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 Page 1


Q u e s t i o n : 1
In ?ABC, if ?B = 76° and ?C = 48°, find ?A.
S o l u t i o n :
In ? ABC, ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?A +76°+48° = 180° ? ?A +124° = 180° ? ?A = 56°
Q u e s t i o n : 2
The angles of a triangle are in the ratio 2 : 3 : 4. Find the angles.
S o l u t i o n :
Let the angles of the given triangle measure (2x)°, (3x)° and (4x)°
, respectively.
Then,
2x +3x +4x = 180°   [Sum of the angles of a triangle] ? 9x = 180° ? x = 20°
Hence, the measures of the angles are 2 ×20° = 40°, 3 ×20° = 60° and 4 ×20°=80°
.
Q u e s t i o n : 3
In ?ABC, if 3 ?A = 4 ?B = 6 ?C, calculate ?A, ?B and ?C.
S o l u t i o n :
Let 3 ?A = 4 ?B = 6 ?C = x°
.
Then,
?A =
x
3
°
, ?B =
x
4
°
 and ?C =
x
6
°
? 
x
3
+
x
4
+
x
6
= 180°   [Sum of the angles of a triangle] ? 4x +3x +2x = 2160° ? 9x = 2160° ? x = 240°
Therefore,
?A =
240
3
°
= 80°, ?B =
240
4
°
= 60° and ?C =
240
6
°
= 40°
Q u e s t i o n : 4
In ?ABC, if ?A + ?B = 108° and ?B + ?C = 130°, find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 108° and ?B + ?C = 130°
.
? ?A + ?B + ?B + ?C = (108 +130)° ? ( ?A + ?B + ?C)+ ?B = 238°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?B = 238° ? ?B = 58°
? ?C = 130°- ?B
          = (130 -58)° = 72°
? ?A = 108°- ?B
         = (108 -58)° = 50°
Q u e s t i o n : 5
In ?ABC, ?A + ?B = 125° and ?A + ?C = 113°. Find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 125° and ?A + ?C = 113°
.
Then,
?A + ?B + ?A + ?C = (125 +113)° ? ( ?A + ?B + ?C)+ ?A = 238° ? 180°+ ?A = 238° ? ?A = 58°
? ?B = 125°- ?A
           = (125 -58)° = 67°
? ?C = 113°- ?A
         = (113 -58)° = 55°
Q u e s t i o n : 6
In ?PQR, if ?P - ?Q = 42° and ?Q - ?R = 21°, find ?P, ?Q and ?R.
S o l u t i o n :
 Given: ?P - ?Q = 42° and ?Q- ?R = 21°
Then,
?P = 42°+ ?Q and ?R = ?Q-21° ? 42°+ ?Q+ ?Q+ ?Q-21° = 180°   [Sum of the angles of a triangle] ? 3 ?Q = 159° ? ?Q = 53°
? ?P = 42°+ ?Q
         = (42 +53)° = 95°
? ?R = ?Q-21°
         = (53 -21)° = 32°
Q u e s t i o n : 7
The sum of two angles of a triangle is 116° and their difference is 24°. Find the measure of each angle of the triangle.
( ) ( ) ( )
( ) ( ) ( )
Page 2


Q u e s t i o n : 1
In ?ABC, if ?B = 76° and ?C = 48°, find ?A.
S o l u t i o n :
In ? ABC, ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?A +76°+48° = 180° ? ?A +124° = 180° ? ?A = 56°
Q u e s t i o n : 2
The angles of a triangle are in the ratio 2 : 3 : 4. Find the angles.
S o l u t i o n :
Let the angles of the given triangle measure (2x)°, (3x)° and (4x)°
, respectively.
Then,
2x +3x +4x = 180°   [Sum of the angles of a triangle] ? 9x = 180° ? x = 20°
Hence, the measures of the angles are 2 ×20° = 40°, 3 ×20° = 60° and 4 ×20°=80°
.
Q u e s t i o n : 3
In ?ABC, if 3 ?A = 4 ?B = 6 ?C, calculate ?A, ?B and ?C.
S o l u t i o n :
Let 3 ?A = 4 ?B = 6 ?C = x°
.
Then,
?A =
x
3
°
, ?B =
x
4
°
 and ?C =
x
6
°
? 
x
3
+
x
4
+
x
6
= 180°   [Sum of the angles of a triangle] ? 4x +3x +2x = 2160° ? 9x = 2160° ? x = 240°
Therefore,
?A =
240
3
°
= 80°, ?B =
240
4
°
= 60° and ?C =
240
6
°
= 40°
Q u e s t i o n : 4
In ?ABC, if ?A + ?B = 108° and ?B + ?C = 130°, find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 108° and ?B + ?C = 130°
.
? ?A + ?B + ?B + ?C = (108 +130)° ? ( ?A + ?B + ?C)+ ?B = 238°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?B = 238° ? ?B = 58°
? ?C = 130°- ?B
          = (130 -58)° = 72°
? ?A = 108°- ?B
         = (108 -58)° = 50°
Q u e s t i o n : 5
In ?ABC, ?A + ?B = 125° and ?A + ?C = 113°. Find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 125° and ?A + ?C = 113°
.
Then,
?A + ?B + ?A + ?C = (125 +113)° ? ( ?A + ?B + ?C)+ ?A = 238° ? 180°+ ?A = 238° ? ?A = 58°
? ?B = 125°- ?A
           = (125 -58)° = 67°
? ?C = 113°- ?A
         = (113 -58)° = 55°
Q u e s t i o n : 6
In ?PQR, if ?P - ?Q = 42° and ?Q - ?R = 21°, find ?P, ?Q and ?R.
S o l u t i o n :
 Given: ?P - ?Q = 42° and ?Q- ?R = 21°
Then,
?P = 42°+ ?Q and ?R = ?Q-21° ? 42°+ ?Q+ ?Q+ ?Q-21° = 180°   [Sum of the angles of a triangle] ? 3 ?Q = 159° ? ?Q = 53°
? ?P = 42°+ ?Q
         = (42 +53)° = 95°
? ?R = ?Q-21°
         = (53 -21)° = 32°
Q u e s t i o n : 7
The sum of two angles of a triangle is 116° and their difference is 24°. Find the measure of each angle of the triangle.
( ) ( ) ( )
( ) ( ) ( )
S o l u t i o n :
Let ?A + ?B = 116° and ?A - ?B = 24°
Then,
? ?A + ?B + ?A - ?B = (116 +24)° ? 2 ?A = 140° ? ?A = 7 0 °
? ?B = 116°- ?A
          = (116 -70)° = 4 6 °
Also, in ? ABC:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 70°+46°+ ?C = 180° ? ?C = 6 4 °
Q u e s t i o n : 8
Two angles of a triangle are equal and the third angle is greater than each one of them by 18°. Find the angles.
S o l u t i o n :
Let ?A = ?B and ?C = ?A +18°
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ?A + ?A + ?A +18° = 180° ? 3 ?A = 162° ? ?A = 54°
Since,
?A = ?B ? ?B = 54° ? ?C = ?A +18°
        = (54 +18)° = 72°
Q u e s t i o n : 9
Of the three angles of a triangle, one is twice the smallest and another one is thrice the smallest. Find the angles.
S o l u t i o n :
Let the smallest angle of the triangle be ?C
and let ?A = 2 ?C and ?B = 3 ?C
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 2 ?C +3 ?C + ?C = 180° ? 6 ? = 180° ? ?C = 30°
? ?A = 2 ?C
         = 2(30)° = 60°
Also,
?B = 3 ?C     = 3(30)°     = 90°
Q u e s t i o n : 1 0
In a right-angled triangle, one of the acute angles measures 53°. Find the measure of each angle of the triangle.
S o l u t i o n :
Let ABC be a triangle right-angled at B.
Then, ?B = 90°  and let ?A = 53°.
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 53°+90°+ ?C = 180° ? ?C = 37°
Hence, ?A = 53°, ?B = 90° and ?C = 37°
.
Q u e s t i o n : 1 1
If one angle of a triangle is equal to the sum of the other two, show that the triangle is right-angled.
S o l u t i o n :
Let ABC be a triangle.
Then, ?A = ?B + ?C
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?B + ?C + ?B + ?C = 180° ? 2 ?B + ?C = 180° ? ?B + ?C = 90° ? ?A = 9 0 °   [ ? ?A = ?B + ?C]
This implies that the triangle is right-angled at A.
Q u e s t i o n : 1 2
If each angle of a triangle is less than the sum of the other two, show that the triangle is acute-angled.
S o l u t i o n :
Let ABC be the triangle.
Let ?A < ?B + ?C
Then,
2 ?A < ?A + ?B + ?C   [Adding ?A to both sides] ? 2 ?A < 180°   [ ? ?A + ?B + ?C = 180°] ? ?A < 9 0 °
Also, let ?B < ?A + ?C
Then,
2 ?B < ?A + ?B + ?C   [Adding ?B to both sides] ? 2 ?B < 180°   [ ? ?A + ?B + ?C = 180°] ? ?B < 9 0 °
And let ?C < ?A + ?B
Then,
2 ?C < ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C < 180°   [ ? ?A + ?B + ?C = 180°] ? ?C < 9 0 °
Hence, each angle of the triangle is less than 90°
Page 3


Q u e s t i o n : 1
In ?ABC, if ?B = 76° and ?C = 48°, find ?A.
S o l u t i o n :
In ? ABC, ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?A +76°+48° = 180° ? ?A +124° = 180° ? ?A = 56°
Q u e s t i o n : 2
The angles of a triangle are in the ratio 2 : 3 : 4. Find the angles.
S o l u t i o n :
Let the angles of the given triangle measure (2x)°, (3x)° and (4x)°
, respectively.
Then,
2x +3x +4x = 180°   [Sum of the angles of a triangle] ? 9x = 180° ? x = 20°
Hence, the measures of the angles are 2 ×20° = 40°, 3 ×20° = 60° and 4 ×20°=80°
.
Q u e s t i o n : 3
In ?ABC, if 3 ?A = 4 ?B = 6 ?C, calculate ?A, ?B and ?C.
S o l u t i o n :
Let 3 ?A = 4 ?B = 6 ?C = x°
.
Then,
?A =
x
3
°
, ?B =
x
4
°
 and ?C =
x
6
°
? 
x
3
+
x
4
+
x
6
= 180°   [Sum of the angles of a triangle] ? 4x +3x +2x = 2160° ? 9x = 2160° ? x = 240°
Therefore,
?A =
240
3
°
= 80°, ?B =
240
4
°
= 60° and ?C =
240
6
°
= 40°
Q u e s t i o n : 4
In ?ABC, if ?A + ?B = 108° and ?B + ?C = 130°, find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 108° and ?B + ?C = 130°
.
? ?A + ?B + ?B + ?C = (108 +130)° ? ( ?A + ?B + ?C)+ ?B = 238°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?B = 238° ? ?B = 58°
? ?C = 130°- ?B
          = (130 -58)° = 72°
? ?A = 108°- ?B
         = (108 -58)° = 50°
Q u e s t i o n : 5
In ?ABC, ?A + ?B = 125° and ?A + ?C = 113°. Find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 125° and ?A + ?C = 113°
.
Then,
?A + ?B + ?A + ?C = (125 +113)° ? ( ?A + ?B + ?C)+ ?A = 238° ? 180°+ ?A = 238° ? ?A = 58°
? ?B = 125°- ?A
           = (125 -58)° = 67°
? ?C = 113°- ?A
         = (113 -58)° = 55°
Q u e s t i o n : 6
In ?PQR, if ?P - ?Q = 42° and ?Q - ?R = 21°, find ?P, ?Q and ?R.
S o l u t i o n :
 Given: ?P - ?Q = 42° and ?Q- ?R = 21°
Then,
?P = 42°+ ?Q and ?R = ?Q-21° ? 42°+ ?Q+ ?Q+ ?Q-21° = 180°   [Sum of the angles of a triangle] ? 3 ?Q = 159° ? ?Q = 53°
? ?P = 42°+ ?Q
         = (42 +53)° = 95°
? ?R = ?Q-21°
         = (53 -21)° = 32°
Q u e s t i o n : 7
The sum of two angles of a triangle is 116° and their difference is 24°. Find the measure of each angle of the triangle.
( ) ( ) ( )
( ) ( ) ( )
S o l u t i o n :
Let ?A + ?B = 116° and ?A - ?B = 24°
Then,
? ?A + ?B + ?A - ?B = (116 +24)° ? 2 ?A = 140° ? ?A = 7 0 °
? ?B = 116°- ?A
          = (116 -70)° = 4 6 °
Also, in ? ABC:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 70°+46°+ ?C = 180° ? ?C = 6 4 °
Q u e s t i o n : 8
Two angles of a triangle are equal and the third angle is greater than each one of them by 18°. Find the angles.
S o l u t i o n :
Let ?A = ?B and ?C = ?A +18°
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ?A + ?A + ?A +18° = 180° ? 3 ?A = 162° ? ?A = 54°
Since,
?A = ?B ? ?B = 54° ? ?C = ?A +18°
        = (54 +18)° = 72°
Q u e s t i o n : 9
Of the three angles of a triangle, one is twice the smallest and another one is thrice the smallest. Find the angles.
S o l u t i o n :
Let the smallest angle of the triangle be ?C
and let ?A = 2 ?C and ?B = 3 ?C
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 2 ?C +3 ?C + ?C = 180° ? 6 ? = 180° ? ?C = 30°
? ?A = 2 ?C
         = 2(30)° = 60°
Also,
?B = 3 ?C     = 3(30)°     = 90°
Q u e s t i o n : 1 0
In a right-angled triangle, one of the acute angles measures 53°. Find the measure of each angle of the triangle.
S o l u t i o n :
Let ABC be a triangle right-angled at B.
Then, ?B = 90°  and let ?A = 53°.
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 53°+90°+ ?C = 180° ? ?C = 37°
Hence, ?A = 53°, ?B = 90° and ?C = 37°
.
Q u e s t i o n : 1 1
If one angle of a triangle is equal to the sum of the other two, show that the triangle is right-angled.
S o l u t i o n :
Let ABC be a triangle.
Then, ?A = ?B + ?C
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?B + ?C + ?B + ?C = 180° ? 2 ?B + ?C = 180° ? ?B + ?C = 90° ? ?A = 9 0 °   [ ? ?A = ?B + ?C]
This implies that the triangle is right-angled at A.
Q u e s t i o n : 1 2
If each angle of a triangle is less than the sum of the other two, show that the triangle is acute-angled.
S o l u t i o n :
Let ABC be the triangle.
Let ?A < ?B + ?C
Then,
2 ?A < ?A + ?B + ?C   [Adding ?A to both sides] ? 2 ?A < 180°   [ ? ?A + ?B + ?C = 180°] ? ?A < 9 0 °
Also, let ?B < ?A + ?C
Then,
2 ?B < ?A + ?B + ?C   [Adding ?B to both sides] ? 2 ?B < 180°   [ ? ?A + ?B + ?C = 180°] ? ?B < 9 0 °
And let ?C < ?A + ?B
Then,
2 ?C < ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C < 180°   [ ? ?A + ?B + ?C = 180°] ? ?C < 9 0 °
Hence, each angle of the triangle is less than 90°
.
Therefore, the triangle is acute-angled.
Q u e s t i o n : 1 3
If one angle of a triangle is greater than the sum of the other two, show that the triangle is obtuse-angled.
S o l u t i o n :
Let ABC be a triangle and let ?C > ?A + ?B
.
Then, we have:
2 ?C > ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C > 180°   [ ? ?A + ?B + ?C = 180°] ? ?C > 9 0 °
Since one of the angles of the triangle is greater than 90°
, the triangle is obtuse-angled.
Q u e s t i o n : 1 4
In the given figure, side BC of ?ABC is produced to D. If ?ACD = 128° and ?ABC = 43°, find ?BAC and ?ACB.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ACD = ?A + ?B        [Exterior angle property] ? 128° = ?A +43° ? ?A = (128 -43)° ? ?A = 85° ? ?BAC = 85°
Also, in triangle ABC,
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 85°+43°+ ?ACB = 180° ? 128°+ ?ACB = 180° ? ?ACB = 52°
Q u e s t i o n : 1 5
In the given figure, the side BC of ? ABC has been produced on both sides-on the left to D and on the right to E. If ?ABD = 106° and ?ACE = 118°, find the measure of each angle of
the triangle.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ABC = ?A + ?C ? 106° = ?A + ?C   . . . (i)
Also, side BC of triangle ABC is produced to E.
?ACE = ?A + ?B ? 118° = ?A + ?B   . . . (ii)
Adding (i) and (ii), we get: ?A + ?A + ?B + ?C = (106 +118)°
? ( ?A + ?B + ?C)+ ?A = 224°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?A = 224° ? ?A = 44°
? ?B = 118°- ?A   [Using (ii)] ? ?B = (118 -44)° ? ?B = 74°
And,
?C = 106°- ?A   [Using (i)] ? ?C = (106 -44)° ? ?C = 62°
Q u e s t i o n : 1 6
Calculate the value of x in each of the following figures.
S o l u t i o n :
Page 4


Q u e s t i o n : 1
In ?ABC, if ?B = 76° and ?C = 48°, find ?A.
S o l u t i o n :
In ? ABC, ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?A +76°+48° = 180° ? ?A +124° = 180° ? ?A = 56°
Q u e s t i o n : 2
The angles of a triangle are in the ratio 2 : 3 : 4. Find the angles.
S o l u t i o n :
Let the angles of the given triangle measure (2x)°, (3x)° and (4x)°
, respectively.
Then,
2x +3x +4x = 180°   [Sum of the angles of a triangle] ? 9x = 180° ? x = 20°
Hence, the measures of the angles are 2 ×20° = 40°, 3 ×20° = 60° and 4 ×20°=80°
.
Q u e s t i o n : 3
In ?ABC, if 3 ?A = 4 ?B = 6 ?C, calculate ?A, ?B and ?C.
S o l u t i o n :
Let 3 ?A = 4 ?B = 6 ?C = x°
.
Then,
?A =
x
3
°
, ?B =
x
4
°
 and ?C =
x
6
°
? 
x
3
+
x
4
+
x
6
= 180°   [Sum of the angles of a triangle] ? 4x +3x +2x = 2160° ? 9x = 2160° ? x = 240°
Therefore,
?A =
240
3
°
= 80°, ?B =
240
4
°
= 60° and ?C =
240
6
°
= 40°
Q u e s t i o n : 4
In ?ABC, if ?A + ?B = 108° and ?B + ?C = 130°, find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 108° and ?B + ?C = 130°
.
? ?A + ?B + ?B + ?C = (108 +130)° ? ( ?A + ?B + ?C)+ ?B = 238°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?B = 238° ? ?B = 58°
? ?C = 130°- ?B
          = (130 -58)° = 72°
? ?A = 108°- ?B
         = (108 -58)° = 50°
Q u e s t i o n : 5
In ?ABC, ?A + ?B = 125° and ?A + ?C = 113°. Find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 125° and ?A + ?C = 113°
.
Then,
?A + ?B + ?A + ?C = (125 +113)° ? ( ?A + ?B + ?C)+ ?A = 238° ? 180°+ ?A = 238° ? ?A = 58°
? ?B = 125°- ?A
           = (125 -58)° = 67°
? ?C = 113°- ?A
         = (113 -58)° = 55°
Q u e s t i o n : 6
In ?PQR, if ?P - ?Q = 42° and ?Q - ?R = 21°, find ?P, ?Q and ?R.
S o l u t i o n :
 Given: ?P - ?Q = 42° and ?Q- ?R = 21°
Then,
?P = 42°+ ?Q and ?R = ?Q-21° ? 42°+ ?Q+ ?Q+ ?Q-21° = 180°   [Sum of the angles of a triangle] ? 3 ?Q = 159° ? ?Q = 53°
? ?P = 42°+ ?Q
         = (42 +53)° = 95°
? ?R = ?Q-21°
         = (53 -21)° = 32°
Q u e s t i o n : 7
The sum of two angles of a triangle is 116° and their difference is 24°. Find the measure of each angle of the triangle.
( ) ( ) ( )
( ) ( ) ( )
S o l u t i o n :
Let ?A + ?B = 116° and ?A - ?B = 24°
Then,
? ?A + ?B + ?A - ?B = (116 +24)° ? 2 ?A = 140° ? ?A = 7 0 °
? ?B = 116°- ?A
          = (116 -70)° = 4 6 °
Also, in ? ABC:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 70°+46°+ ?C = 180° ? ?C = 6 4 °
Q u e s t i o n : 8
Two angles of a triangle are equal and the third angle is greater than each one of them by 18°. Find the angles.
S o l u t i o n :
Let ?A = ?B and ?C = ?A +18°
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ?A + ?A + ?A +18° = 180° ? 3 ?A = 162° ? ?A = 54°
Since,
?A = ?B ? ?B = 54° ? ?C = ?A +18°
        = (54 +18)° = 72°
Q u e s t i o n : 9
Of the three angles of a triangle, one is twice the smallest and another one is thrice the smallest. Find the angles.
S o l u t i o n :
Let the smallest angle of the triangle be ?C
and let ?A = 2 ?C and ?B = 3 ?C
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 2 ?C +3 ?C + ?C = 180° ? 6 ? = 180° ? ?C = 30°
? ?A = 2 ?C
         = 2(30)° = 60°
Also,
?B = 3 ?C     = 3(30)°     = 90°
Q u e s t i o n : 1 0
In a right-angled triangle, one of the acute angles measures 53°. Find the measure of each angle of the triangle.
S o l u t i o n :
Let ABC be a triangle right-angled at B.
Then, ?B = 90°  and let ?A = 53°.
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 53°+90°+ ?C = 180° ? ?C = 37°
Hence, ?A = 53°, ?B = 90° and ?C = 37°
.
Q u e s t i o n : 1 1
If one angle of a triangle is equal to the sum of the other two, show that the triangle is right-angled.
S o l u t i o n :
Let ABC be a triangle.
Then, ?A = ?B + ?C
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?B + ?C + ?B + ?C = 180° ? 2 ?B + ?C = 180° ? ?B + ?C = 90° ? ?A = 9 0 °   [ ? ?A = ?B + ?C]
This implies that the triangle is right-angled at A.
Q u e s t i o n : 1 2
If each angle of a triangle is less than the sum of the other two, show that the triangle is acute-angled.
S o l u t i o n :
Let ABC be the triangle.
Let ?A < ?B + ?C
Then,
2 ?A < ?A + ?B + ?C   [Adding ?A to both sides] ? 2 ?A < 180°   [ ? ?A + ?B + ?C = 180°] ? ?A < 9 0 °
Also, let ?B < ?A + ?C
Then,
2 ?B < ?A + ?B + ?C   [Adding ?B to both sides] ? 2 ?B < 180°   [ ? ?A + ?B + ?C = 180°] ? ?B < 9 0 °
And let ?C < ?A + ?B
Then,
2 ?C < ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C < 180°   [ ? ?A + ?B + ?C = 180°] ? ?C < 9 0 °
Hence, each angle of the triangle is less than 90°
.
Therefore, the triangle is acute-angled.
Q u e s t i o n : 1 3
If one angle of a triangle is greater than the sum of the other two, show that the triangle is obtuse-angled.
S o l u t i o n :
Let ABC be a triangle and let ?C > ?A + ?B
.
Then, we have:
2 ?C > ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C > 180°   [ ? ?A + ?B + ?C = 180°] ? ?C > 9 0 °
Since one of the angles of the triangle is greater than 90°
, the triangle is obtuse-angled.
Q u e s t i o n : 1 4
In the given figure, side BC of ?ABC is produced to D. If ?ACD = 128° and ?ABC = 43°, find ?BAC and ?ACB.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ACD = ?A + ?B        [Exterior angle property] ? 128° = ?A +43° ? ?A = (128 -43)° ? ?A = 85° ? ?BAC = 85°
Also, in triangle ABC,
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 85°+43°+ ?ACB = 180° ? 128°+ ?ACB = 180° ? ?ACB = 52°
Q u e s t i o n : 1 5
In the given figure, the side BC of ? ABC has been produced on both sides-on the left to D and on the right to E. If ?ABD = 106° and ?ACE = 118°, find the measure of each angle of
the triangle.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ABC = ?A + ?C ? 106° = ?A + ?C   . . . (i)
Also, side BC of triangle ABC is produced to E.
?ACE = ?A + ?B ? 118° = ?A + ?B   . . . (ii)
Adding (i) and (ii), we get: ?A + ?A + ?B + ?C = (106 +118)°
? ( ?A + ?B + ?C)+ ?A = 224°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?A = 224° ? ?A = 44°
? ?B = 118°- ?A   [Using (ii)] ? ?B = (118 -44)° ? ?B = 74°
And,
?C = 106°- ?A   [Using (i)] ? ?C = (106 -44)° ? ?C = 62°
Q u e s t i o n : 1 6
Calculate the value of x in each of the following figures.
S o l u t i o n :
i
Side AC of triangle ABC is produced to E.
? ?EAB = ?B + ?C ? 110° = x + ?C   . . . (i)
Also,
?ACD + ?ACB = 180°   [linear pair] ? 120°+ ?ACB = 180° ? ?ACB = 60° ? ?C = 60°
Substituting the value of ?C in (i), we get x = 50
ii
From ? ABC
 we have:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 30°+40°+ ?C = 180° ? ?C = 110° ? ?ACB = 110°
Also,
?ECB + ?ECD = 180°   [linear pair] ? 110°+ ?ECD = 180° ? ?ECD = 70°Now, in ? ECD, ? ?AED = ?ECD + ?EDC     [exterior angle property ] ? x = 70°+50° ? x = 120°
iii
?ACB + ?ACD = 180°   [linear pair] ? ?ACB +115° = 180° ? ?ACB = 65°
Also,
?EAF = ?BAC   [Vertically-opposite angles] ? ?BAC = 60° ? ?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 60°+x +65° = 180° ? x = 55°
iv
?BAE = ?CDE   [Alternate angles] ? ?CDE = 60° ? ?ECD + ?CDE + ?CED = 180°     [Sum of the angles of a triangle] ? 45°+60°+x = 180° ? x = 75°
v
From ? ABC
, we have:
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 40°+ ?ABC +90° = 180° ? ?ABC = 50°
Also, from ? EBD
, we have:
?BED + ?EBD + ?BDE = 180°   [Sum of the angles of a triangle] ? 100°+50°+x = 180°   [ ? ?ABC = ?EBD] ? x = 30°
vi
From ? ABE
, we have:
?BAE + ?ABE + ?AEB = 180°   [Sum of the angles of a triangle] ? 75°+65°+ ?AEB = 180° ? ?AEB = 40° ? ?AEB = ?CED   [Vertically-opposite angles] ? ?CED = 40°
Also, From ? CDE
, we have
?ECD + ?CDE + ?CED = 180°   [Sum of the angles of a triangle] ? 110°+x +40° = 180° ? x = 30°
Q u e s t i o n : 1 7
In the figure given alongside, AB || CD, EF || BC, ?BAC = 60º and ?DHF = 50º. Find ?GCH and ?AGH. 
S o l u t i o n :
In the given figure, AB || CD and AC is the transversal.
? ?ACD = ?BAC = 60º     Pairofalternateangles
Or ?GCH = 60º
Now, ?GHC = ?DHF = 50º      Verticallyoppositeangles
In ?GCH,
?AGH = ?GCH + ?GHC       Exteriorangleofatriangleisequaltothesumofthetwointerioroppositeangles
? ?AGH = 60º + 50º = 110º
 
Q u e s t i o n : 1 8
Calculate the value of x in the given figure.
Page 5


Q u e s t i o n : 1
In ?ABC, if ?B = 76° and ?C = 48°, find ?A.
S o l u t i o n :
In ? ABC, ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?A +76°+48° = 180° ? ?A +124° = 180° ? ?A = 56°
Q u e s t i o n : 2
The angles of a triangle are in the ratio 2 : 3 : 4. Find the angles.
S o l u t i o n :
Let the angles of the given triangle measure (2x)°, (3x)° and (4x)°
, respectively.
Then,
2x +3x +4x = 180°   [Sum of the angles of a triangle] ? 9x = 180° ? x = 20°
Hence, the measures of the angles are 2 ×20° = 40°, 3 ×20° = 60° and 4 ×20°=80°
.
Q u e s t i o n : 3
In ?ABC, if 3 ?A = 4 ?B = 6 ?C, calculate ?A, ?B and ?C.
S o l u t i o n :
Let 3 ?A = 4 ?B = 6 ?C = x°
.
Then,
?A =
x
3
°
, ?B =
x
4
°
 and ?C =
x
6
°
? 
x
3
+
x
4
+
x
6
= 180°   [Sum of the angles of a triangle] ? 4x +3x +2x = 2160° ? 9x = 2160° ? x = 240°
Therefore,
?A =
240
3
°
= 80°, ?B =
240
4
°
= 60° and ?C =
240
6
°
= 40°
Q u e s t i o n : 4
In ?ABC, if ?A + ?B = 108° and ?B + ?C = 130°, find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 108° and ?B + ?C = 130°
.
? ?A + ?B + ?B + ?C = (108 +130)° ? ( ?A + ?B + ?C)+ ?B = 238°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?B = 238° ? ?B = 58°
? ?C = 130°- ?B
          = (130 -58)° = 72°
? ?A = 108°- ?B
         = (108 -58)° = 50°
Q u e s t i o n : 5
In ?ABC, ?A + ?B = 125° and ?A + ?C = 113°. Find ?A, ?B and ?C.
S o l u t i o n :
Let ?A + ?B = 125° and ?A + ?C = 113°
.
Then,
?A + ?B + ?A + ?C = (125 +113)° ? ( ?A + ?B + ?C)+ ?A = 238° ? 180°+ ?A = 238° ? ?A = 58°
? ?B = 125°- ?A
           = (125 -58)° = 67°
? ?C = 113°- ?A
         = (113 -58)° = 55°
Q u e s t i o n : 6
In ?PQR, if ?P - ?Q = 42° and ?Q - ?R = 21°, find ?P, ?Q and ?R.
S o l u t i o n :
 Given: ?P - ?Q = 42° and ?Q- ?R = 21°
Then,
?P = 42°+ ?Q and ?R = ?Q-21° ? 42°+ ?Q+ ?Q+ ?Q-21° = 180°   [Sum of the angles of a triangle] ? 3 ?Q = 159° ? ?Q = 53°
? ?P = 42°+ ?Q
         = (42 +53)° = 95°
? ?R = ?Q-21°
         = (53 -21)° = 32°
Q u e s t i o n : 7
The sum of two angles of a triangle is 116° and their difference is 24°. Find the measure of each angle of the triangle.
( ) ( ) ( )
( ) ( ) ( )
S o l u t i o n :
Let ?A + ?B = 116° and ?A - ?B = 24°
Then,
? ?A + ?B + ?A - ?B = (116 +24)° ? 2 ?A = 140° ? ?A = 7 0 °
? ?B = 116°- ?A
          = (116 -70)° = 4 6 °
Also, in ? ABC:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 70°+46°+ ?C = 180° ? ?C = 6 4 °
Q u e s t i o n : 8
Two angles of a triangle are equal and the third angle is greater than each one of them by 18°. Find the angles.
S o l u t i o n :
Let ?A = ?B and ?C = ?A +18°
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ?A + ?A + ?A +18° = 180° ? 3 ?A = 162° ? ?A = 54°
Since,
?A = ?B ? ?B = 54° ? ?C = ?A +18°
        = (54 +18)° = 72°
Q u e s t i o n : 9
Of the three angles of a triangle, one is twice the smallest and another one is thrice the smallest. Find the angles.
S o l u t i o n :
Let the smallest angle of the triangle be ?C
and let ?A = 2 ?C and ?B = 3 ?C
.
Then,
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 2 ?C +3 ?C + ?C = 180° ? 6 ? = 180° ? ?C = 30°
? ?A = 2 ?C
         = 2(30)° = 60°
Also,
?B = 3 ?C     = 3(30)°     = 90°
Q u e s t i o n : 1 0
In a right-angled triangle, one of the acute angles measures 53°. Find the measure of each angle of the triangle.
S o l u t i o n :
Let ABC be a triangle right-angled at B.
Then, ?B = 90°  and let ?A = 53°.
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 53°+90°+ ?C = 180° ? ?C = 37°
Hence, ?A = 53°, ?B = 90° and ?C = 37°
.
Q u e s t i o n : 1 1
If one angle of a triangle is equal to the sum of the other two, show that the triangle is right-angled.
S o l u t i o n :
Let ABC be a triangle.
Then, ?A = ?B + ?C
? ?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? ?B + ?C + ?B + ?C = 180° ? 2 ?B + ?C = 180° ? ?B + ?C = 90° ? ?A = 9 0 °   [ ? ?A = ?B + ?C]
This implies that the triangle is right-angled at A.
Q u e s t i o n : 1 2
If each angle of a triangle is less than the sum of the other two, show that the triangle is acute-angled.
S o l u t i o n :
Let ABC be the triangle.
Let ?A < ?B + ?C
Then,
2 ?A < ?A + ?B + ?C   [Adding ?A to both sides] ? 2 ?A < 180°   [ ? ?A + ?B + ?C = 180°] ? ?A < 9 0 °
Also, let ?B < ?A + ?C
Then,
2 ?B < ?A + ?B + ?C   [Adding ?B to both sides] ? 2 ?B < 180°   [ ? ?A + ?B + ?C = 180°] ? ?B < 9 0 °
And let ?C < ?A + ?B
Then,
2 ?C < ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C < 180°   [ ? ?A + ?B + ?C = 180°] ? ?C < 9 0 °
Hence, each angle of the triangle is less than 90°
.
Therefore, the triangle is acute-angled.
Q u e s t i o n : 1 3
If one angle of a triangle is greater than the sum of the other two, show that the triangle is obtuse-angled.
S o l u t i o n :
Let ABC be a triangle and let ?C > ?A + ?B
.
Then, we have:
2 ?C > ?A + ?B + ?C   [Adding ?C to both sides] ? 2 ?C > 180°   [ ? ?A + ?B + ?C = 180°] ? ?C > 9 0 °
Since one of the angles of the triangle is greater than 90°
, the triangle is obtuse-angled.
Q u e s t i o n : 1 4
In the given figure, side BC of ?ABC is produced to D. If ?ACD = 128° and ?ABC = 43°, find ?BAC and ?ACB.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ACD = ?A + ?B        [Exterior angle property] ? 128° = ?A +43° ? ?A = (128 -43)° ? ?A = 85° ? ?BAC = 85°
Also, in triangle ABC,
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 85°+43°+ ?ACB = 180° ? 128°+ ?ACB = 180° ? ?ACB = 52°
Q u e s t i o n : 1 5
In the given figure, the side BC of ? ABC has been produced on both sides-on the left to D and on the right to E. If ?ABD = 106° and ?ACE = 118°, find the measure of each angle of
the triangle.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
? ?ABC = ?A + ?C ? 106° = ?A + ?C   . . . (i)
Also, side BC of triangle ABC is produced to E.
?ACE = ?A + ?B ? 118° = ?A + ?B   . . . (ii)
Adding (i) and (ii), we get: ?A + ?A + ?B + ?C = (106 +118)°
? ( ?A + ?B + ?C)+ ?A = 224°   [ ? ?A + ?B + ?C = 180°] ? 180°+ ?A = 224° ? ?A = 44°
? ?B = 118°- ?A   [Using (ii)] ? ?B = (118 -44)° ? ?B = 74°
And,
?C = 106°- ?A   [Using (i)] ? ?C = (106 -44)° ? ?C = 62°
Q u e s t i o n : 1 6
Calculate the value of x in each of the following figures.
S o l u t i o n :
i
Side AC of triangle ABC is produced to E.
? ?EAB = ?B + ?C ? 110° = x + ?C   . . . (i)
Also,
?ACD + ?ACB = 180°   [linear pair] ? 120°+ ?ACB = 180° ? ?ACB = 60° ? ?C = 60°
Substituting the value of ?C in (i), we get x = 50
ii
From ? ABC
 we have:
?A + ?B + ?C = 180°   [Sum of the angles of a triangle] ? 30°+40°+ ?C = 180° ? ?C = 110° ? ?ACB = 110°
Also,
?ECB + ?ECD = 180°   [linear pair] ? 110°+ ?ECD = 180° ? ?ECD = 70°Now, in ? ECD, ? ?AED = ?ECD + ?EDC     [exterior angle property ] ? x = 70°+50° ? x = 120°
iii
?ACB + ?ACD = 180°   [linear pair] ? ?ACB +115° = 180° ? ?ACB = 65°
Also,
?EAF = ?BAC   [Vertically-opposite angles] ? ?BAC = 60° ? ?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 60°+x +65° = 180° ? x = 55°
iv
?BAE = ?CDE   [Alternate angles] ? ?CDE = 60° ? ?ECD + ?CDE + ?CED = 180°     [Sum of the angles of a triangle] ? 45°+60°+x = 180° ? x = 75°
v
From ? ABC
, we have:
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 40°+ ?ABC +90° = 180° ? ?ABC = 50°
Also, from ? EBD
, we have:
?BED + ?EBD + ?BDE = 180°   [Sum of the angles of a triangle] ? 100°+50°+x = 180°   [ ? ?ABC = ?EBD] ? x = 30°
vi
From ? ABE
, we have:
?BAE + ?ABE + ?AEB = 180°   [Sum of the angles of a triangle] ? 75°+65°+ ?AEB = 180° ? ?AEB = 40° ? ?AEB = ?CED   [Vertically-opposite angles] ? ?CED = 40°
Also, From ? CDE
, we have
?ECD + ?CDE + ?CED = 180°   [Sum of the angles of a triangle] ? 110°+x +40° = 180° ? x = 30°
Q u e s t i o n : 1 7
In the figure given alongside, AB || CD, EF || BC, ?BAC = 60º and ?DHF = 50º. Find ?GCH and ?AGH. 
S o l u t i o n :
In the given figure, AB || CD and AC is the transversal.
? ?ACD = ?BAC = 60º     Pairofalternateangles
Or ?GCH = 60º
Now, ?GHC = ?DHF = 50º      Verticallyoppositeangles
In ?GCH,
?AGH = ?GCH + ?GHC       Exteriorangleofatriangleisequaltothesumofthetwointerioroppositeangles
? ?AGH = 60º + 50º = 110º
 
Q u e s t i o n : 1 8
Calculate the value of x in the given figure.
S o l u t i o n :
Join A and D to produce AD to E.
Then,
?CAD + ?DAB = 55° and ?CDE + ?EDB = x°
Side AD of triangle ACD is produced to E.
? ?CDE = ?CAD + ?ACD   . . . (i)
   Exteriorangleproperty
Side AD of triangle ABD is produced to E.
? ?EDB = ?DAB + ?ABD   . . . (ii)
   Exteriorangleproperty
Adding (i) and (ii)we get, ?CDE + ?EDB = ?CAD + ?ACD + ?DAB + ?ABD
 
                 ? x° = ( ?CAD + ?DAB)+30°+45° ? x° = 55°+30°+45° ? x° = 130° ? x = 130
Q u e s t i o n : 1 9
In the given figure, AD divides ?BAC in the ratio 1 : 3 and AD = DB. Determine the value of x.
S o l u t i o n :
?BAC + ?CAE = 180°   [ ? BE is a straight line] ? ?BAC +108° = 180° ? ?BAC = 72°
Now, divide 72°
 in the ratio 1 : 3.
? a +3a = 72° ? a = 18° ? a = 18° and 3a = 54°
Hence, the angles are 18
o
 and 54
o
? ?BAD = 18° and ?DAC = 54°
Given,
AD = DB ? ?DAB = ?DBA = 18°
In ? ABC
, we have:
?BAC + ?ABC + ?ACB = 180°   [Sum of the angles of a triangle] ? 72°+18°+x° = 180° ? x° = 90° ? x = 90
Q u e s t i o n : 2 0
If the sides of a triangle are produced in order, prove that the sum of the exterior angles so formed is equal to four right angles.
S o l u t i o n :
Side BC of triangle ABC is produced to D.
?ACD = ?B + ?A   . . . (i)
Side AC of triangle ABC is produced to E.
?BAC = ?B + ?C   . . . (i)
And side AB of triangle ABC is produced to F.
?CBF = ?C + ?A   . . . (iii)
Adding (i), (ii) and (iii), we get: ?ACD + ?BAE + ?CBF = 2( ?A + ?B + ?C)
                               = 2(180)° = 360° = 4 ×90° = 4 right angles
Hence, the sum of the exterior angles so formed is equal to four right angles.
Q u e s t i o n : 2 1
In the adjoining figure, show that
?A + ?B + ?C + ?D + ?E + ?F = 360°.
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FAQs on RS Aggarwal Solutions: Triangles - Mathematics (Maths) Class 9

1. What are the different types of triangles?
Ans. There are several types of triangles based on their sides and angles. The types of triangles based on sides are equilateral, isosceles, and scalene triangles. Based on angles, triangles can be classified as acute, obtuse, or right-angled triangles.
2. How do you determine if a triangle is equilateral?
Ans. A triangle is equilateral if all three sides are equal in length. To determine if a triangle is equilateral, you can measure the lengths of its sides using a ruler or a measuring tape. If all three sides are found to be equal, then the triangle is equilateral.
3. What is the sum of the angles in a triangle?
Ans. The sum of the angles in a triangle is always 180 degrees. This is known as the triangle angle sum property. Regardless of the type of triangle, the sum of its three angles will always be equal to 180 degrees.
4. How can you determine if a triangle is right-angled?
Ans. A triangle is right-angled if one of its angles measures exactly 90 degrees. To determine if a triangle is right-angled, you can measure the angles using a protractor. If one of the angles measures 90 degrees, then the triangle is right-angled.
5. How do you calculate the area of a triangle?
Ans. The area of a triangle can be calculated using the formula: area = (base x height) / 2. The base and height of the triangle can be measured using a ruler or a measuring tape. Substitute the values into the formula to calculate the area of the triangle.
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