Polynomial
When we think about polynomials , one question arises in our mind.
What is a polynomial???
Yes, to know about polynomials we shall start with its definition. So, let's start:
Definition:
In mathematics, an expression consisting of variables (x,y,z...etc) and coefficients ( known/unknown) , and that involves addition, subtraction, multiplication and non negative integral powers/exponents of variables ; is called a polynomial.
A polynomial in a single variable x is of the form:
a₀xⁿ+ a₁xⁿ⁻¹ +...+aₙ .
Types of polynomial:
Polynomial Degree:
Zero polynomial: a polynomial of degree zero is called a zero polynomial or a constant.
As for example 0, 1,2,... are zero polynomials.
As for example 0, 1,2,... are zero polynomials.
Linear polynomial: A polynomial of degree 1 is called a linear polynomial.
As for example 2x, x+3, x/5,... are linear polynomials.
Similarly, polynomials with degree 2,3,4,5 are called quadratic, cubic, quartic, quantic polynomials respectively.
Similarly, polynomials with degree 2,3,4,5 are called quadratic, cubic, quartic, quantic polynomials respectively.
Also polynomials are named differently according to the number of terms.
A polynomial with single, dual and triple terms are called monomial, binomial, trinomial respectively.
A polynomial with real coefficients is called a real polynomial and a polynomial with complex coefficients is called a complex polynomial.
A polynomial with integer coefficients is called an integer polynomial.
A polynomial with one variable is called a univariate polynomial.
As for example ( x+2) is an univariate polynomial.
A polynomial with two variables is called a bivariate polynomial.
As for example (x+3y+60) is a bivariate polynomial.
A polynomial with more than one variables is called a multivariate polynomial.
As for example (4x+y+7z-50) is a multivariate polynomial.
A polynomial with real coefficients is called a real polynomial and a polynomial with complex coefficients is called a complex polynomial.
A polynomial with integer coefficients is called an integer polynomial.
A polynomial with one variable is called a univariate polynomial.
As for example ( x+2) is an univariate polynomial.
A polynomial with two variables is called a bivariate polynomial.
As for example (x+3y+60) is a bivariate polynomial.
A polynomial with more than one variables is called a multivariate polynomial.
As for example (4x+y+7z-50) is a multivariate polynomial.
Polynomial terms:
Homogeneous polynomial:
A polynomial having more than one variable and each term of the polynomial having same degree n, is called a homogeneous polynomial of degree n.
example:
(x²+ 5xy+y²) and (x³+3x²y+3xy²+y³) are homogeneous polynomials of degree 2 and 3 respectively.
Complete polynomial:
A polynomial without any zero coefficient is said to be complete polynomial ; otherwise it is incomplete polynomial.
Vanishing polynomial:
A polynomial all of whose coefficients are zero is called a vanishing polynomial.
Monic polynomial:
A monic polynomial is an univariate polynomial in which the leading coefficient (the non zero coefficient of highest degree) is equal to one.
So, a monic polynomial is of the form: xⁿ+ aₙ_₁xⁿ⁻¹ +...+ a₁x + a₀ .
Polynomial formula:
(1) addition,subtraction, multiplication of two or more polynomials are also polynomial.
(2) division of two polynomials may not be a polynomial.
This is the basic idea about a polynomials.
(3) Derivatives and integration of a polynomial are also polynomials.
If you find out any incorrect information or know anything more about this , please write it in the comment section!
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