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Lines And Angles

Class 7th Mathematics NCERT Exemplar Solution
Exercise
  1. The angles between North and West and South and East areA. complementary B.…
  2. Angles between South and West and South and East areA. vertically opposite angles…
  3. In Fig. 5.9, PQ is a mirror, AB is the incident ray and BC is the reflected ray.…
  4. If the complement of an angle is 79°, then the angle will be ofA. 1° B. 11° C. 79°…
  5. Angles which are both supplementary and vertically opposite areA. 95°, 85° B. 90°,…
  6. The angle which makes a linear pair with an angle of 61° is ofA. 29° B. 61° C.…
  7. The angles x and 90° - x areA. supplementary B. complementary C. vertically…
  8. The angles x - 10° and 190° - x areA. interior angles on the same side of the…
  9. In Fig. 5.10, the value of x is A. 110° B. 46° C. 64° D. 150°
  10. In Fig. 5.11, if AB || CD, ∠APQ = 50° and ∠PRD = 130°, then ∠QPR is A. 130° B.…
  11. In Fig. 5.12, lines l and m intersect each other at a point. Which of the…
  12. If angle P and angle Q are supplementary and the measure of angle P is 60°, then…
  13. In Fig. 5.13, POR is a line. The value of a is A. 40° B. 45° C. 55° D. 60°…
  14. In Fig. 5.14, POQ is a line. If x = 30°, then ∠QOR is A. 90° B. 30° C. 150° D.…
  15. The measure of an angle which is four times its supplement isA. 36° B. 144° C.…
  16. In Fig. 5.15, the value of y is A. 30° B. 15° C. 20° D. 22.5°
  17. In Fig. 5.16, PA || BC || DT and AB || DC. Then, the values of a and b are…
  18. The difference of two complementary angles is 30°. Then, the angles areA. 60°,…
  19. In Fig. 5.17, PQ || SR and SP || RQ. Then, angles a and b are respectively A.…
  20. In Fig. 5.18, a and b are A. alternate exterior angles B. corresponding angles C.…
  21. If two supplementary angles are in the ratio 1 : 2, then the bigger angle isA.…
  22. In Fig. 5.19, ∠ROS is a right angle and ∠POR and ∠QOS are in the ratio 1 : 5.…
  23. Statements a and b are as given below: a : If two lines intersect, then the…
  24. For Fig. 5.20, statements p and q are given below: p : a and b are forming a…
  25. In Fig. 5.21, ∠AOC and ∠BOC form a pair of A. vertically opposite angles B.…
  26. In Fig. 5.22, the value of a is A. 20° B. 15° C. 5° D. 10°
  27. In Fig. 5.23, if QP || SR, the value of a is A. 40° B. 30° C. 90° D. 80°…
  28. In which of the following figures, a and b are forming a pair of adjacent…
  29. In a pair of adjacent angles, (i) vertex is always common, (ii) one arm is always…
  30. In Fig. 5.25, lines PQ and ST intersect at O. If ∠POR = 90° and x : y = 3 : 2,…
  31. In Fig. 5.26, POQ is a line, then a is equal to A. 35° B. 100° C. 80° D. 135°…
  32. Vertically opposite angles are alwaysA. supplementary B. complementary C.…
  33. In Fig. 5.27, a = 40°. The value of b is underbrace5b/2a 5.27 A. 20° B. 24° C.…
  34. If an angle is 60° less than two times of its supplement, then the greater angle…
  35. In Fig. 5.28, PQ || RS. If ∠1 = (2a + b)° and ∠6 = (3a-b)°, then the measure of…
  36. In Fig. 5.29, PQ||RS and a : b = 3 : 2.Then, f is equal to A. 36° B. 108° C. 72°…
  37. In Fig. 5.30, line l intersects two parallel lines PQ and RS. Then, which one of…
  38. In Fig. 5.30, which one of the following is not true? A. ∠1 + ∠5 = 180° B. ∠2 +…
  39. In Fig. 5.30, which of the following is true? A. ∠1 = ∠5 B. ∠4 = ∠8 C. ∠5 = ∠8 D.…
  40. In Fig. 5.31, PQ||ST. Then, the value of x + y is A. 125° B. 135° C. 145° D. 120°…
  41. In Fig. 5.32, if PQ||RS and QR||TS, then the value a is A. 95° B. 90° C. 85° D.…
  42. If sum of measures of two angles is 90°, then the angles are _________. Fill in…
  43. If the sum of measures of two angles is 180°, then they are _________. Fill in…
  44. A transversal intersects two or more than two lines at _________points. Fill in…
  45. If a transversal intersects two parallel lines, then sum of interior angles on…
  46. If a transversal intersects two parallel lines, then alternate interior angles…
  47. If a transversal intersects two parallel lines, then corresponding angles are on…
  48. If a transversal intersects two parallel lines, then alternate interior angles…
  49. Two lines in a plane which do not meet at a point anywhere are called…
  50. Two angles forming a __________ pair are supplementary. Fill in the blanks to…
  51. The supplement of an acute is always __________ angle. Fill in the blanks to make…
  52. The supplement of a right angle is always _________ angle. Fill in the blanks to…
  53. The supplement of an obtuse angle is always _________ angle. Fill in the blanks…
  54. In a pair of complementary angles, each angle cannot be more than________. Fill…
  55. An angle is 45°. Its complementary angle will be __________. Fill in the blanks…
  56. An angle which is half of its supplement is of __________. Fill in the blanks to…
  57. Two right angles are complementary to each other. State whether the statements…
  58. One obtuse angle and one acute angle can make a pair of complementary angles.…
  59. Two supplementary angles are always obtuse angles. State whether the statements…
  60. Two right angles are always supplementary to each other. State whether the…
  61. One obtuse angle and one acute angle can make a pair of supplementary angles.…
  62. Both angles of a pair of supplementary angles can never be acute angles. State…
  63. Two supplementary angles always form a linear pair. State whether the statements…
  64. Two angles making a linear pair are always supplementary. State whether the…
  65. Two angles making a linear pair are always adjacent angles. State whether the…
  66. Vertically opposite angles form a linear pair. State whether the statements are…
  67. Interior angles on the same side of a transversal with two distinct parallel…
  68. Vertically opposite angles are either both acute angles or both obtuse angles.…
  69. A linear pair may have two acute angles. State whether the statements are True or…
  70. An angle is more than 45°. Its complementary angle must be less than 45°. State…
  71. Two adjacent angles always form a linear pair. State whether the statements are…
  72. Write down each pair of adjacent angles shown in the following figures:…
  73. In each of the following figures, write, if any, (i) each pair of vertically…
  74. Name the pairs of supplementary angles in the following figures:
  75. In Fig. 5.36, PQ || RS, TR || QU and ∠PTR = 42°. Find ∠QUR.
  76. The drawings below (Fig. 5.37), show angles formed by the goalposts at different…
  77. The sum of two vertically opposite angles is 166°. Find each of the angles.…
  78. In Fig. 5.38, l ||m||n. ∠QPS = 35° and ∠QRT = 55°. Find ∠PQR.
  79. In Fig. 5.39, P, Q and R are collinear points and TQ ⊥ PR, Name; (a) pair of…
  80. In Fig. 5.40, OR ⊥ OP. (i) Name all the pairs of adjacent angles. (ii) Name all…
  81. If two angles have a common vertex and their arms form opposite rays (Fig. 5.41),…
  82. In (Fig 5.42) are the following pairs of angles adjacent? Justify your answer.…
  83. In Fig. 5.43, write all the pairs of supplementary angles.
  84. What is the type of other angle of a linear pair if A. one of its angle is acute?…
  85. Can two acute angles form a pair of supplementary angles? Give reason in support…
  86. Two lines AB and CD intersect at O (Fig. 5.44). Write all the pairs of adjacent…
  87. If the complement of an angle is 62°, then find its supplement.
  88. A road crosses a railway line at an angle of 30° as shown in Fig.5.45. Find the…
  89. The legs of a stool make an angle of 35° with the floor as shown in Fig. 5.46.…
  90. Iron rods a, b, c, d, e and f are making a design in a bridge as showing Fig.…
  91. Amisha makes a star with the help of line segments a, b, c, d, e and f, in which…
  92. In Fig. 5.49, AB||CD, AF||ED, ∠AFC = 68° and ∠FED = 42°. Find ∠EFD.…
  93. In Fig. 5.50, OB is perpendicular to OA and ∠BOC = 49°. Find ∠AOD.…
  94. Three lines AB, CD and EF intersect each other at O. If ∠AOE = 30° and ∠DOB = 40°…
  95. Measures (in degrees) of two complementary angles are two consecutive even…
  96. If a transversal intersects two parallel lines, and the difference of two…
  97. Two angles are making a linear pair. If one of them is one-third of the other,…
  98. Measures (in degrees) of two supplementary angles are consecutive odd integers.…
  99. In Fig. 5.52, AE || GF || BD, AB || CG || DF and ∠CHE = 120°. Find ∠ABC and ∠CDE.…
  100. In Fig. 5.53, find the value of ∠BOC, if points A, O and B are collinear.…
  101. In Fig. 5.54, if l ||m, find the values of a and b.
  102. In Fig. 5.55, l ||m and a line t intersects these lines at P and Q,…
  103. In Fig. 5.56, QP || RS. Find the values of a and b.
  104. In Fig. 5.57, PQ || RT. Find the value of a + b.
  105. In Fig 5.58, PQ, RS and UT are parallel lines. (i) If c = 57^0 and a = c/3 find…
  106. In Fig. 5.59, AB||CD. Find the reflex ∠EFG.
  107. In Fig. 5.60, two parallel lines l and m are cut by two transversals n and p.…
  108. In Fig. 5.61, l, m and n are parallel lines, and the lines p and q are also…
  109. In Fig. 5.62, state which pair of lines are parallel. Give reason.…
  110. In Fig. 5.63, examine whether the following pairs of lines are parallel or not:…
  111. In Fig. 5.64, find out which pair of lines are parallel:
  112. In Fig. 5.65, show that (i) AB || CD (ii) EF || GH
  113. In Fig. 5.66, two parallel lines l and m are cut by two transversals p and q.…

Exercise
Question 1.

The angles between North and West and South and East are
A. complementary

B. supplementary

C. both are acute

D. both are obtuse


Answer:




The angle between North and West is 90° and between South and East is also 90°.

As 90°+ 90°= 180°

So they are supplementary angles.


Question 2.

Angles between South and West and South and East are
A. vertically opposite angles

B. complementary angles

C. making a linear pair

D. adjacent but not supplementary


Answer:

The angle between South and West is 90° and between South and East is also 90°.


So the sum of this two angles is equal to 180°.


Since this two angles are adjacent to each other so they form a linear pair.


Question 3.

In Fig. 5.9, PQ is a mirror, AB is the incident ray and BC is the reflected ray. If ∠ABC = 46°, then ∠ABP is equal to


A. 44°

B. 67°

C. 13°

D. 62°


Answer:

Angle of incidence(i) = Angle of reflection(r)


∠ABC = Angle of incidence(i) + Angle of reflection(r)


∠ABC = 46° (Given)


⇒ 2i = 46°


⇒ i = 23°


∠ABP + i = 90°


⇒ ∠ABP = 67°


Question 4.

If the complement of an angle is 79°, then the angle will be of
A. 1°

B. 11°

C. 79°

D. 101°


Answer:

Complement means the sum of angles is 90°


Complement of 79° = 90°-79° = 11°


Question 5.

Angles which are both supplementary and vertically opposite are
A. 95°, 85°

B. 90°, 90°

C. 100°, 80°

D. 45°, 45°


Answer:

Vertically opposite angles are always equal to each other. So they can be supplementary if and only if their value is half of 180° i.e. 90°


Question 6.

The angle which makes a linear pair with an angle of 61° is of
A. 29°

B. 61°

C. 122°

D. 119°


Answer:

Linear pair means the sum of the two angle is 180°


Angle which makes a linear pair = 180°-61° = 119°


Question 7.

The angles x and 90° – x are
A. supplementary

B. complementary

C. vertically opposite

D. making a linear pair


Answer:

The sum of the two angles x and 90° – x is 90°


Hence they are complementary


Question 8.

The angles x – 10° and 190° – x are
A. interior angles on the same side of the transversal

B. making a linear pair

C. complementary

D. supplementary


Answer:

The sum of the two angles is 180°.Hence they are supplementary.


Question 9.

In Fig. 5.10, the value of x is


A. 110°

B. 46°

C. 64°

D. 150°


Answer:

Sum of all four angles about the point = 360°


⇒ x + 100° + 46° + 64° = 360°


⇒ x + 210° = 360°


⇒ x = 150°


Question 10.

In Fig. 5.11, if AB || CD, ∠APQ = 50° and ∠PRD = 130°, then ∠QPR is


A. 130°

B. 50°

C. 80°

D. 30°


Answer:

∠APQ = 50°(Given)


⇒ ∠PQR = 50°(Alternate interior angles)


∠PRD = 130°(Given)


∠PRD = (180°- 130°) = 50° (Forms a Linear pair)


Sum of interior angles of a triangle = 180°


∠ QPR = 180°- ∠PQR-∠PRD


∠ QPR = 180°-100°


∠ QPR = 80°


Question 11.

In Fig. 5.12, lines l and m intersect each other at a point. Which of the following is false?


A. ∠a = ∠b

B. ∠d = ∠c

C. ∠a + ∠d = 180°

D. ∠a = ∠d


Answer:

l and m intersect at a point


∠a = ∠b (Vertically Opposite)


∠d = ∠c (Vertically Opposite)


∠a + ∠d = 180° (Forms a linear pair)


Hence Option A, B & C are correct


∠a ≠ ∠d


Question 12.

If angle P and angle Q are supplementary and the measure of angle P is 60°, then the measure of angle Q is
A. 120°

B. 60°

C. 30°

D. 20°


Answer:

Sum of two angles P and Q when they are supplementary is 180°


∠P + ∠Q = 180°


⇒ ∠Q = 180°-60°


⇒ ∠Q = 120°


Question 13.

In Fig. 5.13, POR is a line. The value of a is


A. 40°

B. 45°

C. 55°

D. 60°


Answer:

∠ POQ and ∠ QOR forms a linear pair


(3a + 5)° + (2a-25)° = 180°


⇒ 5a - 20° = 180°


⇒ 5a = 200°


⇒ a = 40°


Question 14.

In Fig. 5.14, POQ is a line. If x = 30°, then ∠QOR is


A. 90°

B. 30°

C. 150°

D. 60°


Answer:

∠ POS, ∠ SOR & ∠ ROQ forms a linear pair


x + 5y = 180°


⇒ 5y = 150°


⇒ y = 30°


∠QOR = 3y


⇒ ∠QOR = 90°


Question 15.

The measure of an angle which is four times its supplement is
A. 36°

B. 144°

C. 16°

D. 64°


Answer:

Let one angle be x and the other angle 4x


Since the two angles are supplementary, hence


x + 4x = 180°


⇒ 5x = 180°


⇒ x = 36°


Measure of angle = 4x = 144°


Question 16.

In Fig. 5.15, the value of y is


A. 30°

B. 15°

C. 20°

D. 22.5°


Answer:

The three angles forms a linear pair


6y + y + 2y = 180°


⇒ 9y = 180°


⇒ y = 20°


Question 17.

In Fig. 5.16, PA || BC || DT and AB || DC. Then, the values of a and b are respectively.


A. 60°, 120°

B. 50°,130°

C. 70°,110°

D. 80°,100°


Answer:

a = ∠PAB = 50° (Alternate interior angles)


a = b (Adjacent angles of a parallelogram are supplementary)


a + b = 180°


⇒ b = 130°


Question 18.

The difference of two complementary angles is 30°. Then, the angles are
A. 60°, 30°

B. 70°, 40°

C. 20°,50°

D. 105°,75°


Answer:

Let one angle be x and the other angle be (x + 30°)


Sum of complementary angles is 90°


x + (x + 30°) = 90°


⇒ 2x = 60°


⇒ x = 30°


x + 30° = 60°


Question 19.

In Fig. 5.17, PQ || SR and SP || RQ. Then, angles a and b are respectively


A. 20°, 50°

B. 50°, 20°

C. 30°, 50°

D. 45°, 35°


Answer:

a = ∠ SRP = 20° (Alternate interior angle)


b = ∠ QRP = 50° (Alternate interior angle)


Question 20.

In Fig. 5.18, a and b are


A. alternate exterior angles

B. corresponding angles

C. alternate interior angles

D. vertically opposite angles


Answer:

l is a transversal of the two line segments m and n


The angles a and b lies on the inner side of each line segment but on opposite sides of transversal. So the angles are known as alternate interior angles.


Question 21.

If two supplementary angles are in the ratio 1 : 2, then the bigger angle is
A. 120°

B. 125°

C. 110°

D. 90°


Answer:

Ratio = 1 : 2


Let the angles be x and 2x


Sum of supplementary angles is 180°


x + 2x = 180°


⇒ 3x = 180°


⇒ x = 60°


The bigger angle = 2 × 60° = 120°


Question 22.

In Fig. 5.19, ∠ROS is a right angle and ∠POR and ∠QOS are in the ratio 1 : 5. Then, ∠QOS measures


A. 150°

B. 75°

C. 45°

D. 60°


Answer:

Since ∠ROS, ∠POR and ∠QOS forms a linear pair


∠ROS is a right angle


So ∠POR and ∠QOS are complementary angles


Let ∠POR be x, ∠QOS be 5x


x + 5x = 90°


⇒ 6x = 90°


⇒ x = 15°


∠QOS = 15°× 5 = 75°


Question 23.

Statements a and b are as given below:

a : If two lines intersect, then the vertically opposite angles are equal.

b : If a transversal intersects, two other lines, then the sum of two interior angles on the same side of the transversal is 180°.

Then
A. Both a and b are true

B. a is true and b is false

C. a is false and b is true

D. both a and b are false


Answer:

When two lines intersect then the vertically opposite angles are always equal.


When a transversal intersects, two other lines, then the sum of two interior angles on the same side of the transversal is 180° if and only if the two lines are parallel. The pair of angles are known as co-interior angles.


So both a is true and b is false.


Question 24.

For Fig. 5.20, statements p and q are given below:



p : a and b are forming a linear pair.

q : a and b are forming a pair of adjacent angles.

Then,
A. both p and q are true

B. p is true and q is false

C. p is false and q is true

D. both p and q are false


Answer:

Summation of a and b is 1800, hence they form a linear pair.


Angle a and b have a common vertex O and a common side OC. So they form a pair of adjacent angles.


So both p and q statements are true.


Question 25.

In Fig. 5.21, ∠AOC and ∠BOC form a pair of


A. vertically opposite angles

B. complementary angles

C. alternate interior angles

D. supplementary angles


Answer:

Sum of ∠AOC and ∠BOC is 180°


Hence they forms supplementary angles


Question 26.

In Fig. 5.22, the value of a is


A. 20°

B. 15°

C. 5°

D. 10°


Answer:

Let the point of intersection of all the three lines be O


∠ AOF = ∠ COD = 90°


∠ BOC, ∠ COD and ∠ DOE forms a linear pair


Since ∠ COD = 90°


So ∠ BOC and ∠ DOE are complementary angles


40° + 5a = 90°


⇒ 5a = 50°


⇒ a = 10°


Question 27.

In Fig. 5.23, if QP || SR, the value of a is


A. 40°

B. 30°

C. 90°

D. 80°


Answer:


We draw an imaginary straight line UT ||QP || SR


∠ UTS = ∠ TSR = 30° (Alternate Interior angle)


∠ UTQ = ∠TQP = 60° (Alternate Interior angle)


a = ∠ UTQ + ∠UTS


⇒ a = 60° + 30° = 90°


Question 28.

In which of the following figures, a and b are forming a pair of adjacent angles?
A.

B.

C.

D.


Answer:

Adjacent angles share a common vertex and a common side but no common interior points which is found only in option D.


Question 29.

In a pair of adjacent angles, (i) vertex is always common, (ii) one arm is always common, and (iii) uncommon arms are always opposite rays

Then
A. All (i), (ii) and (iii) are true

B. (iii) is false

C. (i) is false but (ii) and (iii) are true

D. (ii) is false


Answer:

Adjacent angles share a common vertex and a common side but no common interior points. But it is not mandatory for the uncommon arms to have opposite rays.


Question 30.

In Fig. 5.25, lines PQ and ST intersect at O. If ∠POR = 90° and x : y = 3 : 2, then z is equal to


A. 126°

B. 144°

C. 136°

D. 154°


Answer:

x and y are complementary pairs while y and z are supplementary pairs.


∠POR + ∠QOR = 1800( Forms a linear pair)


⇒ ∠QOR = 900


Let x = 3t, y = 2t


∠QOR = x + y


⇒ ∠QOR = 5t


⇒ 900 = 5t


⇒ t = 180


y = 2t = 360


y + z = 1800


⇒ z = 1800-360


⇒ z = 1440


Question 31.

In Fig. 5.26, POQ is a line, then a is equal to


A. 35°

B. 100°

C. 80°

D. 135°


Answer:

∠ POR and ∠ ROQ forms a linear pair


a + ∠ POR = 1800


⇒ a = 1800-1000 = 800


Question 32.

Vertically opposite angles are always
A. supplementary

B. complementary

C. adjacent

D. equal


Answer:

Vertically Opposite angles are formed when two lines intersect at a point. This angles are always equal.


Question 33.

In Fig. 5.27, a = 40°. The value of b is


A. 20°

B. 24°

C. 36°

D. 120°


Answer:

Angle 5b and 2a forms a linear pair


5b + 2a = 1800


⇒ 5b = 1800-800


⇒ 5b = 1000


⇒ b = 200


Question 34.

If an angle is 60° less than two times of its supplement, then the greater angle is
A. 100°

B. 80°

C. 60°

D. 120°


Answer:

Let one angle be x other (1800- x)


According to the problem:


2x- (1800-x) = 600


⇒ 3x = 2400


⇒ x = 800


Supplement of x = 1800 - 800 = 1000


Question 35.

In Fig. 5.28, PQ || RS. If ∠1 = (2a + b)° and ∠6 = (3a–b)°, then the measure of ∠2 in terms of b is


A. (2 + b)°

B. (3–b)°

C. (108–b)°

D. (180–b)°


Answer:

∠1 = (2a + b)° …Equation (i)


∠6 = (3a–b)°


Since ∠5 and ∠6 forms a linear pair so


∠5 = (180-3a + b)°


∠5 = ∠1 = (180-3a + b)° (Corresponding angles) …Equation (ii)


Equating Equation (i) and Equation (ii) we get


2a + b = 180-3a + b


⇒ 5a = 180


⇒ a = 360


Since ∠1 and ∠2 forms a linear pair so


∠2 = 1800- 2a-b


⇒ ∠2 = (108-b)0


Question 36.

In Fig. 5.29, PQ||RS and a : b = 3 : 2.Then, f is equal to


A. 36°

B. 108°

C. 72°

D. 144°


Answer:

Let a be 3x and b be 2x


Since a and b forms a linear pair, so


a + b = 1800


⇒ 5x = 1800


⇒ x = 360


⇒ a = 3x = 1080


a = f = 1080 (Corresponding angle)


Question 37.

In Fig. 5.30, line l intersects two parallel lines PQ and RS. Then, which one of the following is not true?


A. ∠1 = ∠3

B. ∠2 = ∠4

C. ∠6 = ∠7

D. ∠4 = ∠8


Answer:

According to this figure


∠ 1 = ∠ 3 (Corresponding angles)


∠2 = ∠4 (Corresponding angles)


∠6 = ∠5 (Vertically Opposite angle)


∠5 = ∠7 (Corresponding angles)


So we can say


∠6 = ∠7


∠2 and ∠8 are supplementary pair


Since ∠2 = ∠4


So ∠4 and ∠8 are also supplementary pair


Hence ∠4≠∠8


Question 38.

In Fig. 5.30, which one of the following is not true?


A. ∠1 + ∠5 = 180°

B. ∠2 + ∠5 = 180°

C. ∠3 + ∠8 = 180°

D. ∠2 + ∠3 = 180°


Answer:

∠1 = ∠3 (Corresponding angles)


∠3 + ∠5 = 1800 (Supplementary pairs)


So ∠1 + ∠5 = 180°


∠5 = ∠7 (Corresponding angles)


∠2 + ∠7 = 1800 (Supplementary pairs)


So ∠2 + ∠5 = 180°


∠1 = ∠3 (Corresponding angles)


∠1 + ∠8 = 1800 (Supplementary pairs)


So ∠3 + ∠8 = 180°


∠2 = ∠4 (Corresponding angles)


∠3 = ∠4 (Vertically Opposite angle)


So ∠3 = ∠2


Hence ∠3 and ∠2 are not supplementary pairs


Question 39.

In Fig. 5.30, which of the following is true?


A. ∠1 = ∠5

B. ∠4 = ∠8

C. ∠5 = ∠8

D. ∠3 = ∠7


Answer:

∠5 = ∠7 (Corresponding angle)


∠7 = ∠8 (Vertically Opposite angle)


Combining the above result we can say that


∠5 = ∠8


Question 40.

In Fig. 5.31, PQ||ST. Then, the value of x + y is


A. 125°

B. 135°

C. 145°

D. 120°


Answer:

y + ∠ PQR = 1800 (Forms a linear pair)


⇒ y + 1300 = 1800


⇒ y = 500


∠ QOS = ∠ TSO (Co-interior angle)


⇒ x = 850


⇒x + y = 1350


Question 41.

In Fig. 5.32, if PQ||RS and QR||TS, then the value a is


A. 95°

B. 90°

C. 85°

D. 75°


Answer:

∠ RQP = ∠ TSR = 850 (Corresponding angles)


a + ∠ TSR = 1800


⇒ a = 950


Question 42.

Fill in the blanks to make the statements true.

If sum of measures of two angles is 90°, then the angles are _________.


Answer:

Complementary


Complementary, since the sum of measures of two angles is 900



Question 43.

Fill in the blanks to make the statements true.

If the sum of measures of two angles is 180°, then they are _________.


Answer:

Supplementary


Supplementary, since the sum of measures of two angles is 1800



Question 44.

Fill in the blanks to make the statements true.

A transversal intersects two or more than two lines at _________points.


Answer:

Distinct


A transversal intersects two or more than two lines at distinct points.



Question 45.

Fill in the blanks to make the statements true.

If a transversal intersects two parallel lines, then

sum of interior angles on the same side of a transversal is __________.


Answer:

1800


Sum of interior angles on the same side of a transversal is 1800



Question 46.

Fill in the blanks to make the statements true.

If a transversal intersects two parallel lines, then

alternate interior angles have one common __________.


Answer:

Vertex


Alternate interior angle have one common vertex.



Question 47.

Fill in the blanks to make the statements true.

If a transversal intersects two parallel lines, then

corresponding angles are on the ________ side of the transversal.


Answer:

Same


Corresponding angles are on the same side of the transversal.



Question 48.

Fill in the blanks to make the statements true.

If a transversal intersects two parallel lines, then

alternate interior angles are on the ______ side of the transversal.


Answer:

Opposite


Alternate interior angles are on the opposite side of the transversal.



Question 49.

Fill in the blanks to make the statements true.

Two lines in a plane which do not meet at a point anywhere are called ________lines.


Answer:

Parallel


Two lines in a plane which do not meet at a point anywhere are called parallel lines



Question 50.

Fill in the blanks to make the statements true.

Two angles forming a __________ pair are supplementary.


Answer:

Linear


Two angles forming a linear pair are supplementary.



Question 51.

Fill in the blanks to make the statements true.

The supplement of an acute is always __________ angle.


Answer:

Obtuse


The supplement of an acute angle is always obtuse angle since acute angle is always less than 900



Question 52.

Fill in the blanks to make the statements true.

The supplement of a right angle is always _________ angle.


Answer:

Right


The supplement of a right angle is always a right angle since a right angle = 900


Supplement = 1800-900 = 900



Question 53.

Fill in the blanks to make the statements true.

The supplement of an obtuse angle is always _________ angle.


Answer:

Acute


The supplement of an obtuse angle is always acute angle since obtuse angle is always more than 900



Question 54.

Fill in the blanks to make the statements true.

In a pair of complementary angles, each angle cannot be more than________.


Answer:

900


In a pair of complementary angles, each angle cannot be more than 900



Question 55.

Fill in the blanks to make the statements true.

An angle is 45°. Its complementary angle will be __________.


Answer:

450


Complementary angle = (900-450) = 450



Question 56.

Fill in the blanks to make the statements true.

An angle which is half of its supplement is of __________.


Answer:

600


Let the angle be x, supplement be 2x


x + 2x = 1800


⇒ 3x = 1800


⇒ x = 600



Question 57.

State whether the statements are True or False.

Two right angles are complementary to each other.


Answer:

False


Sum of two right angles = 1800. So they are always supplementary to each other. Only two acute angles can be complementary to each other since their sum has to be 900



Question 58.

State whether the statements are True or False.

One obtuse angle and one acute angle can make a pair of complementary angles.


Answer:

False


An Obtuse angle is always more than 900, so it can never form a complementary pair.



Question 59.

State whether the statements are True or False.

Two supplementary angles are always obtuse angles.


Answer:

False


An Obtuse angle is always more than 900, so sum of angles of two obtuse angles will always be greater than 1800 and can never form a supplementary pair.



Question 60.

State whether the statements are True or False.

Two right angles are always supplementary to each other.


Answer:

True


Sum of two right angles is always 1800 and so they are always supplementary.



Question 61.

State whether the statements are True or False.

One obtuse angle and one acute angle can make a pair of supplementary angles.


Answer:

True


Obtuse angles are more than 900 and acute angles are less than 900. So they can form a supplementary pair.



Question 62.

State whether the statements are True or False.

Both angles of a pair of supplementary angles can never be acute angles.


Answer:

True


Acute angles are less than 900, so they can’t form a supplementary pair.



Question 63.

State whether the statements are True or False.

Two supplementary angles always form a linear pair.


Answer:

False


All linear pairs forms two supplementary angles but the reverse is not always true.



Question 64.

State whether the statements are True or False.

Two angles making a linear pair are always supplementary.


Answer:

True


All linear pairs forms two supplementary angles but the reverse is not always true.



Question 65.

State whether the statements are True or False.

Two angles making a linear pair are always adjacent angles.


Answer:

True


The angles are on a straight line so they share a common vertex and arm. Hence they are always adjacent.



Question 66.

State whether the statements are True or False.

Vertically opposite angles form a linear pair.


Answer:

False


Vertically Opposite angles are always equal. Linear pairs can only be formed by adjacent angles.



Question 67.

State whether the statements are True or False.

Interior angles on the same side of a transversal with two distinct parallel lines are complementary angles.


Answer:

False


Interior angles on the same side of a transversal with two distinct parallel lines are supplementary angles.



Question 68.

State whether the statements are True or False.

Vertically opposite angles are either both acute angles or both obtuse angles.


Answer:

True


Vertically Opposite angles are always equal.



Question 69.

State whether the statements are True or False.

A linear pair may have two acute angles.


Answer:

False


The linear pair has one acute and one obtuse angle which are adjacent to each other to add up to 1800.



Question 70.

State whether the statements are True or False.

An angle is more than 45°. Its complementary angle must be less than 45°.


Answer:

True


Complementary angles always add up to 900. When one angle is more than 450 the other angle is always less than 450 to make the sum up to 900.



Question 71.

State whether the statements are True or False.

Two adjacent angles always form a linear pair.


Answer:

False


Two angles forming a linear pair are always adjacent but the reverse is not always true.



Question 72.

Write down each pair of adjacent angles shown in the following figures:



Answer:

(a) The adjacent pairs are:


● ∠ DOC and ∠ COB


● ∠ COB and ∠ AOB


● ∠ DOC and ∠ COA


● ∠ DOB and ∠ AOB


(b) The adjacent pairs are:


● ∠TQP and ∠PQR


● ∠PRQ and ∠QRU


● ∠SPR and ∠PRQ


(c) The adjacent pairs are:


● ∠TSV and ∠VSU


● ∠TVS and ∠SVU


(d) The adjacent pairs are:


● ∠ AOC and ∠AOD


● ∠ AOC and ∠BOC


● ∠ BOD and ∠BOC


● ∠ BOD and ∠AOD



Question 73.

In each of the following figures, write, if any, (i) each pair of vertically opposite angles, and (ii) each linear pair.



Answer:

(i) Pair of vertically opposite angles:


● ∠ 1 and ∠ 3


● ∠2 and ∠4


● ∠6 and ∠8


● ∠5 and ∠7


Linear Pairs:


● ∠ 1 and ∠ 2


● ∠ 2 and ∠ 3


● ∠ 3 and ∠ 4


● ∠ 4 and ∠ 1


● ∠5 and ∠6


● ∠6 and ∠7


● ∠7 and ∠8


● ∠8 and ∠5


(ii) Pair of vertically opposite angles:


No vertically Opposite angles are present


Linear Pairs:


● ∠ABD and ∠DBC


● ∠ABE and ∠EBC


(iii) Pair of vertically opposite angles:


No vertically Opposite angles are present


Linear Pairs:


No linear pairs


(iv) Pair of vertically opposite angles:


● ∠ ROP and ∠QOS


● ∠ROQ and ∠ POS


Linear pairs:


● ∠ ROP and ∠QOR


● ∠ ROQ and ∠QOS


● ∠ SOP and ∠QOS


● ∠ ROP and∠ SOP


● ∠ ROT and ∠ TOS


● ∠ POT and ∠ TOQ



Question 74.

Name the pairs of supplementary angles in the following figures:



Answer:

(i) The pairs of Supplementary angles are :


● ∠ AOC and ∠AOD


● ∠ AOC and ∠BOC


● ∠ BOD and ∠BOC


● ∠ BOD and ∠AOD


(ii) The pairs of Supplementary angles are :


● ∠ POR and ∠ QOR


● ∠ POS and ∠ QOS


(iii) The pairs of Supplementary angles are :


● ∠ 1 and ∠ 2


● ∠ 3 and ∠ 4


● ∠ 5 and ∠ 6



Question 75.

In Fig. 5.36, PQ || RS, TR || QU and ∠PTR = 42°. Find ∠QUR.



Answer:

∠PTR = ∠TRU = 42° (Alternate Interior angle)


∠ TRU + ∠QUR = 1800 (Co interior angle)


∠ QUR = (1800 -42°) = 1380



Question 76.

The drawings below (Fig. 5.37), show angles formed by the goalposts at different positions of a football player. The greater the angle, the better chance the player has of scoring a goal. For example, the player has a better chance of scoring a goal from Position A than from Position B.



In Parts (a) and (b) given below it may help to trace the diagrams and draw and measure angles.

a) Seven football players are practicing their kicks. They are lined up in a straight line in front of the goalpost [Fig.(ii)]. Which player has the best (the greatest) kicking angle?

b) Now the players are lined up as shown in Fig. (iii). Which player has the best kicking angle?

c) Estimate at least two situations such that the angles formed by different positions of two players are complement to each other.


Answer:

(a) The player 4 has the best kicking angle since its position is the best.


(b) The player 4 has the best kicking angle since its position is the midway between all the players.


c) When the angles are complementary the sum is always 900


The two different positions of the player may be


i.) 300 and 600


ii.) 00 and 900



Question 77.

The sum of two vertically opposite angles is 166°. Find each of the angles.


Answer:

Vertically Opposite angles are always equal


Sum of two vertically opposite angles = 166°


Each angle



Question 78.

In Fig. 5.38, l ||m||n.

∠QPS = 35° and ∠QRT = 55°. Find ∠PQR.



Answer:


∠QPS = ∠PQA = 35° (Alternate Interior angle)


∠QRT = ∠RQA = 55° (Alternate Interior angle)


∠PQA + ∠RQA = ∠PQR


⇒ ∠PQR = 900



Question 79.

In Fig. 5.39, P, Q and R are collinear points and TQ ⊥ PR,



Name; (a) pair of complementary angles

(b) two pairs of supplementary angles.

(c) four pairs of adjacent angles.


Answer:

Pair of complementary angles:


i) ∠TQS and ∠SQR


Two Pairs of Supplementary angles:


i) ∠PQT and ∠TQR


ii) ∠PQS and ∠SQR


Four pairs of adjacent angles:


i) ∠TQS and ∠SQR


ii) ∠PQT and ∠TQR


iii) ∠PQS and ∠SQR


iv) ∠PQT and ∠TQS



Question 80.

In Fig. 5.40, OR ⊥ OP.



(i) Name all the pairs of adjacent angles.

(ii) Name all the pairs of complementary angles.


Answer:

Pairs of Adjacent angles:


i) ∠ x and ∠y


ii) ∠y and ∠z


iii) ∠x + y and ∠z


iv) ∠z + y and ∠x


Pair of complementary angle:


∠y and ∠x



Question 81.

If two angles have a common vertex and their arms form opposite rays (Fig. 5.41), Then,



A. how many angles are formed?

B. how many types of angles are formed?

C. write all the pairs of vertically opposite angles.


Answer:

A. There are all total 13 angles.


B. The four types of angles formed are


● Vertically Opposite Angles.


● Linear Pair


● Adjacent Angles


● Supplementary angles


C. The Pair of vertically opposite angles are:


● ∠ 1 and ∠ 3


● ∠ 2 and ∠ 4



Question 82.

In (Fig 5.42) are the following pairs of angles adjacent? Justify your answer.



Answer:

i) ∠a and ∠b are adjacent since they share a common vertex and a common arm.


ii) ∠a and ∠b are not adjacent since they does not share a common arm.


iii) ∠a and ∠b are not adjacent since they does not share a common vertex


iv) ∠a and ∠b are not adjacent since they share common interior points.



Question 83.

In Fig. 5.43, write all the pairs of supplementary angles.



Answer:

The pairs of supplementary angles are :


i) 7 and 2


ii) 1 and 8


iii) 3 and 6


iv) 6 and 5


v) 5 and 4


vi) 4 and 3



Question 84.

What is the type of other angle of a linear pair if

A. one of its angle is acute?

B. one of its angles is obtuse?

C. one of its angles is right?


Answer:

A. If one angle is acute the other angle to form a linear pair will always be obtuse.


B. If one angle is obtuse the other angle to form a linear pair will always be acute.


C. If one angle is right angle then the other angle to form a linear pair will always be a right angle.


Question 85.

Can two acute angles form a pair of supplementary angles? Give reason in support of your answer.


Answer:

Two acute angles can never form a pair of supplementary angles.


Acute angles are always less than 900. So their sum will always be less than 2 × 900 = 1800.Hence they can never can form a pair of supplementary angles.



Question 86.

Two lines AB and CD intersect at O (Fig. 5.44). Write all the pairs of adjacent angles by taking angles 1, 2, 3, and 4 only.



Answer:

The pairs of adjacent angles are:


i) 1 and 2


ii) 2 and 3


iii) 3 and 4


iv) 4 and 1



Question 87.

If the complement of an angle is 62°, then find its supplement.


Answer:

Complement of an angle = 620


Supplement of that angle = (900 + 620) = 1520


1520



Question 88.

A road crosses a railway line at an angle of 30° as shown in Fig.5.45. Find the values of a, b and c.



Answer:


Let ∠ x = 300


⇒ ∠ y = ∠ x = 300 (Corresponding angle)


∠ c = 1800-300 = 1500( Forms a linear pair with ∠ y)


∠ 1 = ∠ y = 300 (Vertically Opposite)


∠ a = ∠ 1 = 300 (Corresponding angle)


∠ 2 = 1800-300 = 1500( Forms a linear pair with ∠ a)


∠ b = ∠ 2 = 1500 (Alternate interior angle)


∠ a = 300, ∠ b = 1500, ∠ c = 1500



Question 89.

The legs of a stool make an angle of 35° with the floor as shown in Fig. 5.46. Find the angles x and y.



Answer:


∠ x = ∠ OQR = 350 (Alternate Interior angle)


∠ x and ∠ y forms a linear pair


∠ y = 1800-350 = 1450


∠ x = 350 and ∠ y = 1450



Question 90.

Iron rods a, b, c, d, e and f are making a design in a bridge as showing Fig. 5.47, in which a ||b, c ||d, e || f. Find the marked angles between



(i) b and c (ii) d and e

(iii) d and f (iv) c and f


Answer:


∠ 1 = 300 (Vertically Opposite angle)


∠4 = 750 (Alternate Interior angle)


∠ 2 + ∠ QPT = 1800 (Co interior angles)


∠ 2 = 1800-750 = 1050


∠ 3 = 750 (Alternate Interior angle)


(i) b and c = ∠ 1 = 300


(ii) d and e = ∠ 2 = 1050


(iii) d and f = ∠ 3 = 750


(iv) c and f = ∠4 = 750



Question 91.

Amisha makes a star with the help of line segments a, b, c, d, e and f, in which a || d,b || e and c || f. Chhaya marks an angle as 120° as shown in Fig. 5.48 and asks Amisha to find the ∠x, ∠y and ∠z. Help Amisha in finding the angles.



Answer:


∠A = 1200 (Vertically Opposite )


∠A + ∠ x = 1800 (Co-interior angle)


⇒ ∠x = 600


∠B + ∠ x = 1800 (Co-interior angle)


∠B = 1200


⇒ ∠y = 1200 (Vertically Opposite angle)


∠ z = ∠x = 600 (Alternate interior angle)


∠x = 600, ∠y = 1200, ∠z = 600



Question 92.

In Fig. 5.49, AB||CD, AF||ED, ∠AFC = 68° and ∠FED = 42°. Find ∠EFD.



Answer:

∠FED = ∠AFE = 42° (Alternate interior angle)


∠AFC, ∠AFE and ∠EFD are supplementary


∠EFD = 1800-(680 + 420) = 700



Question 93.

In Fig. 5.50, OB is perpendicular to OA and ∠BOC = 49°. Find ∠AOD.



Answer:

∠BOC = 49° (Given)


∠AOC = 900-490 = 410 (Complementary angles)


∠AOC and ∠AOD forms a linear pair


∠AOD = 1800-410 = 1390



Question 94.

Three lines AB, CD and EF intersect each other at O. If ∠AOE = 30° and ∠DOB = 40° (Fig. 5.51), find ∠COF.



Answer:

∠AOE, ∠DOB and ∠ EOD forms a linear pair


∠AOE = 30°


∠DOB = 40°


∠ EOD = 1800-∠AOE- ∠DOB


⇒ ∠ EOD = 1100


∠COF = ∠ EOD = 1100( Vertically Opposite)


∠COF = 1100



Question 95.

Measures (in degrees) of two complementary angles are two consecutive even integers. Find the angles.


Answer:

Let one angle be x other angle x + 20


Since the two angles are complementary their sum is 900


x + x + 2 = 900


⇒ 2x = 880


⇒ x = 440


The two angles are 440 and 460



Question 96.

If a transversal intersects two parallel lines, and the difference of two interior angles on the same side of a transversal is 20°, find the angles.


Answer:

Let one angle be x and the other angle be x + 200


Sum of two interior angles on the same side of a transversal = 1800


x + x + 200 = 1800


⇒ 2x = 1600


⇒ x = 800


The two angles are 800 and 1000



Question 97.

Two angles are making a linear pair. If one of them is one-third of the other, find the angles.


Answer:

Let one angle be x and the other angle be 3x


Since the two angles forms a linear pair their sum is 1800


x + 3x = 1800


⇒ 4x = 1800


⇒ x = 450


The two angles are 450, 1350



Question 98.

Measures (in degrees) of two supplementary angles are consecutive odd integers. Find the angles.


Answer:

Let one angle be x other angle x + 2


Since the two angles are supplementary their sum is 1800


x + x + 2 = 1800


⇒ 2x = 1780


⇒ x = 890


The two angles are 890 and 910



Question 99.

In Fig. 5.52, AE || GF || BD, AB || CG || DF and ∠CHE = 120°. Find ∠ABC and ∠CDE.



Answer:

∠ HCB = ∠CHE = 1200 (Alternate Interior angles)


∠ HCB + ∠ ABC = 1800 ( Co interior angles)


⇒ ∠ ABC = 600


∠ HCB = ∠CDE = 1200 (Corresponding angle)


∠ ABC = 600 and ∠CDE = 1200



Question 100.

In Fig. 5.53, find the value of ∠BOC, if points A, O and B are collinear.



Answer:

∠ AOD, ∠ DOC and ∠ COB are linear pairs.


So the sum of this three angles is 1800


(x-10) + (4x-25) + (x + 5) = 180


⇒ 6x = 180 + 30


⇒ 6x = 210


⇒ x = 350


∠BOC = (x + 5)0

= 400


Question 101.

In Fig. 5.54, if l ||m, find the values of a and b.



Answer:


∠ x = 1800-1320 = 480(Forms a linear pair)


∠a = 1800-(650 + 480) = 670 (Interior angles of a triangle are supplementary)


∠a, ∠b and ∠y are supplementary


∠ y = 650 (Corresponding angle)


∠b = 1800-(670 + 650) = 480


∠a = 670, ∠b = 480



Question 102.

In Fig. 5.55, l ||m and a line t intersects these lines at P and Q, respectively. Find the sum 2a + b.



Answer:

∠a = 1320 (Corresponding angle)


∠b = 1320 (Vertically Opposite angle)


2a + b = 3960



Question 103.

In Fig. 5.56, QP || RS. Find the values of a and b.



Answer:

Since QP || RS


∠a = 650 (Alternate Interior angle)


∠b = 700 (Corresponding angle)



Question 104.

In Fig. 5.57, PQ || RT. Find the value of a + b.



Answer:

Since PQ || RT


∠b = 550 (Alternate Interior angle)


∠a = 450 (Corresponding angle)


∠a + ∠b = 1000



Question 105.

In Fig 5.58, PQ, RS and UT are parallel lines.



(i) If c = 570 and a = find the value of d.

(ii) If c = 750 and a = c, find b.


Answer:

(i) a + b = c


(Given)




⇒ b = 380


d + b = 1800(Co- interior angle)


⇒ d = 1420


(ii) c = 750(Given)


a = c


⇒ a = 300


a + b = c


⇒ b = c - a


⇒ b = (750- 300) = 450



Question 106.

In Fig. 5.59, AB||CD. Find the reflex ∠EFG.



Answer:

∠ 2 + ∠ FGD = 1800(Co Interior angle)


∠ 2 = 1800-1350 = 450


∠ 1 = ∠ AEF = 340(Alternate Interior angle)


∠ 1 + ∠ 2 = 790


Reflex ∠EFG = (3600-(∠ 1 + ∠ 2)) = 2810



Question 107.

In Fig. 5.60, two parallel lines l and m are cut by two transversals n and p. Find the values of x and y.



Answer:

x + 660 = 1800(Co Interior angle)


⇒ x = 1140


y + 480 = 1800(Co Interior angle)


⇒ y = 1320


x = 1140 and y = 1320



Question 108.

In Fig. 5.61, l, m and n are parallel lines, and the lines p and q are also parallel. Find the values of a, b and c.



Answer:

∠ 6a = ∠3b = ∠4c = 1200 (Corresponding angle)


∠ 6a = 1200


⇒ ∠ a = 200


∠3b = 1200


⇒ ∠b = 400


∠4c = 1200


⇒ ∠c = 300


∠ a = 200, ∠b = 400, ∠c = 300


Question 109.

In Fig. 5.62, state which pair of lines are parallel. Give reason.



Answer:

Supplement of 1200 = 600


So the transversal l meets the line m and n forming an angle of 600 on the same side of transversal


Therefore this two angles are corresponding pairs


Hence m and n are parallel



Question 110.

In Fig. 5.63, examine whether the following pairs of lines are parallel or not:

(i) EF and GH (ii) AB and CD



Answer:


i) ∠ CQF≠∠ SRD (Alternate Exterior angle)


Hence EF is not || GH


ii) ∠ CQF = ∠ RQF = 650 (Vertically Opposite)


∠ RQF + ∠ SPQ = 1150 + 650 = 1800


Hence they form a pair of corresponding interior angle. So AB || CD



Question 111.

In Fig. 5.64, find out which pair of lines are parallel:



Answer:


∠ VUF + ∠ TUV = 1800


∠ TUV = 1800-1230 = 570


∠ TUV = ∠UVH


So they form alternate interior pairs


Hence EF||GH


∠UVH≠∠ VQP


Hence PK is not parallel to EF and GH


∠ VUF≠∠RSV


Hence AB is not parallel to CD as they don’t form corresponding pairs.


EF||GH



Question 112.

In Fig. 5.65, show that



(i) AB || CD

(ii) EF || GH


Answer:


Let P,Q,R,S be the four intersecting point


∠ FQS and ∠ SQP forms a linear pair


∠ SQP = 1800-500 = 1300


∠ APQ = 1300


∠ APQ = ∠ SQP = 1300


∠ APQ & ∠ SPQ are alternate interior angles


Hence AB || CD


∠ APQ and ∠ QPR forms a linear pair


∠ QPR = 1800-1300 = 500


∠ QPR = ∠ GRP = 500


So ∠ QPR and ∠ GRP are alternate interior angles


Hence EF || GH



Question 113.

In Fig. 5.66, two parallel lines l and m are cut by two transversals p and q. Determine the values of x and y.



Answer:

y + 800 = 1800 (Co- interior angles)


⇒ y = 1000


x = 1100 (Alternate interior angles)


x = 1100, y = 1000