Childish vs Infinite - What's the difference?
As an adjective childish
is of or suitable for a child.
As a noun infinite is
Of or suitable for a child.
- Your childish temper tantrums are not going to change my decision on this matter.
* (behaving immaturely) infantile, immature, silly, unbecoming, juvenile
Indefinably large, countlessly great; immense.
* , I.40:
* (and other bibliographic particulars) H. Brooke
- The number is so infinite , that verily it would be an easier matter for me to reckon up those that have feared the same.
* (and other bibliographic particulars) Marlowe
- Whatever is finite, as finite, will admit of no comparative relation with infinity; for whatever is less than infinite is still infinitely distant from infinity; and lower than infinite distance the lowest or least cannot sink.
* (and other bibliographic particulars) Milton
- infinite riches in a little room
Boundless, endless, without end or limits; innumerable.
* Bible, Psalms cxlvii. 5
- which infinite calamity shall cause to human life
With plural noun: infinitely many.
* 2012 , Helen Donelan, ?Karen Kear, ?Magnus Ramage, Online Communication and Collaboration: A Reader
- Great is our Lord, and of great power; his understanding is infinite .
(mathematics) Greater than any positive quantity or magnitude; limitless.
(set theory, of a set) Having infinitely many elements.
- Huxley's theory says that if you provide infinite monkeys with infinite typewriters, some monkey somewhere will eventually create a masterpiece – a play by Shakespeare, a Platonic dialogue, or an economic treatise by Adam Smith.
, year = 2009
, author = Brandon C. Look
, title = Symbolic Logic II, Lecture 2: Set Theory
, site = www.uky.edu/~look
, url = http://www.uky.edu/~look/Phi520-Lecture7.pdf
, accessdate = 2012-11-20 }}
(grammar) Not limited by person or number.
(music) Capable of endless repetition; said of certain forms of the canon, also called perpetual fugues, constructed so that their ends lead to their beginnings.
- For any infinite set, there is a 1-1 correspondence between it and at least one of its proper subsets. For example, there is a 1-1 correspondence between the set of natural numbers and the set of squares of natural numbers, which is a proper subset of the set of natural numbers.
Although the term is incomparable in the precise sense, it can be comparable both in mathematics and set theory to compare different degrees of infinity, and informally to denote yet a larger thing.
* (set theory) countably infinite
* (set theory) uncountable