mathematics questions practice class 10 real number.pdf
1. KOTA ASPIRE
Educational Research Center, Bolangir
MATHEMATICS PRACTICE QUESTIONS
Class – 10
Chapter 1 Real Number
Question 1.
The decimal expansion of the rational number 432453 will terminate
after how many places of decimals? (2013)
Solution:
Question 2.
Write the decimal form of 129275775
3. Question 3.
Find the largest number that will divide 398, 436 and 542 leaving
remainders 7, 11, and 15 respectively.
Solution:
Algorithm
4. 398 – 7 = 391, 436 – 11 = 425, 542 – 15 = 527
HCF of 391, 425, 527 = 17
Question 4.
Express 98 as a product of its primes.
5. Solution:
2 × 72
Question 5.
If the HCF of 408 and 1032 is expressible in the form 1032 × 2 + 408 ×
p, then find the value of p.
6. Solution:
HCF of 408 and 1032 is 24.
1032 × 2 + 408 × (p) = 24
408p = 24 – 2064
p = -5
Question 6.
HCF and LCM of two numbers is 9 and 459 respectively. If one of the
numbers is 27, find the other number. (2012)
14. Question 11.
Find the largest number which divides 70 and 125 leaving remainder 5
and 8 respectively. (2015)
15. Solution:
It is given that on dividing 70 by the required number, there is a
remainder 5.
This means that 70 – 5 = 65 is exactly divisible by the required number.
Similarly, 125 – 8 = 117 is also exactly divisible by the required
number.
65 = 5 × 13
117 = 32
× 13
HCF = 13
Required number = 13
16. Question 12.
Find the prime factorisation of the denominator of rational number
expressed as 6.12¯ in simplest form. (2014)
Solution:
Let x = 6.12¯ …(i)
100x = 612.12¯ …(ii)
…[Multiplying both sides by 100]
Subtracting (i) from (ii),
99x = 606
x = 60699 = 20233
17. Denominator = 33
Prime factorisation = 3 × 11
Question 13.
Complete the following factor tree and find the composite number x.
(2014)
20. Solution:
Let us assume, to the contrary, that 2 + 3√5 is rational.
So that we can find integers a and b (b ≠ 0).
Such that 2 + 3√5 = ab, where a and b are coprime.
Rearranging the above equation, we get
Since a and b are integers, we get a3b−23 is rational and so √5 is
rational.
But this contradicts the fact that √5 is irrational.
So, we conclude that 2 + 3√5 is irrational.
23. Solution:
Let us assume, to the contrary, that 3√7 is rational.
That is, we can find coprime a and b (b ≠ 0) such that 3√7 = ab
Rearranging, we get √7 = a3b
Since 3, a and b are integers, a3b is rational, and so √7 is rational.
But this contradicts the fact that √7 is irrational.
So, we conclude that 3√7 is irrational.
Question 16.
Explain why (17 × 5 × 11 × 3 × 2 + 2 × 11) is a composite number?
(2015)
25. = 2 × 11 × 256
Number (i) is divisible by 2, 11 and 256, it has more than 2 prime
factors.
Therefore (17 × 5 × 11 × 3 × 2 + 2 × 11) is a composite number.
Question 17.
Check whether 4n can end with the digit 0 for any natural number n.
(2015)
26. Solution:
4n
= (22
)n
= 22n
The only prime in the factorization of 4n
is 2.
There is no other prime in the factorization of 4n
= 22n
(By uniqueness of the Fundamental Theorem of Arithmetic).
5 does not occur in the prime factorization of 4n
for any n.
Therefore, 4n
does not end with the digit zero for any natural number n.
Question 18.
Can two numbers have 15 as their HCF and 175 as their LCM? Give
reasons. (2017 OD)
27. Solution:
No, LCM = Product of the highest power of each factor involved in the
numbers.
HCF = Product of the smallest power of each common factor.
We can conclude that LCM is always a multiple of HCF, i.e., LCM = k
× HCF
We are given that,
LCM = 175 and HCF = 15
175 = k × 15
⇒ 11.67 = k
28. But in this case, LCM ≠ k × HCF
Therefore, two numbers cannot have LCM as 175 and HCF as 15.
Question 19.
Prove that √5 is irrational and hence show that 3 + √5 is also irrational.
(2012)
Solution:
Let us assume, to the contrary, that √5 is rational.
So, we can find integers p and q (q ≠ 0), such that
√5 = pq, where p and q are coprime.
Squaring both sides, we get
5 = p2q2
⇒ 5q2
= p2
…(i)
⇒ 5 divides p2
29. 5 divides p
So, let p = 5r
Putting the value of p in (i), we get
5q2
= (5r)2
⇒ 5q2
= 25r2
⇒ q2
= 5r2
⇒ 5 divides q2
5 divides q
So, p and q have atleast 5 as a common factor.
But this contradicts the fact that p and q have no common factor.
So, our assumption is wrong, is irrational.
√5 is irrational, 3 is a rational number.
So, we conclude that 3 + √5 is irrational.
Question 20.
Prove that 3 + 2√3 is an irrational number. (2014)
Solution:
Let us assume to the contrary, that 3 + 2√3 is rational.
So that we can find integers a and b (b ≠ 0).
Such that 3 + 2√3 = ab, where a and b are coprime.
Rearranging the equations, we get
30. Since a and b are integers, we get a2b−32 is rational and so √3 is
rational.
But this contradicts the fact that √3 is irrational.
So we conclude that 3 + 2√3 is irrational.
Question 21.
Three bells toll at intervals of 9, 12, 15 minutes respectively. If they start
tolling together, after what time will they next toll together? (2013)
Solution:
9 = 32
, 12 = 22
× 3, 15 = 3 × 5
LCM = 22
× 32
× 5 = 4 × 9 × 5 = 180 minutes or 3 hours
They will next toll together after 3 hours.
Question 22.
Two tankers contain 850 liters and 680 liters of petrol. Find the
maximum capacity of a container which can measure the petrol of each
tanker in the exact number of times. (2012)
31. Solution:
To find the maximum capacity of a container which can measure the
petrol of each tanker in the exact number of times, we find the HCF of
850 and 680.
850 = 2 × 52
× 17
680 = 23
× 5 × 17
HCF = 2 × 5 × 17 = 170
Maximum capacity of the container = 170 liters.
32. Question 23.
The length, breadth, and height of a room are 8 m 50 cm, 6 m 25 cm and
4 m 75 cm respectively. Find the length of the longest rod that can
measure the dimensions of the room exactly. (2015)
33. Solution:
To find the length of the longest rod that can measure the dimensions of
the room exactly, we have to find HCF.
L, Length = 8 m 50 cm = 850 cm = 21
× 52
× 17
B, Breadth = 6 m 25 cm = 625 cm = 54
H, Height = 4 m 75 cm = 475 cm = 52
× 19
HCF of L, B and H is 52
= 25 cm
Length of the longest rod = 25 cm
Question 24.
Three alarm clocks ring at intervals of 4, 12 and 20 minutes respectively.
If they start ringing together, after how much time will they next ring
34. together? (2015)
Solution:
To find the time when the clocks will next ring together,
we have to find LCM of 4, 12 and 20 minutes.
4 = 22
12 = 22
× 3
20 = 22
× 5
LCM of 4, 12 and 20 = 22
× 3 × 5 = 60 minutes.
So, the clocks will ring together again after 60 minutes or one hour.
35. Question 25.
In a school, there are two Sections A and B of class X. There are 48
students in Section A and 60 students in Section B. Determine the least
number of books required for the library of the school so that the books
can be distributed equally among all students of each Section. (2017
OD)
36. Solution:
Since the books are to be distributed equally among the students of
Section A and Section B. therefore, the number of books must be a
multiple of 48 as well as 60.
Hence, required num¬ber of books is the LCM of 48 and 60.
48 = 24
× 3
60 = 22
× 3 × 5
LCM = 24
× 3 × 5 = 16 × 15 = 240
Hence, required number of books is 240.
37. Question 26.
By using Euclid’s algorithm, find the largest number which divides 650
and 1170. (2017 OD)
Solution:
Given numbers are 650 and 1170.
1170 > 650
1170 = 650 × 1 + 520
650 = 520 × 1 + 130
520 = 130 × 4 + 0
HCF = 130
The required largest number is 130.
38. Question 27.
Find the HCF of 255 and 867 by Euclid’s division algorithm. (2014)
Solution:
867 is greater than 255. We apply the division lemma to 867 and 255, to
39. get
867 = 255 × 3 + 102
We continue the process till the remainder is zero
255 = 102 × 2 + 51
102 = 51 × 2 + 0, the remainder is zero.
HCF = 51
Question 28.
Using Euclid’s division algorithm, find whether the pair of numbers 847,
2160 are coprime or not.
To find out the minimum (least) time when the bells toll together next,
we find the LCM of 9, 12, 15.
41. Solution:
Let us assume, to the contrary, that 3 + 2√5 is rational
So that we can find integers a and b (b ≠ 0), such that
3 + 2 √5 = ab, where a and b are coprime.
Rearranging this equation, we get
Since a and b are integers, we get that a2b – 32 is rational and so √5 is
rational.
But this contradicts the fact that √5 is irrational.
So we conclude that 3 + 2√5 is irrational.
Question 30.
There are 104 students in class X and 96 students in class IX in a school.
In a house examination, the students are to be evenly seated in parallel
rows such that no two adjacent rows are of the same class. (2013)
(a) Find the maximum number of parallel rows of each class for the
42. seating arrange¬ment.
(b) Also, find the number of students of class IX and also of class X in a
row.
(c) What is the objective of the school administration behind such an
arrangement?
Solution:
104 = 23
× 13
96 = 25
× 3
HCF = 23
= 8
43. (a) Number of rows of students of class X = 1048 = 13
Number maximum of rows class IX = 968 = 12
Total number of rows = 13 + 12 = 25
(b) No. of students of class IX in a row = 8
No. of students of class X in a row = 8
(c) The objective of school administration behind such an arrangement is
fair and clean examination, so that no student can take help from any
other student of his/her class.
Question 31.
Dudhnath has two vessels containing 720 ml and 405 ml of milk
44. respectively. Milk from these containers is poured into glasses of equal
capacity to their brim. Find the minimum number of glasses that can be
filled. (2014)
Solution:
1st vessel = 720 ml; 2nd vessel = 405 ml
We find the HCF of 720 and 405 to find the maximum quantity of milk
to be filled in one glass.
45. 405 = 34
× 5
720 = 24
× 32
× 5
HCF = 32
× 5 = 45 ml = Capacity of glass
No. of glasses filled from 1st vessel = 72045 = 16
No. of glasses filled from 2nd vessel = 40545 = 9
Total number of glasses = 25
Question 32.
Amita, Sneha, and Raghav start preparing cards for all persons of an old
age home. In order to complete one card, they take 10, 16 and 20
minutes respectively. If all of them started together, after what time will
they start preparing a new card together? (2013)
Solution:
To find the earliest (least) time, they will start preparing a new card
together, we find the LCM of 10, 16 and 20.
10 = 2 × 5
16 = 24
20 = 22
× 5
LCM = 24
× 5 = 16 × 5 = 80 minutes
They will start preparing a new card together after 80 minutes.
46. Question 33.
Find HCF of numbers 134791, 6341 and 6339 by Euclid’s division
algorithm. (2015)
47. Solution:
First, we find HCF of 6339 and 6341 by Euclid’s division method.
6341 > 6339
6341 = 6339 × 1 + 2
6339 = 2 × 3169 + 1
2 = 1 × 2 + 0
HCF of 6341 and 6339 is 1.
Now, we find the HCF of 134791 and 1
134791 = 1 × 134791 + 0
HCF of 134791 and 1 is 1.
Hence, the HCF of the given three numbers is 1.
48. Question 34.
If two positive integers x and y are expressible in terms of primes as x =
p2
q3
and y = p3
q, what can you say about their LCM and HCF. Is LCM a
multiple of HCF? Explain. (2014)
49.
50. Solution:
x = p2
q3
and y = p3
q
LCM = p3
q3
HCF = p2
q …..(i)
Now, LCM = p3
q3
⇒ LCM = pq2
(p2
q)
⇒ LCM = pq2
(HCF)
Yes, LCM is a multiple of HCF.
Explanation:
Let a = 12 = 22
× 3
b = 18 = 2 × 32
HCF = 2 × 3 = 6 …(ii)
LCM = 22
× 32
= 36
LCM = 6 × 6
LCM = 6 (HCF) …[From (ii)]
Here LCM is 6 times HCF.
51. Question 35.
Show that one and only one out of n, (n + 1) and (n + 2) is divisible by
3, where n is any positive integer. (2015)
52. Solution:
Let n, n + 1, n + 2 be three consecutive positive integers.
We know that n is of the form 3q, 3q + 1, or 3q + 2.
Case I. When n = 3q,
In this case, n is divisible by 3,
but n + 1 and n + 2 are not divisible by 3.
Case II. When n = 3q + 1,
In this case n + 2 = (3q + 1) + 2
= 3q + 3
= 3(q + 1 ), (n + 2) is divisible by 3,
but n and n + 1 are not divisible by 3.
Case III.
When n = 3q + 2, in this case,
n + 1 = (3q + 2) + 1
= 3q + 3 = 3 (q + 1 ), (n + 1) is divisible by 3,
but n and n + 2 are not divisible by 3.
Hence, one and only one out of n, n + 1 and n + 2 is divisible by 3.
53. Question 36.
Find the HCF and LCM of 306 and 657 and verify that LCM × HCF =
Product of the two numbers. (2016 D)
55. R.H.S. = Product of two numbers = 306 × 657 = 201042
L.H.S. = R.H.S.
56. Question 37.
Show that any positive odd integer is of the form 41 + 1 or 4q + 3 where
q is a positive integer. (2016 OD)
57. Solution:
Let a be a positive odd integer
By Euclid’s Division algorithm:
a = 4q + r …[where q, r are positive integers and 0 ≤ r < 4]
a = 4q
or 4q + 1
or 4q + 2
or 4q + 3
But 4q and 4q + 2 are both even
a is of the form 4q + 1 or 4q + 3.