Quadrilateral - Practically Study Material (2024)

9.1. INTRODUCTION
If there are four points in a plane in such a way that no three of them are collinear, then the figure obtained by joining four points, in order is called a quadrilateral. We can say that a quadrilateral is a closed figure with four sides :

e.g. ABCD is a quadrilateral which has four sides AB, BC, CD and DA, four angles $∠ A, ∠ B, ∠ C and ∠ D$ and four vertices A, B, C and D and also has two diagonals AC and BD. i.e. A quadrilateral has four sides, four angles, four vertices and two diagonals.
9.2. ANGLES SUM PROPERTY OF A QUADRILATERAL
Theorem : The sum of the angles of a quadrilateral is 360^o
Given : Let ABCD be a quadrilateral and AC be its one diagonal

To prove : $∠$ A + $∠$ B + $∠$ C + $∠$ D = 360^o
Solution : In $△$ ACD, we have
$∠$ DAC + $∠$ ACD + $∠$ D = 180^o… (i)
[Angles sum property]
In $△$ ABC, we have
$∠$ BAC + $∠$ ACB + $∠$ B = 180^o … (ii)
[Angles sum property]
Adding (i) and (ii), we get
$∠$ DAC + $∠$ ACD + $∠$ D + $∠$ BAC + $∠$ ACB + $∠$ B
= 180^o + 180^o
$\Rightarrow$ ( $∠$ DAC + $∠$ BAC) + ( $∠$ ACD + $∠$ ACB) + $∠$ D + $∠$ B = 360^o
$∴$ A + $∠$ C + $∠$ D + $∠$ B = 360^o
Hence, $∠$ A + $∠$ B + $∠$ C + $∠$ D = 360^o Proved.
9.3. TYPES OF QUADRILATERALS
I. A Trapezium : In a quadrilateral if one pair of opposite sides is parallel, then it is called a trapezium i.e. If AB || CD then quadrilateral ABCD is a trapezium.

II. A parallelogram : In a quadrilateral, if both pairs of opposite sides are parallel and equal, then it is called a parallelogram. i.e., AB || CD and AB = CD; AD || BC and AD = BC, then ABCD is a parallelogram.

III. A Rectangle : In a quadrilaterals (parallelogram) if all angles are right angles, then it is called a rectangle. i.e. AB || CD, AB = CD, AD || BC; AD = BC and $∠$ A = $∠$ B = $∠$ C = $∠$ D = 90^o, then ABCD is a rectangle.

To prove : $△$ ABC $≅$ $△$ CDA,
Solution : In $△$ ABC and $△$ CDA, we have
BC || AD and AC is a transversal
$∴$ $∠$ BCA = $∠$ DAC [Pair of alternate angles]
Similarly, AB || DC and AC is a transversal
$∴$ $∠$ BAC = $∠$ DCA [Pair of alternate angles]
and AC = AC [Common]
Hence, $△$ ABC $≅$ $△$ CDA [By ASA congruence rule]
i.e. Diagonal AC divides parallelogram ABCD into two congruent triangles ABC and CDA.
Theorem : If each pair of opposite sides of a quadrilateral is equal, then it is a parallelogram.
Given : Let ABCD be a quadrilateral in which AB = CD and BC = AD .

To prove : ABCD is a parallelogram.
Construction : Joined AC
Solution: In $△^{s}$ ABC and CDA, we have
AB = CD [Given]
BC = AD [Given]
and AC = AC [Common]
$∴ △ ABC ≅ △ CDA$ [By SSS congruence rule]
$∴$ $∠$ CAB = $∠$ ACD … (i)
and $∠$ ACB = $∠$ CAD … (ii) [By CPCT]
Now, line AC intersects AB and DC at A and C, such that
$∠$ CAB = $∠$ ACD [From (i)]
But these are alternate interior angles
$∴$ AB || DC … (iii)
Similarly, line AC intersects BC and AD at C and A such that
$∠$ ACB = $∠$ CAD [from (ii)]
But these are alternate interior angles
$∴$ BC || AD … (iv)
From (iii) and (iv), we have
AB || DC and BC || AD
Hence, ABCD is a parallelogram. Proved.
Theorem : In a parallelogram, opposite angles are equal.
If ABCD is a parallelogram,

Then, $∠$ A = $∠$ C and $∠$ B = $∠$ D
Theorem : If in a quadrilateral, each pair of opposite angles is equal, then it is a parallelogram.
Given : ABCD is a quadrilateral in which $∠$ A = $∠$ C and $∠$ B = $∠$ D .

To prove : ABCD is a parallelogram
Solution : In quadrilateral ABCD, we have
$∠$ A = $∠$ C … (i) [Given]
$∠$ B = $∠$ D …(ii) [Given]
Now, adding (i) and (ii) we get
$∠$ A + $∠$ B = $∠$ C + $∠$ D … (iii)
We know that the sum of the angles of a quadrilateral is 360^o.
$∴$ $∠$ A + $∠$ B + $∠$ C + $∠$ D = 360^o
$\Rightarrow$ $∠$ A + $∠$ B) + ( $∠$ A + $∠$ B) = 360^o [From (iii)]
$\Rightarrow 2 (∠ A + ∠ B) = 360 °$
$∴$ $∠$ A + $∠$ B = 180^o … (iv)
i.e. $∠$ A + $∠$ B = $∠$ C + $∠$ D = 180^o … (v)
[From (iii) and (iv)]
line AB intersects AD and BC at A and B respectively, such that
$∠$ A + $∠$ B = 180^o[The sum of consecutive interior angles is 180^o]
$∴$ AD || BC … (vi)
Again, $∠$ A + $∠$ B = 180^o
$\Rightarrow$ $∠$ C + $∠$ B = 180^o [ $∵$ $∠$ A = $∠$ C given]
Line BC intersects AB and DC at A and C respectively, such that
$∠$ B + $∠$ C = 180^o
$∴$ AB || DC [The sum of consecutive interior angles is 180^o]… (vii)
From (vi) and (vii), we get
AD || BC and AB || DC
Hence, ABCD is a parallelogram.
Theorem : The diagonals of a parallelogram bisect each other.
Given : ABCD is a parallelogram in which AB = CD, AB || CD and BC = AD; BC || AD diagonals AC and BD intersect each other at O.

To prove :
OA = OC and OB = OD
Solution :
In $△$ OAB and $△$ OCD
AB || CD and BD is a transversal [Given]
$∴$ $∠$ ABD = $∠$ CDB [Pair of alternate angles]
$\Rightarrow$ $∠$ BAO = $∠$ CDO
Again, $∵$ BC || AD and AC is a transversal [Given]
$∴$ $∠$ BAC = $∠$ DCA [Pair of alternate angles]
$\Rightarrow$ $∠$ BAO = $∠$ DCO
and AB = CD [Given]
$∴ △ OAB ≅ △ OCD$ [By ASA congruence rule]
Hence, OA = OC [By CPCT] and OB = OD Proved.
Converse of the above Theorem
If the diagonals of a quadrilateral bisect each other, then it is a parallelogram.
Given :
Let ABCD be a quadrilateral in which diagonals AC and BD bisect each other at O;
i.e. OA = OC and OB = OD.

To prove :
ABCD quadrilateral is a parallelogram
Solution:
In $△ S$ AOD and COB, we have
AO = CO [Given]
OD = OB [Given]
and $∠$ AOD = $∠$ BOC [Vertically opposite angles]
$∴ △ AOD ≅ △ COB$ [By SAS congruence rule]
$∴$ $∠$ OAD = $∠$ OCB [By CPCT] … (i)
But these are alternate interior angles
$∴$ AD || BC. Similarly, AB || CD
Hence, ABCD is a parallelogram. Proved.
Theorem :
A quadrilateral is a parallelogram if a pair of opposite sides is equal and parallel
Given :
ABCD is a quadrilateral in which AB = CD and AB || CD .

To prove :
ABCD is a parallelogram.
Construction :
Joined AC.
Solution:
In $△^{s}$ ABC and CDA, we have
AB = CD [Given]
AC = AC [Common]
and $∠$ BAC = $∠$ DCA
[ $∵$ AB||CD and AC is a transversal. $∴$ Alternate interior angles are equal]
$∴ △ ABC ≅ △ CDA$ [SAS congruence rule]
$∴$ $∠$ BCA = $∠$ DAC [By CPCT]
But these are alternate angles.
$∴$ AD || BC
Now, AB || CD and AD || BC. Hence, quadrilateral ABCD is a parallelogram. Proved.
9.5. MIDPOINT THEOREM
The line segment joining the mid-points of two sides of a triangle is parallel to the third side.
Given :
ABC is a triangle in which D and E are the mid-points of sides AB and AC respectively DE is joined.

To prove :
DE || BC and DE = 1/2 BC
Construction : Line segment DE, is produced to F, such that DE = EF joined FC.
Proof : In $△^{s}$ AED and CEF, we have
AE = CE [ $∵$ E is the midpoint of AC Given]
$∠$ AED = $∠$ CEF [vertically opposite angles]
and DE = EF [By construction]
$∴ △ AED ≅ △ CEF$ [By SAS congruence rule]
$∴$ AD = CF … (i) [By CPCT]
and $∠$ ADE = $∠$ CFE … (ii) [By CPCT]
Now, D is the mid-point of AB
$∴$ AD = BD
$\Rightarrow$ DB = CF … (iii) [From (i) AD = CF]
DF intersects AD and FC at D and F respectively such that
$∠$ ADE = $∠$ CFE … [From (ii)]
i.e. alternate interior angles are equal
$∴$ AD || FC
$\Rightarrow$ DB || CF … (iv)
From (iii) and (iv), we get that DBCF is a quadrilateral such that one pair side is equal and parallel
$∴$ DBCF is a parallelogram
$∴$ DF || BC and DF = BC [ $∵$ opposite sides of a || gm are equal are parallel]
But, D, E, F are collinear and DE = EF
Hence, DE || BC and DE = ½ BC. Proved.
Converse of above Theorem : The line drawn through the mid-point of one side of a triangle, parallel to another side bisects the third side.
Given : Let ABC be a triangle in which E is the mid-point of AB, line l is passing through E and is parallel to BC, and CM || BA intersects AC at point F.

To prove : AF = CF
Construction : CM || BE and intersecting line l at D is drawn
Proof : $∵$ CM || BE and l || BC
$∴$ BCDE is a parallelogram.
$∴$ BE = CD [opposite sides of a ||gm]
But BE = AE [Given]
$∴$ AE = CD … (i)
Now, in $△$ AEF and $△$ CDF, we have
$∠$ AFE = $∠$ CFD [vertically opposite angles]
$∠$ A = $∠$ FCD [Alternate angles]
AE = CD … [from (i)]
$∴ △ AEF ≅ △ CDF$ [AAS congruence rule]
Hence, AF = CF [CPCT].