RS Aggarwal Solutions: Quadrilaterals- 1 | Mathematics (Maths) Class 9 PDF Download

 Page 1


Question:1
Three angles of a quadrilateral are 75°, 90° and 75°. Find the measure of the fourth angle.
Solution:
Given: Three angles of a quadrilateral are 75°, 90° and 75°.
Let the fourth angle be x.
Using angle sum property of quadrilateral,
75°+90°+75°+x = 360° ? 240°+x = 360°
? x = 360°-240° ? x = 120°
So, the measure of  the fourth angle is 120°
.
Question:2
The angles of a quadrilateral are in the ratio  2: 4 : 5 : 7. Find the angles.
Solution:
Let ?
A = 2x
°
?.
Then ?
B = (4x)
°
; ?
C = (5x)
°
 and ?
D = (7x)
°
Since the sum of the angles of a quadrilateral is 360
o
, we have:
2x + 4x + 5x + 7x = 360
°
   
? 18 x = 360
°
 ? ? x = 20
°
?  ?
A = 40
°
; ?
B = 80
°
; ?
C = 100
°
; ?
D = 140
°
Question:3
In the adjoining figure, ABCD is a trapezium in which AB || DC. If ?A = 55° and ?B = 70°, find ?C and ?D.
Solution:
  We have AB || DC.
 
? A  and  
? D are the interior angles on the same side of transversal line AD, whereas
Page 2


Question:1
Three angles of a quadrilateral are 75°, 90° and 75°. Find the measure of the fourth angle.
Solution:
Given: Three angles of a quadrilateral are 75°, 90° and 75°.
Let the fourth angle be x.
Using angle sum property of quadrilateral,
75°+90°+75°+x = 360° ? 240°+x = 360°
? x = 360°-240° ? x = 120°
So, the measure of  the fourth angle is 120°
.
Question:2
The angles of a quadrilateral are in the ratio  2: 4 : 5 : 7. Find the angles.
Solution:
Let ?
A = 2x
°
?.
Then ?
B = (4x)
°
; ?
C = (5x)
°
 and ?
D = (7x)
°
Since the sum of the angles of a quadrilateral is 360
o
, we have:
2x + 4x + 5x + 7x = 360
°
   
? 18 x = 360
°
 ? ? x = 20
°
?  ?
A = 40
°
; ?
B = 80
°
; ?
C = 100
°
; ?
D = 140
°
Question:3
In the adjoining figure, ABCD is a trapezium in which AB || DC. If ?A = 55° and ?B = 70°, find ?C and ?D.
Solution:
  We have AB || DC.
 
? A  and  
? D are the interior angles on the same side of transversal line AD, whereas
? B and  
? C are the interior angles on the same side of transversal line BC. 
Now, 
?A +
?D = 180
°
?  
?D = 180
°
 -
?A   
?
? D = 180
°
 - 55
°
 = 125
°
Again ,
? B +
?C = 180
°
?  
?C  = 180
° 
-
?B  
?
? C = 180
°
 -  70
°
 = 110
°
 
Question:4
In the adjoining figure, ABCD is a square and ?EDC is an equilateral triangle. Prove that
i AE = BE,
ii ?DAE = 15°.
Solution:
Given:  ABCD is a square in which AB = BC = CD = DA. ?EDC is an equilateral triangle in which ED = EC = DC and
 
? EDC  =   
? DEC = 
? ?DCE =  60
°
.
To prove:  AE = BE and 
?DAE = 15
°
? Proof: In ?ADE and ?BCE, we have:
AD = BC             
Sidesofasquare
DE = EC ?            
Sidesofanequilateraltriangle
?ADE  = 
?BCE = 90
° 
+  60
°
 = 150
°
? 
? ?ADE ?  ?BCE
i.e., AE =  BE  
Now, 
?ADE = 150
°
Page 3


Question:1
Three angles of a quadrilateral are 75°, 90° and 75°. Find the measure of the fourth angle.
Solution:
Given: Three angles of a quadrilateral are 75°, 90° and 75°.
Let the fourth angle be x.
Using angle sum property of quadrilateral,
75°+90°+75°+x = 360° ? 240°+x = 360°
? x = 360°-240° ? x = 120°
So, the measure of  the fourth angle is 120°
.
Question:2
The angles of a quadrilateral are in the ratio  2: 4 : 5 : 7. Find the angles.
Solution:
Let ?
A = 2x
°
?.
Then ?
B = (4x)
°
; ?
C = (5x)
°
 and ?
D = (7x)
°
Since the sum of the angles of a quadrilateral is 360
o
, we have:
2x + 4x + 5x + 7x = 360
°
   
? 18 x = 360
°
 ? ? x = 20
°
?  ?
A = 40
°
; ?
B = 80
°
; ?
C = 100
°
; ?
D = 140
°
Question:3
In the adjoining figure, ABCD is a trapezium in which AB || DC. If ?A = 55° and ?B = 70°, find ?C and ?D.
Solution:
  We have AB || DC.
 
? A  and  
? D are the interior angles on the same side of transversal line AD, whereas
? B and  
? C are the interior angles on the same side of transversal line BC. 
Now, 
?A +
?D = 180
°
?  
?D = 180
°
 -
?A   
?
? D = 180
°
 - 55
°
 = 125
°
Again ,
? B +
?C = 180
°
?  
?C  = 180
° 
-
?B  
?
? C = 180
°
 -  70
°
 = 110
°
 
Question:4
In the adjoining figure, ABCD is a square and ?EDC is an equilateral triangle. Prove that
i AE = BE,
ii ?DAE = 15°.
Solution:
Given:  ABCD is a square in which AB = BC = CD = DA. ?EDC is an equilateral triangle in which ED = EC = DC and
 
? EDC  =   
? DEC = 
? ?DCE =  60
°
.
To prove:  AE = BE and 
?DAE = 15
°
? Proof: In ?ADE and ?BCE, we have:
AD = BC             
Sidesofasquare
DE = EC ?            
Sidesofanequilateraltriangle
?ADE  = 
?BCE = 90
° 
+  60
°
 = 150
°
? 
? ?ADE ?  ?BCE
i.e., AE =  BE  
Now, 
?ADE = 150
°
DA = DC    
Sidesofasquare
DC = DE     
Sidesofanequilateraltriangle
So, DA = DE
?ADE and ?BCE are isosceles triangles.
i.e.,
?DAE = 
?DEA = 
1
2
(180° - 150°) = 
30°
2
 = 15°
 
Question:5
In the adjoining figure, BM ? AC and DN ? AC. If BM = DN, prove that AC bisects BD.
Solution:
Given: A quadrilateral ABCD, in which BM ?? AC and DN ? AC and BM = DN.
To prove: AC bisects BD; or DO = BO
Proof:
Let AC and BD intersect at O.
Now, in ?OND and ?OMB, we have:
?OND = ?OMB                 (90
o
 each)
?DON = ? BOM                 
Verticallyoppositeangles
Also, DN = BM                        
Given
i.e., ?OND ? ?OMB             AAScongurencerule
? OD = OB                          
CPCT
?Hence, AC bisects BD.
Question:6
In the given figure, ABCD is a quadrilateral in which AB = AD and BC = DC. Prove that
i
AC bisects ?A and ?C,
ii BE = DE,
iii ?ABC = ?ADC.
Page 4


Question:1
Three angles of a quadrilateral are 75°, 90° and 75°. Find the measure of the fourth angle.
Solution:
Given: Three angles of a quadrilateral are 75°, 90° and 75°.
Let the fourth angle be x.
Using angle sum property of quadrilateral,
75°+90°+75°+x = 360° ? 240°+x = 360°
? x = 360°-240° ? x = 120°
So, the measure of  the fourth angle is 120°
.
Question:2
The angles of a quadrilateral are in the ratio  2: 4 : 5 : 7. Find the angles.
Solution:
Let ?
A = 2x
°
?.
Then ?
B = (4x)
°
; ?
C = (5x)
°
 and ?
D = (7x)
°
Since the sum of the angles of a quadrilateral is 360
o
, we have:
2x + 4x + 5x + 7x = 360
°
   
? 18 x = 360
°
 ? ? x = 20
°
?  ?
A = 40
°
; ?
B = 80
°
; ?
C = 100
°
; ?
D = 140
°
Question:3
In the adjoining figure, ABCD is a trapezium in which AB || DC. If ?A = 55° and ?B = 70°, find ?C and ?D.
Solution:
  We have AB || DC.
 
? A  and  
? D are the interior angles on the same side of transversal line AD, whereas
? B and  
? C are the interior angles on the same side of transversal line BC. 
Now, 
?A +
?D = 180
°
?  
?D = 180
°
 -
?A   
?
? D = 180
°
 - 55
°
 = 125
°
Again ,
? B +
?C = 180
°
?  
?C  = 180
° 
-
?B  
?
? C = 180
°
 -  70
°
 = 110
°
 
Question:4
In the adjoining figure, ABCD is a square and ?EDC is an equilateral triangle. Prove that
i AE = BE,
ii ?DAE = 15°.
Solution:
Given:  ABCD is a square in which AB = BC = CD = DA. ?EDC is an equilateral triangle in which ED = EC = DC and
 
? EDC  =   
? DEC = 
? ?DCE =  60
°
.
To prove:  AE = BE and 
?DAE = 15
°
? Proof: In ?ADE and ?BCE, we have:
AD = BC             
Sidesofasquare
DE = EC ?            
Sidesofanequilateraltriangle
?ADE  = 
?BCE = 90
° 
+  60
°
 = 150
°
? 
? ?ADE ?  ?BCE
i.e., AE =  BE  
Now, 
?ADE = 150
°
DA = DC    
Sidesofasquare
DC = DE     
Sidesofanequilateraltriangle
So, DA = DE
?ADE and ?BCE are isosceles triangles.
i.e.,
?DAE = 
?DEA = 
1
2
(180° - 150°) = 
30°
2
 = 15°
 
Question:5
In the adjoining figure, BM ? AC and DN ? AC. If BM = DN, prove that AC bisects BD.
Solution:
Given: A quadrilateral ABCD, in which BM ?? AC and DN ? AC and BM = DN.
To prove: AC bisects BD; or DO = BO
Proof:
Let AC and BD intersect at O.
Now, in ?OND and ?OMB, we have:
?OND = ?OMB                 (90
o
 each)
?DON = ? BOM                 
Verticallyoppositeangles
Also, DN = BM                        
Given
i.e., ?OND ? ?OMB             AAScongurencerule
? OD = OB                          
CPCT
?Hence, AC bisects BD.
Question:6
In the given figure, ABCD is a quadrilateral in which AB = AD and BC = DC. Prove that
i
AC bisects ?A and ?C,
ii BE = DE,
iii ?ABC = ?ADC.
Solution:
Given:  ABCD is a quadrilateral in which AB = AD and BC = DC  
i
In ?ABC and ?ADC, we have:
AB = AD                                                  Given
BC = DC                                                 Given
AC is common.
i.e., ?ABC ? ?ADC                                    SSScongruencerule
? ?BAC = ?DAC and ?BCA = ?D ?CA        ByCPCT
Thus, AC bisects ?A and ? C.
ii
Now, in ?ABE and ?ADE, we have:
  AB = AD                                      Given
?BAE = ?DAE ?                               Provenabove
 AE is common.
? ?ABE ?  ?ADE                          SAScongruencerule
? BE = DE                                                
ByCPCT
 
iii   ?ABC ?  ?ADC                  Provenabove
? ?ABC = ?AD ?C                           ByCPCT
 
Question:7
In the given figure, ABCD is a square and ?PQR = 90°. If PB = QC = DR, prove that
i QB = RC,
ii PQ = QR,
iii QPR = 45°.
Solution:
Given: ABCD is a square and ?PQR = 90°.
Also, PB = QC = DR
i
We have:
  BC = CD                Sidesofsquare
  CQ = DR                   Given
  BC = BQ + CQ
? CQ = BC - BQ
? DR = BC - BQ           ...i
   
Page 5


Question:1
Three angles of a quadrilateral are 75°, 90° and 75°. Find the measure of the fourth angle.
Solution:
Given: Three angles of a quadrilateral are 75°, 90° and 75°.
Let the fourth angle be x.
Using angle sum property of quadrilateral,
75°+90°+75°+x = 360° ? 240°+x = 360°
? x = 360°-240° ? x = 120°
So, the measure of  the fourth angle is 120°
.
Question:2
The angles of a quadrilateral are in the ratio  2: 4 : 5 : 7. Find the angles.
Solution:
Let ?
A = 2x
°
?.
Then ?
B = (4x)
°
; ?
C = (5x)
°
 and ?
D = (7x)
°
Since the sum of the angles of a quadrilateral is 360
o
, we have:
2x + 4x + 5x + 7x = 360
°
   
? 18 x = 360
°
 ? ? x = 20
°
?  ?
A = 40
°
; ?
B = 80
°
; ?
C = 100
°
; ?
D = 140
°
Question:3
In the adjoining figure, ABCD is a trapezium in which AB || DC. If ?A = 55° and ?B = 70°, find ?C and ?D.
Solution:
  We have AB || DC.
 
? A  and  
? D are the interior angles on the same side of transversal line AD, whereas
? B and  
? C are the interior angles on the same side of transversal line BC. 
Now, 
?A +
?D = 180
°
?  
?D = 180
°
 -
?A   
?
? D = 180
°
 - 55
°
 = 125
°
Again ,
? B +
?C = 180
°
?  
?C  = 180
° 
-
?B  
?
? C = 180
°
 -  70
°
 = 110
°
 
Question:4
In the adjoining figure, ABCD is a square and ?EDC is an equilateral triangle. Prove that
i AE = BE,
ii ?DAE = 15°.
Solution:
Given:  ABCD is a square in which AB = BC = CD = DA. ?EDC is an equilateral triangle in which ED = EC = DC and
 
? EDC  =   
? DEC = 
? ?DCE =  60
°
.
To prove:  AE = BE and 
?DAE = 15
°
? Proof: In ?ADE and ?BCE, we have:
AD = BC             
Sidesofasquare
DE = EC ?            
Sidesofanequilateraltriangle
?ADE  = 
?BCE = 90
° 
+  60
°
 = 150
°
? 
? ?ADE ?  ?BCE
i.e., AE =  BE  
Now, 
?ADE = 150
°
DA = DC    
Sidesofasquare
DC = DE     
Sidesofanequilateraltriangle
So, DA = DE
?ADE and ?BCE are isosceles triangles.
i.e.,
?DAE = 
?DEA = 
1
2
(180° - 150°) = 
30°
2
 = 15°
 
Question:5
In the adjoining figure, BM ? AC and DN ? AC. If BM = DN, prove that AC bisects BD.
Solution:
Given: A quadrilateral ABCD, in which BM ?? AC and DN ? AC and BM = DN.
To prove: AC bisects BD; or DO = BO
Proof:
Let AC and BD intersect at O.
Now, in ?OND and ?OMB, we have:
?OND = ?OMB                 (90
o
 each)
?DON = ? BOM                 
Verticallyoppositeangles
Also, DN = BM                        
Given
i.e., ?OND ? ?OMB             AAScongurencerule
? OD = OB                          
CPCT
?Hence, AC bisects BD.
Question:6
In the given figure, ABCD is a quadrilateral in which AB = AD and BC = DC. Prove that
i
AC bisects ?A and ?C,
ii BE = DE,
iii ?ABC = ?ADC.
Solution:
Given:  ABCD is a quadrilateral in which AB = AD and BC = DC  
i
In ?ABC and ?ADC, we have:
AB = AD                                                  Given
BC = DC                                                 Given
AC is common.
i.e., ?ABC ? ?ADC                                    SSScongruencerule
? ?BAC = ?DAC and ?BCA = ?D ?CA        ByCPCT
Thus, AC bisects ?A and ? C.
ii
Now, in ?ABE and ?ADE, we have:
  AB = AD                                      Given
?BAE = ?DAE ?                               Provenabove
 AE is common.
? ?ABE ?  ?ADE                          SAScongruencerule
? BE = DE                                                
ByCPCT
 
iii   ?ABC ?  ?ADC                  Provenabove
? ?ABC = ?AD ?C                           ByCPCT
 
Question:7
In the given figure, ABCD is a square and ?PQR = 90°. If PB = QC = DR, prove that
i QB = RC,
ii PQ = QR,
iii QPR = 45°.
Solution:
Given: ABCD is a square and ?PQR = 90°.
Also, PB = QC = DR
i
We have:
  BC = CD                Sidesofsquare
  CQ = DR                   Given
  BC = BQ + CQ
? CQ = BC - BQ
? DR = BC - BQ           ...i
   
Also, CD = RC+ DR
? DR = CD -  RC = BC - RC            ...ii
From i
and ii
, we have:
BC - BQ = ?BC - RC
? BQ = RC
ii
In ?RCQ and ?QBP, we have:
PB = QC   Given
BQ = RC  Provenabove
?RCQ = ?QBP   (90
o
 each)
i.e., ?RCQ ? ?QBP       SAScongruencerule
? QR =  PQ                ByCPCT
iii
?RCQ ? ?QBP and QR = PQ Provenabove
? In ?RPQ, ?QPR = ?QRP = 
1
2
(180° - 90°) = 
90°
2
 = 45
°
Question:8
If O is a point within a quadrilateral ABCD, show that OA + OB + OC + OD > AC + BD.
Solution:
Let ABCD be a quadrilateral whose diagonals are AC and BD and O is any point within the quadrilateral. 
Join O with A, B, C, and D.
We know that the sum of any two sides of a triangle is greater than the third side.
So, in ?AOC, OA + OC > AC
Also, in ? BOD, OB + OD > BD
Adding these inequalities, we get:
(OA + OC) + (OB + OD) > (AC + BD)
? OA + OB + OC + OD > AC + BD
 
Question:9
In the adjoining figure, ABCD is a quadrilateral and AC is one of its diagonals. Prove that:
i
AB + BC + CD + DA > 2AC
ii
AB + BC + CD > DA
iii
AB + BC + CD + DA > AC + BD