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Finish Line & Beyond
Square & Square Roots
1. If a natural number m can be expressed as n², where n is also a natural number, then m is a square number.2. All square numbers end with 0, 1, 4, 5, 6 or 9 at unit’s place.All numbers have numbers from 0 to 9 at their unit place and the number at the unit place of square of that number behaves as per the number at unit place in the original number. Following is the illustration of this property:
0²=0 0 is the number at unit’s place1²=1 1 is the number at unit’s place2²=4 4 is the number at unit’s place3²=9 9 is the number at unit’s place4²=16 6 is the number at unit’s place5²=25 5 is the number at unit’s place6²=36 6 is the number at unit’s place7²=49 9 is the number at unit’s place8²=64 4 is the number at unit’s place9²=81 1 is the number at unit’s place
3. Square numbers can only have even number of zeros at the end.4. Square root is the inverse operation of square.5. There are two integral square roots of a perfect square number.
Positive square root of a number is denoted by the symbol
For example, 3² = 9 gives 9 = 3
Exercise 1
1. What will be the unit digit of the squares of the following numbers?(i) 81
Answer: As 1² ends up having 1 as the digit at unit’s place so 81² will have 1 at unit’s place.
(ii) 272
Asnwer: 2²=4So, 272² will have 4 at unit’s place
(iii) 799
Answer: 9²=81So, 799 will have 1 at unit’s place
(iv) 3853
Answer: 3²=9So, 3853² will have 9 at unit’s place.
Answer: 4²=16So, 1234² will have 6 at unit’s place
(vi) 26387
Answer: 7²=49So, 26387² will have 9 at unit’s place
(vii) 52698
Answer: 8²=64So, 52698² will have 4 at unit’s place
(viii) 99880
Answer: 0²=0So, 99880² will have 0 at unit’s place
(ix) 12796
Answer: 6²=36So, 12796² will have 6 at unit’s place
(x) 55555
Answer: 5²=25So, 55555² will have 5 at unit’s place
2. The following numbers are obviously not perfect squares. Give reason.(i) 1057 (ii) 23453 (iii) 7928 (iv) 222222 (v) 64000 (vi) 89722 (vii) 222000 (viii) 505050
Answer: (i), (ii), (iii), (iv), (vi) don’t have any of the 0, 1, 4, 5, 6, and 9 at unit’s place, so they are not perfect squares.
(v), (vii) and (viii) don’t have even number of zeroes at the end so they are not perfect squares.
3. The squares of which of the following would be odd numbers?(i) 431 (ii) 2826 (iii) 7779 (iv) 82004
Answer: (i) and (iii) will have odd numbers as their square, because an odd number multiplied by another odd number always results in an odd number.
4. Observe the following pattern and find the missing digits.11² = 121101² = 10201
Start with 1 followed as many zeroes as there are between the first and the last one, followed by two again followed by as many zeroes and end with 1.
5. Observe the following pattern and supply the missing numbers.11² = 1 2 1101² = 1 0 2 0 110101² = 1020302011010101² = 1020304030201101010101² =102030405040201
Start with 1 followed by a zero and go up to as many number as there are number of 1s given, follow the same pattern in reverse order.6. Using the given pattern, find the missing numbers.1² + 2² + 2² = 3²2² + 3² + 6² = 7²3² + 4² + 12² = 13²4² + 5² + 20²= 21²5² + 6²+ 30² = 31²6² + 7² + 42² = 43²
If the square of a number is added with square of its prime factors we get square of a number which is 1 more than the original number.
7. Without adding, find the sum.(i) 1 + 3 + 5 + 7 + 9
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) 252
Answer: 1262252 ×=6322 ××=
73322 ××××=Here, 2 and 3 are in pairs but 7 needs a pair, so 252 will become a perfect square when multiplied by 7.
(ii) 180
Answer: 4522180 ××=53322 ××××=
180 needs to be multiplied by 5 to become a perfect square.
(iii) 1008
Answer: 252221008 ××=632222 ××××=
7332222 ××××××=1008 needs to be multiplied by 7 to become a perfect square
(iv) 2028
Answer: 50742028 ×=16934 ××=
1313322 ××××=2028 needs to be multiplied by 3 to become a perfect square.
(v) 1458
Answer: 72921458 ×=81332 ×××=
3333332 ××××××=1458 needs to be multiplied by 2 to become a perfect square.
768 needs to be multiplied by 3 to become a perfect square.
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) 252
Answer: 6322252 ××=73322 ××××=
252 needs to be divided by 7 to become a perfect square.
(ii) 2925
Answer: 117552925 ××=133355 ××××=
2925 needs to be divided by 13 to become a perfect square
(iii) 396
Answer: 9922396 ××=113322 ××××=
396 needs to be divided by 11 to become a perfect square
(iv) 2645
Answer: 52952645 ×= 23235 ××2645 needs to be divided by 5 to become a perfect square.
(v) 2800
Answer: 10107222800 ××××=2800 needs to be divided by to become a perfect square.
(vi) 1620
Answer: 405221620 ××=453322 ××××=
5333322 ××××××=1620 needs to be divided by 5 to become a perfect square
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.
Answer: We need to calculate the square root of 2401 to get the solution
77772401 ×××=49772401 =×=⇒
There are 49 students, each contributing 49 rupees
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.
Answer: 3333552025 ×××××=453352025 =××=⇒
There are 45 rows with 45 plants in each of them.
9. Find the smallest square number that is divisible by each of the numbers 4, 9 and 10.
Answer: Let us find LCM of 4, 9 and 10224 ×=339 ×=2510 ×=
So, LCM = 18053²²2 =××Now the LCM gives us a clue that if 180 is multiplied by 5 then it will become a perfect square.The Required number = 9005180 =×
10. Find the smallest square number that is divisible by each of the numbers 8, 15 and 20.
Answer: 2228 ××=
5315 ×=52220 ××=
So, LCM = 12035222 =××××As 3 and 5 are not in pair in LCM’s factor so we need to multiply 120 by 5 and three to make it a perfect square.Required Number= 270053180 =××
2. Find the number of digits in the square root of each of the following numbers (without any calculation).(i) 64 (ii) 144 (iii) 4489 (iv) 27225 (v) 390625
Answer:
If there are even number of digits in square then number of digits in square root =2n
If there are odd number of digits in square then number of digits in square root=
21+n
(i) 1, (ii) 2, (iii) 2, (iv) 3, (v) 3
3. Find the square root of the following decimal numbers.(i) 2.56
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) 402
Answer:
222
0244
4 002
It is clear that if 2 is subtracted then we will get 400, which is a perfect square.
(ii) 1989
Answer:
44
198916
8 389
Here, 84X4=336 which is less than 389And, 85X5=425, which is more than 389
Hence the required difference =389-336=531989-53=1936 is a perfect square.
(iii) 3250
Answer:
55
325025
10 750
Here, 107X7=749 is less than 750 108X8=864 is more than 750Hence, the required difference = 750-749=13250-1=3249 is a perfect square.
Here, 48X8=384 is less than 425 49X9=441 is more than 425Hence, the required difference= 425-384=41825-41=784 is a perfect square.
(v) 4000
Answer:
66
400036
12 400
Here, 123X3=369 is less than 400 124X4=496 is more than 400Hence, the required difference = 400-369=314000-31=3969 is a perfect square.
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) 525
Answer:
22
5254
4 125
Here, 43X3=129 is more than 125 42X2=84 is less than 125Hence, required addition= 129-125=4525+4=529 is a perfect square.
Here, we need 161X1=161Required difference=161-12=149So, 6412+149=6561 is a perfect square
6. Find the length of the side of a square whose area is 441 m².
Answer: Area of Square = Side²
Side⇒ Area=7733441 ×××=2173441 =×=⇒
7. In a right triangle ABC, ∠ B = 90°.(a) If AB = 6 cm, BC = 8 cm, find AC
Answer= AC²=AB²+BC²=6²+8²=36+64=100
AC= 10100 =
(b) If AC = 13 cm, BC = 5 cm, find AB
Answer: AB²=AC²-BC²=13²-5²=169-25=144AB = 12144 =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 same. Find the minimum number of plants he needs more for this.
Answer:
33
10009
6 100
Here, 61X1=61 is less than 100 62X2=124 is more than 100Hence, the required difference= 100-61=39Min. number of plants required= 1000-39=961
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 number of columns. How many children would be left out in this arrangement.
Answer:
22
5004
4 100
Here, 42X2=84 is less than 100 43X3=129 is more than 100Hence, the required difference = 100-84=16
So, 16 children will be left out in the arrangement.