Examples of using This theorem in English and their translations into Tagalog
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This theorem is one of.
The next two results are consequences of this theorem.
Ang dalawang argumentong So I doubt this theorem will be used that often.
Kaya duda ko ito teorama ay gagamitin na madalas.He spoke at the University so I went there and sure enough,he proved this theorem.
Siya nagsalita sa University kaya ako pumunta doon at ang nananagot sapat,he proved na ito teorama.This theorem remains as Osgood's outstanding single result.
Kronecker had first stated a version of this theorem in a lecture which he gave to the Accademia dei Lincei in 1886.
Kronecker had unang sinasabi ng isang bersyon ng teorama na ito sa isang panayam This theorem is the foundation for many poker strategy topics.
Ang teorama na ito However, Eudoxus was born within a few years of the death of Hippocrates, andso there follows the intriguing question of how Hippocrates proved this theorem.
Gayunman, Eudoxus ay ipinanganak sa loob ng ilang mga taon ng kamatayan ng Hippocrates, at kayamay mga sumusunod ang nag-iintriga ng mga katanungan kung paano Hippocrates proved na ito teorama.This theorem can be easily deduced from the actual Karamata theorem. .
Teorama na ito ay maaring madaling deduced mula sa mga aktwal In the paper he published in that year he gave three proofs of this theorem which were all based on a clever use of the interplay between the additive group of a finite division algebra A, and the multiplicative group A*= A-{0}.
Sa papel niya sa na-publish na taon siya ibinigay ng tatlong proofs ng mga ito teorama na kung saan ang lahat ay batay sa isang matalas ang paggamit ng pagtutulungan sa pagitan ng This theorem gave, as a corollary, the complete structure of all finite projective geometries.
Teorama ibinigay na ito, bilang isang corollary, kumpleto na ang istraktura ng lahat ng mga takda projective geometries.The first proof of this theorem was given by Dirichlet in his lectures of 1862(published 1904) before Heine proved it in 1872.
Ang unang patunay ng teorama na ito ay ibinigay sa pamamagitan ng sa Dirichlet kanyang lektura ng 1862( Publish 1904) bago Heine proved This theorem is widely used in the theory of group varieties, combinatorial group theory, and permutation group theory.
Teorama na ito ay malawak As a corollary to this theorem Higman proved the existence of a universal finitely presented group containing every finitely presented group as a subgroup.
Bilang isang corollary na ito teorama Higman proved ang pagkakaroon ng isang universal finitely ipinapahayag grupo na naglalaman ng bawat finitely ipinapahayag ng grupo bilang isang pangalawang putulong.This theorem, concerning the finite generation of the group of rational points on an elliptic curve, is beautifully surveyed in.
Ito teorama, tungkol sa hangganan henerasyon ng mga grupo ng mga puntos sa katuwiran ng isang tambilugin liko, ay beautifully ipasukat sa.The statement of this theorem is an afterthought to a paper in which Jacobi responds to the published correction by Thomas Clausen(1842) of an earlier paper by Jacobi(1836).
Ang pahayag na ito ng teorama ay isang nahuling isip sa isang papel sa kung saan Jacobi tumugon sa ang nai-publish sa pamamagitan ng pagwawasto Thomas Clausen( 1842) ng mas maaga ng isang papel sa pamamagitan ng Jacobi( 1836).This theorem is proved by Euclid in the Elements and it is proved there by the method of exhaustion due to Eudoxus.
Teorama proved na ito ay sa pamamagitan ng Euclid sa Sangkap at This theorem may have more known proofs than any other(the law of quadratic reciprocity being another contender for that distinction);
Posible na ang teoremang ito ay mas maraming kilalang katibayan kaysa sa iba( To prove this theorem, Gödel developed a technique now known as Gödel numbering, which codes formal expressions as natural numbers.”.
Upang patunayan ang teoremang ito, binuo ni Gödel This theorem showed that under the combined action of three operators on a physical event: P, the parity operator, which performed a reflection;
Teorama na ito ay nagpakita This theorem was conjectured in the 18th century, but it was not proved until 1896, when Hadamard and(independently) Charles de la Vallée Poussin, used complex analysis.
Teorama conjectured na ito ay sa ika-18 siglo, ngunit This theorem shows that if a cone is intersected by a plane in a conic, then the foci of the conic are the points where this plane is touched by the spheres inscribed in the cone.
Teorama na ito ay nagpapakita Since it is a monic polynomial with integer coefficients, it thus must have an integer root,and by a well-known theorem, this integer root then must be a divisor of pq.
Dahil Peano gave an existence theorem for this differential equation, giving conditions which guarantee at least one solution.
Peano ibinigay ng pagkakaroon teorama na ito para sa mga kaugalian equation, pagbibigay ng mga kondisyon na garantiya ng hindi bababa sa isang solusyon.Iyanaga managed to solve a question of Artin on generalising the principal ideal theorem and this was published in 1939.
Iyanaga pinamamahalaang upang malutas ang isang katanungan ng Artin sa generalising ang punong-guro ideal teorama at ito ay inilathala sa 1939.One of the themes running through much of his work is the Riemann-Roch theorem and this plays an important role in much of his research.
Isa ng ang mga tema na tumatakbo sa pamamagitan ng marami ng kanyang trabaho ay ang Riemann-Roch teorama at ito plays ng isang mahalagang papel sa marami ng kanyang mga pananaliksik.The topic proposed by Emmy Noether was on a topic assiciated to the Riemann-Roch theorem and this was indeed the topic on which his dissertation was written.
Ang paksang iminungkahi ng Emmy Noether ay sa isang paksa assiciated sa Riemann-Roch teorama at ito ay sa katunayan ang topic na kung saan ang kanyang disertasyon ay nakasulat.In his final year of study he wrote a paper on the theory of equations and Bézout 's theorem, and this was of such quality that he was allowed to graduate in 1800 without taking the final examination.
Sa kanyang huling taon ng pag-aaral wrote siya ng isang papel sa teorya ng equation at Bézout 's teorama, at ito ay tulad ng mga kalidad na siya ay pinapayagan sa mga nagtapos sa 1800 na walang dinadala ang mga huling pagsusuri.The work on cohomology led to Quillen giving a structure theorem for mod p cohomology rings of finite groups, this structure theorem solving a number of open questions in the area.
Ang trabaho sa cohomology na humantong sa Quillen pagbibigay ng isang istraktura Euclid changed the proofs of several theorems in this book so that they fitted the new definition of proportion given by Eudoxus.
Euclid ay nagbago ang proofs ng ilang mga theorems sa librong ito kaya na nilang husto ang bagong kahulugan ng katapat na ibinigay ng Eudoxus.
