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Case Study Questions for Class 8 Maths Chapter 3 Understanding Quadrilaterals

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Here we are providing Case Study questions for Class 8 Maths Chapter 3 Understanding Quadrilaterals.

Case Study Questions

Related posts, learning outcomes.

• Convex and Concave Polygons.
• Regular and Irregular Polygons.
• Sum of Measures of the Exterior Angles of a Polygon.
• Kinds of QuadrilateralTrapezium; Kite; Parallelogram.
• Some Special ParallelogramsRhombus; Rectangle; Square.

Important Keywords

• Convex Polygon: Polygons that have any line segment joining any two different points in the interior and have no portions of their diagonals in their exteriors are called convex polygons.
• Concave Polygon: Polygons that have one diagonal outside it are called concave polygons.
• Regular Polygon: A polygon whose all sides, all angles are equal that is which is both equiangular and equilateral are called regular polygon. Example: Square; Equilateral triangle
• Irregular Polygon: Polygon whose all sides are not equal are called Irregular polygon. Example: Rectangle.

Fundamental Facts

• Convex Polygon has each angle either acute or obtuse.
• Concave Polygon has one angle as reflex angle.

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• NCERT Solutions for Class 8 Maths Chapter 3 - Understanding Quadrilaterals
• NCERT Solutions

NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals - Free PDF

Students can easily download the free PDF available of NCERT Solutions for Class 8 Maths chapter 3 understanding quadrilaterals from the website. All questions are discussed by the experts of maths teachers and according to the guidelines of NCERT (CBSE). While answering the exercise questions, students will understand the topic in a more comfortable and better way. We try to keep all the answers exciting and straightforward so that students can easily understand. Other than this, you can also download the NCERT Solutions for Class 8 Science . It will help to improve the syllabus and secure good marks in the examinations. NCERT Solutions for all classes and subjects are also available on Vedantu.

Access NCERT Solutions for Class 8 Mathematics Chapter 3– Understanding Quadrilaterals

Exercise 3.1.

1. Given here are some figures.

Classify each of them on the basis of following.

Simple Curve

Ans: Given: the figures $(1)$to $(8)$

We need to classify the given figures as simple curves.

We know that a curve that does not cross itself is referred to as a simple curve.

Therefore, simple curves are $1,2,5,6,7$.

Simple Closed Curve

We need to classify the given figures as simple closed curves.

We know that a simple closed curve is one that begins and ends at the same point without crossing itself.

Therefore, simple closed curves are $1,2,5,6,7$.

We need to classify the given figures as polygon.

We know that any closed curve consisting of a set of sides joined in such a way that no two segments

cross is known as a polygon.

Therefore, the polygons are $1,2$.

Convex Polygon

We need to classify the given figures as convex polygon.

We know that a closed shape with no vertices pointing inward is called a convex polygon.

Therefore, the convex polygon is $2$.

Concave Polygon

We need to classify the given figures as concave polygon.

We know that a polygon with at least one interior angle greater than 180 degrees is called a concave

Therefore, the concave polygon is $1$.

2. How many diagonals does each of the following have? 

A Convex Quadrilateral

Ans: Given: a convex quadrilateral

We need to find the number of diagonals in the given quadrilateral

We know that a four-sided closed shape with no vertices pointing inward is called a convex quadrilateral.

Consider, a convex quadrilateral

Now, make diagonals

Therefore, a convex quadrilateral has 2 diagonals.

A Regular Hexagon

Ans: Given: A regular hexagon

We need to find the number of diagonals of a regular hexagon.

We know that a regular hexagon is a closed curve with six equal sides.

Consider, a regular hexagon

Therefore, a regular hexagon has $9$ diagonals.

Ans:  Given: A triangle

We need to find the number of diagonals of a triangle.

We know that a triangle is a closed curve having three sides.

Consider, a triangle

Therefore, a triangle does not have any diagonal.

3. What is the sum of the measures of the angles of a convex quadrilateral? Will this property hold if the quadrilateral is not convex? (Make a non-convex quadrilateral and try!)

Ans: Given: A convex quadrilateral

We need to find the sum of the measures of the angles of a convex quadrilateral. Will this property hold if the quadrilateral is not convex?

Consider, a convex quadrilateral ABCD and then make a diagonal AD.

We know that the sum of angles of a triangle is ${180^ \circ }$.

So, In $\vartriangle {\text{ACD}}$

Sum of angles of $\vartriangle {\text{ACD}}$ is ${180^ \circ }$

Now, In $\vartriangle {\text{ABD}}$ 

Sum of angles of $\vartriangle {\text{ABD}}$ is ${180^ \circ }$.

Therefore, sum of angles of a convex quadrilateral will be sum of angles of $\vartriangle {\text{ACD}}$ and $\vartriangle {\text{ABD}}$

$= {180^ \circ } + {180^ \circ } $

$= {360^ \circ } $ 

Now, consider a concave quadrilateral ABCD, and then make a diagonal AC. The quadrilateral ABCD is made of two triangles, $\vartriangle {\text{ACD}}$ and $\vartriangle {\text{ABC}}$.

Consider, $\vartriangle {\text{ACD}}$

The sum of angles of the triangle are ${180^ \circ }$.

Now, consider $\vartriangle {\text{ABC}}$

The sum of the angles of triangle are ${180^ \circ }$.

Therefore, sum of the angles of quadrilateral ABCD will be

$ = {180^ \circ } + {180^ \circ } $

$   = {360^ \circ } $ 

Thus, we can say that the property hold true for a quadrilateral which is not convex because a quadrilateral can be divided into two triangles.

4. Examine the table. (Each figure is divided into triangles and the sum of the angles deduced from that.)

What can you say about the angle sum of a convex polygon with number of sides?

Given: the table

We need to observe table and make a statement about the angle sum of a convex polygon with number of sides.

From table, we can observe that the angle sum of a convex polygon with ${\text{n}}$sides is $({\text{n}} - 2) \times {180^ \circ }.$

Therefore, the angle sum of a convex polygon with $7$ number of sides will be

$   = (7 - 2) \times {180^ \circ } $

$   = 5 \times {180^ \circ } $

$ = {900^ \circ } $ 

Ans: Given: the table

Therefore, the angle sum of a convex polygon with $8$ number of sides will be

$   = (8 - 2) \times {180^ \circ } $

$   = 6 \times {180^ \circ } $

$   = {1080^ \circ } $ 

Therefore, the angle sum of a convex polygon with $10$ number of sides will be

$ = (10 - 2) \times {180^ \circ } $

$   = 8 \times {180^ \circ } $

$   = {1440^ \circ } $ 

From table, we can observe that the angle sum of a convex polygon with ${\text{n}}$sides will be

$ = ({\text{n}} - 2) \times {180^ \circ }$

5. What is a regular polygon? State the name of a regular polygon of 

Given: $3$ sides

We need to write the statement of a regular polygon and then state the name of the regular polygon with given number of sides.

A regular polygon is a polygon having all angles equal and all sides equal.

We know that a polygon with three equal sides and each ${60^ \circ }$ angle is a triangle.

So, it will be an equilateral triangle. The diagram will be

Ans: Given: $4$ sides

We know that a polygon with four equal sides and each ${90^ \circ }$ angle is called a square.

So, the diagram will be

Ans: Given: $6$ sides

We know that a polygon with six equal sides and each ${120^ \circ }$ angle is called a regular hexagon.

6.  Find the angle measure ${\text{'x'}}$in the following figures.

Given: A quadrilateral with angles ${50^ \circ },{130^ \circ },{120^ \circ },{\text{x}}$

We need to find the value of ${\text{x}}{\text{.}}$

We know that the sum of all interior angles of a quadrilateral is ${360^ \circ }.$

${50^ \circ } + {130^ \circ } + {120^ \circ }{\text{ + x}} = {360^ \circ } $

 $  \Rightarrow {300^ \circ } + {\text{x}} = {360^ \circ } $

 $  \Rightarrow {\text{x}} = {360^ \circ } - {300^ \circ } $

 $  \Rightarrow {\text{x}} = {60^ \circ } $ 

Given: A quadrilateral with angles ${70^ \circ },{60^ \circ },{\text{x}}$

From given figure, 

$  {90^ \circ } + y = {180^ \circ } $

 $  \Rightarrow y = {180^ \circ } - {90^ \circ } $

 $  \Rightarrow y = {90^ \circ } $ 

Now, the quadrilateral has angles, ${70^ \circ },{60^ \circ },{90^ \circ }{\text{,x}}$

We know that sum of all interior angles of a quadrilateral is ${360^ \circ }.$

Thus, 

$  {70^ \circ } + {60^ \circ } + {90^ \circ }{\text{ + x}} = {360^ \circ } $

$   \Rightarrow {220^ \circ } + {\text{x}} = {360^ \circ } $

 $  \Rightarrow {\text{x}} = {360^ \circ } - {220^ \circ } $

$   \Rightarrow {\text{x}} = {140^ \circ } $ 

Ans: We need to find the value of ${\text{x}}{\text{.}}$

From given figure,

$  {70^ \circ } + {\text{a}} = {180^ \circ } $

 $ \Rightarrow {\text{a}} = {180^ \circ } - {70^ \circ } $

$   \Rightarrow {\text{a}} = {110^ \circ } $ 

$  {60^ \circ } + {\text{b}} = {180^ \circ } $

$   \Rightarrow {\text{b}} = {180^ \circ } - {60^ \circ } $

 $  \Rightarrow {\text{b}} = {120^ \circ } $ 

Therefore, the angles of the pentagon are ${30^ \circ }{\text{,x,}}{110^ \circ },{120^ \circ }{\text{,x}}$

We know that the sum of all interior angles of a pentagon is ${540^ \circ }.$

  ${30^ \circ } + {\text{x}} + {110^ \circ } + {120^ \circ } + {\text{x}} = {540^ \circ } $

  $ \Rightarrow {260^ \circ } + 2{\text{x}} = {540^ \circ } $

  $ \Rightarrow 2{\text{x}} = {540^ \circ } - {260^ \circ } $

 $  \Rightarrow 2{\text{x}} = {280^ \circ } $

  $ \Rightarrow {\text{x}} = \dfrac{{{{280}^ \circ }}}{2} $

 $  \Rightarrow {\text{x}} = {140^ \circ } $ 

Ans: Given: a regular pentagon with angle ${\text{x}}{\text{.}}$

$ 5{\text{x}} = {540^ \circ } $

 $  \Rightarrow {\text{x}} = \dfrac{{{{540}^ \circ }}}{5} $

$   \Rightarrow {\text{x}} = {108^ \circ } $ 

Find ${\text{x}} + {\text{y}} + {\text{z}}$

Given: 

We need to find the value of ${\text{x}} + {\text{y}} + {\text{z}}$.

Property Used:

A linear pair can be defined as two adjacent angles that add up to ${180^ \circ },$ or two angles that combine to form a line or right angle.

Exterior angle theorem: If a polygon is convex, the total of the exterior angle measures, one at each vertex, equals${360^ \circ }$.

Using Linear pair,

$  {\text{z}} + {30^ \circ } = {180^ \circ } $

$   \Rightarrow {\text{z}} = {180^ \circ } - {30^ \circ } $

 $  \Rightarrow {\text{z}} = {150^ \circ } $ 

Again, using Linear pair

$  {\text{x}} + {90^ \circ } = {180^ \circ } $

 $  \Rightarrow {\text{x}} = {180^ \circ } - {90^ \circ } $

$   \Rightarrow {\text{x}} = {90^ \circ } $ 

Using Exterior Angle Theorem,

$  {\text{y}} = {90^ \circ } + {30^ \circ } $

$   \Rightarrow {\text{y}} = {120^ \circ } $ 

$  {\text{x}} + {\text{y}} + {\text{z}} = {90^ \circ } + {120^ \circ } + {150^ \circ } $

Find ${\text{x}} + {\text{y}} + {\text{z}} + {\text{w}}$

We need to find the measure of ${\text{x + y + z + w}}$.

Sum of all the interior angles of a quadrilateral is ${360^ \circ }$.

$  {\text{a}} + {60^ \circ } + {80^ \circ } + {120^ \circ } = {360^ \circ } $

$   \Rightarrow {\text{a}} + {260^ \circ } = {360^ \circ } $

$   \Rightarrow {\text{a}} = {360^ \circ } - {260^ \circ } $

$   \Rightarrow {\text{a}} = {100^ \circ } $ 

$  {\text{a}} + {\text{w}} = {180^ \circ } $

 $  \Rightarrow {100^ \circ } + {\text{w}} = {180^ \circ } $

 $  \Rightarrow {\text{w}} = {180^ \circ } - {100^ \circ } $

$   \Rightarrow {\text{w}} = {80^ \circ } $ 

$  {\text{x}} + {120^ \circ } = {180^ \circ } $

$   \Rightarrow {\text{x}} = {180^ \circ } - {120^ \circ } $

$   \Rightarrow {\text{x}} = {60^ \circ } $ 

$  {\text{y}} + {80^ \circ } = {180^ \circ } $

$   \Rightarrow {\text{y}} = {180^ \circ } - {80^ \circ } $

 $  \Rightarrow {\text{y}} = {100^ \circ } $ 

$  {\text{z}} + {60^ \circ } = {180^ \circ } $

 $  \Rightarrow {\text{z}} = {180^ \circ } - {60^ \circ } $

  $ \Rightarrow {\text{z}} = {120^ \circ } $ 

$  {\text{x}} + {\text{y}} + {\text{z}} + {\text{w}} = {60^ \circ } + {100^ \circ } + {120^ \circ } + {80^ \circ } $

Exercise-3.2

1. Find ${\text{x}}$in the following figures.

We know that the sum of all exterior angles of a polygon is ${360^ \circ }.$

$  {\text{x}} + {125^ \circ } + {125^ \circ } = {360^ \circ } $

$   \Rightarrow {\text{x}} + {250^ \circ } = {360^ \circ } $

$   \Rightarrow {\text{x}} = {360^ \circ } - {250^ \circ } $

$   \Rightarrow {\text{x}} = {110^ \circ } $ 

$  {\text{x}} + {90^ \circ } + {60^ \circ } + {90^ \circ } + {70^ \circ } = {360^ \circ } $

$  \Rightarrow {\text{x}} + {310^ \circ } = {360^ \circ } $

$   \Rightarrow {\text{x}} = {360^ \circ } - {310^ \circ } $

 $  \Rightarrow {\text{x}} = {50^ \circ } $ 

2. Find the measure of each exterior angle of a regular polygon of 

Given: a regular polygon with $9$ sides

We need to find the measure of each exterior angle of the given polygon.

We know that all the exterior angles of a regular polygon are equal.

The sum of all exterior angle of a polygon is ${360^ \circ }$.

Formula Used: ${\text{Exterior}}\;{\text{angle}} = \dfrac{{{{360}^ \circ }}}{{{\text{Number}}\;{\text{of}}\;{\text{sides}}}}$

Sum of all angles of given regular polygon $ = {360^ \circ }$

Number of sides $ = 9$

Therefore, measure of each exterior angle will be

$   = \dfrac{{{{360}^ \circ }}}{9} $

 $  = {40^ \circ } $ 

Given: a regular polygon with $15$ sides

Number of sides $ = 15$

$   = \dfrac{{{{360}^ \circ }}}{{15}} $

$ = {24^ \circ } $ 

3. How many sides does a regular polygon have if the measure of an exterior angle is ${24^ \circ }$?

Ans: Given: A regular polygon with each exterior angle ${24^ \circ }$

We need to find the number of sides of given polygon.

We know that sum of all exterior angle of a polygon is ${360^ \circ }$.

Formula Used: ${\text{Number}}\;{\text{of}}\;{\text{sides}} = \dfrac{{{{360}^ \circ }}}{{{\text{Exterior}}\;{\text{angle}}}}$

Each angle measure $ = {24^ \circ }$

Therefore, number of sides of given polygon will be

$   = \dfrac{{{{360}^ \circ }}}{{{{24}^ \circ }}} $

 $  = 15 $ 

4. How many sides does a regular polygon have if each of its interior angles is ${165^ \circ }$?

Ans: Given: A regular polygon with each interior angle ${165^ \circ }$

We need to find the sides of the given regular polygon.

${\text{Exterior}}\;{\text{angle}} = {180^ \circ } - {\text{Interior}}\;{\text{angle}}$

Each interior angle $ = {165^ \circ }$

So, measure of each exterior angle will be

$   = {180^ \circ } - {165^ \circ } $

$   = {15^ \circ } $ 

Therefore, number of sides of polygon will be

$   = \dfrac{{{{360}^ \circ }}}{{{{15}^ \circ }}} $

$   = 24 $ 

Is it possible to have a regular polygon with measure of each exterior angle as ${22^ \circ }$?

Given: A regular polygon with each exterior angle ${22^ \circ }$

We need to find if it is possible to have a regular polygon with given angle measure.

We know that sum of all exterior angle of a polygon is ${360^ \circ }$. The polygon will be possible if ${360^ \circ }$ is a perfect multiple of exterior angle.

$\dfrac{{{{360}^ \circ }}}{{{{22}^ \circ }}}$ does not give a perfect quotient. 

Thus, ${360^ \circ }$ is not a perfect multiple of exterior angle. So, the polygon will not be possible.

Can it be an interior angle of a regular polygon? Why?

Ans: Given: Interior angle of a regular polygon $ = {22^ \circ }$

We need to state if it can be the interior angle of a regular polygon.

And, ${\text{Exterior}}\;{\text{angle}} = {180^ \circ } - {\text{Interior}}\;{\text{angle}}$

Thus, Exterior angle will be

$   = {180^ \circ } - {22^ \circ } $

 $  = {158^ \circ } $ 

$\dfrac{{{{158}^ \circ }}}{{{{22}^ \circ }}}$ does not give a perfect quotient. 

Thus, ${158^ \circ }$ is not a perfect multiple of exterior angle. So, the polygon will not be possible.

What is the minimum interior angle possible for a regular polygon?

Ans:   Given: A regular polygon

We need to find the minimum interior angle possible for a regular polygon.

A polygon with minimum number of sides is an equilateral triangle.

So, number of sides $ = 3$

${\text{Exterior}}\;{\text{angle}} = \dfrac{{{{360}^ \circ }}}{{{\text{Number}}\;{\text{of}}\;{\text{sides}}}}$

Thus, Maximum Exterior angle will be

$   = \dfrac{{{{360}^ \circ }}}{3} $

$   = {120^ \circ } $ 

We know, ${\text{Interior}}\;{\text{angle}} = {180^ \circ } - {\text{Exterior}}\;{\text{angle}}$

Therefore, minimum interior angle will be

$   = {180^ \circ } - {120^ \circ } $

$   = {60^ \circ } $ 

What is the maximum exterior angel possible for a regular polygon?

Ans: Given: A regular polygon

We need to find the maximum exterior angle possible for a regular polygon.

Therefore, Maximum Exterior angle possible will be

$ = {120^ \circ } $

 Exercise 3.3

1. Given a parallelogram ABCD. Complete each statement along with the definition or property used.

$\;{\text{AD}}$ = $...$

Given: A parallelogram ${\text{ABCD}}$ 

We need to complete each statement along with the definition or property used.

We know that opposite sides of a parallelogram are equal.

Hence, ${\text{AD}}$ = ${\text{BC}}$ 

$\;\angle {\text{DCB }} = $ $...$

Given: A parallelogram ${\text{ABCD}}$.

${\text{ABCD}}$ is a parallelogram, and we know that opposite angles of a parallelogram are equal.

Hence, $\angle {\text{DCB   =  }}\angle {\text{DAB}}$

${\text{OC}} = ...$ 

${\text{ABCD}}$ is a parallelogram, and we know that diagonals of parallelogram bisect each other.

Hence, ${\text{OC  =  OA}}$

$m\angle DAB\; + \;m\angle CDA\; = \;...$

Given : A parallelogram ${\text{ABCD}}$.

${\text{ABCD}}$ is a parallelogram, and we know that adjacent angles of a parallelogram are supplementary to each other.

Hence, $m\angle DAB\; + \;m\angle CDA\; = \;180^\circ $

 2. Consider the following parallelograms. Find the values of the unknowns x, y, z.

Given: A parallelogram ${\text{ABCD}}$

We need to find the unknowns ${\text{x,y,z}}$

The adjacent angles of a parallelogram are supplementary.

Therefore, ${\text{x} + 100^\circ  = 180^\circ }$

${\text{x} = 80^\circ }$ 

Also, the opposite angles of a parallelogram are equal.

Hence, ${\text{z}} = {\text{x}} = 80^\circ $ and ${\text{y}} = 100^\circ $

Given: A parallelogram.

We need to find the values of ${\text{x,y,z}}$

The adjacent pairs of a parallelogram are supplementary.

Hence, $50^\circ  + {\text{y}} = 180^\circ $

${\text{y}} = 130^\circ $

Also, ${\text{x}} = {\text{y}} = 130^\circ $(opposite angles of a parallelogram are equal)

And, ${\text{z}} = {\text{x}} = 130^\circ $ (corresponding angles)

(iii)  

Given: A parallelogram 

${\text{x}} = 90^\circ $(Vertically opposite angles)

Also, by angle sum property of triangles

${\text{x}} + {\text{y}} + 30^\circ  = 180^\circ $

${\text{y}} = 60^\circ $

Also,${\text{z}} = {\text{y}} = 60^\circ $(alternate interior angles)

Given: A parallelogram

Corresponding angles between two parallel lines are equal.

Hence, ${\text{z}} = 80^\circ $ Also,${\text{y}} = 80^\circ $ (opposite angles of parallelogram are equal)

In a parallelogram, adjacent angles are supplementary

Hence,${\text{x}} + {\text{y}} = 180^\circ $

$  {\text{x}} = 180^\circ  - 80^\circ  $

$  {\text{x}} = 100^\circ  $ 

As the opposite angles of a parallelogram are equal, therefore,${\text{y}} = 112^\circ $ 

Also, by using angle sum property of triangles

$  {\text{x}} + {\text{y}} + 40^\circ  = 180^\circ  $

$  {\text{x}} + 152^\circ  = 180^\circ  $

$  {\text{x}} = 28^\circ  $ 

And ${\text{z}} = {\text{x}} = 28^\circ $(alternate interior angles)

3. Can a quadrilateral ${\text{ABCD}}$be a parallelogram if 

(i) $\angle {\text{D}}\;{\text{ + }}\angle {\text{B}} = 180^\circ ?$

Given: A quadrilateral ${\text{ABCD}}$

We need to find whether the given quadrilateral is a parallelogram.

For the given condition, quadrilateral ${\text{ABCD}}$ may or may not be a parallelogram.

For a quadrilateral to be parallelogram, the sum of measures of adjacent angles should be $180^\circ $ and the opposite angles should be of same measures.

(ii) ${\text{AB}} = {\text{DC}} = 8\;{\text{cm}},\;{\text{AD}} = 4\;{\text{cm}}\;$and ${\text{BC}} = 4.4\;{\text{cm}}$

As, the opposite sides ${\text{AD}}$and ${\text{BC}}$are of different lengths, hence the given quadrilateral is not a parallelogram.

(iii) $\angle {\text{A}} = 70^\circ $and $\angle {\text{C}} = 65^\circ $

As, the opposite angles have different measures, hence, the given quadrilateral is a parallelogram.

4. Draw a rough figure of a quadrilateral that is not a parallelogram but has exactly two opposite angles of equal measure.

Given: A quadrilateral.

We need to draw a rough figure of a quadrilateral that is not a paralleloghram but has exactly two opposite angles of equal measure.

A kite is a figure which has two of its interior angles, $\angle {\text{B}}$and $\angle {\text{D}}$of same measures. But the quadrilateral ${\text{ABCD}}$is not a parallelogram as the measures of the remaining pair of opposite angles are not equal.

5. The measures of two adjacent angles of a parallelogram are in the ratio 3:2. Find the measure of each of the angles of the parallelogram.

Ans: Given: A parallelogram with adjacent angles in the ratio $3:2$

We need to find the measure of each of the angles of the parallelogram.

Let the angles be $\angle {\text{A}} = 3{\text{x}}$and $\angle {\text{B}} = 2{\text{x}}$

As the sum of measures of adjacent angles is $180^\circ $ for a parallelogram.

$  \angle {\text{A}} + \angle {\text{B}} = 180^\circ  $

 $ 3{\text{x}} + 2{\text{x}} = 180^\circ  $

 $ 5{\text{x}} = 180^\circ  $

 $ {\text{x}} = 36^\circ  $ 

$~\angle A=$ $\angle {\text{C}}$ $= 3{\text{x}} = 108^\circ$and $~\angle B=$ $\angle {\text{D}}$ $= 2{\text{x}} = 72^\circ$(Opposite angles of a parallelogram are equal).

Hence, the angles of a parallelogram are $108^\circ ,72^\circ ,108^\circ $and $72^\circ $.

6. Two adjacent angles of a parallelogram have equal measure. Find the measure of each of the angles of the parallelogram.

Given: A parallelogram with two equal adjacent angles.

The sum of adjacent angles of a parallelogram are supplementary.

$  \angle {\text{A}} + \;\angle {\text{B}} = 180^\circ  $

$  2\angle {\text{A}}\;{\text{ =  180}}^\circ  $

$  \angle {\text{A}}\;{\text{ = }}\;{\text{90}}^\circ  $

$  \angle {\text{B}}\;{\text{ = }}\angle {\text{A}}\;{\text{ = }}\;{\text{90}}^\circ  $

Also, opposite angles of a parallelogram are equal

$  \angle {\text{C}} = \angle {\text{A}} = 90^\circ  $

$  \angle {\text{D}} = \angle {\text{B}} = 90^\circ  $ 

Hence, each angle of the parallelogram measures $90^\circ $.

7. The adjacent figure ${\text{HOPE}}$is a parallelogram. Find the angle measures x, y and z. State the properties you use to find them.

Given: A parallelogram ${\text{HOPE}}$.

We need to find the measures of angles ${\text{x,y,z}}$and also state the properties used to find these angles.

$\angle {\text{y}} = 40^\circ $(Alternate interior angles)

And $\angle {\text{z}} + 40^\circ  = 70^\circ $(corresponding angles are equal)

$\angle {\text{z}} = 30^\circ $

Also, ${\text{x}} + {\text{z}} + 40^\circ  = 180^\circ $(adjacent pair of angles)

${\text{x}} = 110^\circ $

8. The following figures ${\text{GUNS}}$and ${\text{RUNS}}$are parallelograms. Find ${\text{x}}$and${\text{y}}$. (Lengths are in cm).

Given: Parallelogram ${\text{GUNS}}$.

We need to find the measures of ${\text{x}}$and ${\text{y}}$.

${\text{GU = SN}}$(Opposite sides of a parallelogram are equal).

$  3{\text{y }} - {\text{ }}1{\text{ }} = {\text{ }}26{\text{ }} $

$  3{\text{y }} = {\text{ }}27{\text{ }} $

$  {\text{y }} = {\text{ }}9{\text{ }} $ 

Also,${\text{SG = NU}}$

Therefore, 

$  3{\text{x}} = 18 $

$  {\text{x}} = 3 $ 

Given: Parallelogram ${\text{RUNS}}$

We need to find the value of ${\text{x}}$and ${\text{y}}{\text{.}}$

The diagonals of a parallelogram bisect each other, therefore, 

$  {\text{y }} + {\text{ }}7{\text{ }} = {\text{ }}20{\text{ }} $

$  {\text{y }} = {\text{ }}13 $

 $ {\text{x }} + {\text{ y }} = {\text{ }}16 $

$  {\text{x }} + {\text{ }}13{\text{ }} = {\text{ }}16 $

 $ {\text{x }} = {\text{ }}3{\text{ }} $ 

9. In the above figure both ${\text{RISK}}$and ${\text{CLUE}}$are parallelograms. Find the value of ${\text{x}}{\text{.}}$

Given: Parallelograms ${\text{RISK}}$and ${\text{CLUE}}$

As we know that the adjacent angles of a parallelogram are supplementary, therefore, 

In parallelogram ${\text{RISK}}$

$  \angle {\text{RKS  + }}\angle {\text{ISK}} = 180^\circ  $

 $ 120^\circ  + \angle {\text{ISK}} = 180^\circ  $ 

As the opposite angles of a parallelogram are equal, therefore,

In parallelogram ${\text{CLUE}}$,

$\angle {\text{ULC}} = \angle {\text{CEU}} = 70^\circ $

Also, the sum of all the interior angles of a triangle is $180^\circ $

$  {\text{x }} + {\text{ }}60^\circ {\text{ }} + {\text{ }}70^\circ {\text{ }} = {\text{ }}180^\circ  $

$  {\text{x }} = {\text{ }}50^\circ  $ 

10. Explain how this figure is a trapezium. Which of its two sides are parallel?

We need to explain how the given figure is a trapezium and find its two sides that are parallel.

If a transversal line intersects two specified lines in such a way that the sum of the angles on the same side of the transversal equals $180^\circ $, the two lines will be parallel to each other.

Here, $\angle {\text{NML}} = \angle {\text{MLK}} = 180^\circ $

Hence, ${\text{NM}}||{\text{LK}}$

Hence, the given figure is a trapezium.

11. Find ${\text{m}}\angle {\text{C}}$in the following figure if ${\text{AB}}\parallel {\text{CD}}$${\text{AB}}\parallel {\text{CD}}$.

Given: ${\text{AB}}\parallel {\text{CD}}$ and quadrilateral

We need to find the measure of $\angle {\text{C}}$

$\angle {\text{B}} + \angle {\text{C}} = 180^\circ $(Angles on the same side of transversal).

$  120^\circ  + \angle {\text{C}} = 180^\circ  $

$  \angle {\text{C}} = 60^\circ  $ 

12. Find the measure of $\angle {\text{P}}$and$\angle {\text{S}}$, if ${\text{SP}}\parallel {\text{RQ}}$in the following figure. (If you find${\text{m}}\angle {\text{R}}$, is there more than one method to find${\text{m}}\angle {\text{P}}$?)

Given: ${\text{SP}}\parallel {\text{RQ}}$and 

We need to find the measure of $\angle {\text{P}}$and $\angle {\text{S}}$.

The sum of angles on the same side of transversal is $180^\circ .$

$\angle {\text{P}} + \angle {\text{Q}} = 180^\circ $

$  \angle {\text{P}} + 130^\circ  = 180^\circ  $

$  \angle {\text{P}} = 50^\circ  

 $\angle {\text{R }} + {\text{ }}\angle {\text{S }} = {\text{ }}180^\circ {\text{ }} $

$  {\text{ }}90^\circ {\text{ }} + {\text{ }}\angle {\text{S }} = {\text{ }}180^\circ  $

  ${\text{ }}\angle {\text{S }} = {\text{ }}90^\circ {\text{ }} $ 

Yes, we can find the measure of ${\text{m}}\angle {\text{P}}$ by using one more method.

In the question,${\text{m}}\angle {\text{R}}$and ${\text{m}}\angle {\text{Q}}$are given. After finding ${\text{m}}\angle {\text{S}}$ we can find ${\text{m}}\angle {\text{P}}$ by using angle sum property.

Different Types of Polygons, Their Sides, and Angle Sum

Polygons are closed figures having at least or more than three sides. They are made of line segments only. Polygons are classified according to the number of sides they have. Some of the most common polygons and their properties are given in the table below.

Understanding Quadrilaterals Class 8

According to geometry, a quadrilateral is a covered, two-dimensional shape that has four straight sides. The polygon has four vertices or corners. Quadrilaterals will typically imply approved forms with four sides like rectangle, square, Trapezoid, kite, or uneven and uncharacterized. From the polygon formula, we can also derive the Sum of interior angles, i.e. (n - 2) × 180, where n stands for the polygon's number of sides. However, squares, rectangles, etc., are particular types of quadrilaterals with some of their sides and equal angles.

Different Types of Quadrilaterals

There are five types of quadrilaterals based on their shape:

Parallelogram

A rectangle is a kind of quadrilateral having four right angles. Hence, every angle in a rectangle is equal (360°/4 = 90°). Moreover, the opposite planes of a rectangle are parallel and similar. Diagonals bisect each other. Letting the length of the rectangle L and breadth B then,

Area of a Rectangle = Length(L) × Breadth(B).

Perimeter = 2 × (L + B).

Properties:

Every angle of a rectangle are 90°.

Opposite sides are equal and Parallel.

Diagonals of a rectangle bisect each other.

Square is another quadrilateral having four equal sides and angles. It's also a normal quadrilateral as both its sides and angles are equal. Accurately like a rectangle, a square has four angles of 90 degrees each. We can also call it a rectangle whose two adjacent sides are equal. Letting the side of a square 'a' then,

Area = a × a = a².

Perimeter = 2 × (a + a) = 4a.

All the angles are 90°.

Each and every side is parallel and also equal to each other.

Diagonals bisect each other perpendicularly.

A parallelogram is a simple quadrilateral whose opposite sides are parallel, as we can understand by the name itself. Thus, it consists of two pairs of parallel sides. Besides, the opposite angles in a parallelogram are alike, and its diagonals divide each other.

Opposite angles are equal.

Opposite sides are equal and parallel.

Diagonals bisect each other.

The summation of any two adjacent angles is 180 degrees.

A rhombus is also a quadrilateral whose all four sides are identical in length and opposite sides parallel. However, the angles are not similar to 90°. A rhombus with right angles would match a square. We often call rhombus a diamond' as it looks similar to the diamond suit in playing cards. Letting the side of a rhombus is 'a' then, the perimeter = 4a.

Considering the length of two diagonals of the rhombus are d1 and d2, then the rhombus area = ½ × d1 × d2.

All planes are equal, and opposite planes are parallel.

The diagonals bisect each other at 90°.

A trapezium is also a quadrilateral having one parallel side pair. The parallel sides are known as 'bases,' and the rest are known as 'legs' or lateral sides. Letting the height of a trapezium 'h' then:

Perimeter = Sum of lengths of all the sides = AB + BC + CD + DA.

Area = ½ × (Sum of lengths of parallel sides) × h = ½ × (AB + CD) × h.

A trapezium is another type of quadrilateral in which it follows a single property where only one pair of opposite sides of trapezium should be parallel to each other.

Kite: A Special Quadrilateral

Kite is a quadrilateral that has the following properties.

It has two pairs of consecutive sides that are equal in size.

Diagonals intersect each other at 90°, therefore the diagonals of a kite are perpendicular to each other.

When diagonals intersect each other, only one of them will be bisected.

NCERT Solutions for Class 8 Maths - Chapterwise Solutions

Chapter 1 - Rational Numbers

Chapter 2 - Linear Equations in One Variable

Chapter 4 - Practical Geometry

Chapter 5 - Data Handling

Chapter 6 - Squares and Square Roots

Chapter 7 - Cubes and Cube Roots

Chapter 8 - Comparing Quantities

Chapter 9 - Algebraic Expressions and Identities

Chapter 10 - Visualising Solid Shapes

Chapter 11 - Mensuration

Chapter 12 - Exponents and Powers

Chapter 13 - Direct and Inverse Proportions

Chapter 14 - Factorisation

Chapter 15 - Introduction to Graphs

Chapter 16 - Playing with Numbers

We Cover all the Given Exercises of Chapter 3 Understanding Quadrilaterals:-

Benefits of ncert solutions for class 8 maths chapter 3 understanding quadrilaterals.

Our subject specialists worked hard to make the solutions to NCERT Answers for Class 8 Mathematics Chapter 3 Understanding Quadrilaterals easier to comprehend for students. We have answered all of the questions from the chapter in the NCERT textbook. Students will be able to recognise the problems and solve them correctly in the test if they refer to these solutions.

Quick Revision 

Quadrilaterals are majorly of 6 types - Squares, Rectangles, Parallelograms, Trapeziums, Rhombuses, and Kites. It is important that students learn the formulas of area and perimeter for these quadrilaterals. It is also imperative that they revise the same so that they can use these to solve sums from this chapter quickly and efficiently.

List of Formulas

There are two major kinds of formulas related to quadrilaterals - Area and Perimeter. The following tables depict the formulas related to the areas and perimeters of different kinds of quadrilaterals.

Area of Quadrilaterals

Perimeter of quadrilaterals.

Perimeter of any quadrilateral is equal to the sum of all its sides, that is, AB + BC + CD + AD.

In conclusion, NCERT Solutions for Class 8 Maths Chapter 3 - Understanding Quadrilaterals provide a comprehensive and detailed understanding of the properties and characteristics of various types of quadrilaterals. By studying this chapter and using the NCERT solutions, students can enhance their knowledge of quadrilaterals and develop their problem-solving abilities.

The chapter begins by introducing the concept of a quadrilateral and its different types, such as parallelograms, rectangles, squares, rhombuses, and trapeziums. Each type is explained in terms of its defining properties, including sides, angles, diagonals, and symmetry.

FAQs on NCERT Solutions for Class 8 Maths Chapter 3 - Understanding Quadrilaterals

1. What is the Area of a Field in the Shape of a Rectangle with Dimensions of 20 Meters and 40 Meters?

We know that the field is rectangular. Hence, we can apply the area of a rectangle to find the field area.

Length of the field = 40 Metre

Width of the field = 20 Metre

Area of the rectangular field = Length × Width = 40 × 20 = 800 Sq. Meters.

We know if the length of the rectangle is L and breadth is B then,

Area of a rectangle = Length × Breadth or L × B

Perimeter = 2 × (L + B)

So, the properties and formulas of quadrilaterals that are used in this question:

Area of the Rectangle = Length × Width

So, we used only a specific property to find the answer.

2. Find the Rest of the Angles of a Parallelogram if one Angle is 80°?

For a parallelogram ABCD, as we know the properties:

The summation of any two adjacent angles = 180 degrees.

So, the angles opposite to the provided 80° angle will likewise be 80°.

Like we know, know that the Sum of angles of any quadrilateral = 360°.

So, if ∠A = ∠C = 80° then,

Sum of ∠A, ∠B, ∠C, ∠D = 360°

Also, ∠B = ∠D

Sum of 80°, ∠B, 80°, ∠D = 360°

Or, ∠B +∠ D = 200°

Hence, ∠B = ∠D = 100°

Now, we found all the angles of the quadrilateral, which are:

3. Why are the NCERT Solutions for Class 8 Maths Chapter 3 important?

The questions included in NCERT Solutions for Chapter 3 of Class 8 Maths are important not only for the exams but also for the overall understanding of quadrilaterals. These questions have been answered by expert teachers in the subject as per the NCERT (CBSE) guidelines. As the students answer the exercises, they will grasp the topic more comfortably and in a better manner.

4. What are the main topics covered in NCERT Solutions for Class 8 Maths Chapter 3?

All the topics of the syllabus of Class 8 Maths Chapter 3 have been dealt with in detail in the NCERT Solutions by Vedantu. The chapter is Understanding Quadrilaterals and has four exercises. All the important topics in Quadrilaterals have also been carefully covered. Students can also refer to the important questions section to get a good idea about the kind of questions usually asked in the exam.

5. Do I need to practice all the questions provided in the NCERT Solutions Class 8 Maths “Understanding Quadrilaterals”?

It helps to solve as many questions as possible because Mathematics is all about practice. If you solve all the practice questions and exercises given in NCERT Solutions for Class 8 Maths, you will be able to score very well in your exams comfortably. This will also help you understand the concepts clearly and allow you to apply them logically in the questions.

6. What are the most important concepts that I need to remember in Class 8 Maths Chapter 3?

For Class 8 Maths Chapter 3, you must remember the definition, characteristics and properties of all the quadrilaterals prescribed in the syllabus, namely, parallelogram, rhombus, rectangle, square, kite, and trapezium. Also know the properties of their angles and diagonals. Regular practise will help students learn the chapter easily.

7. Is Class 8 Maths Chapter 3 Easy?

Class 8 chapter 3 of Maths is a really interesting but critical topic. It's important not only for the Class 8 exams but also for understanding future concepts in higher classes. So, to stay focused and get a good grip of all concepts, it is advisable to download the NCERT Solutions for Class 8 Maths from the Vedantu website or from the Vedantu app at free of cost. This will help the students to clear out any doubts and allow them to excel in the exams. 

NCERT Solutions for Class 8 Maths

Ncert solutions for class 8.

NCERT Solutions Class 8 Maths Chapter 3 Understanding Quadrilaterals

NCERT solutions for class 8 maths chapter 3 understanding quadrilaterals define a polygon as a simple closed curve that is made up of straight lines. Thus, a quadrilateral can be defined as a polygon that has four sides, four angles, and four vertices. This chapter starts by introducing children to some very important concepts that they need to learn before moving on to studying quadrilaterals . These topics include the classification of polygons on the basis of sides, examining diagonals , concave, convex, regular, and irregular polygons as well as the angle sum property. The scope of NCERT solutions class 8 maths chapter 3 is very vast as there are several properties and types of quadrilaterals available. However, the explanation given in these solutions helps to simplify the learning process ensuring that students can build a strong geometrical foundation. 

Class 8 maths NCERT solutions chapter 3 elaborates on special quadrilaterals such as squares , rectangles , parallelograms , kites , and rhombuses . They show kids how to solve problems based on these figures and intelligently utilize the associated properties to remove the complexities from such questions. In the NCERT solutions Chapter 3 Understanding Quadrilaterals we will take an in-depth look at the basic elements and theories of these four-sided polygons and also you can find some of these in the exercises given below.

• NCERT Solutions Class 8 Maths Chapter 3 Ex 3.1
• NCERT Solutions Class 8 Maths Chapter 3 Ex 3.2
• NCERT Solutions Class 8 Maths Chapter 3 Ex 3.3
• NCERT Solutions Class 8 Maths Chapter 3 Ex 3.4

NCERT Solutions for Class 8 Maths Chapter 3 PDF

Using the NCERT solutions class 8 maths children can solidify several concepts of quadrilaterals. They understand the conditions under which a special quadrilateral such as a parallelogram becomes a square, how to find the measure of an interior or exterior angle , and so on. The links to all these brief and precise solutions are given below and kids can use them to improve their mathematical acumen.

☛ Download Class 8 Maths NCERT Solutions Chapter 3 Understanding Quadrilaterals

NCERT Class 8 Maths Chapter 3   Download PDF

NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals

Quadrilaterals form a vital shape contributing to geometrical studies. Thus, children need to develop a robust conceptual foundation as they will require it in higher classes for solving more complicated problems and constructing this figure. They can do this by revising the solutions given above regularly. The following sections deal with an exercise-wise detailed analysis of NCERT Solutions Class 8 Maths Chapter 3 understanding quadrilaterals.

• Class 8 Maths Chapter 3 Ex 3.1 - 7 Questions
• Class 8 Maths Chapter 3 Ex 3.2 - 6 Questions
• Class 8 Maths Chapter 3 Ex 3.3 - 12 Questions
• Class 8 Maths Chapter 3 Ex 3.4 - 6 Questions

☛ Download Class 8 Maths Chapter 3 NCERT Book

Topics Covered: Identifying the polygon, finding the measure of angles, and verifying the exterior angles of a polygon are topics under class 8 maths NCERT solutions chapter 3. Apart from this, there are many sections dealing with the various elements of trapeziums , parallelograms, rectangles, squares, etc.

Total Questions: There are a total of 31 fantastic sums in Class 8 maths chapter 3 Understanding Quadrilaterals. 7 are simple theory-based problems, 16 are in-between and 8 are higher-order thinking sums.

List of Formulas in NCERT Solutions Class 8 Maths Chapter 3

The questions in the NCERT solutions class 8 maths chapter 3 are not only based on some formulas but also see the use of various vital properties. The sum of interior and exterior angles , along with theorems give the keys to attempting these sums. The angle sum property states that the sum of all the interior angles of a polygon is a multiple of the number of triangles that make up that polygon. Such pointers covered in NCERT solutions for class 8 maths chapter 3 make up the crux of this lesson and are given below.

• Angle Sum Property of a Quadrilateral: a + b + c + d = 360°. (a, b, c, d are the interior angles).
• The opposite sides and opposite angles of a parallelogram are equal in length.
• The adjacent angles in a parallelogram are supplementary.
• The diagonals of a parallelogram bisect each other.
• The diagonals of a rhombus are perpendicular bisectors of one another.

Important Questions for Class 8 Maths NCERT Solutions Chapter 3

Ncert solutions for class 8 maths video chapter 3, faqs on ncert solutions class 8 maths chapter 3, do i need to practice all questions provided in ncert solutions class 8 maths understanding quadrilaterals.

All the sums in the NCERT Solutions Class 8 Maths Understanding Quadrilaterals cover different subtopics of the lesson. These sums also pave a foundation for the geometrical topics in grades that are to follow. Thus, it is crucial for kids to practice all questions so as to get a clear idea of all the components in a quadrilateral.

What are the Important Topics Covered in Class 8 Maths NCERT Solutions Chapter 3?

Each exercise is based on a different topic such as angles of a polygon, rhombus, square, and rectangles; thus, each section that falls under the NCERT Solutions Class 8 Maths Chapter 3 must be given equal importance. Kids need to strategize their studies to focus more on learning properties and then applying them to questions.

How Many Questions are there in NCERT Solutions Class 8 Maths Chapter 3 Understanding Quadrilaterals?

There are a total of 31 questions in the NCERT Solutions Class 8 Maths Chapter 3 Understanding Quadrilaterals that are distributed among 4 exercises. There are different types of questions such as true and false sums, identifying the type of shape based on certain properties, and finding the measure of a particular angle using formulas.

What are the Important Formulas in Class 8 Maths NCERT Solutions Chapter 3?

Formulas such as the angle sum property of a quadrilateral, exterior angle property of a polygon, and other associated theories form the foundation of the NCERT Solutions Class 8 Maths Chapter 3. Students must spend a good amount of time practicing questions so as to get a good understanding of their application.

How CBSE Students can utilize NCERT Solutions Class 8 Maths Chapter 3 effectively?

To effectively utilize NCERT Solutions Class 8 Maths Chapter 3 it is advised that students go through the theory and solved examples associated with each exercise. They should then try to attempt the problem on their own. Finally, to get the best out of these solutions kids should cross-check their answers and go through the steps so that they can organize their answers in a well-structured manner.

Why Should I Practice NCERT Solutions Class 8 Maths Understanding Quadrilaterals Chapter 3?

The only way to ensure that a student has perfected his knowledge of a chapter is by practicing the questions periodically. The NCERT Solutions Class 8 Maths Understanding Quadrilaterals Chapter 3 has been given by experts with certain tips included to simplify the problems. By regular revision, kids will be confident with the topic and can get an amazing score in their examination.

• CBSE-Understanding Quadrilaterals
• Sample Questions

Understanding Quadrilaterals-Sample Questions

• STUDY MATERIAL FOR CBSE CLASS 8 MATH
• Chapter 1 - Algebraic Expressions and Identities
• Chapter 2 - Comparing Quantities
• Chapter 3 - Cubes and Cube Roots
• Chapter 4 - Data handling
• Chapter 5 - Direct and Inverse Proportions
• Chapter 6 - Exponents and Powers
• Chapter 7 - Factorization
• Chapter 8 - Introduction to Graphs
• Chapter 9 - Mensuration
• Chapter 10 - Playing with Numbers
• Chapter 11 - Practical Geometry
• Chapter 12 - Squares and Square Roots
• Chapter 13 - Visualizing Solid Shapes
• Chapter 14 - Linear Equations in One Variable
• Chapter 15 - Rational Numbers
• Chapter 16 - Understanding Quadrilaterals

NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals

NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals are provided below. Our solutions covered each questions of the chapter and explains every concept with a clarified explanation. To score good marks in Class 8 Mathematics examination, it is advised to solve questions provided at the end of each chapter in the NCERT book.

NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals are prepared based on Class 8 NCERT syllabus, taking the types of questions asked in the NCERT textbook into consideration. Further, all the CBSE Class 8 Solutions Maths Chapter 3 are in accordance with the latest CBSE guidelines and marking schemes.

Class 8 Maths Chapter 3 Exercise 3.1 Solutions

Class 8 Maths Chapter 3 Exercise 3.2 Solutions

Class 8 Maths Chapter 3 Exercise 3.3 Solutions

Class 8 Maths Chapter 3 Exercise 3.4 Solutions

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NCERT Solutions for Class 8 Maths Chapter 3 Understanding Quadrilaterals

Ncert solutions for class 8 maths chapter 3 understanding quadrilaterals| pdf download.

• Exercise 3.1 Chapter 3 Class 8 Maths NCERT Solutions
• Exercise 3.2 Chapter 3 Class 8 Maths NCERT Solutions
• Exercise 3.3 Chapter 3 Class 8 Maths NCERT Solutions
• Exercise 3.4 Chapter 3 Class 8 Maths NCERT Solutions

NCERT Solutions for Class 8 Maths Chapters:

How many exercises in chapter 3 understanding quadrilaterals, what is equilateral triangle, in a quadrilateral abcd, the angles a, b, c and d are in the ratio 1 : 2 : 3 : 4. find the measure of each angle of the quadrilateral., the interior angle of a regular is 108°. find the number of sides of the polygon., contact form.

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8th Class Mathematics Understanding Quadrilaterals Question Bank

Done understanding quadrilaterals total questions - 44.

question_answer 1) ABCD is a quadrilateral. If AC and BD bisect each other, what is ABCD?

A)  A square      done clear

B)                         A parallelogram done clear

C)                         A rectangle    done clear

D)                         All the above done clear

question_answer 2) ABCD is a parallelogram. The angle bisectors of \[\angle A\] and \[\angle D\] meet at O. What is the measure of \[\angle AOD\]?

A)  \[{{45}^{o}}\]                    done clear

B)                         \[{{90}^{o}}\]                    done clear

C)                         \[{{75}^{o}}\]                                    done clear

D)                         \[{{180}^{o}}\]                 done clear

question_answer 3) The diagonal of a rectangle is \[10\text{ }cm\] and its breadth is\[6\text{ }cm\]. What is its length?

A)  \[6\text{ }cm\] done clear

B)                                                        \[5\,\,cm\]                         done clear

C)                         \[8\,\,cm\]                         done clear

D)                         \[4\,\,cm\] done clear

A)   \[p+q+r+s=w+x+y+z\] done clear

B)                         \[p+q+r+s<w+x+y+z\] done clear

C)                         \[p+q+r+s>w+x+y+z\]       done clear

D)                         Either (B) or (C) done clear

question_answer 5) What do you call a parallelogram which has equal diagonals?

A)  A trapezium   done clear

B)                         A rectangle done clear

C)                         A rhombus    done clear

D)                         A kite done clear

question_answer 6) In a square ABCD, the diagonals bisect at O. What type of a triangle is AOB?

A)  An equilateral triangle. done clear

B)                         An isosceles but not a right angled triangle. done clear

C)                         A right angled but not an isosceles triangle. done clear

D)                         An isosceles right angled triangle. done clear

question_answer 7) The perimeter of a parallelogram is\[180\text{ }cm\]. If one side exceeds the other by \[10\text{ }cm,\] what are the sides of the parallelogram?

A)  \[40\text{ }cm,\text{ }50\text{ }cm~\] done clear

B)                         \[45\text{ }cm\] each done clear

C)                         \[50\text{ }cm\] each    done clear

D)                         \[45\text{ }cm,\text{ }50\text{ }cm\] done clear

question_answer 8) In the quadrilateral ABCD, the diagonals   AC and BD are equal and perpendicular to each other. What type of a quadrilateral is ABCD?

D)                         A trapezium done clear

A)  \[{{90}^{o}}\]                    done clear

B)                         \[{{60}^{o}}\]    done clear

C)                         \[{{45}^{o}}\]                    done clear

D)                         \[{{135}^{o}}\] done clear

question_answer 10) In a parallelogram ABCD, if \[AB=2x+5,\]\[CD~=y+1,\] \[AD=y+5~\] and \[BC=3x-4,\]what is the ratio of AB and BC?

A)  \[71:21\]                             done clear

B)                         \[12:11\]                                             done clear

C)                         \[31:35\]                             done clear

D)                         \[4:7\]  done clear

question_answer 11) If ABCD is an isosceles trapezium, what is the measure of \[\angle C\]?

A)  \[\angle B\]                                       done clear

B)                         \[\angle A\]                       done clear

C)                         \[\angle D\]                                       done clear

D)                         \[{{90}^{o}}\] done clear

question_answer 12) A diagonal of a rectangle is inclined to one side of the rectangle at \[{{25}^{o}}\]. What is the measure of the acute angle between the diagonals?

A)  \[{{25}^{o}}\]                    done clear

B)                         \[{{40}^{o}}\]  done clear

C)                         \[{{50}^{o}}\]                    done clear

D)                         \[{{55}^{o}}\] done clear

question_answer 13) If angles P, Q, R and S of the quadrilateral PQRS, taken in order, are in the ratio \[3:7:6:4,\]what is PQRS?

A)  A rhombus                         done clear

B)                         A parallelogram               done clear

C)                         A trapezium                      done clear

A)  A square done clear

B)                         A trapezium done clear

C)                         An isosceles trapezium done clear

D)                         A rectangle done clear

question_answer 15) If two adjacent angles of a parallelogram are in the ratio \[3:2,\]what are their measures?

A)  \[{{108}^{o}},{{72}^{o}}\]      done clear

B)                         \[{{72}^{o}},{{36}^{o}}\] done clear

C)                         \[{{100}^{o}},{{80}^{o}}\]      done clear

D)                         \[{{144}^{o}},{{36}^{o}}\] done clear

A)  \[{{60}^{o}}\]                                    done clear

B)                         \[{{70}^{o}}\]                    done clear

C)                         \[{{80}^{o}}\]                                    done clear

D)                         \[{{85}^{o}}\]                    done clear

A)  \[2\]     done clear

B)                                                         \[3\]                     done clear

C)                         \[-3\]                    done clear

D)                         \[-2\] done clear

A)  \[12,5,13\]                         done clear

B)                         \[5,12,13\]         done clear

C)                         \[5,13,5\]                            done clear

D)                         \[12,13,5\] done clear

A)  \[{{100}^{o}},\text{ }{{80}^{o}},\text{ }{{100}^{o}}\] done clear

B)                         \[{{100}^{o}},\text{ }{{100}^{o}},\text{ }{{80}^{ol}},\] done clear

C)                         \[{{80}^{o}},{{100}^{o}},{{100}^{o}}\] done clear

D)                         \[{{80}^{o}},{{80}^{o}},{{100}^{o}}\] done clear

A)  \[{{36}^{o}}\]                    done clear

B)                         \[{{72}^{o}}\]    done clear

C)                         \[{{108}^{o}}\]                 done clear

D)                         \[{{120}^{o}}\] done clear

A)  \[{{210}^{o}}\]                 done clear

B)                         \[{{110}^{o}}\] done clear

C)                         \[{{540}^{o}}\]                 done clear

D)                         \[{{105}^{o}}\] done clear

question_answer 22) Each interior angle of a regular polygon is \[{{150}^{o}}\] How many sides has the polygon?

A)  \[8\]                                     done clear

B)                         \[12\]                   done clear

C)                         \[9\]                                     done clear

D)                         \[10\] done clear

A)  \[{{30}^{o}}\]                    done clear

B)                         \[{{40}^{o}}\]    done clear

C)                         \[{{60}^{o}}\]                                    done clear

D)                         \[{{50}^{o}}\] done clear

A)  \[{{100}^{o}}\]                 done clear

C)                         \[{{130}^{o}}\]                 done clear

D)                         \[{{120}^{o}}\]                 done clear

question_answer 25) Each interior angle of a regular polygon is \[{{162}^{o}}\] How many sides has the polygon?

A)  \[12\]                   done clear

B)                                                         \[20\]                   done clear

C)                         \[16\]                                                   done clear

question_answer 26) ABCD is a quadrilateral such that \[AB=BC,\] \[AD=\frac{1}{2}CD\] and \[AD=\frac{1}{4}AB\]. If \[BC=12\text{ }cm,\]what is the measure of AD?

A)  \[6\,cm\]                            done clear

B)                         \[4\,cm\]            done clear

C)                         \[12\,cm\]                          done clear

D)                         \[3\,cm\]                            done clear

A)  \[4\]                     done clear

B)                         \[3\sqrt{3}\]      done clear

C)                         \[3\]                                     done clear

D)                         \[5\] done clear

question_answer 28) How many measurements are required to construct a quadrilateral?

A)  \[5\]                                     done clear

B)                         \[4\]    done clear

D)                         \[2\]                     done clear

question_answer 29) How many unique measurements are needed to construct a parallelogram?

A)  \[2\]                                     done clear

B)                         \[3\]    done clear

C)                         \[4\]                                     done clear

D)                         \[1\] done clear

question_answer 30) What is the minimum number of dimensions needed to construct a rectangle?

A)  \[1\]                                     done clear

B)                         \[2\]                     done clear

C)                        \[3\]                                      done clear

D)                         \[4\]                     done clear

question_answer 31) What is the minimum number of measurements needed to construct a square?

B)                         \[2\]      done clear

D)                         \[4\] done clear

A) \[{{15}^{o}}\]                     done clear

B)                        \[{{30}^{o}}\]                     done clear

C)                        \[{{45}^{o}}\]                     done clear

D)                        \[{{60}^{o}}\] done clear

A)  A trapezium      done clear

B)                         A rhombus done clear

C)                         A rectangle   done clear

A)  \[{{200}^{o}}\]                 done clear

B)                         \[{{270}^{o}}\]                 done clear

C)                         \[{{360}^{o}}\]                 done clear

D)                         \[{{540}^{o}}\] done clear

question_answer 35) In a trapezium ABCD, AB is parallel to CD and the diagonals intersect each other at O. What is the ratio of OA and OC?

A)  \[\frac{OB}{OD}\]                                           done clear

B)                         \[\frac{BC}{CD}\]                            done clear

C)                         \[\frac{AD}{AB}\]                                            done clear

D)                         \[\frac{AC}{BD}\] done clear

question_answer 36) In \[\Delta ABC,\] P and Q are the midpoints of AB and AC. If PQ is produced to R such that \[PQ=QR,\]what is PRCB?

A)  A rectangle   done clear

B)                         A square done clear

C)                         A rhombus   done clear

D)                         A parallelogram done clear

question_answer 37) Three angles of a quadrilateral are equal and the measure of the fourth angle is \[{{120}^{o}}\]. Find the measure of each of these equal angles.

A)  \[{{80}^{o}}\]                    done clear

B)                         \[{{120}^{o}}\]                 done clear

C)                         \[{{60}^{o}}\]                    done clear

D)                         \[{{140}^{o}}\]                 done clear

question_answer 38) A quadrilateral has three acute angles, each measuring \[{{75}^{o}}\] Find the measure of the fourth angle.

A)  \[{{65}^{o}}\]                    done clear

B)                         \[{{135}^{o}}\]                 done clear

C)                         \[{{140}^{o}}\]                 done clear

D)                        \[{{225}^{o}}\] done clear

B)                         \[{{110}^{o}}\]                 done clear

C)                         \[{{120}^{o}}\]                 done clear

D)                         \[{{130}^{o}}\]                 done clear

A)  \[{{45}^{o}}\]                    done clear

C)                         \[{{255}^{o}}\]                 done clear

D)                         \[{{225}^{o}}\] done clear

A)  \[{{28}^{o}}\]                    done clear

B)                         \[{{33}^{o}}\]                    done clear

C)                         \[{{55}^{o}}\]                    done clear

D)                         \[{{37}^{o}}\]                    done clear

A)  \[{{47}^{o}}\]                    done clear

B)                         \[{{24}^{o}}\]                    done clear

C)                         \[{{67}^{o}}\]                    done clear

D)                         \[{{58}^{o}}\] done clear

A)  \[{{105}^{o}}\]                 done clear

B)                         \[{{95}^{o}}\]                    done clear

C)                         \[{{135}^{o}}\]                 done clear

A)  \[{{85}^{o}}\]                    done clear

B)                         \[{{65}^{o}}\]                    done clear

C)                         \[{{50}^{o}}\]                    done clear

D)                         \[{{130}^{o}}\] done clear

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Understanding Quadrilaterals Class 8 Notes PDF (Short & Handwritten)

Revision notes make you aware of those topics that you might have missed during your regular classes. Thus, Understanding Quadrilaterals is an extremely important chapter of Class 8 Maths and so, all students who have opted for Maths in their intermediate should refer to the Understanding Quadrilaterals Class 8 Notes. The revision notes work as a reference that help students like you to revise the concepts and formulas which you have studied earlier from your Mathematics textbook.

Therefore, to help you better learn the Understanding Quadrilaterals concepts and techniques to solve questions, we have mentioned here the PDF of revision notes. The Understanding Quadrilaterals notes in the PDF file can be downloaded for free of cost from this page.

Understanding Quadrilaterals Notes PDF

The PDF file is easy to access and often free, it is popular among students as they can carry them anywhere they want into their device like smartphone, Laptop, etc. Keeping in mind the convenience of students, our subject matter experts have prepared the Understanding Quadrilaterals Notes PDF which is very illustrative and can help you recall all of your previous learning of Class 8 Maths Understanding Quadrilaterals.

The Understanding Quadrilaterals PDF notes can be a fun and time saving study resource that can help students to cover all the important and highlighted key points of the chapter.

Topic wise Class 8 Understanding Quadrilaterals Notes

Our Maths experts have organised the Class 8 Understanding Quadrilaterals Notes in a topic wise manner. Because of that students are able to find an organised study resource that enables them to focus on study and avoid clutter in learning.

The topic wise Understanding Quadrilaterals notes PDF is an ideal study resource that improves memory power and increases the attention. The notes are considered a great tool to develop a deeper understanding in the concepts explained. Keeping in mind this, our subject experts have prepared our own revision notes for Understanding Quadrilaterals.

How to Download Understanding Quadrilaterals Class 8 Notes in PDF for Free?

Follow the below-given steps to download Understanding Quadrilaterals Class 8 Notes in PDF for Free.

• Open Selfstudys.com: Selfstudys is an online platform that offers free study resources for K-11 students. Thus, to download Understanding Quadrilaterals Class 8 Notes in PDF for free you have to open Selfstudys.com on your browser.
• Navigate to NCERT Books & Solutions: The links to download Class 8 Understanding Quadrilaterals notes PDF are available within the NCERT Books & Solutions which you can find in the navigation menu/button.
• Enter into NCERT Notes Menu: In order to access the Notes of Class 8 Understanding Quadrilaterals, you have to enter into NCERT Notes Menu. To do this, click on NCERT Notes within the NCERT Books and Solutions menu

• Choose Class: There is a list of classes, but you have to choose Class 8 in order to download the Understanding Quadrilaterals Class 8 Notes PDF.

• Now, Select Maths and Access Understanding Quadrilaterals Notes for Free: At this moment, you are two steps away from downloading your revision notes. Click on Maths as mentioned in the given image and then the page will reload where you can download the Understanding Quadrilaterals Class 8 Notes for free of cost.

Understanding Quadrilaterals Class 8 Notes That Can Help You Score Better Marks

We all agree that students need to do lots of practice in order to master Maths; however, it isn’t an easy task because without a proper understanding of the concepts it wouldn’t be easy to solve even a single question from the chapter Understanding Quadrilaterals. But the Class 8 Understanding Quadrilaterals notes that we provide here are a very ideal study resource to develop a higher level of understanding in the topic.

A good grip on the concepts of Class 8 Understanding Quadrilaterals can assist candidates to easily score better marks due to two reasons:

• Revision notes are short yet precise that help students to cover more important concepts in a lesser time.
• Research suggests that repeatedly memorising something boosts depth of mental processing as a result; thus, it develops deeper levels of analysis that produce more elaborate, longer-lasting, and stronger memory.

In conclusion, we can say that Notes of Understanding Quadrilaterals along with a regular practice of questions can help students to score better marks as they can remember the topics for a longer period of time.

Other than Notes of Understanding Quadrilaterals You Can Use

In case, if you make your mind to not only focus on Understanding Quadrilaterals Class 8 notes then you can use -

• MCQ Test of Understanding Quadrilaterals: Similar to notes, solving the Mock test of Understanding Quadrilaterals can help you recall your previous learning from the chapter. If you want to level up your preparation level and want to challenge your conceptual understanding of the Understanding Quadrilaterals you can use the CBSE MCQ test.
• Chapter End Questions of Understanding Quadrilaterals: The Understanding Quadrilaterals notes PDF that we provide here are prepared referring to the NCERT Class 8 Maths Book so, those who want to use other study resources than revision notes of Understanding Quadrilaterals can use the NCERT Books. The book contains exercises that enable the learners to solve various questions to cross-check how well they understood the topic.
• Highlighted Points of Topic: Every single chapter contains the key points that grab attention to readers, even such highlighted points are considered important. Thus, if you want to take a pause for a while from using the Understanding Quadrilaterals PDF notes then you can go back to your preferred textbook to read those highlighted points of the topic.

The Right Time To Use Understanding Quadrilaterals Class 8 Notes

There is no right or wrong time to use Understanding Quadrilaterals Class 8 Maths Notes as long as you are sincere about your study; however, there are 3 most important times that we think all students should revise whatever they have studied in Understanding Quadrilaterals. 

• On a weekly basis after completing the chapter Understanding Quadrilaterals: There’s a few students who dedicate themselves in learning Maths during regular classes; however, experts suggests that revision just after completing the chapter Understanding Quadrilaterals can help students to deepen their understanding in the concepts that were explained in the lesson. Thus, the right time to use the Understanding Quadrilaterals Class 8 Notes can be on a weekly basis after finishing the chapter’s basics subtopics.
• During Board Exam Preparation: The importance of revision Notes of Understanding Quadrilaterals can be understood during the board exam preparation because it saves time and allows students to cover the complete chapter in a lesser time. Also, the board exam preparation time often becomes a mess but the notes are neat, clean and organised in a manner that helps students to be more productive.
• While preparing for competitive exams like JEE: Class 8 Understanding Quadrilaterals is not limited to board exams only, rather it plays a crucial role in national level competitive exam preparation. Therefore, the use of Understanding Quadrilaterals Class 8 Notes PDF while preparing for competitive exams like JEE can be a great time.

What You Definitely Need to Revise Class 8 Understanding Quadrilaterals?

The Understanding Quadrilaterals is an important part of higher level Maths, because in standard like 11, students have to study various topics at the same time, it becomes a challenge to handle so many topics and subjects at the same time. Thus, here we have listed what you definitely need to revise Class 8 Understanding Quadrilaterals for the ease of your study and exam preparation.

• A Short Notes of Understanding Quadrilaterals: You wouldn’t like to use the revision Notes of Understanding Quadrilaterals that look like bulky textbooks, cluttered with so much information in an unorganised manner, right? So, you need a short yet precise Short Notes of Understanding Quadrilaterals that can help you recall your learnings from the chapter within a few minutes. You can find such Notes of Understanding Quadrilaterals here on Selfstudys website.
• Easy To Understand Definitions: Unclear and lengthy definitions never work, and it becomes very challenging to retain such definitions for a longer time. Therefore, you need revision notes that can help you easily understand the definitions of Understanding Quadrilaterals. Easy to understand definitions help you retain them for a longer time and give you an ability to recall them wherever you need them to solve a particular question related to Understanding Quadrilaterals.
• Some Questions of Understanding Quadrilaterals to Practise: Without solving the questions of Understanding Quadrilaterals a revision is incomplete. If you really want to revise the topics, you must solve the questions based on Understanding Quadrilaterals. Such questions can be found from Notes of Understanding Quadrilaterals that we provide here or from the NCERT Class 8 Maths textbooks. Our Maths experts have mentioned the questions of Understanding Quadrilaterals especially in Class 8 Maths notes so that a learner can use them to practise.

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Unit 3: Understanding quadrilaterals

• Polygons as special curves (Opens a modal)
• Open and closed curves Get 3 of 4 questions to level up!
• Polygon types Get 3 of 4 questions to level up!

Angle sum property

• Sum of interior angles of a polygon (Opens a modal)
• Sum of the exterior angles of a polygon (Opens a modal)
• Angles of a polygon Get 3 of 4 questions to level up!
• Interior and exterior angles of a polygon Get 3 of 4 questions to level up!

Kinds of quadrilaterals

• Intro to quadrilateral (Opens a modal)
• Quadrilateral types (Opens a modal)
• Kites as a geometric shape (Opens a modal)
• Analyze quadrilaterals Get 3 of 4 questions to level up!
• Quadrilateral types Get 3 of 4 questions to level up!

Properties of a parallelogram

• Proof: Opposite sides of a parallelogram (Opens a modal)
• Proof: Opposite angles of a parallelogram (Opens a modal)
• Proof: Diagonals of a parallelogram (Opens a modal)
• Side and angle properties of a parallelogram (level 1) Get 3 of 4 questions to level up!
• Side and angle properties of a parallelogram (level 2) Get 3 of 4 questions to level up!
• Diagonal properties of parallelogram Get 3 of 4 questions to level up!

Some special parallelograms

• Proof: Rhombus diagonals are perpendicular bisectors (Opens a modal)
• Rhombus diagonals (Opens a modal)