CBSE Class 10 Maths: Chapter 6 Triangles - Part 1: MCQ

Top 25 MCQs with Answers | Latest CBSE Pattern

1. MCQ 2. VSA 3. SA 4. LA 5. Assertion-Reason 6. Case Study 7. Concepts 8. One-Shot Revision

Welcome to Part 1 of our new 8-part series on Chapter 6, Triangles. This post contains the top 25 Multiple Choice Questions (MCQs) to help you master concepts like BPT, Similarity, and Area Ratios.

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Top 25 MCQs - Triangles

Question 1: BPT Application

CBSE PYQ 2023

In triangle ABC, DE || BC. If AD = 1.5 cm, DB = 3 cm, and AE = 1 cm, then EC is:

• (a) 2 cm
• (b) 1.5 cm
• (c) 3 cm
• (d) 4 cm

(a) 2 cm

Explanation: By Basic Proportionality Theorem (BPT), AD/DB = AE/EC.
1.5 / 3 = 1 / EC
1 / 2 = 1 / EC => EC = 2 cm.

Question 2: Similar Triangles Areas

CBSE PYQ 2024

If ΔABC ~ ΔPQR and Area(ΔABC)/Area(ΔPQR) = 9/16, then BC/QR is:

• (a) 81/256
• (b) 9/16
• (c) 3/4
• (d) 4/3

(c) 3/4

Explanation: Ratio of areas of similar triangles = Square of ratio of their corresponding sides.
Area(ABC)/Area(PQR) = (BC/QR)²
9/16 = (BC/QR)²
BC/QR = √(9/16) = 3/4.

Question 3: Similar Triangles Sides

CBSE PYQ 2022

If ΔABC ~ ΔDEF such that 2AB = DE and BC = 8 cm, then EF is:

• (a) 16 cm
• (b) 12 cm
• (c) 8 cm
• (d) 4 cm

(a) 16 cm

Explanation: Since triangles are similar, AB/DE = BC/EF.
Given 2AB = DE => AB/DE = 1/2.
1/2 = 8/EF => EF = 16 cm.

Question 4: Right Triangle Check

CBSE 2020

The lengths of the sides of a triangle are 7 cm, 24 cm, and 25 cm. Is this a right-angled triangle?

• (a) Yes
• (b) No
• (c) Can't say
• (d) Only if 25 is hypotenuse

(a) Yes

Explanation: Check Pythagoras theorem: 7² + 24² = 49 + 576 = 625.
25² = 625.
Since 7² + 24² = 25², it is a right-angled triangle.

Question 5: BPT Converse

CBSE PYQ 2023

In ΔABC, D and E are points on AB and AC such that AD/DB = AE/EC. Then:

• (a) DE || BC
• (b) DE ⊥ BC
• (c) DE = BC
• (d) None of these

(a) DE || BC

Explanation: This is the Converse of Basic Proportionality Theorem (BPT). If a line divides any two sides of a triangle in the same ratio, then the line is parallel to the third side.

Question 6: Corresponding Angles

CBSE PYQ 2025

If ΔABC ~ ΔPQR, ∠A = 50° and ∠B = 70°, then ∠R is:

• (a) 50°
• (b) 70°
• (c) 60°
• (d) 120°

(c) 60°

Explanation: In ΔABC, ∠C = 180 - (50+70) = 60°.
Since ΔABC ~ ΔPQR, corresponding angles are equal.
So, ∠R = ∠C = 60°.

Question 7: Congruency vs Similarity

CBSE 2019

Which of the following statements is false?

• (a) All congruent triangles are similar.
• (b) All similar triangles are congruent.
• (c) All equilateral triangles are similar.
• (d) All circles are similar.

(b) All similar triangles are congruent.

Explanation: Similarity implies same shape but not necessarily same size. Congruency implies both same shape and size. So, similar triangles are not always congruent.

Question 8: Area Ratio Median

The ratio of the areas of two similar triangles is equal to the square of the ratio of their:

• (a) Corresponding medians
• (b) Corresponding altitudes
• (c) Corresponding angle bisectors
• (d) All of these

(d) All of these

Explanation: The ratio of areas of similar triangles is equal to the square of the ratio of their corresponding sides, medians, altitudes, and angle bisectors.

Question 9: Isosceles Right Triangle

CBSE PYQ 2021

ABC is an isosceles triangle right-angled at C. Therefore:

• (a) AB² = 2AC²
• (b) AC² = 2AB²
• (c) BC² = 2AC²
• (d) AB² = 4AC²

(a) AB² = 2AC²

Explanation: In right ΔABC (at C), AC = BC (isosceles).
By Pythagoras theorem: AB² = AC² + BC².
AB² = AC² + AC² = 2AC².

Question 10: Ladder Problem

CBSE 2023

A ladder 10 m long reaches a window 8 m above the ground. The distance of the foot of the ladder from the base of the wall is:

• (a) 8 m
• (b) 2 m
• (c) 6 m
• (d) 4 m

(c) 6 m

Explanation: Let distance be x.
By Pythagoras theorem: 10² = 8² + x²
100 = 64 + x²
x² = 36 => x = 6 m.

Question 11: Equilateral Triangle Altitude

CBSE 2022

The altitude of an equilateral triangle of side 2a is:

• (a) a√2
• (b) a√3
• (c) a
• (d) 2a√3

(b) a√3

Explanation: In an equilateral triangle with side 2a, altitude h divides base into 'a'.
Using Pythagoras: (2a)² = h² + a²
4a² = h² + a² => h² = 3a² => h = a√3.

Question 12: Rhombus Diagonals

CBSE 2018

The diagonals of a rhombus are 16 cm and 12 cm. The length of the side of the rhombus is:

• (a) 8 cm
• (b) 9 cm
• (c) 10 cm
• (d) 20 cm

(c) 10 cm

Explanation: Diagonals of a rhombus bisect each other at 90°.
Half diagonals = 8 cm and 6 cm.
Side² = 8² + 6² = 64 + 36 = 100.
Side = √100 = 10 cm.

Question 13: BPT Application 2

CBSE PYQ 2024

In ΔABC, DE || BC such that AD/DB = 3/5. If AC = 4.8 cm, then AE is:

• (a) 1.6 cm
• (b) 1.8 cm
• (c) 2.4 cm
• (d) 3.2 cm

(b) 1.8 cm

Explanation: By BPT: AD/DB = AE/EC = 3/5.
Let AE = 3x, EC = 5x. AC = 8x = 4.8.
x = 0.6.
AE = 3x = 3(0.6) = 1.8 cm.

Question 14: Similarity Ratio

If ΔABC ~ ΔPQR with AB/PQ = 1/3, then Area(ΔABC)/Area(ΔPQR) is:

• (a) 1/3
• (b) 1/9
• (c) 3
• (d) 9

(b) 1/9

Explanation: Area ratio = (Side ratio)² = (1/3)² = 1/9.

Question 15: Midpoint Theorem

In ΔABC, D and E are midpoints of AB and AC respectively. If DE = 4 cm, then BC is:

• (a) 2 cm
• (b) 4 cm
• (c) 6 cm
• (d) 8 cm

(d) 8 cm

Explanation: By Midpoint Theorem, DE = (1/2)BC.
4 = (1/2)BC => BC = 8 cm.

Question 16: Similar Triangles

CBSE 2020

ΔABC ~ ΔDEF. If AB=4 cm, BC=3.5 cm, CA=2.5 cm and DF=7.5 cm, the perimeter of ΔDEF is:

• (a) 10 cm
• (b) 30 cm
• (c) 15 cm
• (d) 20 cm

(b) 30 cm

Explanation: Perimeter(ABC) = 4+3.5+2.5 = 10 cm.
Since similar, Ratio of Perimeters = Ratio of Sides.
CA/DF = 2.5/7.5 = 1/3.
Perimeter(ABC)/Perimeter(DEF) = 1/3
10 / P(DEF) = 1/3 => P(DEF) = 30 cm.

Question 17: Trapezium Diagonals

In trapezium ABCD, AB || DC. Diagonals intersect at O. If AO/OC = 1/2 and AB = 5 cm, then DC is:

• (a) 2.5 cm
• (b) 5 cm
• (c) 10 cm
• (d) 15 cm

(c) 10 cm

Explanation: ΔAOB ~ ΔCOD.
AO/OC = AB/DC
1/2 = 5/DC => DC = 10 cm.

Question 18: Pythagorean Triplet

Which of the following sets of sides represents a right-angled triangle?

• (a) 5, 8, 11
• (b) 6, 8, 10
• (c) 3, 4, 6
• (d) 2, 3, 4

(b) 6, 8, 10

Explanation: 6² + 8² = 36 + 64 = 100 = 10². This satisfies Pythagoras theorem.

Question 19: Isosceles Angle

CBSE PYQ 2025

In ΔABC, AB = 6√3 cm, AC = 12 cm and BC = 6 cm. The angle B is:

• (a) 120°
• (b) 60°
• (c) 90°
• (d) 45°

(c) 90°

Explanation: AB² = 108, BC² = 36, AC² = 144.
AB² + BC² = 108 + 36 = 144 = AC².
It satisfies Pythagoras theorem, so angle opposite to longest side (AC) is 90°. Angle B = 90°.

Question 20: Shadow Problem

CBSE 2021

A vertical pole of length 6 m casts a shadow 4 m long on the ground. At the same time, a tower casts a shadow 28 m long. The height of the tower is:

• (a) 28 m
• (b) 40 m
• (c) 42 m
• (d) 56 m

(c) 42 m

Explanation: Triangles formed by pole/shadow and tower/shadow are similar.
Height/Shadow = Height/Shadow
6/4 = h/28
h = (6 × 28) / 4 = 6 × 7 = 42 m.

Question 21: Congruent & Similar

Two polygons of the same number of sides are similar if their corresponding angles are equal and their corresponding sides are:

• (a) Equal
• (b) Proportional
• (c) Parallel
• (d) Perpendicular

(b) Proportional

Explanation: This is the definition of similarity for polygons.

Question 22: Area Ratio

CBSE PYQ 2022

If ΔABC ~ ΔQRP, Area(ABC)/Area(QRP) = 9/4, AB = 18 cm and BC = 15 cm, then PR is:

• (a) 10 cm
• (b) 12 cm
• (c) 8 cm
• (d) 20/3 cm

(a) 10 cm

Explanation: Ratio of Areas = (Ratio of sides)².
9/4 = (BC/RP)²
3/2 = 15/PR
3PR = 30 => PR = 10 cm.
(Note order: ABC ~ QRP, so BC corresponds to RP).

Question 23: Equilateral Area

ΔABC and ΔBDE are two equilateral triangles such that D is the midpoint of BC. Ratio of areas of ΔABC and ΔBDE is:

• (a) 2:1
• (b) 1:2
• (c) 4:1
• (d) 1:4

(c) 4:1

Explanation: Since D is midpoint, BD = BC/2.
Since both are equilateral, they are similar.
Area(ABC)/Area(BDE) = (BC/BD)² = (BC / (BC/2))² = (2)² = 4/1.

Question 24: Corresponding Altitudes

CBSE 2023

If two similar triangles have a scale factor of a:b, then the ratio of their corresponding altitudes is:

• (a) a² : b²
• (b) a : b
• (c) b : a
• (d) √a : √b

(b) a : b

Explanation: For similar triangles, the ratio of corresponding linear parts (sides, altitudes, medians, perimeters) is the same as the scale factor.

Question 25: Square Diagonals

If the diagonal of a square is 10√2 cm, then its perimeter is:

• (a) 10 cm
• (b) 20 cm
• (c) 40 cm
• (d) 80 cm

(c) 40 cm

Explanation: Diagonal of square = Side × √2.
10√2 = Side × √2 => Side = 10 cm.
Perimeter = 4 × Side = 4 × 10 = 40 cm.