英文字典中文字典


英文字典中文字典51ZiDian.com



中文字典辞典   英文字典 a   b   c   d   e   f   g   h   i   j   k   l   m   n   o   p   q   r   s   t   u   v   w   x   y   z       







请输入英文单字,中文词皆可:

son    音标拼音: [s'ʌn]
n. 儿子,女婿,国民

儿子,女婿,国民

son
n 1: a male human offspring; "their son became a famous judge";
"his boy is taller than he is" [synonym: {son}, {boy}] [ant:
{daughter}, {girl}]
2: the divine word of God; the second person in the Trinity
(incarnate in Jesus) [synonym: {Son}, {Word}, {Logos}]

Son \Son\, n. [OE. sone, sune, AS. sunu; akin to D. zoon, OS.,
OFries., & OHG. sunu, G. sohn, Icel. sonr, Sw. son, Dan.
s["o]n, Goth. sunus, Lith. sunus, Russ. suin', Skr. s[=u]nu
(from s[=u] to beget, to bear), and Gr. ? son. [root]293. Cf.
{Sow}, n.]
1. A male child; the male issue, or offspring, of a parent,
father or mother.
[1913 Webster]

Sarah conceived, and bare Abraham a son. --Gen. xxi.
2.
[1913 Webster]

2. A male descendant, however distant; hence, in the plural,
descendants in general.
[1913 Webster]

I am the son of the wise, the son of ancient kings.
--Isa. xix.
11.
[1913 Webster]

I am the Lord, I change not; therefore ye sons of
Jacob are not consumed. --Mal. iii. 6.
[1913 Webster]

3. Any young male person spoken of as a child; an adopted
male child; a pupil, ward, or any other young male
dependent.
[1913 Webster]

The child grew, and she brought him unto Pharaoh's
daughter, and he became her son. --Ex. ii. 10.
[1913 Webster]

Be plain, good son, and homely in thy drift. --Shak.
[1913 Webster]

4. A native or inhabitant of some specified place; as, sons
of Albion; sons of New England.
[1913 Webster]

5. The produce of anything.
[1913 Webster]

Earth's tall sons, the cedar, oak, and pine.
--Blackmore.
[1913 Webster]

6. (Commonly with the def. article) Jesus Christ, the Savior;
-- called the Son of God, and the Son of man.
[1913 Webster]

We . . . do testify that the Father sent the Son to
be the Savior of the world. --1 John iv.
14.
[1913 Webster]

Who gave His Son sure all has given. --Keble.
[1913 Webster]

Note: The expressions son of pride, sons of light, son of
Belial, are Hebraisms, which denote persons possessing
the qualitites of pride, of light, or of Belial, as
children inherit the qualities of their ancestors.
[1913 Webster]

{Sons of the prophets}. See School of the prophets, under
{Prophet}.
[1913 Webster]

62 Moby Thesaurus words for "son":
aunt, auntie, blood brother, brethren, brother, bub, bubba, bud,
buddy, child, country cousin, cousin, cousin once removed,
cousin twice removed, daughter, descendant, father, first cousin,
foster brother, foster child, frater, grandchild, granddaughter,
grandnephew, grandniece, grandson, granduncle, great-aunt,
great-uncle, half brother, heiress, junior, kid brother, lad,
laddie, mother, nephew, niece, nuncle, nunks, nunky, offspring,
scion, second cousin, sis, sissy, sister, sister-german, sistern,
son and heir, sonny, stepbrother, stepchild, stepdaughter,
stepsister, stepson, stripling, tad, unc, uncle, uncs,
uterine brother

安装中文字典英文字典查询工具!


中文字典英文字典工具:
选择颜色:
输入中英文单字

































































英文字典中文字典相关资料:


  • Homotopy groups O(N) and SO(N): $\\pi_m(O(N))$ v. s. $\\pi_m(SO(N))$
    I have known the data of $\\pi_m(SO(N))$ from this Table: $$\\overset{\\displaystyle\\qquad\\qquad\\qquad\\qquad\\qquad\\qquad\\quad\\textbf{Homotopy groups of
  • Dimension of SO (n) and its generators - Mathematics Stack Exchange
    The generators of $SO(n)$ are pure imaginary antisymmetric $n \\times n$ matrices How can this fact be used to show that the dimension of $SO(n)$ is $\\frac{n(n-1
  • Fundamental group of the special orthogonal group SO(n)
    Also, if I'm not mistaken, Steenrod gives a more direct argument in "Topology of Fibre Bundles," but he might be using the long exact sequence of a fibration (which you mentioned)
  • orthogonal matrices - Irreducible representations of $SO (N . . .
    I'm looking for a reference proof where I can understand the irreps of $SO(N)$ I'm particularly interested in the case when $N=2M$ is even, and I'm really only
  • Prove that the manifold $SO (n)$ is connected
    The question really is that simple: Prove that the manifold $SO (n) \subset GL (n, \mathbb {R})$ is connected it is very easy to see that the elements of $SO (n
  • Diophantus Epitaph Riddle - Mathematics Stack Exchange
    Diophantus' childhood ended at $14$, he grew a beard at $21$, married at $33$, and had a son at $38$ Diophantus' son died at $42$, when Diophantus himself was $80$, and so Diophantus died four years later when he was $84$ Checks out!
  • Representation theory of $SO (n)$ - Mathematics Stack Exchange
    Regarding the downvote: I am really sorry if this answer sounds too harsh, but math SE is not the correct place to ask this kind of questions which amounts to «please explain the represnetation theory of SO (n) to me» and to which not even a whole seminar would provide a complete answer The book by Fulton and Harris is a 500-page answer to this question, and it is an amazingly good answer
  • lie groups - Lie Algebra of SO (n) - Mathematics Stack Exchange
    Welcome to the language barrier between physicists and mathematicians Physicists prefer to use hermitian operators, while mathematicians are not biased towards hermitian operators So for instance, while for mathematicians, the Lie algebra $\mathfrak {so} (n)$ consists of skew-adjoint matrices (with respect to the Euclidean inner product on $\mathbb {R}^n$), physicists prefer to multiply them
  • Diophantus Lifespan - Mathematics Stack Exchange
    "The son lived exactly half as long as his father" is I think unambiguous Almost nothing is known about Diophantus' life, and there is scholarly dispute about the approximate period in which he lived
  • Homotopic type of $GL^+ (n)$, $SL (n)$ and $SO (n)$
    I don't believe that the tag homotopy-type-theory is warranted, unless you are looking for a solution in the new foundational framework of homotopy type theory It sure would be an interesting question in this framework, although a question of a vastly different spirit





中文字典-英文字典  2005-2009