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Test: Euclid's Geometry - Class 9 MCQ


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20 Questions MCQ Test Mathematics (Maths) Class 9 - Test: Euclid's Geometry

Test: Euclid's Geometry for Class 9 2024 is part of Mathematics (Maths) Class 9 preparation. The Test: Euclid's Geometry questions and answers have been prepared according to the Class 9 exam syllabus.The Test: Euclid's Geometry MCQs are made for Class 9 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Euclid's Geometry below.
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Test: Euclid's Geometry - Question 1

 The line drawn from the center of the circle to any point on its circumference is called:

Detailed Solution for Test: Euclid's Geometry - Question 1

Correct Option is A. Radius

Test: Euclid's Geometry - Question 2

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

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Test: Euclid's Geometry - Question 3

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

Test: Euclid's Geometry - Question 4

Axiom and postulates are

Detailed Solution for Test: Euclid's Geometry - Question 4
Axioms and postulates are assumption that are taken bu euclid to prove several theorems , axioms and postulates can not be proved as they are universal truth .
Test: Euclid's Geometry - Question 5

The number of line segments determined by three collinear points is:

Detailed Solution for Test: Euclid's Geometry - Question 5

if the points are collinear then only 1 line can pass through 3 points  as colinear mean the points which are on same line.

Test: Euclid's Geometry - Question 6

The edges of a surface are.

Detailed Solution for Test: Euclid's Geometry - Question 6
The edge of all surfaces are lines because any surface is made up of a plane and each plane is an area formed by collection of points so in this way the boundaries/edges are also formed by points. and a collection of points is called a line.
Test: Euclid's Geometry - Question 7

Maximum numbers of points that can lie on a line are:

Test: Euclid's Geometry - Question 8

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

Detailed Solution for Test: Euclid's Geometry - Question 8

 According to the definition of parallel lines “lines are parallel if they do not intersect”. They are not intersecting. Definition: a statement that gives the exact meaning of the given word. Hence, 'lines are parallel if they do not intersect' is stated in the form of definition.

Test: Euclid's Geometry - Question 9

The things which are double of same things are:

Detailed Solution for Test: Euclid's Geometry - Question 9

Things which are double of the same things are equal to one another.
Example : 
1. If 2x = 2y then x = y.
2. If a = b, then 2a = 2b

Test: Euclid's Geometry - Question 10

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

Test: Euclid's Geometry - Question 11

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

Detailed Solution for Test: Euclid's Geometry - Question 11
Two distinct lines will always intersect in at most one point. This will be true no matter how many dimensions we're in, as long as we're in a standard Euclidean geometry. One way to see this is to consider what happens if we have two lines which intersect in more than one point.
Test: Euclid's Geometry - Question 12

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

Detailed Solution for Test: Euclid's Geometry - Question 12

The correct answer is C: infinite.

Here's why:
- In geometry, through a single point, an infinite number of lines can pass.
- This concept is a fundamental property of Euclidean geometry.
- Imagine a point as the intersection of multiple lines, where each line extends infinitely in both directions.
- Therefore, the correct answer is that an infinite number of lines can pass through a single point.

Test: Euclid's Geometry - Question 13

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

Detailed Solution for Test: Euclid's Geometry - Question 13
A pyramid is a polyhedron that has a base, which can be any polygon, and three or more triangular faces that meet at a point called the apex. A pyramid has one base and at least three triangular faces. It has edges where faces meet each other or the base, vertices where two faces meet the base, and a vertex at the top where all of the triangular faces meet. A pyramid is named by the shape of its base.

Test: Euclid's Geometry - Question 14

If a > b and b > c, then,

Detailed Solution for Test: Euclid's Geometry - Question 14
As a>b and b>c it means that a >b>c obviasly a >c is corrrect answer.
Test: Euclid's Geometry - Question 15

Can two intersecting lines be parallel to a common line?

Detailed Solution for Test: Euclid's Geometry - Question 15
Two intersecting lines cannot be parallel to a common line.
Test: Euclid's Geometry - Question 16

A proof is required for:

Detailed Solution for Test: Euclid's Geometry - Question 16

Theorum is a statement which can be proved. Axiom is universly accepted by all and do not require a proof. Postulate is same a Axiom but used for geometry.

Test: Euclid's Geometry - Question 17

If a > b and b > c, then,

Test: Euclid's Geometry - Question 18

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

Test: Euclid's Geometry - Question 19

The edges of a surface are

Detailed Solution for Test: Euclid's Geometry - Question 19
  • The edges of a surface are defined by lines where two surfaces meet.
  • Plans refer to flat surfaces, not edges.
  • Points are the smallest units in geometry but do not define edges.
  • Rays extend infinitely in one direction, but do not represent edges.
  • Thus, lines, which are made up of multiple points, are the correct representation of edges of a surface.
Test: Euclid's Geometry - Question 20

Which of these statements are false?

Detailed Solution for Test: Euclid's Geometry - Question 20

A solid has shape, size, position and can be moved from one place to another. So, solid has three dimensions

 A point is that which has no part i.e., no length, no breadth and no height. So, it has no dimension.

 Boundaries of a solid are called surfaces. A surface (plane) has only length and breadth. So, it has two dimensions.

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