Polynomial order

Let

P

be an irreducible polynomial of degree

d \geq 1

over a prime finite field

𝔽_{p}

. The order of

P

is the smallest positive integer

n

such that

P (x)

divides

x^{n} - 1

n

is also equal to the multiplicative order of any root of

P

. It is a divisor of

p_{d} - 1

. The polynomial

P

is a primitive polynomial if

n = p^{d} - 1

This tool allows you to enter a polynomial and compute its order. If you enter a reducible polynomial, the orders of all its non-linear factors will be computed and presented.

The most recent version

This page is not in its usual appearance because WIMS is unable to recognize your web browser.

Please take note that WIMS pages are interactively generated; they are not ordinary HTML files. They must be used interactively ONLINE. It is useless for you to gather them through a robot program.

Description: computes the order of an irreducible polynomial over a finite field F_p. interactive exercises, online calculators and plotters, mathematical recreation and games
Keywords: interactive mathematics, interactive math, server side interactivity, algebra, coding, polynomials, finite_field, factorization, roots, order, cyclic_code