The side faces of a pyramid are:
- ✓Triangles.
- BSquares.
- CTrapeziums.
- DPolygons.
Answer: A.
View full solution →Question types
Introduction to Euclid's Geometry question types
44 questions across 5 question groups — pick any mix to generate a Maths paper with step-by-step answer keys.
44
Questions
5
Question groups
5
Question types
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.
A pyramid is a solid figure, whose base is:
- AOnly a triangle.
- BOnly a square.
- COnly a rectangle.
- ✓Any polygon.
Answer: D.
View full solution →Which of the following is a true statement?
- AOnly a unique line can be drawn through a given point.
- BInfinitely many lines can be drawn through two given points.
- ✓If two circles are equal, then their radii are equal.
- DA line has a definite length.
Answer: C.
View full solution →In ancient India, the shapes of altars used for household rituals were:
- ASquares and rectangles.
- ✓Squares and circles.
- CTriangles and rectangles.
- DTrapeziums and pyramids.
Answer: B.
View full solution →Which of the following needs a proof?
- AAxiom.
- BPostulate.
- CDefinition.
- ✓Theorem.
Answer: D.
View full solution →If A, B and C are three collinear points, name all the line segment determined by them.
How many lines can be drawn through two given point?
How many lines can be drawn through a given point?
At how many points can two lines at the most intersect?
Define the following terms:
Collinear points.
Collinear points.
Define the following terms:
Concurrent lines.
Concurrent lines.
Define the following terms:
Ray.
Ray.
Define the following terms:
Parallel lines.
Parallel lines.
Define the following terms:
Half line.
Half line.
From the given figure, name the following:
- Three lines.
- One rectilinear figure.
- Four concurrent points.
What is the difference between a theorem and an axiom?
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.
- $\text{AB}=\text{BC}\Rightarrow\frac{1}{2}\text{AB}=\frac{1}{2}\text{BC}\Rightarrow\text{AL}=\text{MC}.$
- $\text{BL}=\text{BM}\Rightarrow2\text{BL}=2\text{BM}\Rightarrow\text{AB}=\text{BC}.$
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