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RS Aggarwal Solutions: Exercise 3A - Squares and Square Roots | Mathematics (Maths) Class 8 PDF Download

Q.1. Using the prime factorisation method, find which of the following numbers are perfect squares:
(i) 441
(ii) 576
(iii) 11025
(iv) 1176
(v) 5625
(vi) 9075
(vii) 4225
(viii) 1089
Ans. A perfect square can always be expressed as a product of equal factors.
(i) Resolving into prime factors: 441=49×9=7×7×3×3=7×3×7×3=21×21=(21)2
Thus, 441 is a perfect square.
(ii) Resolving into prime factors:
576=64×9=8×8×3×3=2×2×2×2×2×2×3×3
=24×24=(24)2
Thus, 576 is a perfect square.
(iii) Resolving into prime factors:
11025=441×25=49×9×5×5
=7×7×3×3×5×5
=7×5×3×7×5×3
=105×105=(105)2
Thus, 11025 is a perfect square.
(iv) Resolving into prime factors:
1176=7×168=7×21×8=7×7×3×2×2×2
1176 cannot be expressed as a product of two equal numbers. Thus, 1176 is not a perfect square.
(v) Resolving into prime factors:
5625=225×25=9×25×25=3×3×5×5×5×5=3×5×5×3×5×5=75×75=(75)2
Thus, 5625 is a perfect square.
(vi) Resolving into prime factors:
9075=25×363=5×5×3×11×11=55×55×3
9075 is not a product of two equal numbers. Thus, 9075 is not a perfect square.
(vii) Resolving into prime factors:
4225=25×169=5×5×13×13=5×13×5×13=65×65=(65)2
Thus, 4225 is a perfect square.
(viii) Resolving into prime factors:
1089=9×121=3×3×11×11=3×11×3×11=33×33=(33)2
Thus, 1089 is a perfect square.

Q.2. Show that each of the following numbers is a perfect square. In each case, find the number whose square is the given number:
(i) 1225
(ii) 2601
(iii) 5929
(iv) 7056
(v) 8281
Ans. A perfect square is a product of two perfectly equal numbers.
(i) Resolving into prime factors:
1225=25×49=5×5×7×7=5×7×5×7=35×35=(35)2
Thus, 1225 is the perfect square of 35.
(ii) Resolving into prime factors:
2601=9×289=3×3×17×17=3×17×3×17=51×51=(51)2
Thus, 2601 is the perfect square of 51.
(iii) Resolving into prime factors:
5929=11×539=11×7×77=11×7×11×7=77×77=(77)2
Thus, 5929 is the perfect square of 77.
(iv) Resolving into prime factors:
7056=12×588=12×7×84=12×7×12×7=(12×7)2=(84)2
Thus, 7056 is the perfect square of 84.
(v) Resolving into prime factors:
8281=49×169=7×7×13×13=7×13×7×13=(7×13)2=(91)2
Thus, 8281 is the perfect square of 91.

Q.3. By what least number should the given number be multiplied to get a perfect square number? In each case, find the number whose square is the new number.
(i) 3975
(ii) 2156
(iii) 3332
(iv) 2925
(v) 9075
(vi) 7623
(vii) 3380
(viii) 2475
Ans. 1. Resolving 3675 into prime factors:
3675=3×5×5×7×73675=3×5×5×7×7
Thus, to get a perfect square, the given number should be multiplied by 3.
New number= (32×52×72)=(3×5×7)2=(105)2
Hence, the new number is the square of 105.
2. Resolving 2156 into prime factors:
2156=2×2×7×7×11=(22×72×11)
Thus to get a perfect square, the given number should be multiplied by 11.
New number =(22×72×112)=(2×7×11)2=(154)2
Hence, the new number is the square of 154.
3. Resolving 3332 into prime factors:
3332=2×2×7×7×17=22×72×17
Thus, to get a perfect square, the given number should be multiplied by 17.
New number =(22×72×172)=(2×7×17)2=(238)2
Hence, the new number is the square of 238.
4. Resolving 2925 into prime factors:
2925=3×3×5×5×13=32×52×13
Thus, to get a perfect square, the given number should be multiplied by 13.
New number =(32×52×132)=(3×5×13)2=(195)2
Hence, the number whose square is the new number is 195.
5. Resolving 9075 into prime factors:
9075=3×5×5×11×11=3×52×112
Thus, to get a perfect square, the given number should be multiplied by 3.
New number =(32×52×112)=(3×5×11)2=(165)2
Hence, the new number is the square of 165.
6. Resolving 7623 into prime factors:
7623=3×3×7×11×11=32×7×112
Thus, to get a perfect square, the given number should be multiplied by 7.
New number =(32×72×112)=(3×7×11)2=(231)2=(32×72×112)=(3×7×11)2=(231)2
Hence, the number whose square is the new number is 231.
7. Resolving 3380 into prime factors:
3380=2×2×5×13×13=22×5×132
Thus, to get a perfect square, the given number should be multiplied by 5.
New number =(22×52×132)=(2×5×13)2=(130)2
Hence, the new number is the square of 130.
8. Resolving 2475 into prime factors:
2475=3×3×5×5×11=32×52×11
Thus, to get a perfect square, the given number should be multiplied by 11.
New number =(32×52×112)=(3×5×11)2=(165)2
Hence, the new number is the square of 165.

Q.4. By what least number should the given number be divided to get a perfect square number? In each case, find the number whose square is the new number.
(i) 1575
(ii) 9075
(iii) 4851
(iv) 3380
(v) 4500
(vi) 7776
(vii) 8820
(viii) 4056
Ans. (i) Resolving 1575 into prime factors:
1575=3×3×5×5×7=32×52×7
Thus, to get a perfect square, the given number should be divided by 7
New number obtained=(32×52)=(3×5)2=(15)2
Hence, the new number is the square of 15
(ii) Resolving 9075 into prime factors:
9075=3×5×5×11×11=3×52×112
Thus, to get a perfect square, the given number should be divided by 3
New number obtained=(52×112)=(5×11)2=(55)2
Hence, the new number is the square of  55
(iii) Resolving 4851 into prime factors:
4851=3×3×7×7×11=32×72×11
Thus, to get a perfect square, the given number should be divided by 11
New number obtained=(32×72)=(3×7)2=(21)2
Hence, the new number is the square of 21
(iv) Resolving 3380 into prime factors:
3380=2×2×5×13×13=22×5×132
Thus, to get a perfect square, the given number should be divided by 5
New number obtained=(22×132)=(2×13)2=(26)2
Hence, the new number is the square of 26
(v) Resolving 4500 into prime factors:
4500=2×2×3×3×5×5×5=22×32×52×5
Thus, to get a perfect square, the given number should be divided by 5
New number obtained=(22×32×52)=(2×3×5)2=(30)2
Hence, the new number is the square of 30
(vi) Resolving 7776 into prime factors:
7776=2×2×2×2×2×3×3×3×3×3=22×22×2×32×32×3
Thus, to get a perfect square, the given number should be divided by 6 whish is a product of 2 and 3
New number obtained=(22×22×32×32)=(2×2×3×3)2=(36)2
Hence, the new number is the square of 36
(vii) Resolving 8820 into prime factors:
8820=2×2×3×3×5×7×7=22×32×5×72
Thus, to get a perfect square, the given number should be divided by 5
New number obtained=(22×32×72)=(2×3×7)2=(42)2
Hence, the new number is the square of 42
(viii) Resolving 4056 into prime factors:
4056=2×2×2×3×13×13=22×2×3×132
Thus, to get a perfect square, the given number should be divided by 6, which is a product of 2 and 3
New number obtained=(22×132)=(2×13)2=(26)2
Hence, the new number is the square of 26

Q.5. Find the largest number of 2 digits which is a perfect square.
Ans. 
The first three digit number (100) is a perfect square. Its square root is 10.
The number before 10 is 9.
Square of 9 = (9)2=81= (9)2=81
Thus, the largest 2 digit number that is a perfect square is 81.

Q.6. Find the largest number of 3 digits which is a perfect square.
Ans.
The largest 3 digit number is 999.
The number whose square is 999 is 31.61.
Thus, the square of any number greater than 31.61 will be a 4 digit number.
Therefore, the square of 31 will be the greatest 3 digit perfect square.
312=31×31=961

The document RS Aggarwal Solutions: Exercise 3A - Squares and Square Roots | Mathematics (Maths) Class 8 is a part of the Class 8 Course Mathematics (Maths) Class 8.
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FAQs on RS Aggarwal Solutions: Exercise 3A - Squares and Square Roots - Mathematics (Maths) Class 8

1. How can I find the square root of a number?
Ans. To find the square root of a number, you can use the prime factorization method or the long division method. In the prime factorization method, you express the given number as the product of its prime factors, and then take the square root of each prime factor. In the long division method, you divide the given number into groups of two digits starting from the rightmost digit, find the largest number whose square is less than or equal to the group, subtract the square of that number from the group, and continue the process until you have divided all the groups.
2. How can I check if a number is a perfect square?
Ans. To check if a number is a perfect square, you can find its square root and see if it is an integer. If the square root is an integer, then the number is a perfect square. For example, the square root of 16 is 4, which is an integer, so 16 is a perfect square.
3. What is the square of a negative number?
Ans. The square of a negative number is always positive. When you square a negative number, the negative sign is removed, and you get a positive result. For example, (-3)^2 is equal to 9.
4. How can I find the square of a decimal number?
Ans. To find the square of a decimal number, you can multiply the number by itself. For example, to find the square of 1.5, you multiply 1.5 by 1.5, which is equal to 2.25.
5. How can I simplify a square root expression?
Ans. To simplify a square root expression, you can look for perfect square factors inside the square root and take them out. For example, if you have √18, you can simplify it as √9 * √2, which is equal to 3√2. Similarly, if you have √50, you can simplify it as √25 * √2, which is equal to 5√2.
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