axiomatical$509081$ - traducción al alemán
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axiomatical$509081$ - traducción al alemán

STATEMENT THAT IS TAKEN TO BE TRUE
Postulate; Postulates; Axiomm; Fundamental postulates; Logical axiom; Postulation; Primitive sentence; Axiomatical; Axiomatically; Postulating; Postulated; Postulations; Mathematical assumption; Axiomatic; Philosophical law; Logical axioms; Mathematical axiom; Posit (word); Non-logical axioms; Axoims; Axioms

axiomatical      
adj. axiomatisch, auf Axiome bezogen; von Axiomen abstammend; unbestreitbar, eindeutig

Definición

postulate
¦ verb 'p?stj?le?t
1. suggest or assume the existence, fact, or truth of (something) as a basis for reasoning, discussion, or belief.
2. (in ecclesiastical law) nominate or elect to an ecclesiastical office subject to the sanction of a higher authority.
¦ noun 'p?stj?l?t a thing postulated.
Derivatives
postulation noun
postulator noun
Origin
ME: from L. postulat-, postulare 'ask'.

Wikipedia

Axiom

An axiom, postulate, or assumption is a statement that is taken to be true, to serve as a premise or starting point for further reasoning and arguments. The word comes from the Ancient Greek word ἀξίωμα (axíōma), meaning 'that which is thought worthy or fit' or 'that which commends itself as evident'.

The precise definition varies across fields of study. In classic philosophy, an axiom is a statement that is so evident or well-established, that it is accepted without controversy or question. In modern logic, an axiom is a premise or starting point for reasoning.

In mathematics, an axiom may be a "logical axiom" or a "non-logical axiom". Logical axioms are taken to be true within the system of logic they define and are often shown in symbolic form (e.g., (A and B) implies A), while non-logical axioms (e.g., a + b = b + a) are substantive assertions about the elements of the domain of a specific mathematical theory, such as arithmetic.

Non-logical axioms may also be called "postulates" or "assumptions". In most cases, a non-logical axiom is simply a formal logical expression used in deduction to build a mathematical theory, and might or might not be self-evident in nature (e.g., the parallel postulate in Euclidean geometry). 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), and there are typically many ways to axiomatize a given mathematical domain.

Any axiom is a statement that serves as a starting point from which other statements are logically derived. Whether it is meaningful (and, if so, what it means) for an axiom to be "true" is a subject of debate in the philosophy of mathematics.