Degree

In mathematics, there are several meanings of degree depending on the subject.

Unit of angle

A degree (in full, a degree of arc, arc degree, or arcdegree), usually denoted by ° (the degree symbol), is a measurement of a plane angle, representing ¹⁄₃₆₀ of a full rotation. When that angle is with respect to a reference meridian, it indicates a location along a great circle of a sphere, such as Earth (see Geographic coordinate system), Mars, or the celestial sphere.^[1]

Degree of a monomial

The degree of a monomial is equal to sum of the exponents of each of the variables appearing in the monomial, e.g. the degree of x²yz³ is 2 + 1 + 3.

Degree of an algebraic number

The degree of an algebraic number is the smallest degree of a non-trivial polynomial in one variable with rational coefficients having said algebraic number as a root. For instance, any rational number q is degree 1 since it is the root of the polynomial .

Additionally, the square root of any non-square positive integer, say , is degree 2, as it is the root of .

Degree of a field extension

Given a field extension K/F, the field K can be considered as a vector space over the field F. The dimension of this vector space is the degree of the extension and is denoted by [K : F].

Degree of a vertex in a graph

In graph theory, the degree of a vertex in a graph is the number of edges incident to that vertex — in other words, the number of lines coming out of the point. In a directed graph, the indegree and outdegree count the number of directed edges coming into and out of a vertex respectively.

Topological degree

In topology the term degree is used for various generalizations of the winding number in complex analysis. See topological degree theory.

Degree of freedom

A degree of freedom is a concept in mathematics, statistics, physics and engineering. See degrees of freedom.

References

1. ^ Beckmann P. (1976) A History of Pi, St. Martin's Griffin. ISBN 0-312-38185-9