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RD Sharma Solutions Class 9 Maths Chapter 1 Number System
RD Sharma Class 9 Maths Chapter 1 Number System: Exercise wise Solutions
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RD Sharma Class 9 Solutions Chapter 1 Number System Ex 1.1
Question 1.
Is zero a rational number? Can you write it P in the form pq , where p and q are integers and q ≠ 0? [NCERT]
Solution:
Yes, zero is a rational number e.g.
Question 2.
Find five rational numbers between 1 and 2. [NCERT]
Solution:
We know that one rational number between two numbers a and b = a+b2
Therefore one rational number between 1 and 2
Question 3.
Find six rational numbers between 3 and 4. [NCERT]
Question 4.
Find five rational numbers between 35 and 45
Solution:
Question 5.
Are the following statements true or false?
Give reason for your answer.
(i) Every whole number is a natural number. [NCERT]
(ii) Every integer is a rational number.
(iii) Every rational number is an integer.
(iv) Every natural number is a whole number,
(v) Every integer is a whole number.
(vi) Every rational number is a whole number.
Solution:
(i) False, as 0 is not a natural number.
(ii) True.
(iii) False, as 12, 13 etc. are not integers.
(iv) True.
(v) False, ∵ negative natural numbers are not whole numbers.
(vi) False, ∵ proper fraction are not whole numbers
RD Sharma Class 9 Chapter 1 Number System Ex 1.2
Question 1.
Express the following rational numbers as decimals:
Solution:
Question 2.
Solution:
Question 3.
Look at several examples of rational numbers in the form pq (q ≠ 0), where p and q are integers with no common factors other than 1 and having terminating decimal representations. Can you guess what property q must satisfy?
Solution:
The property is if the denominators have factors 2 or 5 or both, the decimal representation will be terminating e.g.
RD Sharma Class 9 Solutions Chapter 1 Number System Ex 1.3
Question 1.
Express each of the following decimals in the form pq:
(i) 0.39
(ii) 0.750
(iii) 2.15
(iv) 7.010
(v) 9.90
(vi) 1.0001
Solution:
Question 2.
Express each of the following decimals in the form pq:
Solution:
RD Sharma Solutions Class 9 Chapter 1 Number System Ex 1.4
Question 1.
Define an irrational number.
Solution:
A number which cannot be expressed in the form of pq where p and q are integers and q ≠ 0 is called an irrational number.
Question 2.
Explain, how irrational numbers differ from rational numbers?
Solution:
A rational number can be expressed in either terminating decimal or non-terminating recurring decimals but an irrational number is expressed in non-terminating non-recurring decimals.
Question 3.
Examine, whether the following numbers are rational or irrational:
Question 4.
Identify the following as rational or irrational numbers. Give the decimal representation of rational numbers:
Solution:
Question 5.
In the following equation, find which variables x, y, z etc. represent rational or irrational numbers:
Solution:
Question 6.
Given two rational numbers lying between 0.232332333233332… and 0.212112111211112.
Solution:
Two rational numbers lying between 0.232332333233332… and 0.212112111211112… will be 0.232 and 0.212
Question 7.
Give two rational numbers lying between 0.515115111511115… and 0.5353353335…
Solution:
Two rational numbers lying between 0.515115111511115… and 0.535335333533335… will be 0.515, 0.535
Question 8.
Find one irrational numbers between 0.2101 and 0.2222… = 0.2¯¯¯.
Solution:
One irrational number lying between 0.2101 and 0.2222… = 0.2¯¯¯ will be 2201.0010001…
Question 9.
Find a rational number and also an irrational number lying between the numbers, 0.3030030003… and 0.3010010001…
Solution:
Between two numbers 0.3030030003… and 0.3010010001…, a rational will be 0.301 and irrational number will be 0.3020020002…
Question 10.
Find three different irrational numbers between the rational numbers 57 and 911. [NCERT]
Solution:
Question 11.
Give an example of each, of two irrational numbers whose:
(i) difference is a rational number.
(ii) difference is an irrational number.
(iii) sum is a rational number.
(iv) sum is an irrational number.
(v) product is a rational number.
(vi) product is an irrational number.
(vii) quotient is a rational number.
(viii) quotient is an irrational number.
Solution:
(i) Two numbers whose difference is also a rational number, e.g. 2–√
, 2–√ which are irrational numbers.
∴ Difference = 2–√ – 2–√ = 0 which is also a rational number.
(ii) Two numbers whose difference is an irrational number.
e.g. 3–√ and 2–√ which are irrational numbers.
Now difference = 3–√ –2–√ which is also an irrational number.
(iii) Let two irrational numbers be 3–√ and –2–√ which are irrational numbers.
Now sum = 3–√ + (-3–√) = 3–√
– 3–√ = 0 Which is a rational number.
(iv) Let two numbers be 5–√ , 3–√ which are irrational numbers.
Now sum = 5–√ + 3–√ which is an irrational number.
(v) Let numbers be 3–√ +2–√and 3–√ –2–√which are irrational numbers.
Now product = (3–√ +2–√ ) (3–√ –2–√)
= 3-2 = 1 which is a rational number.
(vi) Let numbers be 3–√ and 5–√ , which are irrational number.
Now product = 3–√ x 5–√ = 3×5−−−−√
= 15−−√
which is an irrational number.
(vii) Let numbers be 6 2–√ and 2 2–√ which are irrational numbers.
Quotient =62√22√ = 3 which is a rational number.
(viii) Let numbers be 3–√and 5–√ which are irrational numbers.
Now quotient =3√5√ = 35−−√ which is an irrational number.
Question 12.
Find two irrational numbers between 0.5 and 0.55.
Solution:
Two irrational numbers between 0.5 and 0.55 will be 0.51010010001… and 52020020002…
Question 13.
Find two irrational numbers lying betwee 0.1 and 0.12.
Solution:
Two irrational numbers lying between 0.1 and 0.12 will be 0.1010010001… and 0.1020020002…
Question 14.
Prove that 3–√+5–√ is an irrational number.
Solution:
RD Sharma Class 9 PDF Chapter 1 Number System Ex 1.5
Question 1.
Complete the following sentences:
(i) Every point on the number line corresponds to a … number which many be either … or
(ii) The decimal form of an irrational number is neither … nor …
(iii) The decimal representation of a rational number is either … or …
(iv) Every real number is either … number or … number.
Solution:
(i) Every point on the number line corresponds to a real number which many be either rational or irrational.
(ii) The decimal form of an irrational number is neither terminating nor repeating.
(iii) The decimal representation of a rational number is either terminating or nonterminating, recurring.
(iv) Every real number is either rational number or an irrational number.
Question 2.
Find whether the following statements are true or false:
(i) Every real number is either rational or irrational.
(ii) π is an irrational number.
(iii) Irrational numbers cannot be represented by points on the number line.
Solution:
(i) True. (Value of π = 3.14)
(ii) False : we can represent irrational number also.
Question 3.
Represent 6–√, 7–√, 8–√ on the number line.
Solution:
Question 4.
Represent 3.5−−−√ , 9.4−−−√and 10.5−−−−√ on the real number line.
Solution:
Number System Class 9 RD Sharma Class 9 Solutions Ex 1.6
Question 1.
Visualise 2.665 on the number line, using successive magnification.
Solution:
2.665
∵ It lies between 2 and 3
Question 2.
Visualise the representation of 5.37¯¯¯ on the number line upto 5 decimal places, that is upto 5.37777. [NCERT]
Solution:
5.37777.
RD Sharma Class 9 Solution Chapter 1 Number System MCQS
Question 1.
Visualise 2.665 on the number line, using successive magnification.
Solution:
2.665
∵ It lies between 2 and 3
Question 2.
Visualise the representation of 5.37¯¯¯ on the number line upto 5 decimal places, that is upto 5.37777. [NCERT]
Solution:
5.37777.
Class 9 RD Sharma Solutions Chapter 1 Number System Ex 1.6
the correct alternative in each of the following:
Question 1.
Which one of the following is a correct statement?
(a) Decimal expansion of a rational number is terminating
(b) Decimal expansion of a rational number is non-terminating
(c) Decimal expansion of an irrational number is terminating
(d) Decimal expansion of an irrational number is non-terminating and non-repeating
Solution:
Decimal expansion of an irrational number is non-terminating and non-repeating . (d)
Question 2.
Which one of the following statements is true?
(a) The sum of two irrational numbers is always an irrational-number
(b) The sum of two irrational numbers is always a rational number
(c) The sum of two irrational numbers may be a rational number or an irrational number
(d) The sum of two irrational numbers is always an integer
Solution:
The sum of two irrational numbers may be a rational number or an irrational number (c)
Question 3.
Which of the following is a correct statement?
(a) Sum of two irrational numbers is always irrational
(b) Sum of a rational and irrational number is always an irrational number
(c) Square of an irrational number is always a rational number
(d) Sum of two rational numbers can never be an integer
Solution:
Sum of a rational and irrational number is always an irrational number (b)
Question 4.
Which of the following statements is true?
(a) Product of two irrational numbers is always irrational
(b) Product of a rational and an irrational number is always irrational
(c) Sum of two irrational numbers can never be irrational
(d) Sum of an integer and a rational number can never be an integer
Solution:
Product of a rational and an irrational number is always irrational (b)
Question 5.
Which of the following is irrational?
Solution:
Question 6.
Which of the following is irrational?
(a) 14
(b) 0.1416¯¯¯¯¯
(c) 0.1416¯¯¯¯¯¯¯¯¯¯
(d) 0.1014001400014
Solution:
0.1014001400014…….. is irrational as it is non-terminating nor repeating decimal, (d)
Question 7.
Which of the following is rational?
Solution:
Question 8.
The number 0.318564318564318564… is:
(a) a natural number
(b) an integer
(c) a rational number
(d) an irrational number
Solution:
The number = 0.318564318564318564…………
= 0.318564¯¯¯¯¯¯¯¯¯¯¯¯¯¯¯
∵ The decimal is non-terminating and recurring
∴ It is rational number. (c)
Question 9.
If n is a natural number, then n−−√is
(a) always a natural number
(b) always a rational number
(c) always an irrational number
(d) sometimes a natural number and sometimes an irrational number
Solution:
If n is a natural number then n−−√ may sometimes a natural number and sometime an irrational number e.g.
If n = 2 then n−−√ =2–√ which is are irrational and if n = 4, then n−−√= 4–√ = 2 which is a rational number. (d)
Question 10.
Which of the following numbers can be represented as non-terminating, repeating decimals?
Solution:
Question 11.
Every point on a number line represents
(a) a unique real number
(b) a natural number
(c) a rational number
(d) an irrational number
Solution:
Every point on a number line represents a unique real number. (a)
Question 12.
Which of the following is irrational?
(a) 0.15
(b) 0.01516
(c) 0.1516¯¯¯¯¯¯¯¯¯¯
(d) 0.5015001500015..
Solution:
As it is non-terminating non-repeating decimals while others are terminating or non-terminating repeating decimals. (d)
Question 13.
The number 1.27¯¯¯¯¯ in the form pq , where p and q are integers and q ≠ 0, is
Solution:
Question 14.
Solution:
Question 15.
Solution:
Question 16.
Solution:
Question 17.
Solution:
Question 18.
Solution:
Question 19.
Solution:
An irrational number between 2 and 2.5 is 5–√ as it has approximate value 2.236… (b)
Question 20.
The number of consecutive zeros in 23 x 34 x 54 x 7, is
(a) 3
(b) 2
(c) 4
(d) 5
Solution:
In 23 x 34 x 54 x 7, number of consecutive zero will be 3 as 23 x 54 = 2 x 2 x 2 x 5x 5 x 5 x 5 = 5000 (a)
Question 21.
The smallest rational number by which 13 should be multiplied so that its decimal expansion terminates after one place of decimal, is
Solution:
Important Topics: RD Sharma Solutions Class 9 Maths Chapter 1
- Number System Introduction
- Review of Numbers
- The decimal representation of rational numbers
- Conversion of decimal numbers into rational numbers
- Conversion of decimal numbers into rational numbers
- Irrational Numbers
- Some useful results on Irrational Numbers
- Representing Irrational Numbers on the Number Line
- Real Numbers and real number line
- Existence of the square root of a positive real number
- Visualization of representation of real numbers
In the end, we are here with everything that one needs to finish their syllabus with ease and right on time. Here is RD Sharma Solutions Class 9 Mathematics Chapter 1 Number System. If you have any doubts regarding the CBSE Class 9 exams, ask in the comments.
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