euclidean axiom
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Definition
- Noun:
- A fundamental geometric principle: A Euclidean axiom is one of a set of five foundational, self-evident statements or postulates upon which the entire logical structure of Euclidean geometry is built. These axioms describe the basic properties of points, lines, and planes in a flat, two-dimensional space.
Usage Examples
- Noun:
- The first Euclidean axiom states that a straight line segment can be drawn joining any two points.
- To prove the theorem, we must rely on the established Euclidean axioms.
- Non-Euclidean geometries are developed by altering one or more of the traditional Euclidean axioms.
Advanced Usage
- "The parallel postulate": This is the fifth and most famous Euclidean axiom. It states that through a point not on a given line, exactly one line can be drawn parallel to the given line. This axiom was historically the one challenged to create non-Euclidean geometries.
- For centuries, mathematicians tried to prove the parallel postulate from the other four Euclidean axioms.
Variants and Related Words
- Axiom (n): A statement or proposition that is regarded as being established, accepted, or self-evidently true, serving as a starting point for further reasoning.
- In logic, an axiom requires no proof.
- Postulate (n): A synonym for axiom, especially in mathematics and logic.
- Euclid's postulates form the basis of classical geometry.
- Non-Euclidean geometry (n): A type of geometry where the parallel postulate (the fifth Euclidean axiom) does not hold.
- The surface of a sphere is an example of a non-Euclidean geometry.
Synonyms
- Postulate: A fundamental assumption used as a basis for reasoning.
- Fundamental principle: A primary or basic rule or truth.
Related Concepts (Not Phrasal Verbs)
- Euclidean geometry: The system of geometry based on the five Euclidean axioms, describing the properties of flat space.
- Foundational assumption: A basic premise that is accepted without proof within a given system.
Noun
- (mathematics) any of five axioms that are generally recognized as the basis for Euclidean geometry