ProphetesAI is thinking...
propriety
MindMap
Loading...
Sources
propriety
propriety, n. (prəʊˈpraɪɪtɪ) Forms: 5–6 propriete, (-yete(e, 6 -ietee, -ietye, -yetie), 6–7 proprietie, 6– propriety. [ME. propriete, a. F. propriété (12th c. in Littré), ad. L. proprietāt-em: see property.] The quality of being proper, or that which is proper (in various senses of the adj.). † 1. a...
Oxford English Dictionary
prophetes.ai
Propriety Definition & Meaning - Merriam-Webster
the quality or state of being proper or suitable : appropriateness; conformity to what is socially acceptable in conduct or speech… See the full definition Menu Toggle
www.merriam-webster.com
Public propriety
In the canon law of the Catholic Church, the impediment of public propriety, also called public honesty or decency, is a diriment impediment to marriage
wikipedia.org
en.wikipedia.org
propriety
propriety/prəˈpraɪətɪ; prə`praɪətɪ/ n(fml 文)1(a) [U] state of being correct in one's social or moral behaviour 合乎社交或道德规范的举止; 得体 behave with perfect propriety 举止极为得体 The way tourists dress offends local standards of propriety. 这些游客的穿著在当地人的眼中简直不成体统.(b) the proprieties [pl]details of the rules of corre...
牛津英汉双解词典
prophetes.ai
Rothenberg propriety
Mathematical definition of propriety
Rothenberg defined propriety in a very general context; however for nearly all purposes it suffices to consider Strict propriety implies propriety but a proper scale need not be strictly proper; an example is the diatonic scale in equal temperament, where the tritone
wikipedia.org
en.wikipedia.org
Cancellation propriety for continuous functions. Let's say we have a continuous (onto) function $f:\mathbb{R}^n \rightarrow \mathbb{R}^n$ such that there exist $k,s \in \mathbb{N}: f^k=f^s$. Is it true that $f^{|k-s|}...
If $f$ onto, then the continuous condition for $f$ is superfluous. Since $f$ is onto, so is $f^s$. So from the condition that $f^{s + k} = f^s$, we obtain: $f^k\circ f^s = f^{s + k} = f^s = \text{id}\circ f^s$, since $f^s$ is onto, we can cancel $f^s$ on the right to obtain $f^k = \text{id}$.
prophetes.ai
Considerations on the Propriety of Imposing Taxes in the British Colonies
Considerations on the Propriety of Imposing Taxes in the British Colonies was a pamphlet written by Daniel Dulany the Younger in opposition to the Stamp In 1765, he published his Considerations on the Propriety of Imposing Taxes in the British Colonies in Annapolis.
wikipedia.org
en.wikipedia.org
What do we call the state of being proper? The set $\\{1, 2\\}$ is a proper subset of $\\{1, 2, 3\\}$. But $\\{1, 2, 3\\}$ itself is not. More generally, we might want to define a notion of "proper-ness" that derives...
The paper "Completeness and properness of refinement operators in inductive logic programming" uses _properness_ , though the authors may not be English first-language speakers. Wiktionary also has this meaning as the third offered for _properness_ _-ness_ and _-less_ are productive in English (for ...
prophetes.ai
"Self invertible" group Let there be an Abelian group with a binary operation $\ast$ on a set $S$. Let such a group respect the following propriety: $$ (X\ast Y)\ast Y = X$$ For any $X$ and $Y$ in $S$. I realize tha...
Yes, there are many groups where every element satisfies $Y * Y = e$. The simplest one is $\mathbb{Z}/2\mathbb{Z}$, the group of integers modulo 2 (under addition). These groups have interesting properties. For example you don't have to assume that the group is abelian; if a group is such that $Y * ...
prophetes.ai
Translate a sentence into predicate logic I want to translate this sentence > There exists $a$ such that if for all $b$ different from $a$, $b$ has the propriety $P$ then $a$ has the propriety $Q$ I translated it l...
It indeed looks weird, and that's because _typically_ an existential goes hand in hand with a conjunction ($\land$), rather than a conditional ($\rightarrow$). But: 'typically' is not the same as 'always'. Indeed, I would say this case is one of those rare exceptions where you do use a conditional. ...
prophetes.ai
过而不改·Unrectified: Ignorance of Propriety...?
子曰:"过而不改,是谓过矣。" 孔子说:"有了过错却不改正,这才是真正的过错啊。 " - 《论语》 15.30 Confucius said:" To have faults and not to rectify them - this, indeed, should be pronounced having faults. - Analects of Confucius, 15.30
unrectified1530.blogspot.com
Get rid of the square roots of the denominator: $\dfrac{1}{\sqrt{7}-2\sqrt{5}+\sqrt{3}}$ > How to get rid of the square roots of the denominator: $\dfrac{1}{\sqrt{7}-2\sqrt{5}+\sqrt{3}}$? * I squared the whole deno...
$$\begin{align}\frac{1}{\sqrt 7-2\sqrt 5+\sqrt 3}&=\frac{1}{\sqrt 7-2\sqrt 5+\sqrt 3}\cdot \frac{\sqrt 7-2\sqrt 5-\sqrt 3}{\sqrt 7-2\sqrt 5-\sqrt 3}\\\&=\frac{\sqrt 7-2\sqrt 5-\sqrt 3}{(\sqrt 7-2\sqrt 5)^2-3}\\\&=\frac{\sqrt 7-2\sqrt 5-\sqrt 3}{4(6-\sqrt{35})}\cdot\frac{6+\sqrt{35}}{6+\sqrt{35}}\\\&...
prophetes.ai
你见过的最美的翻译(汉译英)是什么?
Compassion is the beginning of benevolence; shame is the beginning of righteousness; humility is the beginning of propriety; right and wrong is the beginning If we can expand the four beginnings of benevolence, righteousness, propriety and wisdom, it will be enough to stabilize the world.
zhihu
www.zhihu.com
Study the convergence of a succession of functions Study the punctual and uniform convergence of $f_n(x)$ on $A$ $$f_n(x)=\frac{x}{1+n^2 x^2} \ \ \ A=[-1,1]$$ My reasoning: Punctual convergence $\forall x \in A $ ...
For an alternate proof, note that $f_n'(x)=0$ implies $x=\pm\frac1n$, and \begin{align} f_n\left(\frac1n\right) &= \frac1{2n}\\\ f_n\left(-\frac1n\right) &= -\frac1{2n}\\\ f(-1) &= -\frac1{1+n^2}\\\ f(1) &= \frac1{1+n^2}. \end{align} It follows that $$\lim_{n\to\infty}\sup_{x\in[-1,1]}|f_n(x)|=0, $$...
prophetes.ai
Product of matrices: $\mathbf Q^{-1}\cdot\mathbf B^T\cdot\mathbf B\cdot\mathbf Q$ Let $\mathbf Q$ be an orthogonal matrix ($\mathbf Q^T\cdot\mathbf Q=\mathbf I$). If I have another matrix $\mathbf B$, is there any spe...
For any matrix $B$, the matrix $B^TB$ will be symmetric and positive semidefinite. This matrix is sometimes referred to as the "Grammian matrix" or the "covariance matrix" associated with $B$. The matrix $Q^T(B^TB)Q$ will be symmetric and positive definite as well. It will also be similar to the mat...
prophetes.ai