Ideal vs Whimsical - What's the difference?
ideal | whimsical | Related terms |
Optimal; being the best possibility.
Perfect, flawless, having no defects.
* Rambler
Pertaining to ideas, or to a given idea.
Existing only in the mind; conceptual, imaginary.
* 1796 , Matthew Lewis, The Monk , Folio Society 1985, p. 256:
* 1818 , ,
Teaching or relating to the doctrine of idealism.
(mathematics) Not actually present, but considered as present when limits at infinity are included.
A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
(mathematics, order theory) A non-empty]] lower set (of a partially ordered set) which is [[closure, closed under binary suprema (a.k.a. joins).[http://en.wikipedia.org/wiki/Boolean_prime_ideal_theorem#Prime_ideal_theorems]
(for example, algebra) A subring closed under multiplication by its containing ring.
Given to whimsy; capricious; odd; peculiar; playful; light-hearted or amusing.
Ideal is a related term of whimsical.
As a noun ideal
is ideal (perfect standard).As an adjective whimsical is
given to whimsy; capricious; odd; peculiar; playful; light-hearted or amusing.ideal
English
Adjective
(en adjective)- There will always be a wide interval between practical and ideal excellence.
- The idea of ghosts is ridiculous in the extreme; and if you continue to be swayed by ideal terrors —
[[s:Frankenstein/Chapter 4, Chapter 4],
- Life and death appeared to me ideal bounds, which I should first break through, and pour a torrent of light into our dark world.
- the ideal theory or philosophy
- ideal point
- An ideal triangle in the hyperbolic disk is one bounded by three geodesics that meet precisely on the circle.
Synonyms
* See alsoNoun
(en noun)- Ideals are like stars; you will not succeed in touching them with your hands. But like the seafaring man on the desert of waters, you choose them as your guides, and following them you will reach your destiny -
- If (1) the empty set were called a "small" set, and (2) any subset of a "small" set were also a "small" set, and (3) the union of any pair of "small" sets were also a "small" set, then the set of all "small" sets would form an ideal .
- Let be the ring of integers and let be its ideal of even integers. Then the quotient ring is a Boolean ring.
- The product of two ideals and is an ideal which is a subset of the intersection of and . This should help to understand why maximal ideals' are prime ' ideals . Likewise, the union of and is a subset of .