RD Sharma Class 10 Solutions Chapter 4 MCQs (Updated for 2024)

RD Sharma Class 10 Solutions Chapter 4 MCQs

RD Sharma Class 10 Solutions Chapter 4 MCQs: Students can download the RD Sharma Class 10 Solutions Chapter 4 MCQs PDF to learn how to solve the questions in this exercise correctly. Students wishing to brush up on their concepts can check the RD Sharma Class 10 Solutions.

Access RD Sharma Class 10 Solutions Chapter 4 MCQs PDF

Mark the correct alternative in each of the following.
Question 1.
The sides of two similar triangles are in the ratio 4: 9. Areas of these triangles are in the ratio
(a) 2 : 3
(b) 4: 9
(c) 81: 16
(d) 16: 81
Solution:
(d) Triangles are similar and the ratio of their sides is 4: 9
The ratio of the areas of two similar triangles are proportional to the square oT their corresponding sides
Ratio in their areas = (4)² : (9)² = 16 : 81

RD Sharma Class 10 Solutions Chapter 4 MCQs Question 2.
The areas of two similar triangles are respectively 9 cm² and 16 cm². The ratio of their corresponding sides is
(a) 3: 4
(b) 4 : 3
(c) 2 : 3
(d) 4: 5
Solution:
(a) Ratio in the areas of two similar triangles = 9 cm² : 16 cm² = 9 : 16
The areas of similar triangles are proportional to the squares of their corresponding sides
Ratio in their corresponding sides = √916 = 34 = 3 : 4

Question 3.
The areas of two similar triangles ∆ABC and ∆DEF are 144 cm² and 81 cm² respectively. If the longest side of larger ∆ABC be 36 cm, then. The longest side of the smaller triangle ∆DEF is :
(a) 20 cm
(b) 26 cm
(c) 27 cm
(d) 30 cm
Solution:
(c) Area of the larger triangle ABC = 144 cm²
and area of smaller ∆DEF = 81 cm²
Longest side of larger triangle = 36 cm
Let the longest side of smaller triangle = x cm
The ratio of the areas of two similar triangles is proportional to the squares of their corresponding sides
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 1

Question 4.
∆ABC and ∆BDE are two equilateral triangles such that D is the mid-point of BC. The ratio of the areas of triangles ABC and BDE is :
(a) 2: 1
(b) 1: 2
(c) 4: 1
(d) 1: 4
Solution:
(c) ∆ABC and ∆BDE are equilateral triangles and D is the mid-point of PC
∆ABC and ∆BDE are both equilateral triangles
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 2

Question 5.
If ∆ABC and ∆DEF are similar such that 2AB = DE and BC = 8 cm, then EF =
(a) 16 cm
(b) 12 cm
(c) 8 cm
(d) 4 cm
Solution:
(a)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 3

Question 6.
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 4
(a) 2 : 5
(b) 4 : 25
(c) 4 : 15
(d) 8 : 125
Solution:
(b)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 5

Question 7.
XY is drawn parallel to the base BC of a ∆ABC cutting AB at X and AC at Y. If AB = 4 BX and YC = 2 cm, then AY =
(a) 2 cm
(b) 4 cm
(c) 6 cm
(d) 8 cm
Solution:
(c) In ∆ABC, XY || BC
AB = 4BX, YC = 2 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 6

Question 8.
Two poles of height 6 m and 11 m stand vertically upright on a plane ground. If the distance between their foot is 12 m, the distance between their tops is
(a) 12 m
(b) 14 m
(c) 13 m
(d) 11 m
Solution:
(c) Let length of pole AB = 6 m
and of pole CD = 11 m
and distance between their foot = 12 m
i.e., BD = 12 m
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 7

Question 9.
In ∆ABC, D and E are points on side AB and AC respectively such that DE || BC and AD : DB = 3 : 1. If EA = 3.3 cm, then AC =
(a) 1.1 cm
(b) 4 cm
(c) 4.4 cm
(d) 5.5 cm
Solution:
(c) In ∆ABC, DE || BC
AD : DB = 3 : 1, EA = 3.3 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 8

Question 10.
In triangles ABC and DEF, ∠A = ∠E = 40°, AB : ED = AC : EF and ∠F = 65°, then ∠B =
(a) 35°
(b) 65°
(c) 75°
(d) 85°
Solution:
(c) In ∆ABC and ∆DEF,
∠A = ∠E = 40°
AB : ED = AC : EF, ∠F = 65°
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 9
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 10

Question 11.
If ABC and DEF are similar triangles such that ∠A = 47° and ∠E = 83°, then ∠C =
(a) 50°
(b) 60°
(c) 70°
(d) 80°
Solution:
(a) ∆ABC ~ ∆DEF
∠A = 47°, ∠E = 83°
∆ABC and ∆DEF are similar
∠A = ∠D, ∠B = ∠E and ∠C = ∠F
∠A = 47°
∠B = ∠E = 83°
But ∠A + ∠B + ∠C = 180° (Sum of angles of a triangle)
47° + 83° + ∠C = 180°
=> 130° + ∠C = 180°
=> ∠C = 180° – 130°
=> ∠C = 50°

Question 12.
If D, E, F are the mid-points of sides BC, CA, and AB respectively of ∆ABC, then the ratio of the areas of triangles DEF and ABC is
(a) 1: 4
(b) 1: 2
(c) 2 : 3
(d) 4: 5
Solution:
(a) D, E, and F are the midpoints of the sides. BC, CA, and AB respectively of ∆ABC
DE, EF, and FD are joined
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 11

Question 13.
In an equilateral triangle ABC, if AD ⊥ BC, then
(a) 2AB² = 3AD²
(b) 4AB² = 3AD²
(c) 3AB² = 4AD²
(d) 3AB² = 2AD²
Solution:
(c) In equilateral ∆ABC,
AD ⊥ BC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 12
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 13

Question 14.
If ∆ABC is an equilateral triangle such that AD ⊥ BC, then AD² =
(a) 32 DC²
(b) 2 DC²
(c) 3 CD²
(d) 4 DC²
Solution:
(c) In equilateral ∆ABC, AD ⊥ BC
AD bisects BC at D
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 14

Question 15.
In a ∆ABC, AD is the bisector of ∠BAC. If AB = 6 cm, AC = 5 cm and BD = 3 cm, then DC =
(a) 11.3 cm
(b) 2.5 cm
(c) 3.5 cm
(d) None of these
Solution:
(b) In ∆ABC, AD is the bisector of ∠BAC
AB = 6 cm, AC = 5 cm, BD = 3 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 15

Question 16.
In a ∆ABC, AD is the bisector of ∠BAC. If AB = 8 cm, BD = 6 cm and DC = 3 cm. Find AC
(a) 4 cm
(b) 6 cm
(c) 3 cm
(d) 8 cm
Solution:
(a) In ∆ABC, AD is the bisector of ∠BAC
AB = 8 cm, BD = 6 cm and DC = 3 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 16
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 17

Question 17.
ABCD is a trapezium such that BC || AD and AB = 4 cm. If the diagonals AC and BD intersect at O such that AOOC = DOOB = 12 , then BC =
(a) 7 cm
(b) 8 cm
(c) 9 cm
(d) 6 cm
Solution:
(b) In trapezium ABCD, BC || AD
AD = 4 cm, diagonals AC and BD intersect
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 18
=> x = 8
BC = 8 cm

Question 18.
If ABC is a right triangle right-angled at B and M, N are the mid-points of AB and BC respectively, then 4 (AN² + CM²) =
(a) 4 AC²
(b) 5 AC²
(c) 54 AC²
(d) 6 AC²
Solution:
(b) In right ∆ABC, ∠B = 90°
M and N are the midpoints of AB and BC respectively
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 19
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 20
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 21

Question 19.
If in ∆ABC and ∆DEF, ABDE = BCFD, then ∆ABC ~ ∆DEF when
(a) ∠A = ∠F
(b) ∠A = ∠D
(c) ∠B = ∠D
(d) ∠B = ∠E
Solution:
(c)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 22

Question 20.
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 23
Solution:
(a)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 24
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 25

Question 21.
∆ABC ~ ∆DEF, ar (∆ABC) = 9 cm², ar (∆DEF) = 16 cm². If BC = 2.1 cm, then the measure of EF is
(a) 2.8 cm
(b) 4.2 cm
(c) 2.5 cm
(d) 4.1 cm
Solution:
(a) ∆ABC ~ ∆DEF
ar (∆ABC) = 9 cm², ar (∆DEF) =16 cm²,
BC = 2.1 cm
∆ABC ~ ∆DEF
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 26

Question 22.
The length of the hypotenuse of an isosceles right triangle whose one side is 4√2 cm is
(a) 12 cm
(b) 8 cm
(c) 8√2 cm
(d) 12√2 cm
Solution:
(b) In isosceles right ∆ABC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 27
∠B = 90°, AB = BC = 4√2
AC = √2
equal side = √2 x 4√2 = 8 cm

Question 23.
A man goes 24 m due west and then 7 m due north. How far is he from the starting point?
(a) 31 m
(b) 17 m
(c) 25 m
(d) 26 m
Solution:
(c) In the figure, O is starting point OA = 24 m and AB = 7 m
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 28
By Pythagoras Theorem
OB² = OA² + AB²
= (24)² + (7)² = 576 + 49 = 625 = (25)²
OB = 25 m

Question 24.
∆ABC ~ ∆DEF. If BC = 3 cm, EF = 4 cm and ar (∆ABC) = 54 cm², then ar (∆DEF)
(a) 108 cm²
(b) 96 cm²
(c) 48 cm²
(d) 100 cm²
Solution:
(b)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 29
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 30

Question 25.
∆ABC ~ ∆PQR such that ar (∆ABC) = 4 ar (∆PQR). If BC = 12 cm, then QR =
(a) 9 cm
(b) 10 cm
(c) 6 cm
(d) 8 cm
Solution:
(c) ∆ABC ~ ∆PQR
ar (∆ABC) = 4ar (∆PQR), BC = 12 cm
∆ABC ~ ∆PQR
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 31

Question 26.
The areas of two similar triangles are 121 cm² and 64 cm² respectively. If the median of the first triangle is 12.1 cm, then the corresponding median of the other triangles is
(a) 11 cm
(b) 8.8 cm
(c) 11.1 cm
(d) 8.1 cm
Solution:
(b) Areas of two similar triangles are 121 cm² and 64 cm²
Median of first triangle = 12.1 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 32
In ∆ABC, area ∆DEF
AD and PS are their corresponding median
∆ABC ~ ∆DEF
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 33

Question 27.
In an equilateral triangle ABC if AD ⊥ BC, then AD² =
(a) CD²
(b) 2 CD²
(c) 3 CD²
(d) 4 CD²
Solution:
(c) In equilateral ∆ABC, AD ⊥ BC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 34

Question 28.
In an equilateral triangle ABC if AD ⊥ BC, then
(a) 5 AB² = 4 AD²
(b) 3 AB² = 4 AD²
(c) 4 AB² = 3 AD²
(d) 2 AB² = 3 AD²
Solution:
(b) In equilateral ∆ABC, AD ⊥ BC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 35
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 36

Question 29.
In an isosceles triangle ABC if AC = BC and AB² = 2 AC², then ∠C =
(a) 30°
(b) 45°
(c) 90°
(d) 60°
Solution:
(c) In isosceles ∆ABC, AC = BC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 37
and AB2 = 2 AC² = AC² + AC²
= AC² + BC² ( AC = BC)
By converse of Pythagoras Theorem,
∠C = 90°

Question 30.
∆ABC is an isosceles triangle in which ∠C = 90°. If AC = 6 cm, then AB =
(a) 6√2 cm
(b) 6 cm
(c) 2√6 cm
(d) 4√2 cm
Solution:
(a) ∆ABC is an isosceles with ∠C= 90°
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 38
AC = BC
AC = 6 cm
AB² = AC² + BC² (Pythagoras Theorem)
(6)² + (6)² = 36 + 36 = 72 (AC = BC)
AB = √72 = √(36 x 2) = 6√2 cm

Question 31.
If in two triangles ABC and DEF, ∠A = ∠E, ∠B = ∠F, then which of the following is not true?
(a) BCDF = ACDE
(b) ABDE = BCDF
(c) ABEF = ACDE
(d) BCDF = ABEF
Solution:
(b) In two triangles ABC and DEF
∠A = ∠E, ∠B = ∠F
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 39

Question 32.
In the figure, the measures of ∠D and ∠F are respectively
(a) 50°, 40°
(b) 20°, 30°
(c) 40°, 50°
(d) 30°, 20°
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 40
Solution:
(b) In ∆ABC
∠A = 180° – (∠B + ∠C)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 41

Question 33.
In the figure, the value of x for which DE || AB is
(a) 4
(b) 1
(c) 3
(d) 2
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 42
Solution:
(b)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 43

Question 34.
In the figure, if ∠ADE = ∠ABC, then CE =
(a) 2
(b) 5
(c) 92
(c) 3
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 44
Solution:
(c) In the figure ∠ADE = ∠ABC
AB = 2, DB = 3, AE = 3
Let EC = x
∠ADE = ∠ABC
But these are corresponding angles DE || BC
∆ADE ~ ∆ABC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 45

Question 35.
In the figure, RS || DB || PQ. If CP = PD = 11 cm and DR = RA = 3 cm. Then the values of x and y are respectively
(a) 12, 10
(b) 14, 6
(c) 10, 7
(d) 16, 8
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 46
Solution:
(d) In the figure RS || DB || PQ
CP = PD = 11 cm DR = RA = 3 cm
In ∆ABD
RS || BD and AR = RD
RS = 12 BD
y = 12 x or x = 2y
Only 16, 8 is possible

Question 36.
In the figure, if PB || CF and DP || EF, then ADDE =
(a) 34
(b) 13
(c) 14
(d) 23
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 47
Solution:
(b) In the figure, PB || CF, DP || EF
AB = 2 cm, AC = 8 cm
BC = AC – AB = 8 – 2 = 6 cm
In ∆ACF, BP || CF
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 48
ADDE = 13

Question 37.
A chord of a circle of radius 10 cm subtends a right angle at the center. The length of the chord (in cm) is
(a) 5√2
(b) 10√2
(c) 5√2
(d) 10√3 [ICSE 2014]
Solution:
(b)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 49
AB² = OA² + OB² (Pythagoras Theorem)
AB² = 10² + 10²
AB² = 2 (10)²
AB = 10√2

Question 38.
A vertical stick 20 m long casts a shadow 10 m long on the ground. At the same time, a tower casts a shadow 50 m long on the ground. The height of the tower is
(a) 100 m
(b) 120 m
(c) 25 m
(d) 200 m
Solution:
(a) Height of a stick = 20 m
and length of its shadow = 10 m
At the same time
Let height of tower = x m
and its shadow = 50 m
20 : x = 10 : 50
x x 10 = 20 x 50
=> x = 20×5010 = 100
Height of tower = 100 m

Question 39.
Two isosceles triangles have equal angles and their areas are in the ratio 16: 25. The ratio of their corresponding heights is :
(a) 4: 5
(b) 5: 4
(c) 3: 2
(d) 5: 7
Solution:
(a) The corresponding angles of two isosceles triangles are equal These are similar Ratio in their areas = 16: 25
The ratio of areas of similar triangles is in proportion to the squares of their corresponding altitudes (heights)
Ratio in their altitudes = √1625=45
= i.e., 4 : 5

Question 40.
∆ABC is such that AB = 3 cm, BC = 2 cm and CA = 2.5 cm. If ∆DEF ~ ∆ABC and EF = 4 cm, then perimeter of ∆DEF is
(a) 7.5 cm
(b) 15 cm
(c) 22.5 cm
(d) 30 cm
Solution:
(b) ∆DEF ~ ∆ABC
AB = 3 cm, BC = 2 cm, CA = 2.5 cm, EF = 4 cm
∆s are similar
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 50

Question 41.
In ∆ABC, a line XY parallel to BC cuts AB at X and AC at Y. If BY bisects ∠XYC, then :
(a) BC = CY
(b) BC = BY
(c) BC ≠ CY
(d) BC ≠ BY
Solution:
(a) In ∆ABC, XY || BC
BY is the bisector of ∠XYC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 51
∠XYB = ∠CXB ….(i)
XY || BC
∠XYB = ∠XBC (Alternate angles) ……….(ii)
From (i) and (ii)
∠CYB = ∠YBC
BC = CY

Question 42.
In a ∆ABC, ∠A = 90°, AB = 5 cm and AC = 12 cm. If AD ⊥ BC, then AD =
(a) 132 cm
(b) 6013 cm
(c) 1360 cm
(d) 2√1513 cm
Solution:
(b) In ∆ABC,
∠A = 90°, AB = 5 cm, AC = 12 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 52
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 53

Question 43.
In a ∆ABC, perpendicular AD from A on BC meets BC at D. If BD = 8 cm, DC = 2 cm and AD = 4 cm, then
(a) ∆ABC is isosceles
(b) ∆ABC is equilateral
(c) AC = 2 AB
(d) ∆ABC is right-angled at A
Solution:
(d) In ∆ABC, AD ⊥ BC
BD = 8 cm, DC = 2 cm, AD = 4 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 54
In right ∆ACD,
AC² = AD² + CD² (Pythagoras Theorem)
= (4)² + (2)² = 16 + 4 = 20
and in right ∆ABD,
AB² = AD² + DB²
= (4)² + (8)2 = 16 + 64 = 80
and BC² = (BD + DC)² = (8 + 2 )² = (10)² = 100
AB² + AC² = 80 + 20 = 100 = BC²
∆ABC is a right triangle whose ∠A = 90°

Question 44.
In a ∆ABC, point D is on side AB and point G is on side AC, such that BCED is a trapezium. If DE : BC = 3:5, then Area (∆ADE) : Area (BCED) =
(a) 3 : 4
(b) 9 : 16
(c) 3 : 5
(d) 9 : 25
Solution:
(b)
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 55
In ∆ABC, D and E are points on the side AB and AC respectively, such that BCED is a trapezium DE: BC = 3: 5
In ∆ABC, DE || BC
∆ADE ~ ∆ABC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 56
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 57

Question 45.
If ABC is an isosceles triangle and D is a point on BC such that AD ⊥ BC, then
(a) AB² – AD² = BD.DC
(b) AB² – AD² = BD² – DC²
(c) AB² + AD² = BD.DC
(d) AB² + AD² = BD² – DC²
Solution:
(a) If ∆ABC, AB = AC
D is a point on BC such that
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 58
AD ⊥ BC
AD bisects BC at D
In right ∆ABD,
AB² = AD² + BD²
AB² – AD² = BD² = BD x BD = BD x DC (BD = DC)

Question 46.
∆ABC is a right triangle right-angled at A and AD ⊥ BC. Then , BDDC =
(a) (ABAC)2
(b) ABAC
(c) (ABAD)2
(d) ABAD
Solution:
(a) In right angled ∆ABC, ∠A = 90°
AD ⊥ BC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 59

Question 47.
If E is a point on side CA of an equilateral triangle ABC such that BE ⊥ CA, then AB² + BC² + CA² =
(a) 2 BE²
(b) 3 BE²
(c) 4 BE²
(d) 6 BE²
Solution:
(c) ∆ABC is an equilateral triangle
BE ⊥ AC
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 60
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 61
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 62

Question 48.
In a right triangle ABC right-angled at B, if P and Q are points on the sides AB and AC respectively, then
(a) AQ² + CP² = 2 (AC² + PQ²)
(b) 2 (AQ² + CP²) = AC² + PQ²
(c) AQ² + CP² = AC² + PQ²
(d) AQ + CP = 12 (AC + PQ)
Solution:
(c) In right ∆ABC, ∠B = 90°
P and Q are points on AB and BC respectively
AQ, CP, and PQ are joined
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 63
In right ∆ABC,
AC² = AB² + BC² ….(i)
(Pythagoras Theorem)
Similarly in right ∆PBQ,
PQ² = PB² + BQ² ………(ii)
In right ∆ABQ
AQ² = AB² + BQ² ….(iii)
and in right ∆CPB,
CP² = PB² + BC² ….(iv)
Adding (iii) and (iv)
AQ² + CP² = AB² + BQ² + PB² + BC²
= AB² + BC² + BQ² + PB²
= AC² + PQ2 {From (i) and (ii)}

Question 49.
If ∆ABC ~ ∆DEF such that DE = 3 cm, EF = 2 cm, DF = 2.5 cm, BC = 4 cm, then perimeter of ∆ABC is
(a) 18 cm
(b) 20 cm
(c) 12 cm
(d) 15 cm
Solution:
(d) ∆ABC ~ ∆DEF
DE = 3 cm, EF = 2 cm, DF = 2.5 cm, BC = 4 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 64
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 65

Question 50.
If ∆ABC ~ ∆DEF such that AB = 9.1 cm and DE = 6.5 cm. If the perimeter of ∆DEF is 25 cm, then the perimeter of ∆ABC is
(a) 36 cm
(b) 30 cm
(c) 34 cm
(d) 35 cm
Solution:
(d) ∆ABC ~ ∆DEF
AB = 9.1 cm and DE = 6.5 cm
Perimeter of ∆DEF = 25 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 66

Question 51.
In an isosceles triangle ABC, if AB = AC = 25 cm and BC = 14 cm, then the measure of altitude from A on BC is
(a) 20 cm
(b) 22 cm
(c) 18 cm
(d) 24 cm
Solution:
(d) ∆ABC is an isosceles triangle in which AB = AC = 25 cm, BC = 14 cm
RD Sharma Class 10 Solutions Chapter 7 Triangles MCQS 67
From A, draw AD ⊥ BC
D is mid-point of BC
BD = 12 BC = 12 x 14 = 7 cm
Now in right ∆ABD
AD² = AB² – BD²
= (25)² – (7)² = 625 – 49 = 576 = (24)²
AD = 24 cm

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