Revoke vs Axiom - What's the difference?
revoke | axiom |
To cancel or invalidate by withdrawing or reversing
To fail to follow suit in a game of cards when holding a card in that suit.
(obsolete) To call or bring back; to recall.
* Spenser
(obsolete) To hold back; to repress; to restrain.
* Spenser
(obsolete) To draw back; to withdraw.
(obsolete) To call back to mind; to recollect.
* South
The act of revoking in a game of cards.
A renege; a violation of important rules regarding the play of tricks in trick-taking card games serious enough to render the round invalid.
A violation ranked in seriousness somewhat below overt cheating, with the status of a more minor offense only because, when it happens, it is usually accidental.
(en noun); also axiomata (though, becoming less common and sometimes considered archaic)
(philosophy) A seemingly which cannot actually be proved or disproved.
* '>citation
(mathematics, logic, proof theory) A fundamental of theorems. Examples: "Through a pair of distinct points there passes exactly one straight line", "All right angles are congruent".
*
An established principle in some artistic practice or science that is universally received.
As nouns the difference between revoke and axiom
is that revoke is the act of revoking in a game of cards while axiom is axiom.As a verb revoke
is to cancel or invalidate by withdrawing or reversing.revoke
English
Verb
- Your driver's license will be revoked .
- The faint sprite he did revoke again, / To her frail mansion of morality.
- [She] still strove their sudden rages to revoke .
- (Spenser)
- A man, by revoking and recollecting within himself former passages, will be still apt to inculcate these sad memories to his conscience.
Noun
(en noun)axiom
English
(wikipedia axiom)Noun
- The axioms read as follows. For every composable pair f'' and ''g'' the composite goes from the domain of ''g'' to the codomain of ''f''. For each object ''A'' the identity arrow goes from ''A'' to ''A . Composing any arrow with an identity arrow (supposing that the two are composable) gives the original arrow. And composition is associative.
- The axioms of political economy cannot be considered absolute truths.