RS Aggarwal Chapter 2 Class 9 Maths Exercise 2.3 Solutions: In this chapter, we shall start our study with a particular type of algebraic expression, called polynomial, and the terminology related to it. We shall also study the Remainder Theorem and Factor Theorem and their use in the factorisation of polynomials. In addition to the above, we shall study some more algebraic identities and their use in factorisation and in evaluating some given expressions

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## Download RS Aggarwal Chapter 2 Class 9 Maths Exercise 2.3 Solutions

## Important Definition for RS Aggarwal Chapter 2 Class 9 Maths Ex 2c Solutions

A polynomial p(x) denoted for one variable ‘x’ comprises an algebraic expression in the form:

**p(x) = a****n****x****n**** + a****n-1****x****n-1**** + ….. + a****2****x****2**** + a****1****x + a**** 0** ; where a0, a1, a2, …. an are constants where an ≠ 0

- Any real number; let’s say ‘a’ is considered to be the zero of a polynomial ‘p(x)’ if p(a) = 0. In this case, a is said to be the mysqladmin of the equation p(x) = 0.
- Every one variable linear polynomial will contain a unique zero, a real number which is a zero of the zero polynomial and non-zero constant polynomial which does not have any zeros.
If p(x) has the degree greater than or equal to 1 and p(x) when divided by the linear polynomial x – a will give the remainder as p(a).**Remainder Theorem:**x – a will be the factor of the polynomial p(x), whenever p(a) = 0. The vice-versa also holds true every time.**Factor Theorem:**

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