NCERT Solutions for Class 9 Maths Chapter 8 Quadrilaterals

NCERT Solutions for Class 9 Maths Chapter 8 Quadrilaterals Ex 8.1 are part of NCERT Solutions for Class 9 Maths. Here we have given NCERT Solutions for Class 9 Maths Chapter 8 Quadrilaterals Ex 8.1.

NCERT Solutions for Class 9 Maths Chapter 8 Quadrilaterals Ex 8.1

Ex 8.1 Class 9 Maths Question 1.

The angles of quadrilateral are in the ratio 3 : 5 : 9 : 13. Find all the angles of the quadrilateral.

Solution:
Let the angles of the quadrilateral be 3x, 5x, 9x and 13x.
3x + 5x + 9x + 13x = 360°
[Angle sum property of a quadrilateral]
30x = 360°
x = 36030 = 12°
3x = 3 x 12° = 36°
5x = 5 x 12° = 60°
9x = 9 x 12° = 108°
13a = 13 x 12° = 156°
The required angles of the quadrilateral are 36°, 60°, 108° and 156°.

Also See: NCERT Solutions for Class 9 Maths Chapter 15 Probability

Ex 8.1 Class 9 Maths Question 2.
If the diagonals of a parallelogram are equal, then show that it is a rectangle.

Solution:
Let ABCD is a parallelogram such that AC = BD.
image

In ∆ABC and ∆DCB,
AC = DB [Given]
AB = DC [Opposite sides of a parallelogram]
BC = CB [Common]
∆ABC ∆DCB [By SSS congruency]
ABC = DCB [By C.P.C.T.] …(1)
Now, AB || DC and BC is a transversal. [ ABCD is a parallelogram]
ABC + DCB = 180° … (2) [Co-interior angles]
From (1) and (2), we have
ABC = DCB = 90°
i.e., ABCD is a parallelogram having an angle equal to 90°.
ABCD is a rectangle.

Ex 8.1 Class 9 Maths Question 3.
Show that if the diagonals of a quadrilateral bisect each other at right angles, then it is a rhombus.

Solution:
Let ABCD be a quadrilateral such that the diagonals AC and BD bisect each other at right angles at O.
image

In ∆AOB and ∆AOD, we have
AO = AO [Common]
OB = OD [O is the mid-point of BD]
AOB = AOD [Each 90]
∆AQB ∆AOD [By,SAS congruency
AB = AD [By C.P.C.T.] ……..(1)
Similarly, AB = BC .. .(2)
BC = CD …..(3)
CD = DA ……(4)
From (1), (2), (3) and (4), we have
AB = BC = CD = DA
Thus, the quadrilateral ABCD is a rhombus.
Alternatively: ABCD can be proved first a parallelogram then proving one pair of adjacent sides equal will result in rhombus.

Ex 8.1 Class 9 Maths Question 4.
Show that the diagonals of a square are equal and bisect each other at right angles.

Solution:
Let ABCD be a square such that its diagonals AC and BD intersect at O.

image

(i) To prove that the diagonals are equal, we need to prove AC = BD.
In ∆ABC and ∆BAD, we have
AB = BA [Common]
BC = AD [Sides of a square ABCD]
ABC = BAD [Each angle is 90°]
∆ABC ∆BAD [By SAS congruency]
AC = BD [By C.P.C.T.] …(1)

(ii) AD || BC and AC is a transversal. [ A square is a parallelogram]
1 = 3
[Alternate interior angles are equal]
Similarly, 2 = 4
Now, in ∆OAD and ∆OCB, we have
AD = CB [Sides of a square ABCD]
1 = 3 [Proved]
2 = 4 [Proved]
∆OAD ∆OCB [By ASA congruency]
OA = OC and OD = OB [By C.P.C.T.]
i.e., the diagonals AC and BD bisect each other at O. …….(2)

(iii) In ∆OBA and ∆ODA, we have
OB = OD [Proved]
BA = DA [Sides of a square ABCD]
OA = OA [Common]
∆OBA ∆ODA [By SSS congruency]
AOB = AOD [By C.P.C.T.] …(3)

AOB and AOD form a linear pair.
∴∠AOB + AOD = 180°
∴∠AOB = AOD = 90° [By(3)]
AC BD …(4)
From (1), (2) and (4), we get AC and BD are equal and bisect each other at right angles.

Also See: NCERT Solutions for Class 9 Maths Chapter 14 Statistics

Ex 8.1 Class 9 Maths Question 5.
Show that if the diagonals of a quadrilateral are equal and bisect each other at right angles, then it is a square.

Solution:
Let ABCD be a quadrilateral such that diagonals AC and BD are equal and bisect each other at right angles.

image

Now, in ∆AOD and ∆AOB, We have
AOD = AOB [Each 90°]
AO = AO [Common]
OD = OB [ O is the midpoint of BD]
∆AOD ∆AOB [By SAS congruency]
AD = AB [By C.P.C.T.] …(1)
Similarly, we have
AB = BC … (2)
BC = CD …(3)
CD = DA …(4)
From (1), (2), (3) and (4), we have
AB = BC = CD = DA
Quadrilateral ABCD have all sides equal.
In ∆AOD and ∆COB, we have AO = CO [Given]
OD = OB [Given]
AOD = COB [Vertically opposite angles]
So, ∆AOD ∆COB [By SAS congruency]
∴∠1 = 2 [By C.P.C.T.]
But, they form a pair of alternate interior angles.
AD || BC
Similarly, AB || DC
ABCD is a parallelogram.
Parallelogram having all its sides equal is a rhombus.
ABCD is a rhombus.
Now, in ∆ABC and ∆BAD, we have
AC = BD [Given] BC = AD [Proved]
AB = BA [Common]
∆ABC ∆BAD [By SSS congruency]
ABC = BAD [By C.P.C.T.] ……(5)
Since, AD || BC and AB is a transversal.
∴∠ABC + BAD = 180° .. .(6) [ Co – interior angles]
ABC = BAD = 90° [By(5) & (6)]
So, rhombus ABCD is having one angle equal to 90°.
Thus, ABCD is a square

Ex 8.1 Class 9 Maths Question 6.
Diagonal AC of a parallelogram ABCD bisects A (see figure). Show that
(i) it bisects C also,
(ii) ABCD is a rhombus.

image

Solution:
We have a parallelogram ABCD in which diagonal AC bisects A
DAC = BAC

image
(i) Since, ABCD is a parallelogram.
AB || DC and AC is a transversal.
1 = 3 …(1)
[ Alternate interior angles are equal]
Also, BC || AD and AC is a transversal.
2 = 4 …(2)
[ v Alternate interior angles are equal]
Also, 1 = 2 …(3)
[ AC bisects A]
From (1), (2) and (3), we have
3 = 4 AC bisects C.

(ii) In ∆ABC, we have
1 = 4 [From (2) and (3)]
BC = AB …(4)
[ Sides opposite to equal angles of a ∆ are equal]
Similarly, AD = DC ……..(5)
But, ABCD is a parallelogram. [Given]
AB = DC …(6)
From (4), (5) and (6), we have
AB = BC = CD = DA
Thus, ABCD is a rhombus.

Also See: NCERT Solutions for Class 9 Maths Chapter 10 Circles

Ex 8.1 Class 9 Maths Question 7.
ABCD is a rhombus. Show that diagonal AC bisects Aas well as C and diagonal BD bisects B as well AS D.

Solution:
Since, ABCD is a rhombus.
AB = BC = CD = DA
Also, AB || CD and AD || BC

image
Now, CD = AD 1 = 2 …….(1)
[ Angles opposite to equal sides of a triangle are equal]
Also, AD || BC and AC is the transversal.
[ Every rhombus is a parallelogram]
1 = 3 …(2) [ Alternate interior angles are equal]
From (1) and (2), we have
2 = 3 …(3)
Since, AB || DC and AC is transversal.
2 = 4 …(4)
[ Alternate interior angles are equal] From (1) and (4),
we have 1 = 4
AC bisects C as well as A.
Similarly, we can prove that BD bisects B as well as D.

Ex 8.1 Class 9 Maths Question 8.
ABCD is a rectangle in which diagonal AC bisects A as well as C. Show that
(i) ABCD is a square
(ii) diagonal BD bisects B as well as D.

Solution:
We have a rectangle ABCD such that AC bisects A as well as C.
i.e., 1 = 4 and 2 = 3 ……..(1)

image

(i) Since, every rectangle is a parallelogram.
ABCD is a parallelogram.
AB || CD and AC is a transversal.
∴∠2 = 4 …(2)
[ Alternate interior angles are equal]
From (1) and (2), we have
3 = 4
In ∆ABC, 3 = 4
AB = BC
[ Sides opposite to equal angles of a A are equal]
Similarly, CD = DA

So, ABCD is a rectangle having adjacent sides equal.
ABCD is a square.

(ii) Since, ABCD is a square and diagonals of a square bisect the opposite angles.
So, BD bisects B as well as D.

Ex 8.1 Class 9 Maths Question 9.
In parallelogram ABCD, two points P and Q are taken on diagonal BD such that DP = BQ (see figure). Show that

image

Solution:
We have a parallelogram ABCD, BD is the diagonal and points P and Q are such that PD = QB

(i) Since, AD || BC and BD is a transversal.
ADB = CBD [ Alternate interior angles are equal]
ADP = CBQ
Now, in ∆APD and ∆CQB, we have
AD = CB [Opposite sides of a parallelogram ABCD are equal]
PD = QB [Given]
ADP = CBQ [Proved]
∆APD ∆CQB [By SAS congruency]

(ii) Since, ∆APD ∆CQB [Proved]
AP = CQ [By C.P.C.T.]

(iii) Since, AB || CD and BD is a transversal.
ABD = CDB
ABQ = CDP
Now, in ∆AQB and ∆CPD, we have
QB = PD [Given]
ABQ = CDP [Proved]
AB = CD [ Y Opposite sides of a parallelogram ABCD are equal]
∆AQB = ∆CPD [By SAS congruency]

(iv) Since, ∆AQB = ∆CPD [Proved]
AQ = CP [By C.P.C.T.]

(v) In a quadrilateral ∆PCQ,
Opposite sides are equal. [Proved]
∆PCQ is a parallelogram.

Ex 8.1 Class 9 Maths Question 10.
ABCD is a parallelogram and AP and CQ are perpendiculars from vertices A and C on diagonal BD (see figure). Show that

image

Solution:
(i) In ∆APB and ∆CQD, we have
APB = CQD [Each 90°]
AB = CD [ Opposite sides of a parallelogram ABCD are equal]
ABP = CDQ
[ Alternate angles are equal as AB || CD and BD is a transversal]
∆APB = ∆CQD [By AAS congruency] (ii) Since, ∆APB ∆CQD [Proved]
AP = CQ [By C.P.C.T.]

Ex 8.1 Class 9 Maths Question 11.
In ∆ABC and ∆DEF, AB = DE, AB || DE, BC – EF and BC || EF. Vertices A, B and C are joined to vertices D, E and F, respectively (see figure).
Show that
(i) quadrilateral ABED is a parallelogram
(ii) quadrilateral BEFC is a parallelogram

image

(iii) AD || CF and AD = CF
(iv) quadrilateral ACFD is a parallelogram
(v) AC = DF
(vi) ∆ABC ∆DEF

Solution:
(i) We have AB = DE [Given]
and AB || DE [Given]
i. e., ABED is a quadrilateral in which a pair of opposite sides (AB and DE) are parallel and of equal length.
ABED is a parallelogram.

(ii) BC = EF [Given]
and BC || EF [Given]
i.e. BEFC is a quadrilateral in which a pair of opposite sides (BC and EF) are parallel and of equal length.
BEFC is a parallelogram.

(iii) ABED is a parallelogram [Proved]
AD || BE and AD = BE …(1)
[ Opposite sides of a parallelogram are equal and parallel] Also, BEFC is a parallelogram. [Proved]
BE || CF and BE = CF …(2)
[ Opposite sides of a parallelogram are equal and parallel]
From (1) and (2), we have
AD || CF and AD = CF

(iv) Since, AD || CF and AD = CF [Proved]
i.e., In quadrilateral ACFD, one pair of opposite sides (AD and CF) are parallel and of equal length.
Quadrilateral ACFD is a parallelogram.

(v) Since, ACFD is a parallelogram. [Proved]
So, AC =DF [ Opposite sides of a parallelogram are equal]

(vi) In ∆ABC and ∆DFF, we have
AB = DE [Given]
BC = EF [Given]
AC = DE [Proved in (v) part]

∆ABC ∆DFF [By SSS congruency]

Ex 8.1 Class 9 Maths Question 12.
ABCD is a trapezium in which AB || CD and AD = BC (see figure). Show that
(i )A=B
(ii )C=D
(iii) ∆ABC ∆BAD
(iv) diagonal AC = diagonal BD

image

[Hint: Extend AB and draw a line through C parallel to DA intersecting AB produced at E].

Solution:
We have given a trapezium ABCD in which AB || CD and AD = BC.

(i) Produce AB to E and draw CF || AD.. .(1)
image

AB || DC
AE || DC Also AD || CF
AECD is a parallelogram.
AD = CE …(1)
[ Opposite sides of the parallelogram are equal]
But AD = BC …(2) [Given]
By (1) and (2), BC = CF
Now, in ∆BCF, we have BC = CF

CEB = CBE …(3)
[ Angles opposite to equal sides of a triangle are equal]
Also, ABC + CBE = 180° … (4)
[Linear pair]
and A + CEB = 180° …(5)
[Co-interior angles of a parallelogram ADCE]
From (4) and (5), we get
ABC + CBE = A + CEB
ABC = A [From (3)]
B = A …(6)

(ii) AB || CD and AD is a transversal.
A + D = 180° …(7) [Co-interior angles]
Similarly, B + C = 180° … (8)
From (7) and (8), we get
A + D = B + C
C = D [From (6)]

(iii) In ∆ABC and ∆BAD, we have
AB = BA [Common]
BC = AD [Given]
ABC = BAD [Proved]
∆ABC = ∆BAD [By SAS congruency]

(iv) Since, ∆ABC = ∆BAD [Proved]
⇒ AC = BD [By C.P.C.T.]

NCERT Solutions for Class 9 Maths Chapter 8 Quadrilaterals Ex 8.2

Question 1.
ABCD is a quadrilateral in which P, Q, R and S are mid-points of the sides AB, BC, CD and DA (see figure). AC is a diagonal. Show that
(i) SR || AC and SR = 12 AC
(ii) PQ = SR
(iii) PQRS is a parallelogram.

image

Solution:
(i) In ∆ACD, We have
S is the mid-point of AD and R is the mid-point of CD.
SR = 12AC and SR || AC …(1)
[By mid-point theorem]

(ii) In ∆ABC, P is the mid-point of AB and Q is the mid-point of BC.
PQ = 12AC and PQ || AC …(2)
[By mid-point theorem]
From (1) and (2), we get
PQ = 12AC = SR and PQ || AC || SR
PQ = SR and PQ || SR
(iii) In a quadrilateral PQRS,
PQ = SR and PQ || SR [Proved]
PQRS is a parallelogram.

Question 2.
ABCD is a rhombus and P, Q, R and S are the mid-points of the sides AB, BC, CD and DA, respectively. Show that the quadrilateral PQRS is a rectangle.

Solution:
We have a rhombus ABCD and P, Q, R and S are the mid-points of the sides AB, BC, CD and DA respectively. Join AC.

image

In ∆ABC, P and Q are the mid-points of AB and BC respectively.
PQ = 12AC and PQ || AC …(1)
[By mid-point theorem]
In ∆ADC, R and S are the mid-points of CD and DA respectively.
SR = 12AC and SR || AC …(2)
[By mid-point theorem]
From (1) and (2), we get
PQ = 12AC = SR and PQ || AC || SR
PQ = SR and PQ || SR
PQRS is a parallelogram. …….(3)
Now, in ∆ERC and ∆EQC,
1 = 2
[ The diagonals of a rhombus bisect the opposite angles]
CR = CQ [ CD2 = BC2]
CE = CE [Common]
∆ERC ∆EQC [By SAS congruency]
3 = 4 …(4) [By C.P.C.T.]
But 3 + 4 = 180° ……(5) [Linear pair] From (4) and (5), we get
3 = 4 = 90°
Now, RQP = 180° – b [ Y Co-interior angles for PQ || AC and EQ is transversal]
But 5 = 3
[ Vertically opposite angles are equal]
5 = 90°
So, RQP = 180° – 5 = 90°
One angle of parallelogram PQRS is 90°.
Thus, PQRS is a rectangle.

Question 3.
ABCD is a rectangle and P, Q, R ans S are mid-points of the sides AB, BC, CD and DA, respectively. Show that the quadrilateral PQRS is a rhombus.

Solution:

We have,
Now, in ∆ABC, we have
PQ = 12AC and PQ || AC …(1)
[By mid-point theorem]
Similarly, in ∆ADC, we have
SR = 12AC and SR || AC …(2)
From (1) and (2), we get
PQ = SR and PQ || SR
PQRS is a parallelogram.
Now, in ∆PAS and ∆PBQ, we have
A = B [Each 90°]
AP = BP [ P is the mid-point of AB]
AS = BQ [ 12AD = 12BC]
∆PAS ∆PBQ [By SAS congruency]
PS = PQ [By C.P.C.T.]
Also, PS = QR and PQ = SR [opposite sides of a parallelogram are equal]
So, PQ = QR = RS = SP i.e., PQRS is a parallelogram having all of its sides equal.
Hence, PQRS is a rhombus.

Question 4.
ABCD is a trapezium in which AB || DC, BD is a diagonal and E is the mid-point of AD. A line is drawn through E parallel to AB intersecting BC at F (see figure). Show that F is the mid-point of BC.

image

Solution:
We have,
image

In ∆DAB, we know that E is the mid-point of
AD and EG || AB [ EF || AB]
Using the converse of mid-point theorem, we get, G is the mid-point of BD.
Again in ABDC, we have G is the midpoint of BD and GF || DC.
[ AB || DC and EF || AB and GF is a part of EF]
Using the converse of the mid-point theorem, we get, F is the mid-point of BC.

Question 5.
In a parallelogram ABCD, E and F are the mid-points of sides AB and CD respectively (see figure). Show that the line segments AF and EC trisect the diagonal BD.
image

Solution:
Since, the opposite sides of a parallelogram are parallel and equal. AB || DC
AE || FC …(1)
and AB = DC
 12AB = 12DC
AE = FC …(2)
From (1) and (2), we have
AE || PC and AE = PC
∆ECF is a parallelogram.
Now, in ∆DQC, we have F is the mid-point of DC and FP || CQ
[ AF || CE]
DP = PQ …(3)
[By converse of mid-point theorem] Similarly, in A BAP, E is the mid-point of AB and EQ || AP [AF || CE]
BQ = PQ …(4)
[By converse of mid-point theorem]
From (3) and (4), we have
DP = PQ = BQ
So, the line segments AF and EC trisect the diagonal BD.

Question 6.
Show that the line segments joining the mid-points of the opposite sides of a quadrilateral bisect each other.

Solution:
Let ABCD be a quadrilateral, where P, Q, R and S are the mid-points of the sides AB, BC, CD and DA respectively.
Join PQ, QR, RS and SP.
Let us also join PR, SQ and AC.

image

Now, in ∆ABC, we have P and Q are the mid-points of its sides AB and BC respectively.
PQ || AC and PQ = 12 AC …(1)
[By mid-point theorem]
Similarly, RS || AC and RS = 12AC …(2)
By (1) and (2), we get
PQ || RS, PQ = RS
PQRS is a parallelogram.
And the diagonals of a parallelogram bisect each other, i.e., PR and SQ bisect each other. Thus, the line segments joining the midpoints of opposite sides of a quadrilateral ABCD bisect each other.

Question 7.
ABC is a triangle right angled at C. A line through the mid-point M of hypotenuse AB and parallel to BC intersects AC at D. Show that
(i) D is the mid-point of AC
(ii) MD AC
(iii) CM = MA = 12AB

Solution:
we have

image

(i) In ∆ACB, We have
M is the mid-point of AB. [Given]
MD || BC , [Given]
Using the converse of mid-point theorem,
D is the mid-point of AC.

(ii) Since, MD || BC and AC is a transversal.
MDA = BCA
[ Corresponding angles are equal] As
BCA = 90° [Given]
MDA = 90°
MD AC.

(iii) In ∆ADM and ∆CDM, we have
ADM = CDM [Each equal to 90°]
MD = MD [Common]
AD = CD [ D is the mid-point of AC]
∆ADM ∆CDM [By SAS congruency]
MA = MC [By C.P.C.T.] .. .(1)
M is the mid-point of AB [Given]
MA = 12AB …(2)
From (1) and (2), we have
CM = MA = 12AB

Kunji Team

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