Complete vs Bottomless - What's the difference?

complete | bottomless | Related terms |

Complete is a related term of bottomless.

As a verb complete

is .

As an adjective bottomless is

having no bottom.



Alternative forms

* compleat (archaic)


  • To finish; to make done; to reach the end.
  • He completed the assignment on time.
  • To make whole or entire.
  • The last chapter completes the book nicely.

    Usage notes

    * This is a catenative verb that takes the gerund (-ing) . See


    * accomplish * finish


  • With all parts included; with nothing missing; full.
  • * {{quote-magazine, year=2012, month=March-April
  • , author= , title=Well-connected Brains , volume=100, issue=2, page=171 , magazine=(American Scientist) citation , passage=Creating a complete map of the human connectome would therefore be a monumental milestone but not the end of the journey to understanding how our brains work.}}
  • Finished; ended; concluded; completed.
  • *
  • , title=(The Celebrity), chapter=5 , passage=In the eyes of Mr. Farquhar Fenelon Cooke the apotheosis of the Celebrity was complete . The people of Asquith were not only willing to attend the house-warming, but had been worked up to the pitch of eagerness. The Celebrity as a matter of course was master of ceremonies.}}
  • (Generic intensifier).
  • (analysis, Of a metric space) in which every Cauchy sequence converges.
  • (algebra, Of a lattice) in which every set with a lower bound has a greatest lower bound.
  • (math, Of a category) in which all small limits exist.
  • (logic, of a proof system of a formal system)   With respect to a given semantics, that any well-formed formula which is (semantically) valid must also be provable.Sainsbury, Mark [2001] Logical Forms : An Introduction to Philosophical Logic . Blackwell Publishing, Hong Kong (2010), p. 358.
  • * Gödel's first incompleteness theorem showed that Principia'' could not be both consistent and complete. According to the theorem, for every sufficiently powerful logical system (such as ''Principia''), there exists a statement ''G'' that essentially reads, "The statement ''G'' cannot be proved." Such a statement is a sort of Catch-22: if ''G'' is provable, then it is false, and the system is therefore inconsistent; and if ''G is not provable, then it is true, and the system is therefore incomplete.(w)
  • Synonyms

    * (with everything included) entire, total * (finished) done


    * incomplete

    Derived terms

    * bicomplete * cocomplete * completeness * completist * completely * completion



    * 1000 English basic words ----




  • Having no bottom.
  • Extremely deep.
  • Having no bounds; limitless.
  • The restaurant offered bottomless drinks.
  • Difficult to understand; unfathomable.
  • Not wearing clothes below the waist.
  • Coordinate terms

    * (not wearing clothes below the waist) topless, naked