What is the Difference Between Axioms and Postulates?

The main difference between axioms and postulates lies in their scope and applicability within different fields of science. Both axioms and postulates are assumptions that are considered to be self-evident and universally true, but they are not specifically proven. Here are the key differences between the two:

• Axioms: These are self-evident assumptions that are common to all branches of science. They are not specifically linked to geometry or any other particular field. A well-known example of an axiom is the statement "halves of equal are equal".
• Postulates: These are specific to a particular field, such as geometry. Postulates are assumptions that are considered to be true within that field, but they are not applicable to other fields of science. Euclid, the Greek mathematician, used the term "postulate" for assumptions that were specific to geometry.

In summary:

• Axioms are self-evident truths that are applicable to all fields of science, while postulates are specific to a particular field, such as geometry.

Comparative Table: Axioms vs Postulates

Here is a table comparing the differences between axioms and postulates:

Both axioms and postulates are assumed to be true without any proof or demonstration. They serve as a basis for deducing other truths in their respective fields.