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:

powdery    音标拼音: [p'ɑʊdɚi]
a. 粉的,粉状的,满是粉的

粉的,粉状的,满是粉的

powdery
adj 1: consisting of fine particles; "powdered cellulose";
"powdery snow"; "pulverized sugar is prepared from
granulated sugar by grinding" [synonym: {powdered},
{powdery}, {pulverized}, {pulverised}, {small-grained},
{fine-grained}]
2: as if dulled in color with a sprinkling of powder; "a powdery
blue"

Powdery \Pow"der*y\, a.
1. Easily crumbling to pieces; friable; loose; as, a powdery
spar.
[1913 Webster]

2. Sprinkled or covered with powder; dusty; as, the powdery
bloom on plums.
[1913 Webster]

3. Resembling powder; consisting of powder. "The powdery
snow." --Wordsworth.
[1913 Webster]

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:


  • complex analysis - Show that the function $f (z) = \log (z-i)$ is . . .
    Ok but the result ends up being the same, $u_ {xx} + u_ {yy}$ is never becoming zero since it is $\frac {x+y-1} {\sqrt {x^2 + (y-1)^2}}$
  • What were Jacques Derridas most important ideas?
    See a helpful survey in SEP, Jacques Derrida His most recognizable trademark idea is deconstruction, which upends settled lines of thought by tracing their contingent genealogy and or argumentative structure to expose biases, shaky presuppositions, paradoxes, etc
  • When 0 is multiplied with infinity, what is the result?
    What I would say is that you can multiply any non-zero number by infinity and get either infinity or negative infinity as long as it isn't used in any mathematical proof Because multiplying by infinity is the equivalent of dividing by 0 When you allow things like that in proofs you end up with nonsense like 1 = 0 Multiplying 0 by infinity is the equivalent of 0 0 which is undefined
  • Integral of $\sqrt {1-x^2}$ using integration by parts
    A different approach, building up from first principles, without using cos or sin to get the identity, $$\arcsin (x) = \int\frac1 {\sqrt {1-x^2}}dx$$ where the integrals is from 0 to z With the integration by parts given in previous answers, this gives the result The distance around a unit circle traveled from the y axis for a distance on the x axis = $\arcsin (x)$ $$\arcsin (x) = \int\frac
  • factorial - Why does 0! = 1? - Mathematics Stack Exchange
    The theorem that $\binom {n} {k} = \frac {n!} {k! (n-k)!}$ already assumes $0!$ is defined to be $1$ Otherwise this would be restricted to $0 <k < n$ A reason that we do define $0!$ to be $1$ is so that we can cover those edge cases with the same formula, instead of having to treat them separately We treat binomial coefficients like $\binom {5} {6}$ separately already; the theorem assumes
  • Who first defined truth as adæquatio rei et intellectus?
    António Manuel Martins claims (@44:41 of his lecture quot;Fonseca on Signs quot;) that the origin of what is now called the correspondence theory of truth, Veritas est adæquatio rei et intellectus
  • metaphysics - How does philosophy define the concept of error and . . .
    This is not an answer to my question I did not ask what a judgment is First, how do you determine that a given fallacy is actually a fallacy? And second, how do you account for the fact that appealing to authority can be correct in certain contexts?Is an objective deviation from truth is an error? I don't think so
  • What are the criteria for bad faith questions?
    The main criteria is that it be asked in bad faith ;-) I'm not entirely insincere: The question is rather how can we tell that, and a big part of the answer is "context"; it's not mainly the question itself
  • User Mrexcel - Mathematics Stack Exchange
    Q A for people studying math at any level and professionals in related fields
  • geometric topology - What is the formal definition of a hole . . .
    To address your title question: There is no formal definition of a hole The purpose of the whole hole thing is to use our perception of familiar examples (annulus, torus) together with plain language (hole) in order to motivate topological concepts (Betti number, homology) Once your understanding of these topological concepts rises to a sufficient level, you perceive that they go far beyond





中文字典-英文字典  2005-2009