Polynomial
A Polynomial is a mathematical expression involving a series of Powers in one or more variablesmultiplied by Coefficients. A Polynomial in one variable with constantCoefficients is given by
 | (1) |
 | (2) |
Exchanging the Coefficients of a one-variable Polynomial end-to-end produces a Polynomial
 | (3) |
of the original Roots 
.The following table gives special names given to polynomials of low orders.
| Order | Polynomial Type |
| 1 | Linear Equation |
| 2 | Quadratic Equation |
| 3 | Cubic Equation |
| 4 | Quartic Equation |
| 5 | Quintic Equation |
| 6 | Sextic Equation |
Polynomials of fourth degree may be computed using three multiplications and five additions if a few quantities arecalculated first (Press et al. 1989):
 | |
 | (4) |
 |  |  | (5) |
 | |  | (6) |
 | |  | (7) |
 | |  | (8) |
 | |  | (9) |
Similarly, a Polynomial of fifth degree may be computed with four multiplications and five additions, and aPolynomial of sixth degree may be computed with four multiplications and seven additions.
Polynomials of orders one to four are solvable using only rational operations and finite root extractions. A first-orderequation is trivially solvable. A second-order equation is soluble using the Quadratic Equation. A third-order equationis solvable using the Cubic Equation. A fourth-order equation is solvable using the Quartic Equation. It wasproved by Abel 
(and Galois ) using Group Theory that general equations of fifth and higher ordercannot be solved rationally with finite root extractions.
However, the general Quintic Equation may be given in terms of the Theta Functions, orHermite and Kronecker proved that higher order Polynomials are not soluble in the same manner. Klein showed that the workof Hermite was implicit in the Group properties of the Icosahedron. Klein's method of solving thequintic in terms of Hypergeometric Functions in one variable can be extended to thesextic, but for higher order Poincaré created functions which give the solution to the 
th order Polynomial equation in finite form. These functionsturned out to be ``natural'' generalizations of the Elliptic Functions.
Given an th degree Polynomial, the Roots can be found by finding the Eigenvaluesof the Matrix
 | (10) |
Polynomial identities involving sums and differences of like Powers include
 |  |  | (11) |
 | |  | (12) |
 | |  | (13) |
 | |  | (14) |
 | |  | (15) |
 | |  | (16) |
 | |  | (17) |
 | |  | (18) |
 | |  | (19) |
Further identities include
 | |  | (20) |
 | |  | (21) |
 | |  | (22) |
The identity
 | |
 | |
| (23) |
.See also Appell Polynomial, Bernstein Polynomial, Bessel Polynomial, Bezout's Theorem,Binomial, Bombieri Inner Product, Bombieri Norm, Chebyshev Polynomial of the First Kind,Chebyshev Polynomial of the Second Kind, Christoffel-Darboux Formula, Christoffel Number, ComplexNumber, Cyclotomic Polynomial, Descartes' Sign Rule, Discriminant (Polynomial), Durfee Polynomial,Ehrhart Polynomial, Euler Four-Square Identity, Fibonacci Identity, Fundamental Theorem of Algebra,Fundamental Theorem of Symmetric Functions, Gauss-Jacobi Mechanical Quadrature, Gegenbauer Polynomial,Gram-Schmidt Orthonormalization, Greatest Lower Bound, Hermite Polynomial, Hilbert Polynomial,Irreducible Polynomial,Isobaric Polynomial, Isograph, Jensen Polynomial, Kernel Polynomial, Krawtchouk Polynomial,Laguerre Polynomial, Least Upper Bound, Legendre Polynomial, Liouville Polynomial Identity,Lommel Polynomial, Lukács Theorem, Monomial, Orthogonal Polynomials,Perimeter Polynomial, Poisson-Charlier Polynomial, Pollaczek Polynomial, Polynomial Bar Norm,Quarter Squares Rule, Ramanujan 6-10-8 Identity, Root, Runge-Walsh Theorem, SchläfliPolynomial, Separation Theorem, Stieltjes-Wigert Polynomial, Trinomial,Trinomial Identity, Weierstraß's Polynomial Theorem, ZernikePolynomial
References
Barbeau, E. J. Polynomials. New York: Springer-Verlag, 1989. Bini, D. and Pan, V. Y. Polynomial and Matrix Computations, Vol. 1: Fundamental Algorithms. Boston, MA: Birkhäuser, 1994. Borwein, P. and Erdélyi, T. Polynomials and Polynomial Inequalities. New York: Springer-Verlag, 1995. Cockle, J. ``Notes on the Higher Algebra.'' Quart. J. Pure Applied Math. 4, 49-57, 1861. Cockle, J. ``Notes on the Higher Algebra (Continued).'' Quart. J. Pure Applied Math. 5, 1-17, 1862. Press, W. H.; Flannery, B. P.; Teukolsky, S. A.; and Vetterling, W. T. Numerical Recipes in C: The Art of Scientific Computing. Cambridge, England: Cambridge University Press, 1989. Project Mathematics! Polynomials. Videotape (27 minutes). California Institute of Technology. Available from the Math. Assoc. Amer.
Polynomials
- Lebesgue Measurability Problem
- Lebesgue Measure
- Lebesgue Minimal Problem
- Lebesgue-Radon Integral
- Lebesgue Singular Integrals
- Lebesgue-Stieltjes Integral
- Lebesgue Sum
- Le Cam's Identity
- Leech Lattice
- Lefshetz Fixed Point Formula
- Lefshetz's Theorem
- Lefshetz Trace Formula
- Leg
- Legendre Addition Theorem
- Legendre Differential Equation
- Legendre Duplication Formula
- Legendre Function of the First Kind
- Legendre Function of the Second Kind
- Legendre-Gauss Quadrature
- Legendre-Jacobi Elliptic Integral
- Legendre Polynomial
- Legendre Polynomial of the Second Kind
- Legendre Quadrature
- Legendre Relation
- Legendre's Chi-Function