Class 8 Exam  >  Class 8 Notes  >  Class 8 Mathematics by VP Classes  >  NCERT Solutions (Part- 4)- Algebraic Expressions and Identities

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes PDF Download

Exercise 9.5

Question 1. Use a suitable identity to get each of the following products.

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes                          NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes    NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Solution: (i) Using the identity,

(x + a)(x + b) = x2 + (a + b)x + ab

we have

(x + 3)(x + 3) = x2 + (3 + 3)x + (3 * 3)

= x2 + 6x + 9

(ii) Using the identity,

(x + a)(x + b) = x2 + (a + b)x + ab,

we have

(2y + 5)(2y + 5) = (2y)2 + (5 + 5)2y + (5 * 5)

= 4y2 + (10)2y + 25

= 4y2 + 20y + 25

(iii) Using the identity, (a – b)2 = a2 – 2ab + b2

(2a – 7)(2a – 7) = (2a – 7)2

= (2a)2 – 2(2a)(7) + (7)2

= 4a2 – 28a + 49

(iv) Using the Identity, (a – b)2 = a2 – 2ab + b2, we have

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

(v) Using the identity, (a + b)(a – b) = a2 – b2,

we have

(1.1m – 0.4)(1.1m – 0.4) = (1.1m)2 – (0.4)2

= 1.21m2 – 0.16

(vi) ∵ (a2 + b2)(–a2 + b2) = (b2 + a2)(b2 – a2)

∴ Using the identity, (a + b)(a – b) = a2 – b2, we have

(b2 + a2)(b2 – a2)= (b2)2 – (a2)2 = b4 – a4

(vii) ∵ (6x – 7)(6x + 7) = (6x + 7)(6x – 7)

∴  Using the identity, (a + b)(a – b) = a2 – b2,

we have

(6x + 7)(6x – 7) = (6x)2 – (7)2

= 36x2 – 49

(viii) Using the identity, (a + b)2 = a2 + 2ab + c2, we have

(–a + c)(–a + c) = (–a + c)2

= (–a)2 + 2(–a)(c) + (c)2

= a2 + 2(–ac) + c2

= a2 – 2ac + c2

(ix) Using the identity, (a + b)2 = a2 + b2 + 2ab, we have

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

(x) Using the identity, (a – b)2 = a2 – 2ab + b2 we have

(7a – 9b)(7a – 9b) = (7a – 9b)2

= (7a)2 – 2(7a)(9b) + (9b)2

= 49a2 – 126ab + 81b2

Question 2. Use the identity (x + a)(x + b) = x2 + (a + b)x + ab to find the following products.

(i) (x + 3)(x + 7) (ii) (4x + 5)(4x + 1) (iii) (4x – 5)(4x – 1)
(iv) (4x + 5)(4x – 1) (v) (2x + 5y)(2x + 3y)
(vi) (2a2 + 9)(2a2 + 5) (vii) (xyz – 4)(xyz – 2)

Solution: 

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Question 3. Find the following squares by using the identities.

(i) (b – 7) (ii) (xy + 3z)2 (iii) (6x2 – 5y)  NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes 
 (v) (0.4p – 0.5q)2  (vi) (2xy + 5y)2

Solution: 

(i) (b – 7)2

Using (a – b)= a2 – 2ab – b2, we have

(b – 7)2 = (b)2 – 2(b)(7) + (7)2

= b2 – 14b + 49

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Question 4. Simplify:

(i) (a2 – b2)2                                                        (ii) (2x + 5)– (2x – 5)2     

(iii) (7m – 8n)2 + (7m + 8n)2                     (iv) (4m + 5n)2 + (5m + 4n)2             

(v) (2.5p – 1.5q)2 – (1.5p – 2.5q)2            (vi) (ab + bc)2 – 2ab2c         

(vii) (m2 – n2m)2 + 2m3n2

Solution:

(i) (a2 – b2)2 = (a2)2 – 2a2 * b2 + (b2)2 [using (a – b)2 = a2 – 2ab + b2]

= a4 – 2a2b2 + b4

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Question 5. Show that

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Solution:

(i) LHS = (3x + 7)2 – 84x

= (3x)2 + 2(3x)(7) + (7)2 – 84x

= 9x2 + 42x + 49 – 84x

= 9x2 + (42 – 84)x + 49

= 9x2 – 42x + 49

RHS = (3x – 7)2

= (3x)2 – 2(3x)(7) + (7)2

= 9x2 – 42x + 49 = LHS

Since, LHS = RHS

∴ (3x + 7)2 – 84x = (3x – 7)2

(ii) LHS = (9p – 5q)+ 180pq

= (9p)2 – 2(9p)(5q) + (5q)2 + 180pq

= 81p2 – 90pq + 25q2 + 180pq

= 81p+ (–90 + 180)pq + 25q2

= 81p+ 90pq + 25q2

RHS = (9p + 5q)2

= (9p)2 + 2(9p)(5q) + (5q)2

= 81p2 + 90pq + 25q2

Since, LHS = RHS

∴ (9p – 5q)2 + 180pq = (9p + 5q)2

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

Question 6. Using identities, evaluate:

(i) 712 (ii) 992 (iii) 1022 (iv) 9982 (v) 5.22 (vi) 297 * 303 (vii) 78 * 82 (viii) 8.92 (ix) 1.05 * 9.5

Solution: 

(i) ∵ (71) = (70 + 1)

∴ (71)2 = (70 + 1)2

= (70)2 + 2(70)(1) + (1)2        [Using (a + b)2 = a2 + 2ab + b2]

= 4900 + 140 + 1 = 5041

(ii) We have 100 – 1 = 99

∴ (99)2 = (100 – 1)2

= (100)2 – 2(100)(1) + (1)2    [Using (a – b)2 = a2 – 2ab + b2]

= 10000 – 200 + 1 = 9801

(iii) ∵ 102 = 100 + 2

∴ (102)2 = (100 + 2)2

= (100)2 + 2(100)(2) + (2)2         [Using (a + b)2 = a2 + 2ab + b2]

= 10000 + 400 + 4 = 10404

(iv) ∵ 998 = 1000 – 2

∴ (998)2 = (1000 – 2)2

= (1000)2 – 2(1000)(2) + (2)2              [Using (a – b)2 = a2 – 2ab + b2]

= 1000000 – 4000 + 4 = 996004

(v) ∵ 5.2 = 5 + 0.2

∴  (5.2)2 = (5 + 0.2)2

= (5)2 + 2(5)(0.2) + (0.2)2                  [Using (a + b)2 = a2 + 2ab + b2]

= 25 + 2 + 0.04 = 27.04

(vi) ∵ 297 = 300 – 3 and 303 = 300 + 3

∴ 297 * 303 = (300 – 3)(300 + 3)

= (300)2 – (3)2                                [Using (a + b)(a – b) = a2 – b2]

= 90000 – 9 = 89991

(vii) ∵ 78 = 80 – 2 and 82 = 80 + 2

∴ 78 * 82 = (80 – 2)(80 + 2)

= 802 – (2)2                                   [Using (a + b)(a – b) = a2 – b2]

= 6400 – 4 = 6396

(viii) ∵ 8.9 = (9 – 0.1)

∴ (8.9)2 = (9 – 0.1)

= (9)2 – 2(9)(0.1) + (0.1)2              [Using (a – b)2 = a2 – 2ab + b2]

= 81 – 1.8 + 0.01

= 81.01 – 1.80 = 79.21

(ix) ∵ 1.05 = 1 + 0.05

∴ (1.05) * 9.5 = (1 + 0. 05) * 9.5

= (1 * 9.5) + (9.5 * 0.05)

= 9.500 + 0.475 = 9.975

Question 7. Using a2 – b2 = (a + b)(a – b), find:

(i) 512 – 492 (ii) (1.02)– (0.98)2 (iii) 1532 – 1472 (iv) 12.12 – 7.92

Solution: 

(i) 512 – 492 = (51 + 49)(51 – 49)

= (100)* (2) = 200

(ii) (1.02)2 – (0.98)2 = (1.02 + 0.98)(1.02 – 0.98)

= (2.0) * (0.04) = 0.08

(iii) 1532 – 1472 = (153 + 147)(153 – 147)

= (300) * (6) = 1800

(iv) (12.1)2 – (7.9)2 = (12.1 + 7.9)(12.1 – 7.9)

= 20 * 4.2 = 84

Question 8. Using (x + a)(x + b) = x2 + (a + b)x + ab,
find: (i) 103 * 104 (ii) 5.1 * 5.2
(iii) 103 * 98 (iv) 9.7 * 9.8

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

The document NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes is a part of the Class 8 Course Class 8 Mathematics by VP Classes.
All you need of Class 8 at this link: Class 8
90 docs|16 tests

Top Courses for Class 8

FAQs on NCERT Solutions (Part- 4)- Algebraic Expressions and Identities - Class 8 Mathematics by VP Classes

1. What are algebraic expressions?
Ans. Algebraic expressions are mathematical expressions that consist of variables, constants, and mathematical operations such as addition, subtraction, multiplication, and division. They can include one or more terms and can be simplified or evaluated using specific rules and properties.
2. How are algebraic expressions different from equations?
Ans. Algebraic expressions are mathematical expressions that represent a quantity or a relationship between quantities, whereas equations are mathematical statements that assert the equality of two expressions. In other words, an equation involves an equal sign, while an algebraic expression does not.
3. What are identities in algebraic expressions?
Ans. Identities in algebraic expressions are equations that hold true for all values of the variables involved. They are useful for simplifying and solving equations. For example, the identity (a + b)^2 = a^2 + 2ab + b^2 holds true for any values of a and b.
4. How can algebraic expressions be simplified?
Ans. Algebraic expressions can be simplified by combining like terms, applying the distributive property, and using the rules of exponents. Like terms are terms that have the same variables raised to the same powers. By combining these terms, the expression can be simplified to its simplest form.
5. Can algebraic expressions be solved for specific values?
Ans. Yes, algebraic expressions can be solved for specific values by substituting the given values into the expression and evaluating it. This is often done to find the value of an expression at a particular point or to solve equations. By substituting the values, the expression can be simplified to a numerical value.
90 docs|16 tests
Download as PDF
Explore Courses for Class 8 exam

Top Courses for Class 8

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

Summary

,

Free

,

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

,

Objective type Questions

,

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

,

shortcuts and tricks

,

past year papers

,

mock tests for examination

,

Exam

,

Semester Notes

,

pdf

,

Important questions

,

Extra Questions

,

Previous Year Questions with Solutions

,

Sample Paper

,

video lectures

,

MCQs

,

study material

,

practice quizzes

,

NCERT Solutions (Part- 4)- Algebraic Expressions and Identities | Class 8 Mathematics by VP Classes

,

Viva Questions

,

ppt

;