Octic equation

In algebra, an octic equation^[1] is an equation of the form

ax^{8}+bx^{7}+cx^{6}+dx^{5}+ex^{4}+fx^{3}+gx^{2}+hx+k=0,\,

where $a \neq 0$ .

An octic function is a function of the form

f(x)=ax^{8}+bx^{7}+cx^{6}+dx^{5}+ex^{4}+fx^{3}+gx^{2}+hx+k,

where $a \neq 0$ . In other words, it is a polynomial of degree eight. If $a = 0$ , then f is a septic function ( $b \neq 0$ ), sextic function ( $b = 0, c \neq 0$ ), etc.

The equation may be obtained from the function by setting $f (x) = 0$ .

The coefficients $a, b, c, d, e, f, g, h, k$ may be either integers, rational numbers, real numbers, complex numbers or, more generally, members of any field.

Since an octic function is defined by a polynomial with an even degree, it has the same infinite limit when the argument goes to positive or negative infinity. If the leading coefficient $a$ is positive, then the function increases to positive infinity at both sides; and thus the function has a global minimum. Likewise, if $a$ is negative, the octic function decreases to negative infinity and has a global maximum. The derivative of an octic function is a septic function.

Solvable octics[edit]

By the Abel–Ruffini theorem, there is no general algebraic formula for a solution of an octic equation in terms of its parameters. However, some sub-classes of octics do have such formulas.

Trivially, octics of the form

x^{8}=a

with positive a have the solutions

x_{k}=a^{1/8}\omega _{k}\,,\quad k=1,\dots ,8,

where $\omega _{k}$ is the k-th eighth root of 1 in the complex plane.

Octics which can be decomposed as a functional composition of solvable polynomials can be solved. For example, octics of the form

ax^{8}+ex^{4}+k=0

are compositions of a quadratic and $x 4$ . Octics of the form

ax^{8}+cx^{6}+ex^{4}+gx^{2}+k=0

are compositions of a quartic and

x 2

.

Application[edit]

In some cases some of the quadrisections (partitions into four regions of equal area) of a triangle by perpendicular lines are solutions of an octic equation.^[2]

References[edit]

↑ James Cockle proposed the names "sexic", "septic", "octic", "nonic", and "decic" in 1851. (Mechanics Magazine, Vol. LV, p. 171)
↑ http://forumgeom.fau.edu/FG2018volume18/FG201802.pdf Carl Eberhart, “Revisiting the quadrisection problem of Jacob Bernoulli”, Forum Geometricorum 18, 2018, pp. 7–16 (particularly pp. 14–15).

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[1] James Cockle proposed the names "sexic", "septic", "octic", "nonic", and "decic" in 1851. (Mechanics Magazine, Vol. LV, p. 171)

[2] ttp://forumgeom.fau.edu/FG2018volume18/FG201802.pdf Carl Eberhart, “Revisiting the quadrisection problem of Jacob Bernoulli”, Forum Geometricorum 18, 2018, pp. 7–16 (particularly pp. 14–15).

[1]

[2]

v t e Polynomials and polynomial functions
By degree	Zero polynomial (degree undefined or −1 or −∞) Constant function (0) Linear function (1) Quadratic function (2) Cubic function (3) Quartic function (4) Quintic function (5) Sextic equation (6) Septic equation (7) Octic equation (8)
By properties	Univariate Bivariate Multivariate Monomial Binomial Trinomial Irreducible Square-free Homogeneous Quasi-homogeneous
Tools and algorithms	Factorization Greatest common divisor Division Horner's method of evaluation Resultant Discriminant Gröbner basis

Octic equation

Contents

Solvable octics[edit]

Application[edit]

See also[edit]

References[edit]

📰 Article(s) of the same category(ies)[edit]