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Factorization by Grouping of Terms

Quadratic Equations - Concepts

Identifying Quadratic Equations

Factors of Quadratic Equation

Factorization by Middle Term Splitting

Factorization by Grouping of Terms

Factorization by Completing the Square

Quadratic Formula

Nature of Roots of Quadratic Polynomial

Equations Reducible to Quadratic Form

Statement sum Involing Quadratic Equations

Solving Statements Involving Age

Statement sums involving Coins

Solving Statements For A Two Digit Number

Class - IBPS PO Prelims Subjects

Concept Explanation

Factorization by Grouping of Terms

In order to factorize algebraic expressions containing a binomial as a common factor, we write the expression as the product of the binomial and the quotient obtained by dividing the given expression by this binomial.

Illustration : Factorize: $(y-x)a+(x-y)b$

Solution :

$(y-x)a+(x-y)b$

$=-(x-y)a+(x-y)b$ [ Taking (-1) common from (y-x)]

$=-(x-y)(-a+b)$ [ Taking (x - y) common]

$=-(x-y)(b-a)$ [ $because$ -a + b = b - a ]

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Sample Questions

(More Questions for each concept available in Login)

Question : 1

The real factors of $x^{2}+4$ are:
A. $(x^{2}+2)(x^{2}-2)$	B. $(x+2)(x-2)$	C. does not exist	D. none of these
Right Option : C
View Explanation

Question : 2

Factorize the following: $dpi{110} 72x^6y^7-96x^7y^6$
A. $= 24x^6y^6(3y-4x)$	B. $dpi{110}26x^2y^5(8y-2x)$	C. $28x^5y^597y-3x$	D. $28x^5y^597y-3x$
Right Option : A
View Explanation

Question : 3

The factors of $x^{2}+xy-2xz-2yz$ are:
A. $(x-y)(x+2z)$	B. $(x+y)(x-2z)$	C. $(x-y)(x-2z)$	D. $(x+y)(x+2z)$
Right Option : B
View Explanation

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Attention !!!!!

Factorization by Grouping of Terms

Factorization by Grouping of Terms

Students / Parents Reviews [20]

Eshan Arora

Sharandeep Singh

Ayan Ghosh

Shreya Shrivastava

Yogansh Nyasi

Aman Kumar Shrivastava

Barkha Arora

Upmanyu Sharma

Hiya Gupta

Manish Kumar

Manya

Barkha Arora

Om Umang

Shivam Rana

Hridey Preet

Prisha Gupta

Aman Kumar Shrivastava

Anika Saxena

Manish Kumar

Yatharthi Sharma