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homogen

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homogen
homogen (ˈhɒmədʒɛn) [f. homo- + -gen.] † 1. Bot. (See quot.) Obs.1866 Treas. Bot., Homogens, a name given by Lindley to a division of Exogens characterised by the wood being arranged in the form of wedges, and not in concentric circles. 2. Biol. A part or organ homogenetic with another: see homogene... Oxford English Dictionary
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Homogeneity and heterogeneity
Etymology and spelling The words homogeneous and heterogeneous come from Medieval Latin homogeneus and heterogeneus, from Ancient Greek ὁμογενής (homogenēs wikipedia.org
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homoplast
homoplast Biol. (ˈhɒməʊplæst) [f. as prec. + Gr. πλαστός moulded: cf. bioplast.] 1. An organ or part homoplastic with another (see next); opp. to homogen 2.1870 Ray Lankester in Ann. Nat. Hist. VI. 39 Such details of agreement..we must set down to the fact that they are to a great degree homoplasts,... Oxford English Dictionary
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Edition SCSI-9 – "All She Wants Is" (7:06) Superpitcher – "Mushroom" (6:32) Phong Sui – "Wintermute (Burger/Voigt Mix)" (4:37) Justus Köhncke – "Homogen wikipedia.org
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homogenous
▪ I. homogenous, a. (həʊˈmɒdʒɪnəs) [f. homo- + Gr. γένος race + -ous.] 1. Biol. = homogenetic 1.1870 Ray Lankester in Ann. Nat. Hist. VI. 36 Structures which are genetically related, in so far as they have a single representative in a common ancestor, may be called homogenous. We may trace an homoge... Oxford English Dictionary
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Victor Schlegel
Victor Schlegel (1883) "Theorie der homogen zusammengesetzten Raumgebilde", Nova Acta, Ksl. Leop.-Carol. wikipedia.org
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System of homogen linear equations in a division ring Let $K$ be a division ring (one does not suppose that $K$ is commutative) and $m,n$ two positive integers such that $m<n$. Consider the system of homogen linear eq...
The system has infinitely many solutions, even when $K$ is non-commutative. The reason is that row reduction is still possible over a non-commutative division ring. * * * Side remark: if $K$ is commutative, the system has infinitely many solutions only if $K$ is infinite. If $K$ is not commutative, ...
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Charlotte Moorman
In 1966, Beuys, then associated with Fluxus, created his work Infiltration Homogen für Cello, a felt-covered violoncello, in her honor. wikipedia.org
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Solve $y''-3y'+2y=x^2$ Solve $$y''-3y'+2y=x^2$$ My approach: Homogen solution: $$y = Ae^x +Be^{2x}$$ Particular solution: $$ y_p = x(Ax^2+Bx+C) = Ax^3+Bx^2+Cx $$ $$ y_p' = 3Ax^2 + 2Bx + C$$ $$y_p'' = 6Ax + 2B$$ Pu...
It looks like your method for finding the particular solution is wrong. You want $y_p = ax^2 + bx + c$. I'm not sure why you introduce an extra factor of $x$. Here's a list of trial functions for your particular solution.
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Schlegel diagram
References Further reading Victor Schlegel (1883) Theorie der homogen zusammengesetzten Raumgebilde, Nova Acta, Ksl. Leop.-Carol. wikipedia.org
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Cadmium exceeding 100ppm in homogen - ฉันรักแปล
Cadmium exceeding 100ppm in homogeneous material in alloys as electrical/mechanical solder joints to electrical conductors located directly on the voice coil in transducers used in high-powered loudspeakers with sound pressure levels of 100 dB (A) and more.
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同质与异质
后面两个单词又来源于两个古希腊语的单词「ὁμογενής」(homogenēs)与「ἑτερογενής」(heterogenēs),它们分别由ὁμός(homos,意为「相同」)和ἕτερος(heteros,意为「不同」)两个前缀以及统一的后缀「γένος」(genos,意为「种」)组成。 wikipedia.org
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Two differential equations How would I solve these differential equations? $$y'+2y^2=\frac{6}{x^2}$$ I tried finding integral product but couldn't find its integral. And also tried to trasform into homogen equation....
Well, I can figure out the second one. My guess was we could get the left side of the equation to look like $$\frac d{dx}(f(x)e^{2y})=2f(x)e^{2y}y'+f'(x)e^{2y}$$ through the use of an integrating factor. So we have $$\frac{f'(x)}{2f(x)}=\frac1x$$ $$\ln f(x)=2\ln x$$ $$f(x)=x^2$$ To get the equation ...
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Joseph Beuys
Infiltration Homogen for Piano (performance, 1966) Beuys performed in Düsseldorf in 1966. wikipedia.org
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Differential equation with $w$ and $w_0$ Given is the following differential equation \begin{align} y'' +w^2y = cos(w_0x), \\\\\\\ w,w_0>0, w\neq w_0 \\\\\\\ y(0)=1, y'(0)=0 \end{align} So I procede solving the homog...
Hint: Try to solve first $$y_1''+ w^2 y_1 =0$$ Then try to substitute $y_2(x)=A\cos(w_0 x)+B\sin(w_0 x)$ to the original equation, and try to find $A$ and $B$. Then the complete solution will be $$y(x)=y_1(x)+y_2(x)$$ because the linearity: $$y''+w^2y=(y_1''+w^2y_1)+(y_2''+w^2y_2)=(0)+(\cos(w_0 x))=...
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