Exercise MCQ
Question 1
If one angle of a triangle is equal to the sum of the other two angles, then the triangle is
(a) an isosceles triangle
(b) an obtuse triangle
(c) an equilateral triangle
(d) a right triangleSolution 1
Correct option: (d)
In a right triangle, one angle is 90° and the sum of acute angles of a right triangle is 90°.Question 2
An exterior angle of a triangle is 110° and its two interior opposite angles are equal. Each of these equal angles is
(a) 70°
(b) 55°
(c) 35°
(d)
Correct option: (b)
Let each interior opposite angle be x.
Then, x + x = 110° (Exterior angle property of a triangle)
⇒ 2x = 110°
⇒ x = 55° Question 3
The angles of a triangle are in the ratio 3:5:7 The triangle is
- Acute angled
- Obtuse angled
- Right angled
- an isosceles triangle
Solution 3
Question 4
If one of the angles of triangle is 130° then the angle between the bisector of the other two angles can be
(a) 50°
(b) 65°
(c) 90°
(d) 155Solution 4
Correct option: (d)
Let ∠A = 130°
In ΔABC, by angle sum property,
∠B + ∠C + ∠A = 180°
⇒ ∠B + ∠C + 130° = 180°
⇒ ∠B + ∠C = 50°
Question 5
In the given figure, AOB is a straight line. The value of x is
(a) 12
(b) 15
(c) 20
(d) 25Solution 5
Correct option: (b)
AOB is a straight line.
⇒ ∠AOB = 180°
⇒ 60° + 5x° + 3x° = 180°
⇒ 60° + 8x° = 180°
⇒ 8x° = 120°
⇒ x = 15° Question 6
The angles of a triangle are in the ratio 2 : 3 : 4. The largest angle of the triangle is
(a) 120°
(b) 100°
(c) 80°
(d) 60° Solution 6
Correct option: (c)
By angle sum property,
2x + 3x + 4x = 180°
⇒ 9x = 180°
⇒ x = 20°
Hence, largest angle = 4x = 4(20°) = 80° Question 7
In the given figure, ∠OAB = 110° and ∠BCD = 130° then ∠ABC is equal to
(a) 40°
(b) 50°
(c) 60°
(d) 70° Solution 7
Correct option: (c)
Through B draw YBZ ∥ OA ∥ CD.
Now, OA ∥ YB and AB is the transversal.
⇒ ∠OAB + ∠YBA = 180° (interior angles are supplementary)
⇒ 110° + ∠YBA = 180°
⇒ ∠YBA = 70°
Also, CD ∥ BZ and BC is the transversal.
⇒ ∠DCB + ∠CBZ = 180° (interior angles are supplementary)
⇒ 130° + ∠CBZ = 180°
⇒ ∠CBZ = 50°
Now, ∠YBZ = 180° (straight angle)
⇒ ∠YBA + ∠ABC + ∠CBZ = 180°
⇒ 70° + x + 50° = 180°
⇒ x = 60°
⇒ ∠ABC = 60° Question 8
If two angles are complements of each other, then each angle is
- An acute angle
- An obtuse angle
- A right angle
- A reflex angle
Solution 8
Correct option: (a)
Two angles are said to be complementary, if the sum of their measures is 90°.
Clearly, the measures of each of the angles have to be less than 90°.
Hence, each angle is an acute angle.Question 9
An angle which measures more than 180° but less than 360°, is called
- An acute angle
- An obtuse angle
- A straight angle
- A reflex angle
Solution 9
Correct option: (d)
An angle which measures more than 180o but less than 360o is called a reflex angle.Question 10
The measure of an angle is five times its complement. The angle measures
- 25°
- 35°
- 65°
- 75°
Solution 10
Question 11
Two complementary angles are such that twice the measure of the one is equal to three times the measure of the other. The larger of the two measures
- 72°o
- 54°
- 63°
- 36°
Solution 11
Question 12
In the given figure, AOB is a straight line. If ∠AOC = 4x° and ∠BOC = 5x°, then ∠AOC =?
Solution 12
Question 13
In the given figure, AOB is a straight line. If ∠AOC = (3x + 10) ° and ∠BOC = (4x – 26) °, then ∠BOC =?
- 96°
- 86°
- 76°
- 106°
Solution 13
Question 14
In the given figure, AOB is a straight line. If ∠AOC = (3x – 10) °, ∠COD = 50° and ∠BOD = (x +20) °, then ∠AOC =?
- 40°
- 60°
- 80°
- 50°
Solution 14
Question 15
Which of the following statements is false?
- Through a given point, only one straight line can be drawn
- Through two given points, it is possible to draw one and only one straight line.
- Two straight lines can intersect only at one point
- A line segment can be produced to any desired length.
Solution 15
Correct option: (a)
Option (a) is false, since through a given point we can draw an infinite number of straight lines.Question 16
An angle is one-fifth of its supplement. The measure of the angle is
- 15°
- 30°
- 75°
- 150°
Solution 16
Question 17
In the adjoining figure, AOB is straight line. If x:y:z = 4:5:6, then y = ?
- 60°
- 80°
- 48°
- 72°
Solution 17
Question 18
In the given figure, straight lines AB and CD intersect at O. If ∠AOC =ϕ, ∠BOC = θ and θ = 3 ϕ, then ϕ =?
- 30°
- 40°
- 45°
- 60°
Solution 18
Question 19
In the given figure, straight lines AB and CD intersect at O. If ∠AOC + ∠BOD = 130°, then ∠AOD =?
- 65°
- 115°
- 110°
- 125°
Solution 19
Question 20
In the given figure AB is a mirror, PQ is the incident ray and and QR is the reflected ray. If ∠PQR = 108°, then ∠ AQP =?
- 72°
- 18°
- 36°
- 54°
Solution 20
Question 21
In the given figure, AB ∥ CD, If ∠BAO = 60° and ∠OCD = 110° then ∠AOC = ?
(a) 70°
(b) 60°
(c) 50°
(d) 40° Solution 21
Correct option: (c)
Let ∠AOC = x°
Draw YOZ ∥ CD ∥ AB.
Now, YO ∥ AB and OA is the transversal.
⇒ ∠YOA = ∠OAB = 60° (alternate angles)
Again, OZ ∥ CD and OC is the transversal.
⇒ ∠COZ + ∠OCD = 180° (interior angles)
⇒ ∠COZ + 110° = 180°
⇒ ∠COZ = 70°
Now, ∠YOZ = 180° (straight angle)
⇒ ∠YOA + ∠AOC + ∠COZ = 180°
⇒ 60° + x + 70° = 180°
⇒ x = 50°
⇒ ∠AOC = 50° Question 22
In the given figure, AB ‖ CD. If ∠AOC = 30° and ∠OAB = 100°, then ∠OCD =?
- 130°
- 150°
- 80°
- 100°
Solution 22
Question 23
In the given figure, AB ‖ CD. If ‖CAB = 80o and ∠EFC= 25°, then ∠CEF =?
- 65°
- 55°
- 45°
- 75°
Solution 23
Question 24
In the given figure, AB ‖ CD, CD ‖ EF and y:z = 3:7, then x = ?
- 108°
- 126°
- 162°
- 63°
Solution 24
Question 25
In the given figure, AB ‖ CD. If ∠APQ = 70° and ∠RPD = 120°, then ∠QPR =?
- 50°
- 60°
- 40°
- 35°
Solution 25
Question 26
In the given figure AB ‖ CD. If ∠EAB = 50° and ∠ECD=60°, then ∠AEB =?
- 50°
- 60°
- 70°
- 50°
Solution 26
Question 27
In the given figure, ∠OAB = 75°, ∠OBA=55° and ∠OCD = 100°. Then ∠ODC=?
- 20°
- 25°
- 30°
- 35°
Solution 27
Question 28
In the adjoining figure y =?
- 36°
- 54°
- 63°
- 72°
Solution 28
Exercise Ex. 7A
Question 1
Define the following terms:
(i) Angle (ii) Interior of an angle (iii) Obtuse angle (iv) Reflex angle (v) Complementary angles (vi) Supplementary anglesSolution 1
(i) Angle: Two rays having a common end point form an angle.
(ii) Interior of an angle: The interior of AOB is the set of all points in its plane, which lie on the same side of OA as B and also on same side of OB as A.
(iii) Obtuse angle: An angle whose measure is more than 90o but less than 180o, is called an obtuse angle.
(iv) Reflex angle: An angle whose measure is more than 180o but less than 360o is called a reflex angle.
(v) Complementary angles: Two angles are said to be complementary, if the sum of their measures is 90o.
(vi) Supplementary angles: Two angles are said to be supplementary, if the sum of their measures is 180o.
Question 2(ii)
Find the complement of each of the following angles.
16oSolution 2(ii)
Complement of 16o = 90 – 16o = 74oQuestion 2(iv)
Find the complement of each of the following angles.
46o 30Solution 2(iv)
Complement of 46o 30′ = 90o – 46o 30′ = 43o 30’Question 2(i)
Find the complement of each of the following angle:
55° Solution 2(i)
Complement of 55° = 90° – 55° = 35° Question 2(iii)
Find the complement of each of the following angle:
90° Solution 2(iii)
Complement of 90° = 90° – 90° = 0° Question 3(iv)
Find the supplement of each of the following angles.
75o 36’Solution 3(iv)
Supplement of 75o 36′ = 180o – 75o 36′ = 104o 24’Question 3(i)
Find the supplement of each of the following angle:
42° Solution 3(i)
Supplement of 42° = 180° – 42° = 138° Question 3(ii)
Find the supplement of each of the following angle:
90° Solution 3(ii)
Supplement of 90° = 180° – 90° = 90° Question 3(iii)
Find the supplement of each of the following angle:
124° Solution 3(iii)
Supplement of 124° = 180° – 124° = 56° Question 4
Find the measure of an angle which is
(i) equal to its complement, (ii) equal to its supplement.Solution 4
(i) Let the required angle be xo
Then, its complement = 90o – xo
The measure of an angle which is equal to its complement is 45o.
(ii) Let the required angle be xo
Then, its supplement = 180o – xo
The measure of an angle which is equal to its supplement is 90o.Question 5
Find the measure of an angle which is 36o more than its complement.Solution 5
Let the required angle be xo
Then its complement is 90o – xo
The measure of an angle which is 36o more than its complement is 63o.Question 6
Find the measure of an angle which is 30° less than its supplement.Solution 6
Let the measure of the required angle = x°
Then, measure of its supplement = (180 – x)°
It is given that
x° = (180 – x)° – 30°
⇒ x° = 180° – x° – 30°
⇒ 2x° = 150°
⇒ x° = 75°
Hence, the measure of the required angle is 75°. Question 7
Find the angle which is four times its complement.Solution 7
Let the required angle be xo
Then, its complement = 90o – xo
The required angle is 72o.Question 8
Find the angle which is five times its supplement.Solution 8
Let the required angle be xo
Then, its supplement is 180o – xo
The required angle is 150o.Question 9
Find the angle whose supplement is four times its complement.Solution 9
Let the required angle be xo
Then, its complement is 90o – xo and its supplement is 180o – xoThat is we have,
The required angle is 60o.
Question 10
Find the angle whose complement is one-third of its supplement.Solution 10
Let the required angle be xo
Then, its complement is 90o – xo and its supplement is 180o – xo
The required angle is 45o.Question 11
Two complementary angles are in the ratio 4: 5. Find the angles.Solution 11
Let the two required angles be xo and 90o – xo.
Then
5x = 4(90 – x)
5x = 360 – 4x
5x + 4x = 360
9x = 360
Thus, the required angles are 40o and 90o – xo = 90 o – 40o = 50o.
Question 12
Find the value of x for which the angles (2x – 5)° and (x – 10)° are the complementary angles.Solution 12
(2x – 5)° and (x – 10)° are complementary angles.
∴ (2x – 5)° + (x – 10)° = 90°
⇒ 2x – 5° + x – 10° = 90°
⇒ 3x – 15° = 90°
⇒ 3x = 105°
⇒ x = 35°
Exercise Ex. 7B
Question 1
In the given figure, AOB is a straight line. Find the value of x.
Solution 1
Since BOC and COA form a linear pair of angles, we have
BOC + COA = 180o
xo + 62o = 180o
x = 180 – 62
x = 118oQuestion 2
In the adjoining figure, AOB is a straight line. Find the value of x. Hence, find ∠AOC and ∠BOD.
Solution 2
∠AOB is a straight angle.
⇒ ∠AOB = 180°
⇒ ∠AOC + ∠COD + ∠BOD = 180°
⇒ (3x – 7)° + 55° + (x + 20)° = 180°
⇒ 4x + 68° = 180°
⇒ 4x = 112°
⇒ x = 28°
Thus, ∠AOC = (3x – 7)° = 3(28°) – 7° = 84° – 7° = 77°
And, ∠BOD = (x + 20)° = 28° + 20° = 48° Question 3
In the given figure, AOB is a straight line. Find the value of x. Hence, find AOC, COD and BOD.
Solution 3
Since BOD and DOA from a linear pair of angles.
BOD + DOA = 180o
BOD + DOC + COA = 180o
xo + (2x – 19)o + (3x + 7)o = 180o
6x – 12 = 180
6x = 180 + 12 = 192
x = 32
AOC = (3x + 7)o = (3 32 + 7)o = 103o
COD = (2x – 19)o = (2 32 – 19)o = 45o
and BOD = xo = 32o
Question 4
In the given figure, x: y: z = 5: 4: 6. If XOY is a straight line, find the values of x, y and z.
Solution 4
x: y: z = 5: 4: 6
The sum of their ratios = 5 + 4 + 6 = 15
But x + y + z = 180o
[Since, XOY is a straight line]
So, if the total sum of the measures is 15, then the measure of x is 5.
If the sum of angles is 180o, then, measure of
And, if the total sum of the measures is 15, then the measure of y is 4.
If the sum of the angles is 180o, then, measure of
And z = 180o – x – y
= 180o – 60o – 48o
= 180o – 108o = 72o
x = 60, y = 48 and z = 72.
Question 5
In the given figure, what value of x will make AOB, a straight line?
Solution 5
AOB will be a straight line, if two adjacent angles form a linear pair.
BOC + AOC = 180o
(4x – 36)o + (3x + 20)o = 180o
4x – 36 + 3x + 20 = 180
7x – 16 = 180o
7x = 180 + 16 = 196
The value of x = 28.Question 6
Two lines AB and CD intersect at O. If AOC = 50o, find AOD, BOD and BOC.
Solution 6
Since AOC and AOD form a linear pair.
AOC + AOD = 180o
50o + AOD = 180o
AOD = 180o – 50o = 130o
AOD and BOC are vertically opposite angles.
AOD = BOC
BOC = 130o
BOD and AOC are vertically opposite angles.
BOD = AOC
BOD = 50oQuestion 7
In the given figure, three coplanar lines AB,CD and EF intersect at a point O, forming angles as shown. Find the values of x,y,z and t.
Solution 7
Since COE and DOF are vertically opposite angles, we have,
COE = DOF
z = 50o
Also BOD and COA are vertically opposite angles.
So, BOD = COA
t = 90o
As COA and AOD form a linear pair,
COA + AOD = 180o
COA + AOF + FOD = 180o [t = 90o]
t + x + 50o = 180o
90o + xo + 50o = 180o
x + 140 = 180
x = 180 – 140 = 40
Since EOB and AOF are vertically opposite angles
So, EOB = AOF
y = x = 40
Thus, x = 40 = y = 40, z = 50 and t = 90Question 8
In the given figure, three coplanar lines AB,CD and EF intersect at a point O. Find the value of x. Hence, find AOD, COE and AOE.
Solution 8
Since COE and EOD form a linear pair of angles.
COE + EOD = 180o
COE + EOA + AOD = 180o
5x + EOA + 2x = 180
5x + BOF + 2x = 180
[EOA and BOF are vertically opposite angles so, EOA = BOF]
5x + 3x + 2x = 180
10x = 180
x = 18
Now AOD = 2xo = 2 18o = 36o
COE = 5xo = 5 18o = 90o
and, EOA = BOF = 3xo = 3 18o = 54oQuestion 9
Two adjacent angles on a straight line are in the ratio 5 : 4. Find the measure of each one of these angles.Solution 9
Let the two adjacent angles be 5x and 4x.
Now, since these angles form a linear pair.
So, 5x + 4x = 180o
9x = 180o
The required angles are 5x = 5x = 5 20o = 100o
and 4x = 4 20o = 80oQuestion 10
If two straight lines intersect each other in such a way that one of the angles formed measures 90o, show that each of the remaining angles measures 90o.Solution 10
Let two straight lines AB and CD intersect at O and let AOC = 90o.
Now, AOC = BOD [Vertically opposite angles]
BOD = 90o
Also, as AOC and AOD form a linear pair.
90o + AOD = 180o
AOD = 180o – 90o = 90o
Since, BOC = AOD [Verticallty opposite angles]
BOC = 90o
Thus, each of the remaining angles is 90o.Question 11
Two lines AB and CD intersect at a point O such that BOC +AOD = 280o, as shown in the figure. Find all the four angles.
Solution 11
Since, AOD and BOC are vertically opposite angles.
AOD = BOC
Now, AOD + BOC = 280o [Given]
AOD + AOD = 280o
2AOD = 280o
AOD =
BOC = AOD = 140o
As, AOC and AOD form a linear pair.
So, AOC + AOD = 180o
AOC + 140o = 180o
AOC = 180o – 140o = 40o
Since, AOC and BOD are vertically opposite angles.
AOC = BOD
BOD = 40o
BOC = 140o, AOC = 40o , AOD = 140o and BOD = 40o.Question 12
Two lines AB and CD intersect each other at a point O such that ∠AOC : ∠AOD = 5 : 7. Find all the angles.
Solution 12
Let ∠AOC = 5x and ∠AOD = 7x
Now, ∠AOC + ∠AOD = 180° (linear pair of angles)
⇒ 5x + 7x = 180°
⇒ 12x = 180°
⇒ x = 15°
⇒ ∠AOC = 5x = 5(15°) = 75° and ∠AOD = 7x = 7(15°) = 105°
Now, ∠AOC = ∠BOD (vertically opposite angles)
⇒ ∠BOD = 75°
Also, ∠AOD = ∠BOC (vertically opposite angles)
⇒ ∠BOC = 105° Question 13
In the given figure, three lines AB, CD and EF intersect at a point O such that ∠AOE = 35° and ∠BOD = 40°. Find the measure of ∠AOC, ∠BOF, ∠COF and ∠DOE.
Solution 13
∠BOD = 40°
⇒ AOC = ∠BOD = 40° (vertically opposite angles)
∠AOE = 35°
⇒ ∠BOF = ∠AOE = 35° (vertically opposite angles)
∠AOB is a straight angle.
⇒ ∠AOB = 180°
⇒ ∠AOE + ∠EOD + ∠BOD = 180°
⇒ 35° + ∠EOD + 40° = 180°
⇒ ∠EOD + 75° = 180°
⇒ ∠EOD = 105°
Now, ∠COF = ∠EOD = 105° (vertically opposite angles)Question 14
In the given figure, the two lines AB and CD intersect at a point O such that ∠BOC = 125°. Find the values of x, y and z.
Solution 14
∠AOC + ∠BOC = 180° (linear pair of angles)
⇒ x + 125 = 180°
⇒ x = 55°
Now, ∠AOD = ∠BOC (vertically opposite angles)
⇒ y = 125°
Also, ∠BOD = ∠AOC (vertically opposite angles)
⇒ z = 55° Question 15
If two straight lines intersect each other then prove that the ray opposite to the bisector of one of the angles so formed bisects the vertically opposite angle.Solution 15
Given : AB and CD are two lines which are intersecting at O. OE is a ray bisecting the BOD. OF is a ray opposite to ray OE.
To Prove: AOF = COF
Proof : Since are two opposite rays, is a straight line passing through O.
AOF = BOE
and COF = DOE
[Vertically opposite angles]
But BOE = DOE (Given)
AOF = COF
Hence, proved.Question 16
Prove that the bisectors of two adjacent supplementary angles include a right angle.Solution 16
Given: is the bisector of BCD and is the bisector of ACD.
To Prove: ECF = 90o
Proof: Since ACD and BCD forms a linear pair.
ACD + BCD = 180o
ACE + ECD + DCF + FCB = 180o
ECD + ECD + DCF + DCF = 180o
because ACE = ECD
and DCF = FCB
2(ECD) + 2 (CDF) = 180o
2(ECD + DCF) = 180o
ECD + DCF =
ECF = 90o (Proved)
Exercise Ex. 7C
Question 1
In the given figure, l ∥ m and a transversal t cuts them. If ∠1 = 120°, find the measure of each of the remaining marked angles.
Solution 1
Given, ∠1 = 120°
Now, ∠1 + ∠2 = 180° (linear pair)
⇒ 120° + ∠2 = 180°
⇒ ∠2 = 60°
∠1 = ∠3 (vertically opposite angles)
⇒ ∠3 = 120°
Also, ∠2 = ∠4 (vertically opposite angles)
⇒ ∠4 = 60°
Line l ∥ line m and line t is a transversal.
⇒ ∠5 = ∠1 = 120° (corresponding angles)
∠6 = ∠2 = 60° (corresponding angles)
∠7 = ∠3 = 120° (corresponding angles)
∠8 = ∠4 = 60° (corresponding angles)Question 2
In the given figure, l ∥ m and a transversal t cuts them. If ∠7 = 80°, find the measure of each of the remaining marked angles.
Solution 2
Given, ∠7 = 80°
Now, ∠7 + ∠8 = 180° (linear pair)
⇒ 80° + ∠8 = 180°
⇒ ∠8 = 100°
∠7 = ∠5 (vertically opposite angles)
⇒ ∠5 = 80°
Also, ∠6 = ∠8 (vertically opposite angles)
⇒ ∠6 = 100°
Line l ∥ line m and line t is a transversal.
⇒ ∠1 = ∠5 = 80° (corresponding angles)
∠2 = ∠6 = 100° (corresponding angles)
∠3 = ∠7 = 80° (corresponding angles)
∠4 = ∠8 = 100° (corresponding angles) Question 3
In the given figure, l ∥ m and a transversal t cuts them. If ∠1 : ∠2 = 2 : 3, find the measure of each of the marked angles.
Solution 3
Given, ∠1 : ∠2 = 2 : 3
Now, ∠1 + ∠2 = 180° (linear pair)
⇒ 2x + 3x = 180°
⇒ 5x = 180°
⇒ x = 36°
⇒ ∠1 = 2x = 72° and ∠2 = 3x = 108°
∠1 = ∠3 (vertically opposite angles)
⇒ ∠3 = 72°
Also, ∠2 = ∠4 (vertically opposite angles)
⇒ ∠4 = 108°
Line l ∥ line m and line t is a transversal.
⇒ ∠5 = ∠1 = 72° (corresponding angles)
∠6 = ∠2 = 108° (corresponding angles)
∠7 = ∠3 = 72° (corresponding angles)
∠8 = ∠4 = 108° (corresponding angles) Question 4
For what value of x will the lines l and m be parallel to each other?
Solution 4
Lines l and m will be parallel if 3x – 20 = 2x + 10
[Since, if corresponding angles are equal, lines are parallel]
3x – 2x = 10 + 20
x = 30Question 5
For what value of x will the lines l and m be parallel to each other?
*Question modified, back answer incorrect.Solution 5
For lines l and m to be parallel to each other, the corresponding angles (3x + 5)° and (4x)° should be equal.
⇒ (3x + 5)° = 4x°
⇒ x = 5° Question 6
In the given figure, AB || CD and BC || ED. Find the value of x.
Solution 6
Since AB || CD and BC is a transversal.
So, BCD = ABC = xo [Alternate angles]
As BC || ED and CD is a transversal.
BCD + EDC = 180o
BCD + 75o =180o
BCD = 180o – 75o = 105o
ABC = 105o [since BCD = ABC]
xo = ABC = 105o
Hence, x = 105.
Question 7
In the given figure, AB || CD || EF. Find the value of x.
Solution 7
Since AB || CD and BC is a transversal.
So, ABC = BCD [atternate interior angles]
70o = xo + ECD(i)
Now, CD || EF and CE is transversal.
So,ECD + CEF = 180o [sum of consecutive interior angles is 180o]
ECD + 130o = 180o
ECD = 180o – 130o = 50o
Putting ECD = 50o in (i) we get,
70o = xo + 50o
x = 70 – 50 = 20Question 8
In the give figure, AB ∥ CD. Find the values of x, y and z.
Solution 8
AB ∥ CD and EF is transversal.
⇒ ∠AEF = ∠EFG (alternate angles)
Given, ∠AEF = 75°
⇒ ∠EFG = y = 75°
Now, ∠EFC + ∠EFG = 180° (linear pair)
⇒ x + y = 180°
⇒ x + 75° = 180°
⇒ x = 105°
∠EGD = ∠EFG + ∠FEG (Exterior angle property)
⇒ 125° = y + z
⇒ 125° = 75° + z
⇒ z = 50°
Thus, x = 105°, y = 75° and z = 50° Question 9(i)
Ineach of the figures given below, AB || CD. Find the value of x in each case.
Solution 9(i)
Through E draw EG || CD. Now since EG||CD and ED is a transversal.
So,GED = EDC = 65o[Alternate interior angles]
Since EG || CD and AB || CD,
EG||AB and EB is transversal.
So,BEG = ABE = 35o[Alternate interior angles]
So,DEB = xo
BEG + GED = 35o + 65o = 100o.
Hence, x = 100.Question 9(ii)
Ineach of the figures given below, AB || CD. Find the value of x in each case.
Solution 9(ii)
Through O draw OF||CD.
Now since OF || CD and OD is transversal.
CDO + FOD = 180o
[sum of consecutive interior angles is 180o]
25o + FOD = 180o
FOD = 180o – 25o = 155o
As OF || CD and AB || CD [Given]
Thus, OF || AB and OB is a transversal.
So,ABO + FOB = 180o [sum of consecutive interior angles is 180o]
55o + FOB = 180o
FOB = 180o – 55o = 125o
Now, xo = FOB + FOD = 125o + 155o = 280o.
Hence, x = 280.Question 9(iii)
Ineach of the figures given below, AB || CD. Find the value of x in each case.
Solution 9(iii)
Through E, draw EF || CD.
Now since EF || CD and EC is transversal.
FEC + ECD = 180o
[sum of consecutive interior angles is 180o]
FEC + 124o = 180o
FEC = 180o – 124o = 56o
Since EF || CD and AB ||CD
So, EF || AB and AE is a trasveral.
So,BAE + FEA = 180o
[sum of consecutive interior angles is 180o]
116o + FEA = 180o
FEA = 180o – 116o = 64o
Thus,xo = FEA + FEC
= 64o + 56o = 120o.
Hence, x = 120.Question 10
In the given figure, AB || CD. Find the value of x.
Solution 10
Through C draw FG || AE
Now, since CG || BE and CE is a transversal.
So, GCE = CEA = 20o [Alternate angles]
DCG = 130o – GCE
= 130o – 20o = 110o
Also, we have AB || CD and FG is a transversal.
So, BFC = DCG = 110o [Corresponding angles]
As, FG || AE, AF is a transversal.
BFG = FAE [Corresponding angles]
xo = FAE = 110o.
Hence, x = 110Question 11
In the given figure, AB || PQ. Find the values of x and y.
Solution 11
Since AB || PQ and EF is a transversal.
So, CEB = EFQ [Corresponding angles]
EFQ = 75o
EFG + GFQ = 75o
25o + yo = 75o
y = 75 – 25 = 50
Also, BEF + EFQ = 180o [sum of consecutive interior angles is 180o] BEF = 180o – EFQ
= 180o – 75o
BEF = 105o
FEG + GEB = BEF = 105o
FEG = 105o – GEB = 105o – 20o = 85o
In EFG we have,
xo + 25o + FEG = 180o
Hence, x = 70.
Question 12
In the given figure, AB || CD. Find the value of x.
Solution 12
Since AB || CD and AC is a transversal.
So, BAC + ACD = 180o [sum of consecutive interior angles is 180o]
ACD = 180o – BAC
= 180o – 75o = 105o
ECF = ACD [Vertically opposite angles]
ECF = 105o
Now in CEF,
ECF + CEF + EFC =180o 105o + xo + 30o = 180o
x = 180 – 30 – 105 = 45
Hence, x = 45.
Question 13
In the given figure, AB || CD. Find the value of x.
Solution 13
Since AB || CD and PQ a transversal.
So, PEF = EGH [Corresponding angles]
EGH = 85o
EGH and QGH form a linear pair.
So, EGH + QGH = 180o
QGH = 180o – 85o = 95o
Similarly, GHQ + 115o = 180o
GHQ = 180o – 115o = 65o
In GHQ, we have,
xo + 65o + 95o = 180o
x = 180 – 65 – 95 = 180 – 160
x = 20
Question 14
In the given figure, AB || CD. Find the values of x, y and z.
Solution 14
Since AB || CD and BC is a transversal.
So, ABC = BCD
x = 35
Also, AB || CD and AD is a transversal.
So, BAD = ADC
z = 75
In ABO, we have,
xo + 75o + yo = 180o
35 + 75 + y = 180
y = 180 – 110 = 70
x = 35, y = 70 and z = 75.
Question 16
In the given figure, AB || CD. Prove that p + q – r = 180.
Solution 16
Through F, draw KH || AB || CD
Now, KF || CD and FG is a transversal.
KFG = FGD = ro (i)
[alternate angles]
Again AE || KF, and EF is a transversal.
So,AEF + KFE = 180o
KFE = 180o – po (ii)
Adding (i) and (ii) we get,
KFG + KFE = 180 – p + r
EFG = 180 – p + r
q = 180 – p + r
i.e.,p + q – r = 180Question 17
In the given figure, AB || CD and EF || GH. Find the values of x, y, z and t.
Solution 17
PRQ = xo = 60o [vertically opposite angles]
Since EF || GH, and RQ is a transversal.
So, x = y [Alternate angles]
y = 60
AB || CD and PR is a transversal.
So, [Alternate angles]
[since ]
x + QRD = 110o
QRD = 110o – 60o = 50o
In QRS, we have,
QRD + to + yo = 180o
50 + t + 60 = 180
t = 180 – 110 = 70
Since, AB || CD and GH is a transversal
So, zo = to = 70o [Alternate angles]
x = 60 , y = 60, z = 70 and t = 70
Question 18
In the given figure, AB ∥ CD and a transversal t cuts them at E and F respectively. If EG and FG are the bisectors of ∠BEF and ∠EFD respectively, prove that ∠EGF = 90°.
Solution 18
AB ∥ CD and a transversal t cuts them at E and F respectively.
⇒ ∠BEF + ∠DFE = 180° (interior angles)
⇒ ∠GEF + ∠GFE = 90° ….(i)
Now, in ΔGEF, by angle sum property
∠GEF + ∠GFE + ∠EGF = 180°
⇒ 90° + ∠EGF = 180° ….[From (i)]
⇒ ∠EGF = 90° Question 19
In the given figure, AB ∥ CD and a transversal t cuts them at E and F respectively. If EP and FQ are the bisectors of ∠AEF and ∠EFD respectively, prove that EP ∥ FQ.
Solution 19
Since AB ∥ CD and t is a transversal, we have
∠AEF = ∠EFD (alternate angles)
⇒ ∠PEF = ∠EFQ
But, these are alternate interior angles formed when the transversal EF cuts EP and FQ.
∴ EP ∥ FQQuestion 20
In the given figure, BA ∥ ED and BC ∥ EF. Show that ∠ABC = ∠DEF.
Solution 20
Construction: Produce DE to meet BC at Z.
Now, AB ∥ DZ and BC is the transversal.
⇒ ∠ABC = ∠DZC (corresponding angles) ….(i)
Also, EF ∥ BC and DZ is the transversal.
⇒ ∠DZC = ∠DEF (corresponding angles) ….(ii)
From (i) and (ii), we have
∠ABC = ∠DEF Question 21
In the given figure, BA ∥ ED and BC ∥ EF. Show that ∠ABC + ∠DEF = 180°.
Solution 21
Construction: Produce ED to meet BC at Z.
Now, AB ∥ EZ and BC is the transversal.
⇒ ∠ABZ + ∠EZB = 180° (interior angles)
⇒ ∠ABC + ∠EZB = 180° ….(i)
Also, EF ∥ BC and EZ is the transversal.
⇒ ∠BZE = ∠ZEF (alternate angles)
⇒ ∠BZE = ∠DEF ….(ii)
From (i) and (ii), we have
∠ABC + ∠DEF = 180° Question 22
In the given figure, m and n are two plane mirrors perpendicular to each other. Show that the incident ray CA is parallel to the reflected ray BD.
Solution 22
Let the normal to mirrors m and n intersect at P.
Now, OB ⊥ m, OC ⊥ n and m ⊥ n.
⇒ OB ⊥ OC
⇒ ∠APB = 90°
⇒ ∠2 + ∠3 = 90° (sum of acute angles of a right triangle is 90°)
By the laws of reflection, we have
∠1 = ∠2 and ∠4 = ∠3 (angle of incidence = angle of reflection)
⇒ ∠1 + ∠4 = ∠2 + ∠3 = 90°
⇒ ∠1 + ∠2 + ∠3 + ∠4 = 180°
⇒ ∠CAB + ∠ABD = 180°
But, ∠CAB and ∠ABD are consecutive interior angles formed, when the transversal AB cuts CA and BD.
∴ CA ∥ BD Question 23
In the figure given below, state which lines are parallel and why?
Solution 23
In the given figure,
∠BAC = ∠ACD = 110°
But, these are alternate angles when transversal AC cuts AB and CD.
Hence, AB ∥ CD. Question 24
Two lines are respectively perpendicular to two parallel lines. Show that they are parallel to each other.Solution 24
Let the two parallel lines be m and n.
Let p ⊥ m.
⇒ ∠1 = 90°
Let q ⊥ n.
⇒ ∠2 = 90°
Now, m ∥ n and p is a transversal.
⇒ ∠1 = ∠3 (corresponding angles)
⇒ ∠3 = 90°
⇒ ∠3 = ∠2 (each 90°)
But, these are corresponding angles, when transversal n cuts lines p and q.
∴ p ∥ q.
Hence, two lines which are perpendicular to two parallel lines, are parallel to each other.
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