Intermediate Algebra/Polynomials

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A monomial of one variable, x, is an algabraic expression of the form

where

• ${\displaystyle c}$ is a constant, and
  
• ${\displaystyle m}$ is a non-negative integer (e.g., 0, 1, 2, 3, ...).

The integer ${\displaystyle m}$ is called the degree of the monomial.

A polynomial of one variable, x, is an algebraic expression that is a sum of one or more monomials. The degree of the polynomial is the highest degree of the monomials in the sum. An polynomial ${\displaystyle P(x)}$ can generically be expressed in the form

The constants a_i are called the coefficients of the polynomial.

Each of the individual monomials in the above sum, whose coefficient a_i ≠ 0, is called a term of the polynomial. When i = 0, xⁱ = 1 and the corresponding term simply equals the constant a₀. Also when i = 1, the corresponding term equals a₁ x.

A polynomial having two terms is called a binomial. A polynomial having three terms is called a trinomial.

If a polynomial P(x) of at least degree 1 is set equal to 0 as follows:

this results in an equation which may have one or more roots (solutions), i. e. number(s) whose value(s) for x make the equation true. These roots are called the zeroes of the polynomial (singular is zero). A polynomial of degree 1, a linear function, will always have 1 real zero. A polynomial of degree 2, a quadratic function, can have 0, 1, or 2 real zeroes. A polynomial of degree 3 (a cubic function) can have 1, 2, or 3 real zeroes. A polynomial of degree 4 can have 0, 1, 2, 3, or 4 real zeroes. In general, a polynomial of degree n, where n is odd, can have from 1 to n real zeroes. A polynomial of degree n, where n is even, can have from 0 to n real zeroes.

Some polynomial equations can be solved by factoring, and all equations of degrees 1-4 can be solved completely by formulae. Above degree 4, there are no formulae for solving completely, and you must rely on numerical analysis or factoring.

If we have a polynomial P(x)

The only possible rational roots (roots of the form p/q) are in the form

• Online interactive exercises on polynomials.

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