General Definitions:
* Containing all necessary parts or elements: This is the most common definition. It signifies that nothing is missing, and the whole entity is present.
* Finished, ended, or concluded: This definition implies a process or action has reached its final stage.
* Perfect or flawless: This emphasizes the absence of any imperfections or deficiencies.
Specific Contextual Definitions:
* In mathematics: A complete set is a set that contains all its limit points. For example, the set of all rational numbers is not complete, because the square root of 2, which is irrational, is a limit point of the rationals but is not itself a rational number.
* In computer science: A complete program is a program that has all the necessary code to run without errors.
* In linguistics: A complete sentence is a sentence that contains a subject and a predicate, expressing a complete thought.
* In philosophy: Completeness is a concept that refers to the idea of a whole being fully realized or fulfilled.
Examples:
* "The recipe is complete, with all the ingredients listed." (containing all necessary parts)
* "The construction project is complete." (finished)
* "Her performance was complete and flawless." (perfect)
* "The mathematician proved the completeness of the real number system." (mathematical context)
* "The programmer wrote a complete program that executed successfully." (computer science context)
The specific meaning of "complete" depends on the context in which it is used.