Class 8 Exam > Class 8 Notes > Mathematics (Maths) Class 8 > Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8 PDF Download
| Download, print and study this document offline |
Please wait while the PDF view is loading
Page 1 RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) EXERCISE 17.3 PAGES NO: 17.22 1. Which of the following statements are true for a rectangle? (i) It has two pairs of equal sides. (ii) It has all its sides of equal length. (iii) Its diagonals are equal. (iv) Its diagonals bisect each other. (v) Its diagonals are perpendicular. (vi) Its diagonals are perpendicular and bisect each other. (vii) Its diagonals are equal and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. (ix) All rectangles are squares. (x) All rhombuses are parallelograms. (xi) All squares are rhombuses and also rectangles. (xii) All squares are not parallelograms. Solution: (i) It has two pairs of equal sides. True, in a rectangle two pairs of sides are equal. (ii) It has all its sides of equal length. False, in a rectangle only two pairs of sides are equal. (iii) Its diagonals are equal. True, in a rectangle diagonals are of equal length. (iv) Its diagonals bisect each other. True, in a rectangle diagonals bisect each other. (v) Its diagonals are perpendicular. False, Diagonals of a rectangle need not be perpendicular. (vi) Its diagonals are perpendicular and bisect each other. False, Diagonals of a rectangle need not be perpendicular. Diagonals only bisect each other. (vii) Its diagonals are equal and bisect each other. True, Diagonals are of equal length and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. Page 2 RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) EXERCISE 17.3 PAGES NO: 17.22 1. Which of the following statements are true for a rectangle? (i) It has two pairs of equal sides. (ii) It has all its sides of equal length. (iii) Its diagonals are equal. (iv) Its diagonals bisect each other. (v) Its diagonals are perpendicular. (vi) Its diagonals are perpendicular and bisect each other. (vii) Its diagonals are equal and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. (ix) All rectangles are squares. (x) All rhombuses are parallelograms. (xi) All squares are rhombuses and also rectangles. (xii) All squares are not parallelograms. Solution: (i) It has two pairs of equal sides. True, in a rectangle two pairs of sides are equal. (ii) It has all its sides of equal length. False, in a rectangle only two pairs of sides are equal. (iii) Its diagonals are equal. True, in a rectangle diagonals are of equal length. (iv) Its diagonals bisect each other. True, in a rectangle diagonals bisect each other. (v) Its diagonals are perpendicular. False, Diagonals of a rectangle need not be perpendicular. (vi) Its diagonals are perpendicular and bisect each other. False, Diagonals of a rectangle need not be perpendicular. Diagonals only bisect each other. (vii) Its diagonals are equal and bisect each other. True, Diagonals are of equal length and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) False, Diagonals are of equal length and bisect each other. Diagonals of a rectangle need not be perpendicular (ix) All rectangles are squares. False, in a square all sides are of equal length. (x) All rhombuses are parallelograms. True, all rhombuses are parallelograms, since opposite sides are equal and parallel. (xi) All squares are rhombuses and also rectangles. True, all squares are rhombuses, since all sides are equal in a square and rhombus. All squares are rectangles, since opposite sides are equal and parallel. (xii) All squares are not parallelograms. False, all squares are parallelograms, since opposite sides are parallel and equal. 2. Which of the following statements are true for a square? (i) It is a rectangle. (ii) It has all its sides of equal length. (iii) Its diagonals bisect each other at right angle. (v) Its diagonals are equal to its sides. Solution: (i) It is a rectangle. True. Since, opposite sides are equal and parallel where, each angle is right angle. (ii) It has all its sides of equal length. True. Since, ides of a square are of equal length. (iii) Its diagonals bisect each other at right angle. True. Since, diagonals of a square bisect each other at right angle. (v) Its diagonals are equal to its sides. False. Since, diagonals of a square are of equal length. Length of diagonals is not equal to the length of sides 3. Fill in the blanks in each of the following, so as to make the statement true : (i) A rectangle is a parallelogram in which ________. (ii) A square is a rhombus in which __________. (iii) A square is a rectangle in which ___________. Page 3 RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) EXERCISE 17.3 PAGES NO: 17.22 1. Which of the following statements are true for a rectangle? (i) It has two pairs of equal sides. (ii) It has all its sides of equal length. (iii) Its diagonals are equal. (iv) Its diagonals bisect each other. (v) Its diagonals are perpendicular. (vi) Its diagonals are perpendicular and bisect each other. (vii) Its diagonals are equal and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. (ix) All rectangles are squares. (x) All rhombuses are parallelograms. (xi) All squares are rhombuses and also rectangles. (xii) All squares are not parallelograms. Solution: (i) It has two pairs of equal sides. True, in a rectangle two pairs of sides are equal. (ii) It has all its sides of equal length. False, in a rectangle only two pairs of sides are equal. (iii) Its diagonals are equal. True, in a rectangle diagonals are of equal length. (iv) Its diagonals bisect each other. True, in a rectangle diagonals bisect each other. (v) Its diagonals are perpendicular. False, Diagonals of a rectangle need not be perpendicular. (vi) Its diagonals are perpendicular and bisect each other. False, Diagonals of a rectangle need not be perpendicular. Diagonals only bisect each other. (vii) Its diagonals are equal and bisect each other. True, Diagonals are of equal length and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) False, Diagonals are of equal length and bisect each other. Diagonals of a rectangle need not be perpendicular (ix) All rectangles are squares. False, in a square all sides are of equal length. (x) All rhombuses are parallelograms. True, all rhombuses are parallelograms, since opposite sides are equal and parallel. (xi) All squares are rhombuses and also rectangles. True, all squares are rhombuses, since all sides are equal in a square and rhombus. All squares are rectangles, since opposite sides are equal and parallel. (xii) All squares are not parallelograms. False, all squares are parallelograms, since opposite sides are parallel and equal. 2. Which of the following statements are true for a square? (i) It is a rectangle. (ii) It has all its sides of equal length. (iii) Its diagonals bisect each other at right angle. (v) Its diagonals are equal to its sides. Solution: (i) It is a rectangle. True. Since, opposite sides are equal and parallel where, each angle is right angle. (ii) It has all its sides of equal length. True. Since, ides of a square are of equal length. (iii) Its diagonals bisect each other at right angle. True. Since, diagonals of a square bisect each other at right angle. (v) Its diagonals are equal to its sides. False. Since, diagonals of a square are of equal length. Length of diagonals is not equal to the length of sides 3. Fill in the blanks in each of the following, so as to make the statement true : (i) A rectangle is a parallelogram in which ________. (ii) A square is a rhombus in which __________. (iii) A square is a rectangle in which ___________. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) Solution: (i) A rectangle is a parallelogram in which one angle is a right angle. (ii) A square is a rhombus in which one angle is a right angle. (iii) A square is a rectangle in which adjacent sides are equal. 4. A window frame has one diagonal longer than the other. Is the window frame a rectangle? Why or why not? Solution: No, diagonals of a rectangle are equal length. 5. In a rectangle ABCD, prove that ?ACB ??CAD. Solution: Let us draw a rectangle, In rectangle ABCD, AC is the diagonal. In ?ACB and ?CAD AB = CD [Opposite sides of a rectangle are equal] BC = DA AC = CA [Common] By using SSS congruency ?ACB ??CAD 6. The sides of a rectangle are in the ratio 2 : 3, and its perimeter is 20 cm. Draw the rectangle. Solution: In rectangle ABCD, Given, perimeter of a rectangle = 20cm Ratio = 2:3 So, let us consider the side as ‘x’ Length of rectangle (l) = 3x Breadth of the rectangle (b) = 2x We know that, Page 4 RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) EXERCISE 17.3 PAGES NO: 17.22 1. Which of the following statements are true for a rectangle? (i) It has two pairs of equal sides. (ii) It has all its sides of equal length. (iii) Its diagonals are equal. (iv) Its diagonals bisect each other. (v) Its diagonals are perpendicular. (vi) Its diagonals are perpendicular and bisect each other. (vii) Its diagonals are equal and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. (ix) All rectangles are squares. (x) All rhombuses are parallelograms. (xi) All squares are rhombuses and also rectangles. (xii) All squares are not parallelograms. Solution: (i) It has two pairs of equal sides. True, in a rectangle two pairs of sides are equal. (ii) It has all its sides of equal length. False, in a rectangle only two pairs of sides are equal. (iii) Its diagonals are equal. True, in a rectangle diagonals are of equal length. (iv) Its diagonals bisect each other. True, in a rectangle diagonals bisect each other. (v) Its diagonals are perpendicular. False, Diagonals of a rectangle need not be perpendicular. (vi) Its diagonals are perpendicular and bisect each other. False, Diagonals of a rectangle need not be perpendicular. Diagonals only bisect each other. (vii) Its diagonals are equal and bisect each other. True, Diagonals are of equal length and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) False, Diagonals are of equal length and bisect each other. Diagonals of a rectangle need not be perpendicular (ix) All rectangles are squares. False, in a square all sides are of equal length. (x) All rhombuses are parallelograms. True, all rhombuses are parallelograms, since opposite sides are equal and parallel. (xi) All squares are rhombuses and also rectangles. True, all squares are rhombuses, since all sides are equal in a square and rhombus. All squares are rectangles, since opposite sides are equal and parallel. (xii) All squares are not parallelograms. False, all squares are parallelograms, since opposite sides are parallel and equal. 2. Which of the following statements are true for a square? (i) It is a rectangle. (ii) It has all its sides of equal length. (iii) Its diagonals bisect each other at right angle. (v) Its diagonals are equal to its sides. Solution: (i) It is a rectangle. True. Since, opposite sides are equal and parallel where, each angle is right angle. (ii) It has all its sides of equal length. True. Since, ides of a square are of equal length. (iii) Its diagonals bisect each other at right angle. True. Since, diagonals of a square bisect each other at right angle. (v) Its diagonals are equal to its sides. False. Since, diagonals of a square are of equal length. Length of diagonals is not equal to the length of sides 3. Fill in the blanks in each of the following, so as to make the statement true : (i) A rectangle is a parallelogram in which ________. (ii) A square is a rhombus in which __________. (iii) A square is a rectangle in which ___________. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) Solution: (i) A rectangle is a parallelogram in which one angle is a right angle. (ii) A square is a rhombus in which one angle is a right angle. (iii) A square is a rectangle in which adjacent sides are equal. 4. A window frame has one diagonal longer than the other. Is the window frame a rectangle? Why or why not? Solution: No, diagonals of a rectangle are equal length. 5. In a rectangle ABCD, prove that ?ACB ??CAD. Solution: Let us draw a rectangle, In rectangle ABCD, AC is the diagonal. In ?ACB and ?CAD AB = CD [Opposite sides of a rectangle are equal] BC = DA AC = CA [Common] By using SSS congruency ?ACB ??CAD 6. The sides of a rectangle are in the ratio 2 : 3, and its perimeter is 20 cm. Draw the rectangle. Solution: In rectangle ABCD, Given, perimeter of a rectangle = 20cm Ratio = 2:3 So, let us consider the side as ‘x’ Length of rectangle (l) = 3x Breadth of the rectangle (b) = 2x We know that, RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) Perimeter of the rectangle = 2(length + breadth) 20 = 2(3x + 2x) 10x = 20 x = 20/10 = 2 Length of the rectangle = 3×2 = 6cm Breadth of the rectangle = 2×2 = 4cm Here, is the diagram of rectangle 7. The sides of a rectangle are in the ratio 4 : 5. Find its sides if the perimeter is 90 cm. Solution: In rectangle ABCD, Given, perimeter of a rectangle = 90cm Ratio = 4:5 So, let us consider the side as ‘x’ Length of rectangle (l) = 5x Breadth of the rectangle (b) = 4x We know that, Perimeter of the rectangle = 2(length + breadth) 90 = 2(5x + 4x) 18x = 90 x = 90/18 = 5 Length of the rectangle = 5×5 = 25cm Breadth of the rectangle = 4×5 = 20cm Here, is the diagram of rectangle Page 5 RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) EXERCISE 17.3 PAGES NO: 17.22 1. Which of the following statements are true for a rectangle? (i) It has two pairs of equal sides. (ii) It has all its sides of equal length. (iii) Its diagonals are equal. (iv) Its diagonals bisect each other. (v) Its diagonals are perpendicular. (vi) Its diagonals are perpendicular and bisect each other. (vii) Its diagonals are equal and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. (ix) All rectangles are squares. (x) All rhombuses are parallelograms. (xi) All squares are rhombuses and also rectangles. (xii) All squares are not parallelograms. Solution: (i) It has two pairs of equal sides. True, in a rectangle two pairs of sides are equal. (ii) It has all its sides of equal length. False, in a rectangle only two pairs of sides are equal. (iii) Its diagonals are equal. True, in a rectangle diagonals are of equal length. (iv) Its diagonals bisect each other. True, in a rectangle diagonals bisect each other. (v) Its diagonals are perpendicular. False, Diagonals of a rectangle need not be perpendicular. (vi) Its diagonals are perpendicular and bisect each other. False, Diagonals of a rectangle need not be perpendicular. Diagonals only bisect each other. (vii) Its diagonals are equal and bisect each other. True, Diagonals are of equal length and bisect each other. (viii) Its diagonals are equal and perpendicular, and bisect each other. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) False, Diagonals are of equal length and bisect each other. Diagonals of a rectangle need not be perpendicular (ix) All rectangles are squares. False, in a square all sides are of equal length. (x) All rhombuses are parallelograms. True, all rhombuses are parallelograms, since opposite sides are equal and parallel. (xi) All squares are rhombuses and also rectangles. True, all squares are rhombuses, since all sides are equal in a square and rhombus. All squares are rectangles, since opposite sides are equal and parallel. (xii) All squares are not parallelograms. False, all squares are parallelograms, since opposite sides are parallel and equal. 2. Which of the following statements are true for a square? (i) It is a rectangle. (ii) It has all its sides of equal length. (iii) Its diagonals bisect each other at right angle. (v) Its diagonals are equal to its sides. Solution: (i) It is a rectangle. True. Since, opposite sides are equal and parallel where, each angle is right angle. (ii) It has all its sides of equal length. True. Since, ides of a square are of equal length. (iii) Its diagonals bisect each other at right angle. True. Since, diagonals of a square bisect each other at right angle. (v) Its diagonals are equal to its sides. False. Since, diagonals of a square are of equal length. Length of diagonals is not equal to the length of sides 3. Fill in the blanks in each of the following, so as to make the statement true : (i) A rectangle is a parallelogram in which ________. (ii) A square is a rhombus in which __________. (iii) A square is a rectangle in which ___________. RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) Solution: (i) A rectangle is a parallelogram in which one angle is a right angle. (ii) A square is a rhombus in which one angle is a right angle. (iii) A square is a rectangle in which adjacent sides are equal. 4. A window frame has one diagonal longer than the other. Is the window frame a rectangle? Why or why not? Solution: No, diagonals of a rectangle are equal length. 5. In a rectangle ABCD, prove that ?ACB ??CAD. Solution: Let us draw a rectangle, In rectangle ABCD, AC is the diagonal. In ?ACB and ?CAD AB = CD [Opposite sides of a rectangle are equal] BC = DA AC = CA [Common] By using SSS congruency ?ACB ??CAD 6. The sides of a rectangle are in the ratio 2 : 3, and its perimeter is 20 cm. Draw the rectangle. Solution: In rectangle ABCD, Given, perimeter of a rectangle = 20cm Ratio = 2:3 So, let us consider the side as ‘x’ Length of rectangle (l) = 3x Breadth of the rectangle (b) = 2x We know that, RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) Perimeter of the rectangle = 2(length + breadth) 20 = 2(3x + 2x) 10x = 20 x = 20/10 = 2 Length of the rectangle = 3×2 = 6cm Breadth of the rectangle = 2×2 = 4cm Here, is the diagram of rectangle 7. The sides of a rectangle are in the ratio 4 : 5. Find its sides if the perimeter is 90 cm. Solution: In rectangle ABCD, Given, perimeter of a rectangle = 90cm Ratio = 4:5 So, let us consider the side as ‘x’ Length of rectangle (l) = 5x Breadth of the rectangle (b) = 4x We know that, Perimeter of the rectangle = 2(length + breadth) 90 = 2(5x + 4x) 18x = 90 x = 90/18 = 5 Length of the rectangle = 5×5 = 25cm Breadth of the rectangle = 4×5 = 20cm Here, is the diagram of rectangle RD Sharma Solutions for Class 8 Maths Chapter 17 – Understanding Shapes – III (Special Types of Quadrilaterals) 8. Find the length of the diagonal of a rectangle whose sides are 12 cm and 5 cm. Solution: In rectangle ABCD, Given, sides of a rectangle ABCD are 5cm and 12cm In ?ABC using Pythagoras theorem, AC 2 = AB 2 + BC 2 AC 2 = 12 2 + 5 2 AC 2 = 144 + 25 AC 2 = 169 AC = v169 AC = 13cm ? Length of the diagonal AC is 13cm. 9. Draw a rectangle whose one side measures 8 cm and the length of each of whose diagonals is 10 cm. Solution: Given, one side of the rectangle is 8cm. Length of the diagonal = 10cm Now let us construct a rectangle, Steps to construct a rectangle, (i) Draw a line segment AB of length 8 cm (ii) From point ‘A’ cut an arc of length 10 cm and mark that point as C. (iii) From point B draw an angle of 90°, and join the arc from point A which cuts at point C. (iv) now join AC and BC (v) From point A draw an angle of 90° and from point C cut an arc of length 8 cm to get point D. (vi) Join CD and AD to form required rectangle.Read More
|
79 videos|408 docs|31 tests
|
Related Exams
About this Document
|
4.71/5 Rating |
|
Nov 21, 2024 Last updated |
Document Description: Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 for Class 8 2024 is part of Mathematics (Maths) Class 8 preparation.
The notes and questions for Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 have been prepared according to the Class 8 exam syllabus. Information about Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 covers topics
like and Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Example, for Class 8 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises and tests below for Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2.
Introduction of Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 in English is available as part of our Mathematics (Maths) Class 8
for Class 8 & Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 in Hindi for Mathematics (Maths) Class 8 course.
Download more important topics related with notes, lectures and mock test series for Class 8
Exam by signing up for free. Class 8: Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8
Description
Full syllabus notes, lecture & questions for Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8 - Class 8 | Plus excerises question with solution to help you revise complete syllabus for Mathematics (Maths) Class 8 | Best notes, free PDF download
Information about Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2
In this doc you can find the meaning of Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 defined & explained in the simplest way possible. Besides explaining types of
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 theory, EduRev gives you an ample number of questions to practice Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 tests, examples and also practice Class 8
tests
|
Explore Courses for Class 8 exam
|
|
Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
Related Searches
past year papers
,practice quizzes
,Previous Year Questions with Solutions
,MCQs
,Summary
,Objective type Questions
,Sample Paper
,Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8
,Free
,video lectures
,Extra Questions
,Viva Questions
,Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8
,study material
,mock tests for examination
,Important questions
,ppt
,Exam
,Semester Notes
,shortcuts and tricks
,Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 | Mathematics (Maths) Class 8
;
Additional Information about Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 for Class 8 Preparation
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Free PDF Download
The Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 is an invaluable resource that delves deep into the core of the Class 8 exam.
These study notes are curated by experts and cover all the essential topics and concepts, making your preparation more efficient and effective.
With the help of these notes, you can grasp complex subjects quickly, revise important points easily,
and reinforce your understanding of key concepts. The study notes are presented in a concise and easy-to-understand manner,
allowing you to optimize your learning process. Whether you're looking for best-recommended books, sample papers, study material,
or toppers' notes, this PDF has got you covered. Download the Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 now and kickstart your journey towards success in the Class 8 exam.
Importance of Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2
The importance of Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 cannot be overstated, especially for Class 8 aspirants.
This document holds the key to success in the Class 8 exam.
It offers a detailed understanding of the concept, providing invaluable insights into the topic.
By knowing the concepts well in advance, students can plan their preparation effectively.
Utilize this indispensable guide for a well-rounded preparation and achieve your desired results.
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Notes
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Notes offer in-depth insights into the specific topic to help you master it with ease.
This comprehensive document covers all aspects related to Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2.
It includes detailed information about the exam syllabus, recommended books, and study materials for a well-rounded preparation.
Practice papers and question papers enable you to assess your progress effectively.
Additionally, the paper analysis provides valuable tips for tackling the exam strategically.
Access to Toppers' notes gives you an edge in understanding complex concepts.
Whether you're a beginner or aiming for advanced proficiency, Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Notes on EduRev are your ultimate resource for success.
Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Class 8 Questions
The "Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 Class 8 Questions" guide is a valuable resource for all aspiring students preparing for the
Class 8 exam. It focuses on providing a wide range of practice questions to help students gauge
their understanding of the exam topics. These questions cover the entire syllabus, ensuring comprehensive preparation.
The guide includes previous years' question papers for students to familiarize themselves with the exam's format and difficulty level.
Additionally, it offers subject-specific question banks, allowing students to focus on weak areas and improve their performance.
Study Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 on the App
Students of Class 8 can study Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 alongwith tests & analysis from the EduRev app,
which will help them while preparing for their exam. Apart from the Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2,
students can also utilize the EduRev App for other study materials such as previous year question papers, syllabus, important questions, etc.
The EduRev App will make your learning easier as you can access it from anywhere you want.
The content of Understanding Shapes – III (Special Types of Quadrilaterals) - EXERCISE 17.2 is prepared as per the latest Class 8 syllabus.
|
© EduRev
|
Education Revolution
|
Follow Us
|
Signup to see your scores
go up within 7 days!
Access 1000+ FREE Docs, Videos and Tests
Takes less than 10 seconds to signup