Examples of using The theorem in English and their translations into Danish
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The Theorem Concerning Cumulative Curvature of a Line.
It appears that the theorem is due to William Wallace.
Det ser ud til, at den sætning er på grund af William Wallace.The theorem applies not just to adjacent critical points;
Zassenhaus(1934) discovered a second improvement of the theorem.
Zassenhaus(1934) opdaget en anden forbedring af den sætning.
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The theorem can be extended to cover spherical volumes; i.e., balls of charge.
Sætningen kan udvides til at omfatte sfæriske mængder; dvs. kugler af afgift.Note that a must be strictly algebraic;if a is transcental the theorem is not true.
This is the theorem that should appear on the frontispiece of the'governance' package.
Det er den læresætning, der bør stå på styringspakkens titelblad.Den nemmeste måde at gøre dette på er at give en formel,eksplicit bevis af theorem.In fact in a letter Abel had written to Crelle on 18 October 1828 he gave the theorem.
Faktisk i en skrivelse Abel havde skrevet til Crelle Kronecker never published the theorem and it was Castelnuovo's version which appeared in print.
Kroneckers aldrig offentliggjort den sætning, og det var Castelnuovo's version, der udkom i print.It is remarkable work and, except for one gap,proves the theorem as Ruffini claimed.
Det er bemærkelsesværdigt arbejde og er med undtagelse af en forskel,der viser den sætning som Ruffini hævdet.The theorem solves the problem of how many configurations with certain properties exist.
Den sætning løser problemet med, hvor mange konfigurationer med bestemte egenskaber eksisterer.There are various corollaries of the theorem which are sometimes also labeled the Virial Theorem.
Der er forskellige følgerne af theorem undertiden også mærket af Virial Theorem.The theorem(iv) was attributed to Thales by Eudemus for less than completely convincing reasons.
Den sætning(iv) blev tilskrevet Thales ved Eudemus for mindre end fuldstændig overbevisende grunde.The theorem is important, but does not lead to a solution of the Riemann Hypothesis as Jensen had hoped.
Den sætning er vigtig, men ikke fører til en løsning af Riemann Hypotese som Jensen havde håbet.He completed his doctoral studies in 1938 obtaining, among other results, the theorem now known as the Hasse-Arf theorem. .
Han afsluttede sin ph.d. -studier i 1938 at opnå blandt andre resultater, teorem nu kendt som Hasse-ARF The theorem below gives a simple formula for the integral of curvature over a surface of revolution.
Theorem nedenfor giver en enkel formel for integreret krumningsradius over en overflade af revolution.Hölder proved the uniqueness of the factor groups in a composition series, the theorem now called the Jordan-Hölder theorem. .
Hölder viste The theorem may be used to determine the effect of non-smooth singularities such as conical points or ridges.
Theorem kan anvendes til at bestemme virkningen af ikke-glidende særtræk såsom konisk punkter eller kanter.In February 1671 he discovered Taylor 's theorem(not published by Taylor until 1715), and the theorem is contained in a letter sent to Collins on 15 February 1671.
I februar 1671, han opdagede Taylor's sætning(ikke offentliggjort af Taylor indtil 1715), og den sætning er indeholdt i et brev sendt til Collins The theorem(iv) was attributed to Thales by Eudemus for less than completely convincing reasons. Proclus writes see.
Den sætning(iv) blev tilskrevet Thales ved Eudemus for mindre end fuldstændig overbevisende grunde. Proclus skriver se.However the Simson line does not appear in his work butPoncelet in Propriétés Projectives says that the theorem was attributed to Simson by Servois in the Gergonne 's Journal.
Men Simson linje vises ikke i hans arbejde, menPoncelet i propriétés Projectives siger, at den sætning blev tilskrevet Simson ved Servois i Gergonne's Journal.The theorem stating: The number of primes n tends to∞ as n/logen, was conjectured in the 18th century.
Den sætning med angivelse af: Antallet af primtal n tendens til ∞ som n/ log e n, blev conjectured i det 18 århundrede.Iblanding af konisk punkter I Gauss-Bonnet Theorem Theorem kan anvendes til at bestemme virkningen af ikke-glidende særtræk såsom konisk punkter eller kanter.From the theorem of Nash one can deduce more or less immediately my theorem, following a quite different line of proof.
Fra teorem af Nash man kan udlede mere eller mindre øjeblikkeligt min sætning, efter en helt anden linje af beviset.Examples are extensions of Mergelyan's approximation theorem and the theorem of Frigyes Riesz and Marcel Riesz concerning measures on the unit circle orthogonal to polynomials.
Eksempler er forlængelser af Mergelyan's tilnærmelse The theorem, now called the Riesz-Fischer theorem, is one of the great achievements of the Lebesgue theory of integration.
Den sætning, nu kaldet Riesz-Fischer 
