SSC CGL Exam  >  SSC CGL Tests  >  MCQ: Circles - 1 - SSC CGL MCQ

MCQ: Circles - 1 - SSC CGL MCQ


Test Description

15 Questions MCQ Test - MCQ: Circles - 1

MCQ: Circles - 1 for SSC CGL 2024 is part of SSC CGL preparation. The MCQ: Circles - 1 questions and answers have been prepared according to the SSC CGL exam syllabus.The MCQ: Circles - 1 MCQs are made for SSC CGL 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for MCQ: Circles - 1 below.
Solutions of MCQ: Circles - 1 questions in English are available as part of our course for SSC CGL & MCQ: Circles - 1 solutions in Hindi for SSC CGL course. Download more important topics, notes, lectures and mock test series for SSC CGL Exam by signing up for free. Attempt MCQ: Circles - 1 | 15 questions in 15 minutes | Mock test for SSC CGL preparation | Free important questions MCQ to study for SSC CGL Exam | Download free PDF with solutions
MCQ: Circles - 1 - Question 1

Directions: Kindly study the following questions carefully and choose the right answer:

The diameter of a circle with centre at C is 50 cm. CP is a radial segment of thecircle. AB is a chord perpendicular to CP and passes through P. CP producedintersects the circle at D. If DP = 18 cm, then what is the length of AB?

Detailed Solution for MCQ: Circles - 1 - Question 1

In ΔACP
CP = CD – PD = 25 – 18 = 7

Similarly, PB = 24 cm
∴ AB = AP + PB
= 24 + 24
= 48 cm.
Hence, option D is correct.

MCQ: Circles - 1 - Question 2

Directions: Kindly study the following questions carefully and choose the right answer:

Two equal circles of radius 4 cm intersect each other such that each passes through the centre of the other. The length of the common chord is :

Detailed Solution for MCQ: Circles - 1 - Question 2

According to question , we draw a figure of two equal circles of radius 4 cm intersect each other such that each passes through the centre of the other ,

OC = 2cm
OA = 4cm
∴ AC = √OA² - OC²
∴ AC = √4² - 2² = √16 - 4
AC = √12 = 2√3
∴ AB = 4√3cm

1 Crore+ students have signed up on EduRev. Have you? Download the App
MCQ: Circles - 1 - Question 3

Directions: Kindly study the following question carefully and choose the right answer:

Two parallel chords are drawn in a circle of diameter 30 cm. The length of one chord is 24 cm and the distance between the two chords is 21 cm. The length of the other chord is

Detailed Solution for MCQ: Circles - 1 - Question 3

Given, one chord AB = 24 cm
Then, AE = EB = 12 cm
Diameter = 30 cm ⇒ radius, AO = OC = 15 cm
From ΔAOE, By pythagoras theorem

Distance between two chords, EF = 21 cm (given)
∴ OF = EF – OE = 21 – 9 = 12 cm
From ΔCOF, By pythagoras theorem

Hence, option B is correct.

MCQ: Circles - 1 - Question 4

Directions: Kindly study the following question carefully and choose the right answer:

A circle of radius 10 cm has an equilateral triangle inscrisbed in it. the length of the perpendicular drawn from the centre to any side of the triangle is

Detailed Solution for MCQ: Circles - 1 - Question 4

So,
length of perpendicular drawn from center
= 15 – 10 = 5 cm.
Hence, option D is correct.

MCQ: Circles - 1 - Question 5

Directions: Kindly study the following question carefully and choose the right answer:

The largest chord of a circle is known to be 10.1 cm. The radius of this circle must be :

Detailed Solution for MCQ: Circles - 1 - Question 5

The largest chord of a circle is its diameter. So,

Hence, option B is correct.

MCQ: Circles - 1 - Question 6

Directions: Kindly study the following question carefully and choose the right answer:

If two equal circles whose centres are O and O', intersect each other at the point A and B, OO' = 12 cm and AB = 16 cm, then the radius of the circle is

Detailed Solution for MCQ: Circles - 1 - Question 6

Given, AB = 16 cm and OO' = 12 cm
∴ AC = CB = 8 cm and OC = CO' = 6 cm
From ΔAOC, By pythagoras theorem

Hence, option A is correct.

MCQ: Circles - 1 - Question 7

Directions: Kindly study the following question carefully and choose the right answer:

In a ΔABC, AB = BC = CA. The ratio of the radius of the circumcircle to that of the incircle is

Detailed Solution for MCQ: Circles - 1 - Question 7

In ΔABC,
AB = BC = AC
Hence, ΔABC is equilateral triangle.
Let r be the radius of incircle and R be the radius of circumcircle.

= 2 : 1.
Hence, option A is correct.

MCQ: Circles - 1 - Question 8

Directions: Kindly study the following question carefully and choose the right answer:

The length of the chord of a circle is 8 cm and perpendicular distance between centre and the chord is 3 cm. Then the radius of the circle is equal to :

Detailed Solution for MCQ: Circles - 1 - Question 8

Chord, AB = 8 cm
Then, AC = CB = 4 cm
Perpendicular distance between centre and chord,
OC = 3 cm

Hence, option B is correct.

MCQ: Circles - 1 - Question 9

Directions: Kindly study the following question carefully and choose the right answer:

Chords AB and CD of a circle intersect externally at P. If AB = 6 cm, CD = 3 cm and PD = 5 cm, then the length of PB is

Detailed Solution for MCQ: Circles - 1 - Question 9

Given, PD = 5 cm Then, PC = PD – CD = 5 – 3 = 2 cm
Similarly, PA = (PB – 6) cm
Note : If two chords AB and CD of a circle intersect inside or outside the circle when produced at a point P, then
PA x PB = PC x PD ⇒ (PB – 6) x PB = 2 x 5 ⇒ PB2 – 6PB – 10 = 0
By Sridharacharya formula,

Hence, option B is correct.

MCQ: Circles - 1 - Question 10

Directions: Kindly study the following question carefully and choose the right answer:

Consider the following statements
I. The tangent of a circle is a line that meets the circle in one and only one point.
II. The tangent of a circle at the end point of the diameter is perpendicular to the diameter.
Which of the above statements is/are correct?

Detailed Solution for MCQ: Circles - 1 - Question 10

By definition of tangent,
A tangent to a circle is straight line that touches the circle at a single point. Also, tangent at the
end points of a diameter of a circle is perpendicular to the diameter.
So, both statements are correct.


Hence, option C is correct.

MCQ: Circles - 1 - Question 11

Directions: Kindly study the following question carefully and choose the right answer:

The length of a chord of a circle is equal to the radius of the circle. The angle which this chord subtends in the major segment of the circle is equal to

Detailed Solution for MCQ: Circles - 1 - Question 11

AO = OB = AB
⇒ ∠AOB = 60° [∵ ΔAOB is equilateral]
Note : The angle subtended by an arc of a circle at the centre is double the angle subtended by it
at any point on the remaining part of the circle.
∴ ∠ACB = 30°
Hence, option A is correct.

MCQ: Circles - 1 - Question 12

Directions: Kindly study the following question carefully and choose the right answer:

A circle (with centre at O) is touching two intersecting lines AX and BY. The two points of contact A and B subtend an angle of 65° at any point C on the circumference of the circle. If P is the point of intersection of the two lines, then the measure of ∠APO is

Detailed Solution for MCQ: Circles - 1 - Question 12

Given, ∠ACB = 65°
Note : The angle subtended by an arc of a circle at the centre is double the angle
subtended by it at any point on the remaining part of the circle.
∴ ∠AOB = 2 × 65° = 130°
Note : A tangent at any point of a circle is perpendicular to the radius through
the point of contact.
∴ ∠OAP = 90°

We know that, the sum of the three angles of a triangle is 180°.
∴ ∠APO = 180° – 90° – 65° = 25°
Hence, option A is correct.

MCQ: Circles - 1 - Question 13

Directions: Kindly study the following question carefully and choose the right answer:

A regular hexagon is inscrisbed in a circle of radius 5 cm. If x is the area inside the circle but outside the regular hexagon, then which one of the following is correct?

Detailed Solution for MCQ: Circles - 1 - Question 13

OB = OA = radius

and ∠OAB = ∠OBA = 60° So, ΔAOB is an equilateral triangle. Then, AB = 5 cm
So, Area, x = Area of circle – Area of hexagon

Hence, option A is correct.

MCQ: Circles - 1 - Question 14

Directions: Kindly study the following question carefully and choose the right answer:

AB = 8 cm and CD = 6 cm are two parallel chords on the same side of the centre of a circle. The distance between them is 1 cm. The radius of the circle is

Detailed Solution for MCQ: Circles - 1 - Question 14

Given, Chords AB = 8 cm and CD = 6 cm
Then, AE = EB = 4 cm and CF = FD = 3 cm
EF = 1 cm
Let OE = x cm
Then, OF = (x + 1) cm
OA = OC = r cm (∵ radius)
From ΔOAE, By pythagoras theorem

From ΔOCF, By pythagoras theorem

By equation (ii) – (i),

∴ From equation (i),
9 = r2 – 16
⇒ r2 = 25
⇒ r = 5 cm
Hence, option A is correct.

MCQ: Circles - 1 - Question 15

Directions: Kindly study the following question carefully and choose the right answer:

AB and CD are two parallel chords on the opposite sides of the centre of the circle. If AB = 10 cm, CD = 24 cm and the radius of the circle is 13 cm, the distance between the chords is

Detailed Solution for MCQ: Circles - 1 - Question 15

Given, Chords AB = 10 and CD =24 cm
∴ AE = EB = 5 cm and CF = FD = 12 cm
Radius AO = OC = 13 cm
From ΔAOE, By pytharoas theorem

From ΔCOF, By pytharoas theorem

Hence, option A is corret.

Information about MCQ: Circles - 1 Page
In this test you can find the Exam questions for MCQ: Circles - 1 solved & explained in the simplest way possible. Besides giving Questions and answers for MCQ: Circles - 1, EduRev gives you an ample number of Online tests for practice

Top Courses for SSC CGL

Download as PDF

Top Courses for SSC CGL