An axiom is a premise or starting point of reasoning. As classically conceived, an axiom is a premise so evident as to be accepted as true without controversy. The word comes from the Greek ἀξίωμα 'that which is thought worthy or fit,' or 'that which commends itself as evident.' As used in modern logic, an axiom is simply a premise or starting point for reasoning. Axioms define and delimit the realm of analysis. In other words, an axiom is a logical statement that is assumed to be true. Therefore, its truth is taken for granted within the particular domain of analysis, and serves as a starting point for deducing and inferring other (theory and domain dependent) truths. An axiom is defined as a mathematical statement that is accepted as being true without a mathematical proof.

In mathematics, the term axiom is used in two related but distinguishable senses: "logical axioms" and "non-logical axioms". In both senses, an axiom is any mathematical statement that serves as a starting point from which other statements are logically derived. Unlike theorems, axioms (unless redundant) cannot be derived by principles of deduction, nor are they demonstrable by mathematical proofs, simply because they are starting points; there is nothing else from which they logically follow (otherwise they would be classified as theorems).

Logical axioms are usually statements that are taken to be universally true (e.g., (A and B) implies A), while non-logical axioms (e.g., a + b = b + a) are actually defining properties for the domain of a specific mathematical theory (such as arithmetic). When used in the latter sense, "axiom," "postulate", and "assumption" may be used interchangeably. In general, a non-logical axiom is not a self-evident truth, but rather a formal logical expression used in deduction to build a mathematical theory. To axiomatize a system of knowledge is to show that its claims can be derived from a small, well-understood set of sentences (the axioms). There are typically multiple ways to axiomatize a given mathematical domain.

Read more about Axiom:  Etymology, Mathematical Logic

Other articles related to "axiom, axioms":

Material Discography - Collections
1991 Axiom Collection Illuminations – contains "Cosmic Slop" 1993 Axiom Collection II Manifestation – contains "Mantra" and "Playin' with Fire" 1995 Axion Funk ...
Axiom - Mathematical Logic - Further Discussion
... In the modern view axioms may be any set of formulas, as long as they are not known to be inconsistent ...
Least-upper-bound Property - Proof - Logical Status
... is equivalent to other forms of the completeness axiom, such as the convergence of Cauchy sequences or the nested intervals theorem ... in the synthetic approach, the property is usually taken as an axiom for the real numbers (see least upper bound axiom) in a constructive approach, the property must be proved as a theorem ...
Axiom Of Equity
... The Axiom of Equity was proposed by Samuel Clarke (1675 - 1729), an English philosopher, in the spirit of the ethic of reciprocity ... in his 1907 book "the Theory of Good and Evil", restated the axiom as "One man's good is of as much intrinsic worth as the like good of another." ...
Axiom Collection - Release History
... Axiom Collection Illuminations – 1991 – Axiom / Island, 422-848 958-2 (CD) Axiom Collection II Manifestation – 1993 – Axiom / Island, 314-514-453-2 (CD) Axiom Ambient Lost in the Translation – 1994 ... Last Exit Massacre Soup Tabla Beat Science Time Zone Labels Celluloid Records Axiom Innerhythmic Subharmonic Island Records Palm Pictures ...

Famous quotes containing the word axiom:

    It is an axiom in political science that unless a people are educated and enlightened it is idle to expect the continuance of civil liberty or the capacity for self-government.
    Texas Declaration of Independence (March 2, 1836)

    It’s an old axiom of mine: marry your enemies and behead your friends.
    —Robert N. Lee. Rowland V. Lee. King Edward IV (Ian Hunter)

    “You are bothered, I suppose, by the idea that you can’t possibly believe in miracles and mysteries, and therefore can’t make a good wife for Hazard. You might just as well make yourself unhappy by doubting whether you would make a good wife to me because you can’t believe the first axiom in Euclid. There is no science which does not begin by requiring you to believe the incredible.”
    Henry Brooks Adams (1838–1918)