[2\]is not paired
So, we have to multiply \[1458\] by \[2\] to get a perfect square.
The new number will be \[1458\times 2=2916\]
\[2916=\underline{2\times 2}\times \underline{3\times 3}\times \underline{3\times 3}\times \underline{3\times 3}\] which is a perfect square
\[\sqrt{2916}=2\times 3\times 3\times 3\]
So, \[\sqrt{2916}=54\]
vi. \[\text{768}\]
Ans:
The factorization of \[768\] is as follows:
\[2\] | \[768\] |
\[2\] | \[384\] |
\[2\] | \[192\] |
\[2\] | \[96\] |
\[2\] | \[48\] |
\[2\] | \[24\] |
\[2\] | \[12\] |
\[2\] | \[6\] |
\[3\] | \[3\] |
\[1\] |
Here, \[768=\underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times 3\]
We can see that \[3\]is not paired
So, we have to multiply \[768\] by \[3\] to get a perfect square.
The new number will be \[768\times 3=2304\]
\[2304=\underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{2\times 2}\times \underline{3\times 3}\] which is a perfect square
\[\sqrt{2304}=2\times 2\times 2\times 2\times 3\]
So, \[\sqrt{2304}=48\]
6. For each of the following numbers, find the smallest whole number by which it should be divided so as to get a perfect square. Also find the square root of the square number so obtained.
i. \[\text{252}\]
Ans:
The factorization of \[252\] is as follows:
\[2\] | \[252\] |
\[2\] | \[126\] |
\[3\] | \[63\] |
\[3\] | \[21\] |
\[7\] | \[7\] |
\[1\] |
Here, \[252=\underline{2\times 2}\times \underline{3\times 3}\times 7\]
We can see that \[7\]is not paired
So, we have to divide \[252\] by \[7\] to get a perfect square.
The new number will be \[252\div 7=36\]
\[36=\underline{2\times 2}\times \underline{3\times 3}\] which is a perfect square
\[\sqrt{36}=2\times 3\]
So, \[\sqrt{36}=6\]
ii. \[\text{2925}\]
Ans:
The factorization of \[2925\] is as follows:
\[3\] | \[2925\] |
\[3\] | \[975\] |
\[5\] | \[325\] |
\[5\] | \[65\] |
\[13\] | \[13\] |
\[1\] |
Here, \[2925=\underline{3\times 3}\times \underline{5\times 5}\times 13\]
We can see that \[13\]is not paired
So, we have to divide \[2925\] by \[13\] to get a perfect square.
The new number will be \[2925\div 13=225\]
\[225=\underline{3\times 3}\times \underline{5\times 5}\] which is a perfect square
\[\sqrt{225}=3\times 5\]
So, \[\sqrt{225}=15\]
iii. \[\text{396}\]
Ans:
The factorization of \[396\] is as follows:
\[2\] | \[396\] |
\[2\] | \[198\] |
\[3\] | \[99\] |
\[3\] | \[33\] |
\[11\] | \[11\] |
\[1\] |
Here, \[396=\underline{2\times 2}\times \underline{3\times 3}\times 11\]
We can see that \[11\]is not paired
So, we have to divide \[396\] by \[11\] to get a perfect square.
The new number will be \[396\div 11=36\]
\[36=\underline{2\times 2}\times \underline{3\times 3}\] which is a perfect square
\[\sqrt{36}=2\times 3\]
So, \[\sqrt{36}=6\]
iv. \[\text{2645}\]
Ans:
The factorization of \[2645\] is as follows:
\[5\] | \[2645\] |
\[23\] | \[529\] |
\[23\] | \[23\] |
\[1\] |
Here, \[2645=5\times \underline{23\times 23}\]
We can see that \[5\]is not paired
So, we have to divide \[2645\] by \[5\] to get a perfect square.
The new number will be \[2645\div 5=529\]
\[529=\underline{23\times 23}\] which is a perfect square
So, \[\sqrt{529}=23\]
v. \[\text{2800}\]
Ans:
The factorization of \[2800\] is as follows:
\[2\] | \[2800\] |
\[2\] | \[1400\] |
\[2\] | \[700\] |
\[2\] | \[350\] |
\[5\] | \[175\] |
\[5\] | \[35\] |
\[7\] | \[7\] |
\[1\] |
Here, \[2800=\underline{2\times 2}\times \underline{2\times 2}\times \underline{5\times 5}\times 7\]
We can see that \[7\]is not paired
So, we have to divide \[2800\] by \[7\] to get a perfect square.
The new number will be \[2800\div 7=400\]
\[400=\underline{2\times 2}\times \underline{2\times 2}\times \underline{5\times 5}\] which is a perfect square
\[\sqrt{400}=2\times 2\times 5\]
So, \[\sqrt{400}=20\]
vi. \[\text{1620}\]
Ans:
The factorization of \[1620\] is as follows:
\[2\] | \[1620\] |
\[2\] | \[810\] |
\[3\] | \[405\] |
\[3\] | \[135\] |
\[3\] | \[45\] |
\[3\] | \[15\] |
\[5\] | \[5\] |
\[1\] |
Here, \[1620=\underline{2\times 2}\times \underline{3\times 3}\times \underline{3\times 3}\times 5\]
We can see that \[5\] is not paired
So, we have to divide \[1620\] by \[5\] to get a perfect square.
The new number will be \[1620\div 5=324\]
\[324=\underline{2\times 2}\times \underline{3\times 3}\times \underline{3\times 3}\] which is a perfect square
\[\sqrt{324}=2\times 3\times 3\]
So, \[\sqrt{324}=18\]
7. The students of Class VIII of a school donated Rs 2401 in all, for Prime Minister’s National Relief Fund. Each student donated as many rupees as the number of students in the class. Find the number of students in the class.
Ans:
According to the , each student donated as many rupees as the number of students in the class.
We can find the number of students in the class by doing the square root of the total amount donated by the students of Class VIII.
Total amount donated by students is Rs. $2401$
Then, the number of students in the class will be \[\sqrt{2401}\]
\[\sqrt{2401}=\sqrt{\underline{7\times 7}\times \underline{7\times 7}}\]
\[=7\times 7\]
\[=49\]
Thus, there are total \[49\] students in the class.
8. 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:
According to the plants are being planted in a garden in such a way that each row contains as many plants as the number of rows.
So, the number of rows will be equal to the number of plants in each row.
Hence,
The number of rows \[\times \] Number of plants in each row \[=\]Total number of plants
The number of rows \[\times \] Number of plants in each row \[=\] \[2025\]
The number of rows \[\times \] The number of rows \[=\] \[2025\]
The number of rows \[=\]\[\sqrt{2025}\]
\[\sqrt{2025}=\sqrt{\underline{5\times 5}\times \underline{3\times 3}\times \underline{3\times 3}}\]
\[=5\times 3\times 3\]
\[=45\]
Thus, the number of rows \[=45\] and the number of plants in each row \[=45\].
9. Find the smallest square number that is divisible by each of the numbers \[\text{4,9}\] and \[\text{10}\].
Ans:
We know that the number that is perfectly divisible by each one of \[4,9\] and \[10\] is their L.C.M
So, taking the L.C.M of these numbers
\[2\] | \[4,9,10\] |
\[2\] | \[2,9,5\] |
\[3\] | \[1,9,5\] |
\[3\] | \[1,3,5\] |
\[5\] | \[1,1,5\] |
\[1,1,1\] |
L.C.M\[=2\times 2\times 3\times 3\times 5\]
\[=180\]
It can be clearly seen that \[5\] cannot be paired.
Therefore, we have to multiply \[180\] by \[5\] in order to get a perfect square.
Thus, the smallest square number divisible by \[4,9\] and \[10\]\[=180\times 5=900\]
10. Find the smallest square number that is divisible by each of the numbers \[\text{8,15}\] and \[\text{20}\].
Ans:
We know that the number that is perfectly divisible by each one of \[8,15\] and \[20\]is their L.C.M
So, taking the L.C.M of these numbers
\[2\] | \[8,15,20\] |
\[2\] | \[4,15,10\] |
\[2\] | \[2,15,5\] |
\[3\] | \[1,15,5\] |
\[5\] | \[1,5,5\] |
\[1,1,1\] |
L.C.M\[=2\times 2\times 2\times 3\times 5\]
\[=120\]
It can be clearly seen that the prime factors \[2\],\[3\] and \[5\] cannot be paired.
Therefore, we have to multiply \[120\] by \[2\],\[3\] and \[5\] in order to get a perfect square.
Thus, the smallest square number divisible by \[8,15\] and \[20\]is \[120\times 2\times 3\times 5\]\[=3600\]
Exercise 5.4
1. Find the square root of each of the following numbers by the division method.
i. \[\text{2304}\]
Ans:
The square root of \[2304\] by division method is calculated as follows:
\[48\] | |
\[4\] | $\overline{23}\overline{04} $ $-16$ |
\[88\] | 704 704 |
\[0\] |
Hence, \[\sqrt{2304}=48\]
ii. \[\text{4489}\]
Ans:
The square root of \[4489\] by division method is calculated as follows:
\[67\] | |
\[6\] | $\overline{44}\overline{89} $ $-36$ |
\[127\] | 889 889 |
\[0\] |
Hence, \[\sqrt{4489}=67\]
iii. \[\text{3481}\]
Ans:
The square root of \[3481\] by division method is calculated as follows:
\[59\] | |
\[5\] | $\overline{34}\overline{81}$ $ -25 $ |
\[109\] | 981 981 |
\[0\] |
Hence, \[\sqrt{3481}=59\]
iv. \[\text{529}\]
Ans:
The square root of \[529\] by division method is calculated as follows:
\[23\] | |
\[2\] | $ \overline{5}\overline{29}$ $-4$ |
\[43\] | 129 129 |
\[0\] |
Hence, \[\sqrt{529}=23\]
v. \[\text{3249}\]
Ans:
The square root of \[3249\] by division method is calculated as follows:
\[57\] | |
\[5\] | $\overline{32}\overline{49}$ $ -25$ |
\[107\] | 749 749 |
\[0\] |
Hence, \[\sqrt{3249}=57\]
vi. \[\text{1369}\]
Ans:
The square root of \[1369\] by division method is calculated as follows:
\[37\] | |
\[3\] | $\overline{13}\overline{69}$ $ -9 $ |
\[67\] | 469 469 |
\[0\] |
Hence, \[\sqrt{1369}=37\]
vii. \[\text{5776}\]
The square root of \[5776\] by division method is calculated as follows:
\[76\] | |
\[7\] | $\overline{57}\overline{76}$ -49 |
\[146\] | $overline{57}\overline{76}$ -49 |
\[0\] |
Hence, \[\sqrt{5776}=76\]
viii. \[\text{7921}\]
The square root of \[7921\] by division method is calculated as follows:
\[89\] | |
\[8\] | $\overline{79}\overline{21}$ -64 |
\[169\] | 1521 1521 |
\[0\] |
Hence, \[\sqrt{7921}=89\]
ix. \[\text{576}\]
The square root of \[576\] by division method is calculated as follows:
\[24\] | |
\[2\] | $\overline{5}\overline{76}$ -4 |
\[44\] | 176 176 |
\[0\] |
Hence, \[\sqrt{576}=24\]
x. \[\text{1024}\]
The square root of \[1024\] by division method is calculated as follows:
\[32\] | |
\[3\] | $\overline{10}\overline{24}$ -9 |
\[62\] | 124 124 |
\[0\] |
Hence, \[\sqrt{1024}=32\]
xi. \[\text{3136}\]
The square root of \[3136\] by division method is calculated as follows:
\[56\] | |
\[5\] | $\overline{31}\overline{36}$ -25 |
\[106\] | 636 636 |
\[0\] |
Hence, \[\sqrt{3136}=56\]
xii. \[\text{900}\]
The square root of \[900\] by division method is calculated as follows:
\[30\] | |
\[3\] | $\overline{9}\overline{00}$ -9 |
\[60\] | 00 00 |
\[0\] |
Hence, \[\sqrt{900}=30\]
2. Find the number of digits in the square root of each of the following numbers (without any calculation).
i. \[\text{64}\]
Ans:
In order to find the number of digits in the square root, without any calculation, we have to place the bars on the given number
After placing bars, we get
\[64=\overline{64}\]
We can see that there is only one bar. So, the square root of \[64\] will have only one digit.
ii. \[\text{144}\]
Ans:
In order to find the number of digits in the square root, without any calculation, we have to place the bars on the given number
After placing bars, we get
\[144=\overline{1}\overline{44}\]
We can see that there are two bars. So, the square root of \[144\] will have two digits.
iii. \[\text{4489}\]
Ans:
In order to find the number of digits in the square root, without any calculation, we have to place the bars on the given number
After placing bars, we get
\[4489=\overline{44}\overline{89}\]
We can see that there are two bars. So, the square root of \[4489\] will have two digits.
iv. \[\text{27225}\]
Ans:
In order to find the number of digits in the square root, without any calculation, we have to place the bars on the given number
After placing bars, we get
\[27225=\overline{2}\overline{72}\overline{25}\]
We can see that there are three bars. So, the square root of \[27225\] will have three digits.
v. \[\text{390625}\]
Ans:
In order to find the number of digits in the square root, without any calculation, we have to place the bars on the given number
After placing bars, we get
\[390625=\overline{39}\overline{06}\overline{25}\]
We can see that there are three bars. So, the square root of \[390625\] will have three digits.
3. Find the square root of the following decimal numbers.
i. \[\text{2}\text{.56}\]
Ans:
The square root of \[2.56\] by division method is calculated as follows:
\[1.6\] | |
\[1\] | $\overline{2}.\overline{56} $ -1 |
\[26\] | 156 156 |
\[0\] |
Hence, \[\sqrt{2.56}=1.6\]
ii. \[\text{7}\text{.29}\]
Ans:
The square root of \[7.29\] by division method is calculated as follows:
\[2.7\] | |
\[2\] | $\overline{7}.\overline{29}$ -4 |
\[47\] | 329 329 |
\[0\] |
Hence, \[\sqrt{7.29}=2.7\]
iii. \[\text{51}\text{.84}\]
Ans:
The square root of \[51.84\] by division method is calculated as follows:
\[7.2\] | |
\[7\] | $\overline{51}.\overline{84}$ -49 |
\[142\] | 284 284 |
\[0\] |
Hence, \[\sqrt{51.84}=7.2\]
iv. \[\text{42}\text{.25}\]
Ans:
The square root of \[42.25\] by division method is calculated as follows:
\[6.5\] | |
\[6\] | $\overline{42}.\overline{25} $ -36 |
\[125\] | 625 625 |
\[0\] |
Hence, \[\sqrt{42.25}=6.5\]
v. \[\text{31}\text{.36}\]
Ans:
The square root of \[31.36\] by division method is calculated as follows:
\[5.6\] | |
\[5\] | $\overline{31}.\overline{36}$ -25 |
\[106\] | 636 636 |
\[0\] |
Hence, \[\sqrt{31.36}=5.6\]
4. Find the least number which must be subtracted from each of the following numbers so as to get a perfect square. Also, find the square root of the perfect square so obtained.
i. \[\text{402}\]
Ans:
The square root of \[402\] by division method is calculated as follows:
\[20\] | |
\[2\] | $\overline{4}\overline{02}$ -4 |
\[40\] | 02 00 |
\[2\] |
We are getting a remainder \[2\].
This means that the square of 20 is less than 402 by 2.
So, we must subtract \[2\] from 402 in order to get a perfect square.
Hence, the required perfect square is \[402-2=400\]
The square root of the perfect square obtained is \[\sqrt{400}=20\]
ii. \[\text{1989}\]
Ans:
The square root of \[1989\] by division method is calculated as follows:
\[44\] | |
\[4\] | $\overline{19}\overline{89}$ -16 |
\[84\] | 389 336 |
\[53\] |
We are getting a remainder \[53\].
This means that the square of 44 is less than 1989 by 53.
So, we must subtract \[53\] from 1989 in order to get a perfect square.
Hence, the required perfect square is \[1989-53=1936\]
The square root of the perfect square obtained is \[\sqrt{1936}=44\]
iii.\[\text{3250}\]
Ans:
The square root of \[3250\] by division method is calculated as follows:
\[57\] | |
\[5\] | $\overline{32}\overline{50}$ -25 |
\[107\] | 750 749 |
\[1\] |
We are getting a remainder \[1\] .
This means that the square of 57 is less than 3250 by \[1\].
So, we must subtract \[1\] from 3250 in order to get a perfect square.
Hence, the required perfect square is \[3250-1=3249\]
The square root of the perfect square obtained is \[\sqrt{3249}=57\]
iv. \[\text{825}\]
Ans:
The square root of \[825\] by division method is calculated as follows:
\[28\] | |
\[2\] | $\overline{8}\overline{25}$ -4 |
\[48\] | 425 384 |
\[41\] |
We are getting a remainder \[41\].
This means that the square of 28 is less than 825 by \[41\].
So, we must subtract \[41\] from 825 in order to get a perfect square.
Hence, the required perfect square is \[825-41=784\]
The square root of the perfect square obtained is \[\sqrt{784}=28\]
v. \[\text{4000}\]
Ans:
The square root of \[4000\] by division method is calculated as follows:
\[63\] | |
\[6\] | $\overline{40}\overline{00} $ -36 |
\[123\] | 400 369 |
\[31\] |
We are getting a remainder \[31\].
This means that the square of 63 is less than 4000 by \[31\].
So, we must subtract \[31\] from 4000 in order to get a perfect square.
Hence, the required perfect square is \[4000-31=3969\]
The square root of the perfect square obtained is \[\sqrt{3969}=63\]
5. Find the least number which must be added to each of the following numbers so as to get a perfect square. Also, find the square root of the perfect square so obtained.
i. \[\text{525}\]
Ans:
The square root of \[4000\] by division method is calculated as follows:
\[22\] | |
\[2\] | $\overline{5}\overline{25}$ -4 |
\[42\] | 125 84 |
\[41\] |
Since after finding the square root of 525, we will have 41 as the remainder.
Also, it can be observed that $(22)^2<525<(23)^2$
i.e.,
525 is greater than $(22)^2$ but less than $(23)^2$
Since $(23)^2$ = $529$.
Therefore, to have a perfect square, we need to add 4 to 525.
So, $525+4=529$
And the square root of $529$ = $23$
ii. \[\text{1750}\]
Ans:
The square root of \[1750\] by division method is calculated as follows:
\[41\] | |
\[4\] | $\overline{17}\overline{50}$ -16 |
\[81\] | 150 81 |
\[69\] |
We are getting a remainder \[69\].
This means that the square of 41 is less than 1750.
The next number is 42 and its square is \[{{42}^{2}}=1764\]
So, the number that should be added to 1750 is \[{{42}^{2}}-1750=1764-1750=14\]
Hence, the required perfect square is \[1750+14=1764\]
The square root of the perfect square obtained is \[\sqrt{1764}=42\]
iii. \[\text{252}\]
Ans:
The square root of \[252\] by division method is calculated as follows:
\[15\] | |
\[1\] | $\overline{2}\overline{52}$ -1 |
\[25\] | 152 125 |
\[27\] |
We are getting a remainder \[27\].
This means that the square of 15 is less than \[252\].
The next number is 16 and its square is \[{{16}^{2}}=256\]
So, the number that should be added to 252 is \[{{16}^{2}}-252=256-252=4\]
Hence, the required perfect square is \[252+4=256\]
The square root of the perfect square obtained is \[\sqrt{256}=16\]
iv. \[\text{1825}\]
Ans:
The square root of \[1825\] by division method is calculated as follows:
\[42\] | |
\[4\] | $\overline{18}\overline{25}$ -16 |
\[82\] | 225 164 |
\[61\] |
We are getting a remainder \[61\].
This means that, the square of 42 is less than \[1825\]
The next number is 43 and its square is \[{{43}^{2}}=1849\]
So, the number that should be added to \[1825\] is \[{{43}^{2}}-1825=1849-1825=24\]
Hence, the required perfect square is \[1825+24=1849\]
The square root of the perfect square obtained is \[\sqrt{1849}=43\]
v. \[\text{6412}\]
Ans:
The square root of \[6412\] by division method is calculated as follows:
\[80\] | |
\[8\] | $\overline{64}\overline{12}$ -64 |
\[160\] | 012 0 |
\[12\] |
We are getting a remainder \[12\].
This means that the square of 80 is less than \[6412\]
The next number is 81 and its square is \[{{81}^{2}}=6561\]
So, the number that should be added to \[6412\] is \[{{81}^{2}}-6412=6561-6412=149\]
Hence, the required perfect square is \[6412+149=6561\]
The square root of the perfect square obtained is \[\sqrt{6561}=81\]
6.Find the length of the side of a square whose area is \[\text{441}{{\text{m}}^{\text{2}}}\].
Ans:
Let us consider that the side of the square be x m in length
Then the area of the square is (x)2=441 m2
We get x\[\times \]
Calculating the square root of 441 using long division method as follows:
\[21\] | |
\[2\] | $\overline{4}\overline{41}$ -4 |
\[41\] | 041 41 |
\[0\] |
We get x=21 m
Therefore, the length of the side of the square is 21 m.
7. In a right triangle ABC, $\angle {\text{B = }}{90^ \circ }$
a) Find AC if AB=6 cm, BC=8 cm
Ans:
It is given that triangle ABC is right angled at B
So, on applying Pythagoras Theorem, we get
AC2=AB2+BC2
AC2\[={{6}^{2}}+{{8}^{2}}\]
\[=36+64\]
\[=100\]
AC\[=\sqrt{10\times 10}\]
Thus, AC=10 cm.
b) Find AB if AC=13 cm, BC=5 cm
Ans:
It is given that triangle ABC is right angled at B
So, on applying Pythagoras Theorem, we get
AC2=AB2+BC2
AB2=AC2-BC2
AB2\[={{13}^{2}}-{{5}^{2}}\]
\[=169-25\]
\[=144\]
AB\[=\sqrt{12\times 12}\]
Thus, AB=12 cm.
8. A gardener has 1000 plants. He wants to plant these in such a way that the number of rows and the number of columns remain the same. Find the minimum number of plants he needs more for this.
Ans:
According to the gardener has 1000 plants and the number of rows and columns are the same.
Our aim is to find the minimum number of plants that he needs so that after planting them, the number of rows and columns are the same.
This means that we have to find the number that should be added to 1000 to make it a perfect square.
The square root of \[1000\] by long division method is calculated as follows:
\[31\] | |
\[3\] | $\overline{10}\overline{00} $ -9 |
\[61\] | 100 61 |
\[39\] |
We are getting a remainder \[39\].
This means that the square of 31 is less than \[1000\]
The next number is 32 and its square is \[{{32}^{2}}=1024\]
So, the number that should be added to \[1000\] is \[{{32}^{2}}-1000=1024-1000=24\]
Hence, the required number of plants is 24.
9. There are 500 children in a school. For a P.T. drill, they have to stand in such a manner that the number of rows is equal to a number of columns. How many children would be left out in this arrangement?
Ans:
According to the given question, there are 500 children in the school and they have to stand for a PT drill in such a way that the number of rows and columns are equal.
We have to calculate the number of children that are left out in this arrangement.
This means that we have to find the number that should be subtracted from 500 in order to make it a perfect square.
The square root of \[1000\] by long division method is calculated as follows:
\[22\] | |
\[2\] | $\overline{5}\overline{00}$ -4 |
\[42\] | 100 84 |
\[16\] |
We are getting a remainder \[16\].
This means that the square of 22 is less than \[500\] by \[16\]
So, we must subtract \[16\] from \[500\] in order to get a perfect square.
Hence, the required perfect square is \[500-16=484\]
Thus, 16 children will be left out of this arrangement.
Overview of Deleted Syllabus for CBSE Class 8 Maths Chapter 5 Squares and Square Roots
Chapter | Dropped Topics |
Squares and Square Roots | Estimating Square Root |
Class 8 Maths Chapter 5: Exercises Breakdown
Exercise | Number of Questions |
Exercise 5.1 | 9 Question and Solutions |
Exercise 5.2 | 2 Questions and Solutions |
Exercise 5.3 | 10 Questions and Solutions |
Conclusion
NCERT Class 8 maths Chapter 5 solutions concludes by highlighting how crucial it is to understand the ideas behind squares and square roots. Understanding how to calculate squares and square roots of numbers, both by hand and via prime factorization, is essential. To learn these skills, students should concentrate on working through a variety of issues. 8-12 questions from this Chapter have been asked on tests in the past. Students that practise these kinds of questions will gain confidence and perform well on tests.
Other Study Material for CBSE Class 8 Maths Chapter 5
S. No | Important Links for Chapter 5 Squares and Square Roots | |
1. | Class 8 Squares and Square Roots of Maths Important Questions | |
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4. | Class 8 Squares and Square Roots of Maths RD Sharma Solutions | |
5. | Class 8 Squares and Square Roots of Maths RS Aggarwal Solutions |
Chapter-Specific NCERT Solutions for Class 8 Maths
Given below are the Chapter-wise NCERT Solutions for Class 8 Maths. Go through these Chapter-wise solutions to be thoroughly familiar with the concepts.
S. No | NCERT Solutions Class 8 Maths Chapter-wise List |
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Important Related Links for CBSE Class 8 Maths
S. No | Other Study Materials for CBSE Class 8 Maths |
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FAQs on NCERT Solutions for Class 8 Maths Chapter 5 Squares and Square Roots
1. What key concepts are covered in NCERT Solutions for Class 8 Maths Chapter 5 Squares and Square Roots?
NCERT Solutions for Class 8 Maths Chapter 5 include concepts such as perfect squares, properties and patterns of square numbers, identifying perfect squares, methods to find square roots (prime factorization, long division, and repeated subtraction), formation of Pythagorean triplets, and applying these concepts to solve real-life problems as per CBSE 2025–26 guidelines.
2. How do you determine if a number is a perfect square in Class 8 Maths Chapter 5?
To check if a number is a perfect square:
- Observe the unit (ones) digit – perfect squares end with 0, 1, 4, 5, 6, or 9.
- The number of zeros at the end must be even (if any).
- Try to express the number as multiplication of equal factors (e.g., 36 = 6 × 6).
- Prime factorize the number – all prime factors must be paired.
3. What are the different methods for finding square roots given in the NCERT Solutions for Class 8 Maths Chapter 5?
The ways to find square roots in Class 8 Chapter 5 Solutions include:
- Prime factorization method: Group primes in pairs, multiply one factor from each pair.
- Long division method: Useful for large numbers and decimals; a stepwise division process.
- Repeated subtraction: For smaller numbers; subtract successive odd numbers till zero is reached.
4. Why are Pythagorean triplets introduced in Class 8 Maths Chapter 5, and how are they formed?
Pythagorean triplets help students understand the relationship between squares in right-angled triangles. For any integer m > 1, triplets can be generated by the formulas: 2m, m2 - 1, m2 + 1. This aids in applying the Pythagoras theorem and deepens conceptual understanding of how square and square roots connect to geometry.
5. What mistakes do students commonly make when working with square roots in Class 8?
Common errors in square roots Class 8 include:
- Assuming all numbers ending in 0, 1, 4, 5, 6, or 9 are perfect squares without checking prime factors.
- Pairing not all the primes in factorization.
- Incorrectly placing bars during long division method.
- Missing out on decimal places while finding the square root of decimals.
6. How are applications of square roots used in real-life problems in Class 8 Maths?
Applications of square roots include calculating the length of diagonals in squares and rectangles, solving geometrical problems using the Pythagorean theorem, finding distances between two points, and determining side lengths when the area is known. These practical examples help connect theory to problem-solving for CBSE exams.
7. What pattern exists in the sum of consecutive odd numbers, and how is it related to perfect squares?
The sum of the first n odd natural numbers equals n2 (a perfect square). For instance, 1+3+5+7 = 16 = 42. This pattern helps students recognize and quickly calculate perfect squares without direct multiplication.
8. What strategies are effective for solving higher-order questions in Class 8 Square and Square Roots?
For HOTS questions, students should:
- Analyze word problems to identify hidden squares or roots.
- Relate concepts of patterns and properties (such as units digit, prime factor pairs).
- Practice converting between area equations and side lengths.
- Review multi-step problems involving two or more concepts (e.g., area and perimeter with square roots).
9. Can the square root of a non-perfect square be found without actual calculation in Class 8 Chapter 5?
Yes, by estimating between which two perfect squares the number lies and checking the pattern of the digits. For some numbers, students learn to place bars (long division method) to predict the number of digits in the square root before actual calculation.
10. How do NCERT Solutions for Class 8 Maths Chapter 5 support CBSE exam preparation?
These solutions provide:
- Stepwise problem-solving as per CBSE 2025–26 marking scheme.
- Multiple approaches for each type of square and square root question (to match exam expectations).
- Conceptual explanations to reduce common errors.
- Practice questions of varying difficulty, including previous years' trends.
11. What are the important properties of square numbers highlighted in Class 8 Chapter 5?
Important properties of square numbers include:
- Squares of even numbers are always even; squares of odd numbers are always odd.
- A square number cannot end with 2, 3, 7, or 8.
- The number of zeros at the end of a perfect square is always even.
12. Why is the long division method recommended for finding square roots of large numbers in Class 8?
This method is systematic and accurate for large numbers and decimals. It avoids errors due to missing factor pairs and can be used for non-perfect squares to get decimal approximations, making it suitable for all CBSE Class 8 Maths problems requiring square roots.
13. What if a number is not a perfect square—how do you find the nearest perfect square?
If a number is not a perfect square, find two consecutive perfect squares it lies between, and decide whether to subtract or add to reach the nearest one. The square roots of these will be consecutive natural numbers. This aids in estimation and solving nearest-whole-number questions in exams.
14. How many exercises and questions are included in NCERT Solutions for Class 8 Maths Chapter 5?
There are 4 exercises:
- Exercise 5.1: 9 questions
- Exercise 5.2: 2 questions
- Exercise 5.3: 10 questions
- Exercise 5.4: 9 questions
- All questions are solved as per the latest CBSE Class 8 Maths Syllabus (2025–26).
15. How can students avoid confusion between square and square root while solving NCERT Class 8 Chapter 5 questions?
To avoid confusion:
- Remember: squaring a number means multiplying it by itself; finding the square root means determining the number whose square equals the given value.
- Use clear notation: n2 for square, √n for square root.
- Practice with multiple formats—numbers, decimals, fractions—to strengthen identification of the required operation.

















