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Irrational Numbers - Number System - Grade 9 MCQ


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25 Questions MCQ Test - Irrational Numbers - Number System

Irrational Numbers - Number System for Grade 9 2024 is part of Grade 9 preparation. The Irrational Numbers - Number System questions and answers have been prepared according to the Grade 9 exam syllabus.The Irrational Numbers - Number System MCQs are made for Grade 9 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Irrational Numbers - Number System below.
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Irrational Numbers - Number System - Question 1

A number is irrational if and only if its decimal representation is:

Detailed Solution for Irrational Numbers - Number System - Question 1

A non-terminating, non-repeating decimal is a decimal number that continues endlessly, with no group of digits repeating endlessly. Decimals of this type cannot be represented as fractions, and as a result, are irrational numbers. Pi is a non-terminating, non-repeating decimal.

Irrational Numbers - Number System - Question 2

The product or quotient of a non-zero rational number with an irrational number is:

Detailed Solution for Irrational Numbers - Number System - Question 2

The quotient of a non zero rational number with an irrational number will be irrational.

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Irrational Numbers - Number System - Question 3

A rational number between √3 and √5 is

Detailed Solution for Irrational Numbers - Number System - Question 3

Irrational Numbers - Number System - Question 4

Which of the following statement about real numbers is false ?

Irrational Numbers - Number System - Question 5

(√12 + √10 - √2) is

Detailed Solution for Irrational Numbers - Number System - Question 5

The expression  involves the square roots of non-perfect squares (12, 10, and 2), which are irrational numbers.

When you add or subtract irrational numbers like these, the result is generally also an irrational number (unless there is some specific cancellation, which is not the case here).

Thus, the correct answer is:

Option 3: an irrational number

Irrational Numbers - Number System - Question 6

The value obtained on simplifying (√5 + √6)2

Detailed Solution for Irrational Numbers - Number System - Question 6

(a + b)2 = a2  +  b2  + 2ab
= (√5 + √6)2 
= (√5)2 + (√6)2 + 2(√5)(√6)

= 5 + 6 +2√30

= 11 + 2√30

Irrational Numbers - Number System - Question 7

The decimal expansion 0.080080008000080000080000008……. is a

Irrational Numbers - Number System - Question 8

Sam bought 2+7⁄5 kg of flour in one week and 3+4⁄15 kg of flour in second week. The flour Sam bough altogether is

Detailed Solution for Irrational Numbers - Number System - Question 8

Irrational Numbers - Number System - Question 9

An irrational number between 5/7 and 7/9 is :

Detailed Solution for Irrational Numbers - Number System - Question 9

There are infinitely many irrational numbers between 5/7 and 7/9.
5/7 = 0.71428571428 and 7/9 = 0.77777777777
so we have to find a number between these two numbers
(0.7507500075000.... is also an irrational number between 5/7 and 7/9;but it is not the only one;there are many others)

Irrational Numbers - Number System - Question 10

Identify the irrational number among these.

Detailed Solution for Irrational Numbers - Number System - Question 10

Irrational number is √13

Irrational Numbers - Number System - Question 11

On simplifying (√5 + √7)2 we get

Detailed Solution for Irrational Numbers - Number System - Question 11

(√5 + √7)2 = (√5)2 + (√7)2 + 2(√5)(√7)

= 5 + 7 + 2√35

= 12 + 2√35

Irrational Numbers - Number System - Question 12

The product of two numbers is -20/9. If one of the numbers is 4, find the other. 

Detailed Solution for Irrational Numbers - Number System - Question 12

Solution:


  • Let the other number be x.

  • According to the given information, 4*x = -20/9.

  • So, x = -20/9 / 4 = -20/9 * 1/4 = -5/9.


  •  
Irrational Numbers - Number System - Question 13

Which of the following is an irrational number ?

Detailed Solution for Irrational Numbers - Number System - Question 13

2.31312345…as it has a non terminating non repeating decimal form.

Irrational Numbers - Number System - Question 14

Insert one rational number between 2 and 3.​

Detailed Solution for Irrational Numbers - Number System - Question 14

A rational number between 2 and 3 =  2 + 3  / 2 = 2.5

Irrational Numbers - Number System - Question 15

 = _______.

Irrational Numbers - Number System - Question 16

The ratio of the circumference of a circle to the diameter of the circle is.

Detailed Solution for Irrational Numbers - Number System - Question 16

Circles are all similar, and "the circumference divided by the diameter" produces the same value regardless of their radius. This value is the ratio of the circumference of a circle to its diameter and is called π (Pi). This constant appears in the calculation of the area of a circle and is a type of an irrational number known as a transcendental number that can be expressed neither by a fraction nor by any radical sign such as a square root, nor their combination. 

Irrational Numbers - Number System - Question 17

Of the given numbers
(i) √23
(ii) √256
(iii) 0.3796
(iv) 7.478478…
(v) 1.101001000100001…

Detailed Solution for Irrational Numbers - Number System - Question 17

i) √23

√23 = √23/1 = p/q, but p is not an integer.

Hence √23 is an irrational number.

ii) √256

√256 = 16/1 = p/q, where p and q are integers and q ≠ 0.

Hence √225 is a rational number.

iii) 0.3796

0.3796 is a rational number because it is a terminating decimal number.

iv) 7.478478...

7.478478... is a rational number as it is a non-terminating recurring decimal i.e, the block of numbers 478 is repeating.

v) 1.101001000100001 . . . .

It is an irrational number because it is a non-terminating and non-recurring decimal.

Irrational Numbers - Number System - Question 18

Which among these is the approximate value of π?

Detailed Solution for Irrational Numbers - Number System - Question 18

The number π  is a mathematical constant. Originally defined as the ratio of a circle's circumference to its diameter, it now has various equivalent definitions and appears in many formulas in all areas of mathematics and physics. It is approximately equal to 3.14159. It has been represented by the Greek letter "π" since the mid-18th century, though it is also sometimes spelled out as "pi". It is also called Archimedes' constant.

Irrational Numbers - Number System - Question 19

The decimal expansion 0.080080008000080000080000008….. is a

Detailed Solution for Irrational Numbers - Number System - Question 19

The decimal expansion 0.080080008000080000080000008….. is a. Non-terminating, non-recurring. Non-terminating, recurring.

Irrational Numbers - Number System - Question 20

How many rational numbers can you find between 5 and 6?​

Detailed Solution for Irrational Numbers - Number System - Question 20

Infinitely many. You can say 5.1 is a rational number lying between 5 and 6. 5.01, 5.001, 5.0001, 5.00001 and so forth.

Irrational Numbers - Number System - Question 21

Given that  ∠A = 50° ∠C = 35° ∠E = ?

Detailed Solution for Irrational Numbers - Number System - Question 21

∠A = 50° ∠C = 35°
so  ∠A +∠B + ∠C = 180°
      ∠B = 180 - ∠B -∠C
      ∠B = 180 - 50° - 35°
      ∠B = 180 - 85°
      ∠B = 95°
By similarity ∠B = ∠E
so ∠E = 95°

Irrational Numbers - Number System - Question 22

Which of the following statements is false?

Irrational Numbers - Number System - Question 23

Convert 7/25 in the form of decimals,

Detailed Solution for Irrational Numbers - Number System - Question 23

Irrational Numbers - Number System - Question 24

From the choices given below mark the co-prime numbers

Detailed Solution for Irrational Numbers - Number System - Question 24

he correct answer is a.

The co prime numbers are 2,3 . Co means near prime means which cannot have a square root.

Irrational Numbers - Number System - Question 25

Which of the following statement is true?

Detailed Solution for Irrational Numbers - Number System - Question 25

The real numbers consist of both rational and irrational numbers. so the other three options are not true as the first one is not true because not only every real number is a rational number but the real number is rational and irrational both. same goes for the second one and the last option is not true because one half and the other half can be irrational or rational both.

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