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Simplifying Complex Algebraic Expressions

This document provides a detailed approach to simplifying complex algebraic expressions using various algebraic identities and techniques. We start with a fundamental expression and systematically break it down to achieve the simplest form. Key methods applied include the distribution of factors, combining like terms, and utilizing the common factor technique. The aim is to illustrate step-by-step simplification for better understanding of algebraic manipulation, with examples drawn from various polynomial forms.

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Simplifying Complex Algebraic Expressions

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  1. Buiten haakjes halen 2(a+2b) 2a+4b=

  2. 3a+3.2= 3(a+2) 3a+6= 2(2a+3) 2.2a+2.3= 4a+6= 2a+2= 2a+2.1= 2(a+1)

  3. a(a+2b) a.a+2ab= a2+2ab= 2b(b+2.a) 2.b.b+2.2.a.b= 2b2+4ab = 6ab2+9a2b= 3.2.a.b.b+3.3.a.a.b= 3ab(2b+3a)

  4. 3ab2+12a2b-4a3= 4xy2+6x2y-2xy=

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