5

Q1. How many propositions using his axioms, postulates, definitions and theorems proved earlier did Euclid deduce ?

465

565

165

150

Q2. Things which are double of the same things are _____ to one another.

equal 

not equal

parallel

perpendicular

Q3. A circle can be drawn with any centre but with a fixed radius. This is the statement of:

Euclid's Postulate 1

Euclid's Postulate 2

Euclid's Postulate 3

Euclid's Postulate 4

Q4. If a = c and b = c, then we can say,

a = b

a < b

a > b

None of these

Q5. Can two intersecting lines be parallel to a common line?

Yes

No

Maybe

sometimes

Q6. How many end points does a ray has?

one

two

three

None

Q7. The line x = 2 and y = x can intersect at how may points

one

two

three

None

Q8. Which one of the following statement is true?

Only one line can pass through a single point.

There are an infinite number of lines which pass through two distinct points.

Two distinct lines cannot have more than one point in common

If two circles are equal, then their radii are not equal.

Q9. Axiom or postulates are

Reasons

Conclusions

Assumptions

Questions

Q10. The word geometry comes from two Greek words which in English mean

'Earth' and 'to extend'

'Earth' and 'to read'

'Earth' and 'to measure'

'Earth' and 'to draw'

Q11. 'Lines are parallel if they do not intersect' - is stated in the form of:

An axiom

A definition

A postulate

A proof

Q12. Which among these is the relation between whole and the part?

W < P

W > P

W = P

None of these

Q13. How many points can be common in two distinct straight lines?

one

two

three

None

Q14. A pyramid is a solid figure, the base of which is.

Only a triangle

Only a rectangle

Only a square

Any polygon

Q15. Maximum number of points that can lie on a line are:-

one

two

three

innumerable

Q16. Theorems are statements which are proved using definitions, _________, previously proved statements and deductive reasoning.

Axioms

Definitions

Theorems

Statements

Q17. If B lies on line AC and points A, B and C are distinct such that, AB + BC = AC, then

AB < AC

AB > AC

AB = AC

None of these

Q18. 'Two intersecting lines cannot be parallel to the same line' is stated in the form of:

An axiom

A definition

A postulate

A proof

Q19. A circle can be drawn with any ……… and any radius.

Point

Centre

Coordinate

X- axis

Q20. If a > b and b > c, then,

a > c

a < c

a = c

None of these

Q21. A surface is that which has

Length and breadth

Length only

Breadth only

Length and height

Q22. Maximum number of lines that can pass through a single point are

one

two

three

infinite

Q23. Which of the following is an example of a geometrical line?

Black Board

Sheet of paper

Meeting place of two walls

Tip of the sharp pencil

Q24. How many dimensions does a surface have according to Euclid?

1

2

3

4

Q25. The edges of a surface are

Points

Lines

Rays

Plans

Q26. A proof is required for:

Postulate

Axiom

Theorem

Definition

Q27. How many lines can pass through two distinct points?

One

two

three

innumerable

Q28. The things which are double of same things are:

Equal

halves of same thing

Unequal

double of the same thing

Q29. A line segment has ............ end points.

Two

One

No

Four

Q30. If the point P lies in between M and N and C is midpoint of MP then:

MC + PN = MN

MP + CP = MN

MC + CN + MN

CP + CN = MN