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Algebraic Identity - Dfference of Square

Algebraic Identities - Concepts

Algebraic Identity - Dfference of Square

Algebraic Identity - Square of Sum of Binomial

Algebraic Identity - Square of difference of Binomial

Algebraic Identity -3

Class - 7th CBSE Subjects

Concept Explanation

Algebraic Identity - Dfference of Square

Algebraic Identity-Difference of Square:

$small ( a + b ) ( a - b ) = a^ 2 - b^ 2$

We can prove this identity by multiplying the expressions on the left side and getting equal to the right side expression. Here is the proof of this identity.

Let's begin with the left side of the expression. We have

$small (a+b)(a-b)=a(a-b)+b(a-b)=a^2-ab+ab-b^2=a^2-b^2$

which is equal to the right side of the identity. Hence proved.

Example: $Solve ;(5x-2y)(5x+2y)$ .

Solution: $(5x-2y)(5x+2y)=(5x)^2-(2y)^2= 25x^2-4y^2$

Example Solve 15 X 25

Solution: 15 X 25

= (20-5) X (20 +5)

= $large 20^2-5^2$

=400-25

= 375

Sample Questions

(More Questions for each concept available in Login)

Question : 1

Value of $(99.8)^2-(0.2)^2 ; is :$
A. 9980	B. 9960	C. 9860	D. 9680
Right Option : B
View Explanation

Question : 2

Multiply: $3x^2y+5xy^2$ by $3x^2y-5xy^2$
A. $9x^4y^2-25x^2y^4$	B. $9x^4y^2-25x^2y^2$	C. $25x^4y^2-25x^2y^4$	D. None of these
Right Option : A
View Explanation

Question : 3

Evaluate (100+3) X (100-3)
A. 8881	B. 9991	C. 7771	D. 2221
Right Option : B
View Explanation

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Language - English

Chapters

Triangles and its Properties I

Triangles and its Properties II

Congruence of Triangles I

Congruence of Triangles II

Ratio and Proportion

Percentages and Its Application I

Percentages and Its Application II

Percentages and Its Application III

Algebraic Expression I

Algebraic Expression II

Exponents and Power I

Exponents and Power II

Symmetry

Visualising Soild Shapes

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Algebraic Identity - Dfference of Square

Algebraic Identity - Dfference of Square

Students / Parents Reviews [10]

Cheshta

Yatharthi Sharma

Eshan Arora

Ayan Ghosh

Shivam Rana

Archit Segal

Shreya Shrivastava

Barkha Arora

Hiya Gupta

Om Umang