The side faces of a pyramid are:
- Triangles.
- Squares.
- Trapeziums.
- Polygons.
Question types
Introduction to Euclid’s Geometry question types
56 questions across 6 question groups — pick any mix to generate a Maths paper with step-by-step answer keys.
56
Questions
6
Question groups
5
Question types
01
M.C.Q
27 Q→02True False[1 Marks ]
12 Q→031 Marks Question
4 Q→042 Marks Questions
8 Q→053 Marks Question
1 Q→064 Marks Questions
4 Q→Sample Questions
Introduction to Euclid’s Geometry questions
One sample from each question group in this chapter. Select any group above to see the full set with answer keys.
View full solution →
Which of the following is a true statement?
- Only a unique line can be drawn through a given point.
- Infinitely many lines can be drawn through two given points.
- If two circles are equal, then their radii are equal.
- A line has a definite length.
In ancient India, the shapes of altars used for household rituals were:
- Squares and rectangles.
- Squares and circles.
- Triangles and rectangles.
- Trapeziums and pyramids.
Which of the following needs a proof?
- Axiom.
- Postulate.
- Definition.
- Theorem.
Which of the following is a true statement?
- The floor and a wall of a room are parallel planes.
- The ceiling and a wall of a room are parallel planes.
- The floor and the ceiling of a room are parallel planes.
- Two adjacent walls of a room are parallel planes.
Two intersecting lines cannot be both parallel to the same line.
A line segment has no definite length.
Open half-line OA is same as ray $\overrightarrow{\text{OA}}.$
View full solution →Two lines l and m are parallel only when they have no point in common.
$\overleftrightarrow{\text{AB}}$ in name as line $\overleftrightarrow{\text{BA}}.$
View full solution →How many lines can be drawn through two given point?
At how many points can two lines at the most intersect?
If A, B and C are three collinear points, name all the line segment determined by them.
How many lines can be drawn through a given point?
Define the following terms:
Ray.
Ray.
Define the following terms:
Collinear points.
Collinear points.
Define the following terms:
Line segment.
Line segment.
Define the following terms:
Parallel lines.
Parallel lines.
Define the following terms:
Plane.
Plane.
From the given figure, name the following:
- Three lines.
- One rectilinear figure.
- Four concurrent points.
In the adjoining figure, name:
- Six points.
- Five lines segments.
- Four rays.
- Four lines.
- Four collinear points.
In the adjoining figure, name:
- Two pairs of intersecting lines and their corresponding points of intersection.
- Three concurrent lines and their points of intersection.
- Three rays.
- Two line segments.
In the given figure, L and M are the mid-points of AB and BC respectively.
View full solution →- If AB = BC, prove that AL = MC.
- If BL = BM, prove that AB = BC.
- $\text{AB}=\text{BC}\Rightarrow\frac{1}{2}\text{AB}=\frac{1}{2}\text{BC}\Rightarrow\text{AL}=\text{MC}.$
- $\text{BL}=\text{BM}\Rightarrow2\text{BL}=2\text{BM}\Rightarrow\text{AB}=\text{BC}.$
What is the difference between a theorem and an axiom?
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