# MCQ Questions for Class 9 Maths Chapter 5 Introduction to Euclids Geometry with answers

0 votes
215 views

Provide me latest MCQ Questions for Class 9 Maths Chapter 5 Introduction to Euclids Geometry so I can prepare for exams. Kindly give Chapter 5 Introduction to Euclids Geometry Class 9 Maths MCQs Questions with Answers Free PDF Download quickly as it is very essential.

## 1 Answer

0 votes
by (-15,023 points)

Below you will find MCQ Questions of Chapter 5 Introduction to Euclids Geometry Class 9 Maths Free PDF Download that will help you in gaining good marks in the examinations and also cracking competitive exams. These Class 9 MCQ Questions with answers will widen your skills and understand concepts in a better manner.

# MCQ Questions for Class 9 Maths Chapter 5 Introduction to Euclids Geometry with answers

1. ‘Lines are parallel if they do not intersect’ – is stated in the form of:

(a) A postulate

(b) An axiom

(c) A definition

(d) A proof

► (a) A postulate

2. It is known that if a + b = 4 then 1/2(a + b) = 2. The Euclid’s axiom that illustrates this statement is

(a) VI axiom

(b) IV axiom

(c) V axiom

(d) VII axiom

► (d) VII axiom

3. Axiom and postulates are

(a) Conclusions

(b) Reasons

(c) Assumptions

(d) Questions

► (c) Assumptions

4. Euclid belongs to

(a) Egypt

(b) Greece

(c) Babylonia

(d) Rome

► (a) Egypt

5. The number of dimensions, a solid has

(a) 0

(b) 1

(c) 3

(d) 2

► (c) 3

6. Which of the following are boundaries of a surface?

(a) Lines

(b) Curves

(c) Surfaces

(d) Points

► (b) Curves

7. Maximum number of lines that can pass through a single point are

(a) three

(b) one

(c) infinite

(d) two

► (c) infinite

8. A circle can be drawn with any _____ and any radius.

(a) Point

(b) Coordinate

(c) Centre

(d) X- axis

► (c) Centre

9. If a straight line falling in two straight line make the interior angles on the same side of it taken together, then two straight lines if produced indefinitely, meet on that side on which the sum of angles are _____ 2 right angles.

(a) Less than

(b) Greater than

(c) Equal to

(d) None of these

► (a) Less than

10. It is known that if a + b = 4 then a + b – c = 4 – c. The Euclid’s axiom that illustrates this statement is

(a) I axiom

(b) III axiom

(c) IV axiom

(d) II axiom

► (b) III axiom

11. If B lies on line AC and points A, B and C are distinct such that, AB + BC = AC, then

(a) AB < AC

(b) AB > AC

(c) AB = AC

(d) None of these

► (a) AB < AC

12. Every line has

(a) three mid-points

(b) two mid-points

(c) one and only mid-point

(d) None of these

► (c) one and only mid-point

13. The edges of a surface are

(a) Plans

(b) Lines

(c) Points

(d) Rays

► (b) Lines

14. Pythagoras was a student of

(a) Thales

(b) Archimedes

(c) Euclid

(d) None of these

► (a) Thales

15. If a > b and b > c, then,

(a) a = c

(b) a < c

(c) a > c

(d) a ≤ c

► (c) a > c

16. The number of dimensions, a line has

(a) 0

(b) 1

(c) 2

(d) 3

► (b) 1

17. Thales belongs to

(a) Egypt

(b) Rome

(c) Greece

(d) Babylonia

► (c) Greece

18. The number of lines passing through two distinct points

(a) 4

(b) 2

(c) 3

(d) 1

► (d) 1

19. The three steps from solids to points are

(a) Solids – lines – points – surfaces

(b) Solids – points – lines – surfaces

(c) Solids – surfaces – lines – points

(d) None of these

► (c) Solids – surfaces – lines – points

20. The boundaries of the solids are

(a) curves

(b) lines

(c) surfaces

(d) points

► (c) surfaces

21. The total number of propositions in the Euclid’s Elements are

(a) 465

(b) 460

(c) 32

(d) 13

► (a) 465

22. Two lines are intersecting, if they have :

(a) A common point

(b) An uncommon point

(c) Two collinear point

(d) None of these

► (a) A common point

Hope the given MCQ Questions will help you in cracking exams with good marks. These Introduction to Euclids Geometry MCQ Questions will help you in practising more and more questions in less time.

0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer
0 votes
1 answer