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seemly
▪ I. seemly, a. (ˈsiːmlɪ) Forms: α. 3–4 semliche, (3 somlich, semlyche, sem(e)like), 3–4 sem(e)li, (3 semele, 3, 5 semle, 4 seemeli), 4 semelich(e, seem(e)lich, 4–5 semlich, 5 semelych, 4–6 semly, 5–6 semelie, (5 cemely, semly, seymely), 4–7 semely, (5–6 -ye), 5–7 seemely, (6 seemlie), 4– seemly. β....
Oxford English Dictionary
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Seemly, West Virginia
Seemly was an unincorporated community in Grant County, West Virginia, United States. Its post office is closed.
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seemly
seemly/ˈsi:mlɪ; `simlɪ/ / adj(-ier, -iest) (dated or fml 旧或文) proper and suitable by the standards of polite society 恰当的, 得体的, 适宜的(合乎礼仪的) seemly conduct, modesty 适度的举止、 谦虚 It would be more seemly to tell her after the funeral. 待葬礼过後再告诉她较合适.
牛津英汉双解词典
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Strong's Greek: 1933. ἐπιεικής (epieikés) -- seemly, equitable, yielding
NAS: peaceable, gentle, reasonable, KJV: peaceable, gentle, [and] easy to be intreated, INT: then peaceful gentle yielding full. 1 Peter 2:18 Adj-DMP GRK: ἀγαθοῖς καὶ ἐπιεικέσιν ἀλλὰ καὶ NAS: who are good and gentle, but also KJV: to the good and gentle, but also INT: good and gentle but also. Strong's Greek ...
biblehub.com
Rentokil initial Taiwan - 能多潔除蟲消毒衛生服務-新北分公司
變冷還被蚊子騷擾的原因大公開 ‼️ 蚊子都不用冬眠了嗎?怎麼越冷越多? ↘原來還有這種蚊子↘ 咬你的是「地下家蚊」烈 ...
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欣立除蟲公司 - 【蚊子又讓你失眠?】 夜裡蚊子總是很惱人嗎? 電蚊拍劈劈啪啪 怎麼殺都殺不完... | Facebook
【蚊子又讓你失眠?】 夜裡蚊子總是很惱人嗎? 電蚊拍劈劈啪啪 怎麼殺都殺不完 別以為蚊子是從外面飛進來的 ...
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What is bound states (in math)? From picture below, seemly, bound states is the solutions of equation, is right ? But in wiki, bound states is a physical conception, and I can't understand it. > ![enter image descrip...
It is the same as the physical conception. They are solutions where $|\psi|$ drops to zero as you leave the local minimum f the potential $V$, so the particle has little chance of being far away. It is said to be bound to that minimum.
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Explanation of non-orientability of the Möbius band I have read about the orientation of manifold in the Tu's book. The book is very readable but the first example about non-orientable manifold is seemly hard to under...
Try reading some other discussions (< < and then return to the book you are reading. Making a physical model is also a very good idea. Or just look at a cool picture: <
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Some notation in Orbital stability of standing waves for some nonlinear Schrödinger equations Picture below are from **Orbital stability of standing waves for some nonlinear Schrödinger equations**. First, what is th...
The notation $]a,b[$ is here meant to be the same thing as the open interval $(a,b)$. I believe this notation is meant to refer to the fact that $(a,b) = \\{ (-\infty,a] \cup [b,\infty)\\}^C$. As for the $I_\lambda$ definition, it's hard to say for sure from just the two small pictures you've posted...
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What is the mean of "to appear" in references I want to find the reference 21 in picture below. Then, it is French, I don't know French. Seemly, the reference 22 is like to 21, so I want to find reference 22, but what...
The standard meaning of it is: the article has been accepted, but it is not published yet.
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How to express "When it comes to"? So google translator seemly tells me that to express "When it comes to" I should use the following structure (I tried finding it on google and this forum but could not find it) > ...
... sounds funny, particularly the part. Looks like Google **_forcibly_** translated the word "it". Most naturally, we would say: {}{}/ You could say: > {}{}{}{} Your sentence, though, would be understood by nearly all native speakers if you just dropped .
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An exercise in the chapter of elliptic equations in Evans's PDE The following is from the 345th page of Evans 'Partial differential equations'. > In the following exercises we assume the coefficients of the various P...
It just wants you to show coercivity (and boundedness) which are the two assumptions in the Lax Milgran theorem (other than bilinearity).
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Why the structure group of principal $G$-bundle must be subgroup of $G$? As picture below, seemly, it is said that the structure group of principal $G$-bundle must be subgroup of $G$. Why ? Picture below is from the ...
Cosider two locally trivial $$ \varphi_{_U} :\pi^{-1}(U)\rightarrow U\times G \\\ \varphi_{_V} :\pi^{-1}(V)\rightarrow V\times G $$ So, $$ \varphi_{_V} \circ \varphi^{-1}_{_U} (x,g) \rightarrow (x,\varphi_{_{VU}}(x)g) $$ because $\varphi_{_{VU}}(x)g\in G$, assume $\varphi_{_{VU}}(x)g=h$ , then $\var...
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Reference about the surgery of Ricci flow I roughly read the Topping's _LECTURES ON THE RICCI FLOW_. There does not seem to be an introduction on surgery. Seemly, it is enough to deal singularity by blow up. Then, in ...
A group of five mathematicians (Bessières, Besson, Boileau, Maillot and Porti) have written a book aiming to give a complete proof of the Geometrisation Conjecture from pre-Perelman's results. As such, they present a version of Ricci flow with surgery. I hope the book will appear suitable to you (I ...
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What is spectral invariant? Picture below is from _The Spectrum of the Laplacian in Riemannian Geometry_ . What is the mean of spectral invariant ? I google spectral invariant , and find it is a notation of symplectic...
The term _spectral invariant_ refers to an object, such as a function $Z$ of one real variable, defined in terms of a Riemannian manifold $(M, g)$ but that depends only on the spectrum of the $g$-Laplacian on the space of square-integrable functions on $M$. Isometric manifolds obviously have equal s...
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