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SSC CGL Previous Year Questions: Geometry- 5 - SSC CGL MCQ


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30 Questions MCQ Test SSC CGL Mathematics Previous Year Paper (Topic-wise) - SSC CGL Previous Year Questions: Geometry- 5

SSC CGL Previous Year Questions: Geometry- 5 for SSC CGL 2024 is part of SSC CGL Mathematics Previous Year Paper (Topic-wise) preparation. The SSC CGL Previous Year Questions: Geometry- 5 questions and answers have been prepared according to the SSC CGL exam syllabus.The SSC CGL Previous Year Questions: Geometry- 5 MCQs are made for SSC CGL 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for SSC CGL Previous Year Questions: Geometry- 5 below.
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SSC CGL Previous Year Questions: Geometry- 5 - Question 1

AB is the chord of a circle with centre O and DOC is a line segment originating from a point D on the circle and intersecting, AB produced at C such that BC = OD. If ∠BCD = 20°, then ∠AOD =?   (SSC CGL 2nd Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 1


Here BC = OD = radius {given}
In ΔBOC,
BC = OB (radius).
∴ ∠BOC = ∠BCO = 20°
∠OBA = ∠BOC + ∠BCO = 20° + 20° = 40°
Again, In DAOB,
AO = BO = radius
∠OAB = ∠OBA = 40°
∴ ∠AOB = 180° – 40° – 40° = 100°
Again,
∠AOD + ∠AOB + ∠BOC = 180°
∠AOD + 100° + 20° = 180°
∠AOD = 180° – 120° = 60°

SSC CGL Previous Year Questions: Geometry- 5 - Question 2

ABC is a triangle. The bisectors of the internal angle ∠B and external angle ∠C intersect at D. If ∠BDC = 50°, then ∠A is   (SSC CGL 2nd Sit.  2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 2


From question ∠BDC = 50°
In ΔBDC, ∠DBC + ∠BDC + ∠BCD = 180°

∠B + ∠C = 40 × 2 = 80°
From ΔABC, ∠A + ∠B + ∠C = 180°
∠A + 80° = 180°
∠A = 180° – 80° = 100°

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SSC CGL Previous Year Questions: Geometry- 5 - Question 3

ABCD is a cyclic trapezium with AB || DC and AB = diameter of the circle. If ∠CAB = 30° then ∠ADC is   (SSC CGL 2nd Sit.  2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 3


AB is a diameter of the circle
∴ ∠ACB = 90° {Angle made by the diameter on the semicircle
∠BAC = 30° {given)
∴ ∠BAC = ∠ACD = 30°   {As AB || CD}.
∠BCD = 90° + 30° = 120°
As ABCD is cyclic quadrilateral
∴ ∠BAD + ∠BCD = 180°
∠BAD + 120° = 180°
∠BAD = 180° – 120° = 60°
∠BAD = ∠CAB + ∠CAD = 60°
30° + ∠CAD = 60°  ⇒ ∠CAD = 30°
Again, AB || CD, ∴ ∠BAD + ∠ADC = 180°
60° + ∠ADC = 180°
∴ ∠ADC = 180° – 60° = 120°.

SSC CGL Previous Year Questions: Geometry- 5 - Question 4

ABC is an isosceles triangle such that AB = AC and ∠B = 35°. AD is the median to the base BC. Then ∠BAD is:    (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 4

As, AB = AC
∴ ∠ABC =  ∠ACB = 35°

∠BAC = 180° – 35° – 35° = 110°
∠BAC = ∠BAD + ∠CAD = 2∠BAD
{Since AD is a median}
∴ ÐBAD = 55°

SSC CGL Previous Year Questions: Geometry- 5 - Question 5

AB and CD are two parallel chords of a circle such that AB = 10 cm and CD = 24 cm. If the chords are on the opposite sides of the centre and distance between them is 17 cm, then the radius of the circle is:   (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 5


AB = 10 cm, AE = 5 cm
OE = x
CD = 24 cm, DF = 12 cm
OF = 17 – x
OA = OD = radius
⇒ 52 + x2 = 122 + (17 – x)2
⇒ 25 + x2 = 144 + 289 – 34x + x2
⇒ 34x = 408

SSC CGL Previous Year Questions: Geometry- 5 - Question 6

P and Q are two points on a circle with centre at O. R is a point on the minor arc of the circle, between the points P and Q. The tangents to the circle at the points P and Q meet each other at the point S. If ∠PSQ = 20°, ∠PRQ =?   (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 6


In quadrilateral POQS, ∠S = 20°
∠OPS = ∠OQS = 90°, ∠POQ = ?.
{Since PS and QS are tangent to the circle}
∴ Sum of angles in a quadrilateral = 360°
∠OPS + ∠S + ∠OQS + ∠POQ = 360°
90° + 20° + 90° + ∠POQ = 360°
⇒ ∠POQ = 160°

{Angle made on perimeter by the same chord is half of the angle made at the centre}

Now, In cyclic quadrilateral PRQT,
∠PTQ + ∠PRS = 180°
80° + ∠PRQ = 180°  ⇒ ∠PRQ = 180° – 80° = 100°

SSC CGL Previous Year Questions: Geometry- 5 - Question 7

If ABCD be a rectangle and P, Q, R, S be the mid points of  respectively, then the area of the quadrilateral PQRS is equal to: (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 7

SSC CGL Previous Year Questions: Geometry- 5 - Question 8

A chord of length 30 cm is at a distance of 8 cm from the centre of a circle. The radius of the circle is:    (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 8


Here chord AB = 300 cm
AD = 15 cm
OD = 8 cm

SSC CGL Previous Year Questions: Geometry- 5 - Question 9

In a triangle ABC, AB = AC, ∠BAC = 40°. Then the external angle at B is:    (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 9


Since, AB = AC {given}
∠ABC = ∠ACB
∠BAC = 40°  {given}
∴ ∠ABC + ∠ACB = {180° – 40°} = 140°
∴ ∠ABC  = 70°
​​​​​​​∴ ∠ABD = 180° – 70° = 110°

SSC CGL Previous Year Questions: Geometry- 5 - Question 10

A chord AB of a circle C1 of radius (√3 + 1) cm touches a circle C2 which is concentric to C1. If the radius of C2 is (√3 - 1) cm, the length of AB is:    (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 10

Let A chord AB of circle C1, touches the concentric circle C2 at point ‘P’.

Here OA = radius of circle C1 = (√3 + 1)
OP = radius of circle C2 = (√3 - 1)
As AP is a tangent to the circle C2.
∴ ∠OPA = 90°
Now, from ΔOPA, (OA)2 = (OP)2 + (AP)2
(AP)2 = (OA)2 – (OP)2

SSC CGL Previous Year Questions: Geometry- 5 - Question 11

If ΔABC is similar to ΔDEF such that BC = 3 cm, EF = 4 cm and area of ΔABC = 54 cm2, then the area of ΔDEF is:    (SSC CGL 1st Sit. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 11

SSC CGL Previous Year Questions: Geometry- 5 - Question 12

The perpendiculars, drawn from the vertices to the opposite sides of a triangle, meet at the point whose name is    (SSC CHSL 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 12

Orthocenter is the point where all three altitudes of the triangle intersect. An altitude is a line which passes through a vertex of the triangle and is perpendicular to the opposite side.

Here in the triangle ABC, AD, BE and CF are three altitudes drawn from point A, B and C on the side BC, AC and AB respectively. All the three altitudes intersect each other at a common point ‘O’. That point ‘O’ is called ‘Orthocenter’ of the triangle ABC.

SSC CGL Previous Year Questions: Geometry- 5 - Question 13

If in ΔABC, ∠ABC = 5∠ACB and ∠BAC = 3 ∠ACB, then ∠ABC =    (SSC CHSL 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 13

∠A + ∠B + ∠C = 180°
3∠C + 5∠C + ∠C = 180°
9∠C = 180°
∠C = 20°
∠B = 100°

SSC CGL Previous Year Questions: Geometry- 5 - Question 14

360 sq. cm and 250 sq. cm are the areas of two similar triangles. If the length of one of the sides of the first triangle be 8 cm, then the length of the corresponding side of the second triangle is    (SSC CHSL 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 14

Let the length of the corresponding side of other triangle is x. Then

SSC CGL Previous Year Questions: Geometry- 5 - Question 15

A chord 12 cm long is drawn in a circle of diameter 20 cm. The distance of the chord from the centre is    (SSC CHSL 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 15

Given, AB = 12 cm; CD = 20 cm
OE = ?

Now, AE = EB = 6cm (The line drawn from centre of circle to the chord bisect the chord)
In ΔOAE, By Pythagoras theorem
(OA)2 = (OE)2 + (AE)2 ⇒ (10)2 = (OE)2 + (6)2
100 – 36 = (OE)2 ⇒ 64 = OE2 ⇒ OE = 8 cm

SSC CGL Previous Year Questions: Geometry- 5 - Question 16

From a point P, two tangents PA and PB are drawn to a circle with centre O. If OP is equal to diameter of the circle, then ∠APB is    (SSC CHSL 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 16


AP and PB are two tangents to the circle
∴ ∠OAP = ∠OBP = 90°
In ΔOAP, Let ∠OPA = θ.
OP = 2 × radius {given}
∴ OP = 2 × OA

∴ sinθ = sin 30° ⇒ θ = 30°
Again In ΔBOP, ∠OPA = ∠OPB = θ = 30° {By symmetry}
∴ ∠APB = 30° + 30° = 60°.

SSC CGL Previous Year Questions: Geometry- 5 - Question 17

In ΔABC. ∠A + ∠B = 145° and ∠C + 2∠B = 180°. State which one of the following relations is true? (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 17


∠A + ∠B = 145°
∠C + 180° – 145° = 35°
∠C + 2∠B = 180°
⇒ 2∠B = 180° – 35° = 145°
⇒ ∠B = 145/2 = 72.5 ° = ∠A
∠B > ∠C
∴ CA > AB

SSC CGL Previous Year Questions: Geometry- 5 - Question 18

In a triangle ABC, BC is produced to D so that CD = AC. If ∠BAD = 111° and ∠ACB = 80°, then the measure of ∠ABC is:   (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 18


∠ACB = 80°
∠ACD = 180° – 80° = 100°
∴ ∠CAD = ∠CDA
= 80/2 = 40°
∠BAC = 111° – 40°
 = 71°
∠ABC = 180° – 71° – 80° = 29°

SSC CGL Previous Year Questions: Geometry- 5 - Question 19

The areas of two similar triangles ABC and DEF are 20 cm2 and 45 cm2 respectively. If AB = 5 cm. then DE is equal to:   (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 19

SSC CGL Previous Year Questions: Geometry- 5 - Question 20

In the following figure. AB be diameter of a circle whose centre is O. If  ∠AOE = 150°. ∠DAO = 51° then the measure of ∠CBE is:    (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 20


∠AOE = 150°
∠DAO = 51°
∠EOB = 180° – 150° = 30°
OE = OB = radius
∴ ∠OEB = ∠OBE =  150/2 = 75°
∴ ∠CBE = 180° – 75° = 105°

SSC CGL Previous Year Questions: Geometry- 5 - Question 21

Triangle PQR circumscribes a circle with centre O and radius r cm such that ∠PQR = 90°. If PQ = 3 cm, QR= 4 cm, then the value of r is:    (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 21

PR2 = PQ2 + PR2 = 32 + 42 = 25
∴ PR = √25 = 5 cm

SSC CGL Previous Year Questions: Geometry- 5 - Question 22

If area of an equilateral triangle is a and height b, then value of  b2/a  is:   (SSC Sub. Ins. 2013)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 22

Let side of triangle = x

Putting x in equation (i)

SSC CGL Previous Year Questions: Geometry- 5 - Question 23

A wheel rotates 3.5 times in one second. What time (in seconds) does the wheel take to rotate 55 radian of angle?   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 23

Radian covered in one second 
Time required to covered 55 radian 

SSC CGL Previous Year Questions: Geometry- 5 - Question 24

A and B are centres of the two circles whose radii are 5 cm and 2 cm respectively. The direct common tangents to the circles meet AB extended at P. Then P divides AB.   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 24


Here RQ is the common tangent which touches circles with centre A and B at point R and Q respectively
∴ ∠ARQ = ∠BQR = 90°
On extending the line AB, tangent RQ meet the line AB at point P.
Now, In DPBQ and DPAR,
BQ || AR, ∠P = ∠P, ∠Q = ∠R  ⇒ ∠A = ∠B.
thus, DPBQ ~ DPAR {from AA theorem}

Hence, point P, divides line AB into 5 : 2 ratio externally.

SSC CGL Previous Year Questions: Geometry- 5 - Question 25

O is the centre of the circle passing through the points A, B and C such that ∠BAO = 30°, ∠BCO = 40° and ∠AOC = x°.
What is the value of x?   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 25


In ΔAOB
AO = BO (radii of circles)
∴ ∠ABO = ∠BAO = 30º In DBOC
BO = CO (radii of circles)
∴ ∠BCO = ∠OBC = 40º
∠ABC = ∠ABO + ∠OBC
∠ABC = 30° + 40° = 70°
2 × ∠ABC = ∠AOC ⇒ x° = 140

SSC CGL Previous Year Questions: Geometry- 5 - Question 26

Two circles intersect each other at P and Q. PA and PB are two diameters. Then ∠AQB is   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 26


Let O and O' be the centre of two intersecting circle, where point of intersection are P and Q and PA and PB are their diameter respectively.
∠AQP = 90° and ∠BQP = 90°
{∵ Angle in a semicircle is a right angle}
Adding both these angles,
∠AQP + ∠BQP = 180°
∴ ∠AQB = 180º

SSC CGL Previous Year Questions: Geometry- 5 - Question 27

The bisector of ∠A of ΔABC cuts BC at D and the circumcircle of the triangle at E. Then   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 27


In ΔABC, D is the mid-point of side BC, since, AD divide angle A.
∴ BD = DC
and ∠ABC = ∠AEC {angle in same sector of circle}
and ∠CAE = ∠CBE
from ΔABD and ΔACE

SSC CGL Previous Year Questions: Geometry- 5 - Question 28

Two circles with same radius r intersect each other and one passes through the centre of the other. Then the length of the common chord is    (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 28



SSC CGL Previous Year Questions: Geometry- 5 - Question 29

AB is a diameter of the circumcircle of ΔAPB; N is the foot of the perpendicular drawn from the point P on  AB. If AP = 8 cm and BP = 6 cm, then the length of BN is   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 29

Since AB is a diameter. Then ∠APB = 90° (angle in the semicircle)
ΔBPN ~ ΔAPB
So, BN = BP2 / AB

SSC CGL Previous Year Questions: Geometry- 5 - Question 30

If P, R, T are the area of a parallelogram, a rhombus and a triangle standing on the same base and between the same parallels lines which of the following is true?   (SSC CGL 2nd Sit. 2012)

Detailed Solution for SSC CGL Previous Year Questions: Geometry- 5 - Question 30

Parallelogram Area = l × b
Rhombus Area = l × b

Therefore R = P = 2T.

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