Class 10 Exam  >  Class 10 Tests  >  The Complete SAT Course  >  Test: Lines & Angles - 2 - Class 10 MCQ

Test: Lines & Angles - 2 - Class 10 MCQ


Test Description

10 Questions MCQ Test The Complete SAT Course - Test: Lines & Angles - 2

Test: Lines & Angles - 2 for Class 10 2024 is part of The Complete SAT Course preparation. The Test: Lines & Angles - 2 questions and answers have been prepared according to the Class 10 exam syllabus.The Test: Lines & Angles - 2 MCQs are made for Class 10 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Lines & Angles - 2 below.
Solutions of Test: Lines & Angles - 2 questions in English are available as part of our The Complete SAT Course for Class 10 & Test: Lines & Angles - 2 solutions in Hindi for The Complete SAT Course course. Download more important topics, notes, lectures and mock test series for Class 10 Exam by signing up for free. Attempt Test: Lines & Angles - 2 | 10 questions in 20 minutes | Mock test for Class 10 preparation | Free important questions MCQ to study The Complete SAT Course for Class 10 Exam | Download free PDF with solutions
Test: Lines & Angles - 2 - Question 1

In the given figure AB || CD, ∠A = 128°, ∠E = 144°. Then, ∠FCD is equal to :

Detailed Solution for Test: Lines & Angles - 2 - Question 1

As per the given figure,
Through E draw EE’ || AB || CD.
Then, ∠AEE’ = 180° ‒ ∠BAE = (180° ‒ 128°) = 52°.
(Interior angles on the same side of the transversal are supplementary.)
Now, ∠E’EC = (144° ‒ 52°) = 92°.
∠FCD = ∠E’EC = 92° (Corr. ∠s).
Hence, option D is correct.

Test: Lines & Angles - 2 - Question 2

In the trapezium PQRS, QR || PS, ∠Q = 90°, PQ = QR and ∠PRS = 20°. If ∠TSR = θ, then the value of θ is:

Detailed Solution for Test: Lines & Angles - 2 - Question 2

In the given figure, 
PQ = QR and ∠PQR = 90° ⇒ ∠QPR = ∠QRP = 45°.
∴ ∠QRS = (45° + 20°) = 65°.
∴ θ = ∠QRS = 65° (alt. ∠s)

Hence, option C is correct.

1 Crore+ students have signed up on EduRev. Have you? Download the App
Test: Lines & Angles - 2 - Question 3

In the adjoining figure, ∠ABC = 100°, ∠EDC = 120° and AB || DE. Then, ∠BCD is equal to:

Detailed Solution for Test: Lines & Angles - 2 - Question 3

In the given figure,
Produce AB to meet CD at F.
∠BFD = ∠EDF = 120° (alt. ∠s)
∠BFC = (180° ‒ 120°) = 60°.
∠CBF = (180° ‒ 100°) = 80°.
∴ ∠BCF = 180° ‒ (60° + 80°) = 40°.
Hence, option C is correct.

Test: Lines & Angles - 2 - Question 4

In the given figure, AB || CD, ∠ABO = 40° and ∠CDO = 30°. If ∠DOB = x°, then the value of x is:

Detailed Solution for Test: Lines & Angles - 2 - Question 4

In the given figure,

Through O draw EOF parallel to AB & so to CD.
∴ ∠BOF = ∠ABO = 40° (alt. ∠s)
Similarly, ∠FOD = ∠CDO = 30° (alt. ∠s)
∴ ∠BOD = (40° + 30°) = 70°.
So, x = 70°.

Hence, option C is correct.

Test: Lines & Angles - 2 - Question 5

In the given figure, AB || CD, m∠ABF = 45° and m∠CFC = 110°. Then, m∠FDC is:

Detailed Solution for Test: Lines & Angles - 2 - Question 5

As in the given figure,
∠FCD = ∠FBA = 45° (alt. ∠s)
∴ ∠FDC = 180° ‒ (110° + 45°) = 25°.
Hence, option A is correct.

Test: Lines & Angles - 2 - Question 6

In the given figure, line CE is drawn parallel to DB. If ∠BAD = 110°, ∠ABD = 30°, ∠ADC = 75° and ∠BCD = 60°, then the value of x° is:

Detailed Solution for Test: Lines & Angles - 2 - Question 6

As in the given figure,
∠ADB = 180° ‒ (110° + 30°) = 40°.
So, ∠BDC = (75° ‒ 40°) = 35°.

∴ ∠DBC = 180° ‒ (60° + 35°) = 85°.

∴ ∠BCE = ∠DBC = 85° (alt. ∠s).

So, x = 85°.
Hence, option C is correct.

Test: Lines & Angles - 2 - Question 7

If two supplementary angles differ by 44°, then one of the angle is:

Detailed Solution for Test: Lines & Angles - 2 - Question 7

Let the two angles are x and y. Therefore, as per the given information,
x ‒ y = 44° and 
x + y = 180°
[ As the total of supplementary angles is 180°]
On solving these two linear equations we get,
2x = 224, 
x = 112°. 
Therefore the other angle y = 180° ‒ 112° = 68°
Hence, option D is correct.

Test: Lines & Angles - 2 - Question 8

Consider the following statements

If two straight lines intersect, then
I. vertically opposite angles are equal.
II. vertically opposite angles are supplementary.
III. adjacent angles are complementary.

Which of the statements given above is/are correct?

Detailed Solution for Test: Lines & Angles - 2 - Question 8

Here, AB and CD are two lines.

If two straight lines intersect, then opposite vertically angles are equal.
Hence, option B is correct.

Test: Lines & Angles - 2 - Question 9


In the figure given above LOM is a straight line. What is the value of x°?

Detailed Solution for Test: Lines & Angles - 2 - Question 9

From the given figure,
∠LOQ + ∠QOP + ∠POM = 180°
(straight line)
∴   (x° + 20°) + 50° + (x° – 10°) = 180°
⇒   2x° + 60° = 180° ⇒ 2x° = 120°
∴   x° = 60°
Hence, optuion B is correct.

Test: Lines & Angles - 2 - Question 10

In the figure given above, EC is parallel to AB, ∠ECD = 70° and ∠BDO = 20°. What is the value of ∠OBD?

Detailed Solution for Test: Lines & Angles - 2 - Question 10

Given that, EC || AB
∴    ∠ECO + ∠AOC = 180°

⇒   ∠AOC = 180° – 70° = 110°

∴    ∠BOD = ∠AOC = 110°

(alternate angle)

Now, in ΔOBD

∠BOD + ∠ODB + ∠DBO = 180°

∴   110° + 20° + x° = 180° ⇒ x° = 50°.

Hence, option D is correct.

406 videos|217 docs|164 tests
Information about Test: Lines & Angles - 2 Page
In this test you can find the Exam questions for Test: Lines & Angles - 2 solved & explained in the simplest way possible. Besides giving Questions and answers for Test: Lines & Angles - 2, EduRev gives you an ample number of Online tests for practice

Top Courses for Class 10

406 videos|217 docs|164 tests
Download as PDF

Top Courses for Class 10