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         De Moivre Abraham:     more books (34)
  1. The Doctrine of Chances; Or, a Method of Calculating the Probabilities of Events in Play. (AMS Chelsea Publishing) by Abraham De Moivre, 1967-06
  2. The doctrine of chances: or, A Method of Calculating the Probabilities of Events in Play. by Abraham (1667-1754). DE MOIVRE, 1756
  3. Abraham de Moivre: Mathematician, De Moivre's formula, Complex number,Trigonometry, Normal distribution, Probability theory,Edmond Halley, Huguenot
  4. Early eighteenth-century Newtonianism: the Huguenot contribution [An article from: Studies in History and Philosophy of Science] by J.F. Baillon, 2004-09-01
  5. A rare pamphlet of Moivre and some of [his] discoveries by Raymond Clare Archibald, 1926

41. Moivre - Stirling - Pi
Translate this page abraham de moivre (1667-1754) / James Stirling (1692-1770). abraham de moivre estné en 1667 à Vitry-le-François, mais s'installe à Londres à 18 ans.
http://membres.lycos.fr/bgourevitch/mathematiciens/moivre/moivre.html
page d' accueil
Abraham de Moivre (1667-1754) / James Stirling (1692-1770)
Fondamental...
Tranches de vie Principia de Newton Newton
exp(-ax
ln(n!)

Autour de
, qui, finalement est preque aussi beau que exp(i
Introduisons pour cela la suite s n =(n+1/2)Ln(n)-n-Ln(n!)
u n =s n -s n-1
. On obtient en simplifiant :
u n s n (car les termes s n-1 , s n-2 u n Donc : soit Cool ! c'est bien ce que l'on voulait ! , il me semble) Passons maintenant à la densité de la loi normale ou, ce qui revient au même, l'aire sous la "cloche de Gauss". Notons de plus qu'avec le changement de variable sur R x=t (x)= C a R +y a R K a =[0,a] L'exponentielle est positive et puisque r donc l'encadrement donne : R R Essais k plus loin que dans la somme. Cela donne ainsi pour k=5 n/k k=0 k=1 k=2 k=3 k=4 k=5 n=5 n=10 n=50 n=100 n=200 On peut estimer cette convergence : k=0 k=1 k=2 k=3 k=4 k=5 Log(n) 3.9Log(n) 5.2Log(n) 8Log(n) 9,6Log(n) 11.5Log(n) Mouais, pas terrible... Et pour ne rien arranger, le d' Aitken n'est pas du tout efficace, bon, tant pis ! p est un nombre proche de p et Borwein Pi

42. Rare Mathematics Titles
Mishnat hamidot. 1864. moivre, abraham de,, The doctrine of chances or, A methodof c, 1718. moivre, abraham de,, The doctrine of chances or, A method of c, 1756.
http://web.uflib.ufl.edu/spec/rarebook/science/math.htm
From: A Treatise of the System of the World.
By Isaac Newton. London, 1728.
MATHEMATICS
Author Date
Index
UF Libraries Catalog Agnesi, Maria Gaetan Instituzioni analitiche ad uso della giove Allaize, Cours de mathematiques, a l'usage des ecol Angeli, Stefano degl Problemata geometrica sexaginta. Circa con Archimedes. Archimedis opera non nvlla Barnes, William, A few words on the advantages of a more co Barnes, William, A mathematical investigation of the princi Barrow, Isaac, Lectio reverendi et doctissimi viri D. Isa Bassi, D. Giulio. Dell' arimmetica pratica Bernoulli, Jean, Johannis Bernoulli ... Opera omnia, tam an Carisi, Pellegrino F Scuola d'aritmetica pratica Clark, Samuel, The laws of chance : or, A mathematical in Colburn, Warren, Arithmetic : being a sequel to First lesso Condorcet, Jean-Anto Essai sur l'application de l'analyse a la Davila y Heredia, An Demostrar la inteligencia de Archimedes, q Dilworth, Thomas, The schoolmasters assistant. Dupin, Charles, Mathematics practically applied to the use Euclid.

43. Rare Mathematics Titles
moivre, abraham de,, The doctrine of chances or, A method of c, 1718. Renolds,George. moivre, abraham de,, The doctrine of chances or, A method of c, 1756.
http://web.uflib.ufl.edu/spec/rarebook/science/math2.htm
From: A Treatise of the System of the World.
By Isaac Newton. London, 1728.
MATHEMATICS
Date Author
Index
UF Libraries Catalog Fine, Oronce, Orontii Finaei Delphinatis, regii mathemat Archimedes. Archimedis opera non nvlla Euclid. De gli Elementi d'Euclide libri quindici Vicentino, Silvio Be Quattro libri geometrici Oughtred, William, Arithmeticae in numeris et speciebus insti Potter, Francis, An interpretation of the number 666. Bassi, D. Giulio. Dell' arimmetica pratica Vossius, Gerardus Jo Gerardi Ioannis Vossii De qvatvor artibvs Vlacq, Adriaan. Tables de sinus tangentes, secantes: et de Ward, Seth, Idea trigonometriae demonstratae : in usum Angeli, Stefano degl Problemata geometrica sexaginta. Circa con Euclid. Euclid's elements of geometry / In XV. Bo Barrow, Isaac, Lectio reverendi et doctissimi viri D. Isa Euclid. Euclidis Elementorum libri XV breviter dem Davila y Heredia, An Demostrar la inteligencia de Archimedes, q Ozanam, Jacques, Tables des sinus, tangentes et secantes; e Euclid.

44. 1Up Info > Mathematics, Biographies - Encyclopedia
Cournot, Antoine Augustin • D'Alembert, Jean le Rond • Darboux, Jean Gaston• dedekind, Julius Wilhelm Richard • de moivre, abraham • de Morgan
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45. 1Up Info > Moivre, Abraham De (Mathematics, Biographies) - Encyclopedia
You are here 1Up Info Encyclopedia Mathematics, Biographies moivre,abraham de, 1Up Info A Portal with a Difference. moivre, abraham de.
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Mathematics, Biographies Moivre, Abraham de Related Category: Mathematics, Biographies Moivre, Abraham de Pronunciation Key Doctrine of Chances (1718). There are three mathematical theorems which bear his name.
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46. Bedeutende Mathematiker
Translate this page 1748, Basel). Gauss Carl Friedrich (1777 Braunschweig - 1855, Göttingen),moivre abraham de (1667 - 1754, London). Gödel Kurt (1906
http://www.mathematik.ch/mathematiker/
Home Geschichte Mathematiker Zitate ... Suche Bedeutende Mathematiker alphabetisch nach Geburtsdatum Abel Niels (1802 -1829, Froland, Norwegen) Thales von Milet (um 625 - 546 v. Chr.) Appolonios von Perge (262 - 190 v.Chr., Pergamon?) Pythagoras von Samos (um 580 - 496 v. Chr., Kroton) Archimedes (287 - 212 v. Chr., Syrakus) Zenon von Elea (um 490 - um 430 v.Chr.) Aristoteles (384 - 322 v. Chr., Chalkis) Aristoteles (384 - 322 v. Chr., Chalkis) Banach Stefan (1892 - 1945, Lwów) Euklid von Alexandria (um 360 - um 300 v. Chr. ?) Bernoulli Jakob (1654 - 1705, Basel) Archimedes (287 - 212 v. Chr., Syrakus) Bernoulli Johann (Bruder von Jakob) (1667 - 1748, Basel) Appolonios von Perge (262 - 190 v.Chr., Pergamon?) Bernoulli Daniel (Sohn von Johann) (1700 - 1782, Basel) Ries Adam (1492 - 1559, Annaberg) Bessel Friedrich Wilhelm (1784 - 1846, Königsberg) Cardano Geronimo (1501 - 1576, Rom) Cantor Georg (1845-1918, Halle) Viète (Vieta) François (1540 - 1603, Paris) Cauchy Augustin Louis (1789 - 1857, Paris) Neper (Napier) John (1550 - 1617, Edinburgh) Cardano Geronimo (1501 - 1576, Rom)

47. Browse Results Posner Family Collection In Electronic Format
2, 523.6 H18A, Astronomiae cometicae synopsis /, Halley, Edmond; moivre,abraham de , 1705. The doctrine of chances moivre, abraham de , 1718.
http://posner.library.cmu.edu:8080/DIVA_Posner/jsp/browse-results.jsp?type=bd&q=

48. Abraham De Moivre - Acapedia - Free Knowledge, For All
Friends of Acapedia abraham de moivre. The French mathematician abraham de moivre(May 26 1667 November 27 1754) was a good friend of Isaac Newton.
http://acapedia.org/aca/Abraham_de_Moivre
var srl33t_id = '4200';

49. Moivre
Translate this page abraham de moivre (1667-1754), mathématicien anglais d'origine française né àVitry-le-François, auteur de travaux importants concernant les probabilités
http://www.reunion.iufm.fr/recherche/irem/histoire/nouvellepage22.htm
Accueil Histoire des mathématiques Philosophie des sciences Axiomatiques ... Informations - Contacts Abraham de Moivre (1667-1754) , mathématicien anglais d'origine française né à Vitry-le-François, auteur de travaux importants concernant les probabilités et les nombres imaginaires, connu pour une formule qui porte son nom.

50. Wiskundigen - De Moivre
de moivre. abraham de moivre (1667 1754) was een van oorsprong Frans wiskundige,die echter het grootste deel van zijn werkzame leven in Engeland doorbracht.
http://www.wiskundeweb.nl/Wiskundegeschiedenis/Wiskundigen/DeMoivre.html

51. EE126 Home Page: Jean Walrand
Correlation. uncorrelation implies independence for jointly Gaussian rvs.D. de moivre, abraham. detection. Discrete random variable. E. Ergodicity.
http://robotics.eecs.berkeley.edu/~wlr/126/
EECS 126 - Probability and Random Processes J. Walrand INDEX
This page is an index for the commentaries and the notes. A B C D ... J K L M N O P Q R S T U ... w XY Z A Additive countably A periodic Markov chain B Balance equations continuous time discrete time detailed in discrete or continuous time Bayes, Thomas Bayes’ Rule Bayesian Detection Bernoulli, Jacob ... Brownian Motion Process as scaled Bernoulli process C Cards – 52-card deck Central Limit Theorem Approximate Chebychev Inequality ... Continuous – Probability Confidence Intervals Countable Set Additivity Conditional Probability Expectation o Smoothing property o Of jointly Gaussian rvs Continuous random variable Convergence of random variables: see limits Correlation uncorrelation implies independence for jointly Gaussian rvs D De Moivre, Abraham Detection Discrete random variable E Ergodicity of random process of Markov chain Estimation Properties of estimator MMSE LLSE ... Conditional Of function of random variable F First passage time of Markov chain Fortune process Function of random variable of Markov process may not be Markov G Gambling system: Impossibility of Gambler’s ruin problem Gauss, Carl Friedrich

52. EE126 Commentaries 1: Jean Walrand
We will learn this result as the weak law of large numbers. de moivre (abraham,1667 – 1754). Bounding the probability of deviation Normal distribution. .
http://robotics.eecs.berkeley.edu/~wlr/126/w1.htm
EECS 126 - Probability and Random Processes J. Walrand UNCERTAINTY AND RANDOMNESS Models and Physical Reality Concepts and Calculations Function of Hidden Variable
Models and Physical Reality
Probability Theory is a mathematical model of uncertainty. In these lectures, we introduce examples of uncertainty and we explain how the theory models them. It is important to appreciate the difference between uncertainty in the physical world and the models of Probability Theory. That difference is similar to that between laws of theoretical physics and the real world: even though mathematicians view the theory as standing on its own, when engineers use it, they see it as a model of the physical world. Consider flipping a fair coin repeatedly. Designate by and 1 the two possible outcomes of a coin flip (say for head and 1 for tail). This experiment takes place in the physical world. The outcomes are uncertain. This week, we try to appreciate the probability model of this experiment and to relate it to the physical reality.
Concepts and Calculations
In my twenty years of teaching probability models, I have always found that what is most subtle is the

53. Abraham De Moivre
Back to KISH Home Page. abraham de moivre. abraham de moivre was born on May26, 1667. moivre was born at Vitry and died in London on November 27, 1754.
http://www.edu.pe.ca/kish/Grassroots/math/moivre.htm
Back to KISH Home Page Abraham de Moivre Abraham de Moivre was born on May 26, 1667. Moivre was born at Vitry and died in London on November 27, 1754. Moivre was interested in mathematics when he started his education in England. He was introduced to mathematics when he found a copy of "Newton’s Principles". Trigonometry was first taken into analysis when De Moivre came up with the formula (cos x + I sin x)n. De Moivre is remembered by this formula by many mathematicians. De Moivre also pioneered the development of the Probability theory. This theory is the study of possible outcomes of given events together with their relative likelihoods and distributions. De Moivre also worked with Lambert, and came up with the formula (sin nx + I cos nx). This formula gives the quadratic factors. While figuring out these formulas he was also a tutor and then became a mathematician. De Moivre is also famous for a book that he had published in 1718. He published "The Doctrine of Chance". De Moivre thought that he should sleep 15 minutes longer each night and from this arithmetic progression he calculated that he would die on the day that he slept 24 hours. And he was right, he did die. He was not the only person that did this and was right because Cardan did it too.

54. Ess1454 LindebergFeller Theorem Ess1454b LINDEBERG CONDITION
ess1664, Modulus Transformation, ess1664b, moivre, abraham de See demoivre, abraham, ess1665, moivreLaplace Theorem (Global), ess1666,
http://www.isye.gatech.edu/~brani/ess2/ess5.htm
LindebergFeller Theorem LINDEBERG CONDITION See LINDEBERGFELLER THEOREM Lindley's Equation LindstromMadden Method Linear Algebra, Computational Linear-Circular Correlation LINEAR CONTAMINATED INDEPENDENCE See DEPENDENCE, CONCEPTS OF Linear Estimators, Bayes Linear Exponential Family LINEAR FILTERING See PREDICTION, LINEAR Linear Hazard Rate Distribution Linearization LINEAR LEAST SQUARES See LEAST SQUARES Linear Models with Crossed-Error Structure Linear Models with Nested-Error Structure LINEAR PLATEAU MODELS See PLATEAU MODELS, LINEAR LINEAR PREDICTION See PREDICTION, LINEAR Linear Programming Linear Rank Tests Linear Regression LINEAR STRUCTURAL RELATIONSHIPS See LISREL Linear Sufficiency Linear Systems, Statistical Theory Line Intercept Sampling Line Intersect Sampling Lineo-Normal Distribution Line Transect Sampling Linguistics, Statistics in LINKAGE CLUSTERING See CLASSIFICATION Linked Block Designs Link Index Link Relatives Link Tests LiouvilleDirichlet Distribution Lisrel Literature and Statistics LLOYD DAM See DAM THEORY LOCALLY MOST POWERFUL RANK TESTS See RANK ORDER STATISTICS Locally Optimal Statistical Tests Local Time LOCATION, MEASURES OF See MEAN, MEDIAN, MODE AND SKEWNESS; MEDIAN ESTIMATION, INVERSE

55. Ess0356 Classification Ess0356b CLASS L LAWS See L CLASS LAWS
ess0474b, demography, Stochastic See Stochastic demography, ess0475, de moivre,abraham, ess0475b, de moivre Numbers See Ballot Problem, ess0476, dendrites,
http://www.isye.gatech.edu/~brani/ess2/ess2.htm
Classification CLASS L LAWS See L CLASS LAWS CliffOrd Test Clinical Trials Clisy ClopperPearson Confidence intervals Closeness of Estimators CLUSTER ANALYSIS, GRAPH THEORETICAL See GRAPH THEORETICAL CLUSTER ANALYSIS Cluster Sampling Cochran's (Test) Statistic CODE CONTROL METHOD See EDITING STATISTICAL DATA Coded Data Coding Theorem Coefficient of Correlation Coefficient of Variation COGRADIENT ESTIMATOR See EQUIVARIANT ESTIMATOR Coherence Coherent Structure Theory Cohort Analysis COLD DECK METHOD See EDITING STATISTICAL DATA Collinearity Colton's Model Combination of Data Combinatorics Committee on National Statistics See National Statistics, Committee on Commonality Analysis Communality Communications in Statistics Communication Theory, Statistical COMPACT DERIVATIVE See STATISTICAL FUNCTIONALS Compartment Models, Stochastic Competing Risks Complementary Events Completeness COMPLEXITY See ALGORITHMIC INFORMATION THEORY Component Analysis Components of Variance See Variance Components Composite Design Composite Hypothesis Compound Distribution COMPUTER ASSISTED TELEPHONE SURVEYS See TELEPHONE SURVEYS, COMPUTER ASSISTED

56. Kohler Biographies
BIOGRAPHY 8.2 abraham de moivre (1667 1754). abraham de moivre wasborn at Vitry, France, where his father was a surgeon. de moivre
http://www.hbcollege.com/business_stats/kohler/biographical_sketches/bio8.2.html
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BIOGRAPHY 8.2 Abraham de Moivre
Abraham de Moivre was born at Vitry, France, where his father was a surgeon. De Moivre studied mathematics and physics in Paris, but in 1685, after the Edict of Nantes was revoked, he was imprisoned for being a Protestant. When released three years later, he emigrated to England to escape religious persecution. He never returned to France and never published anything in French. By all accounts, he was a mathematical genius, and he was in constant touch (at the Royal Society) with the leading thinkers of his day, including Isaac Newton who became a close friend. Yet de Moivre never succeeded in obtaining a university appointment. He eked out a living by tutoring the sons of nobility and by advising gamblers and speculators. This unwelcome fate was posterity's gain, for his successful solution of the problems he met in his consulting practice led to his writing of two great books. His text on probability, The Doctrine of Chances , emanated from an article first published in Latin in 1711 and was published posthumously in its final and third edition in 1756. It is notable (among many other contributions) for the origin of the general laws of addition and multiplication of probabilities (discussed in text Chapter 8), for the origin of the binomial distribution law (discussed in Chapter 9), and for the origin of the formula for the normal curve (discussed in Chapter 10), which de Moivre discovered in 1733. De Moivre's other book

57. életrajzok: M
szép eredményei. moivre, abraham de (1677. május 26.—1754. november27.) francia származású angol matematikus. Hugenotta
http://www.iif.hu/~visontay/ponticulus/eletrajzok/m.html
rovatok j¡t©k arch­vum jegyzetek mutat³k kitekintő v©lem©nyek inform¡ci³k
©letrajzok magyar¡zatok forr¡sok
MACLAURIN, Colin (1698. febru¡r ?—1746. janu¡r 14.): sk³t matematikus. P¡lyafut¡s¡t csodagyerekk©nt kezdte: 11 ©vesen ©retts©gizett, 15 ©vesen magiszteri fokozatot szerzett, 19 ©vesen m¡r a aberdeeni Marishal College matematika tansz©k©nek vezetője. Első munk¡j¡t 21 ©ves kor¡ban publik¡lta. C­me Rendszeres geometria volt ©s fontos algebrai geometriai eredm©nyeket tartalmazott. Egy k©sőbbi munk¡j¡ban NEWTON fluxi³elm©let©t fejlesztette tov¡bb. Ebben a műben szerepelt a Maclaurin-sor is, amely a Taylor-sor speci¡lis esete. MAGYARORSZGI GY–RGY Mester (Georgius de Hungaria) (?, 1422?—R³ma, 1502): magyar matematikus. Ő ­rta 1499-ben az első, magyar szerzőtől sz¡rmaz³ matematikai művet.
‰let©ről keveset tudunk. Val³sz­nűleg a pozsonyi egyetem di¡kja volt. M©g di¡k kor¡ban elhurcolt¡k a t¶r¶k¶k. Harminc ©vi rabs¡g ut¡n t©rt haza. Domonkosrendi szerzetes lett ©s a hollandiai Utrecht k¶zel©ben telepedett le. Sz¡mol³mesterk©nt is műk¶d¶tt. Latin nyelven jelent meg a Magyarorsz¡gi Gy¶rgy Mester (Georgius de Hungaria) aritmetik¡j¡nak foglalata h¡rom r©szben c­mű műve. A 20 oldalas k¶nyvecsk©t, mint ősnyomtatv¡nyt 1965-ben ºjra kiadt¡k Hollandi¡ban.

58. A
C Mathematicians; de moivre, abraham (16671754), Maths Archive; demoivre, abraham (1667-1754), 17th and 18th C Mathematicians; de
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59. Project-HTML
abraham de moivre. 1667 1754. In short A Biography of de moivre's life. abrahamde moivre was born at Vitry in Champagne, France on May 26th, 1667.
http://students.bath.ac.uk/ns1galf/Project.html
Abraham de Moivre
In short: Born in Vitry, France on May 26th
Educated in humanties at Protestant Colleges - Sedan and Samaur
Studied mathematics under Ozanam in Paris
Fled to England. Began tutoring mathematics
Elected to the Royal Society
Appointed to the Royal Society's Grand Commission to settle the debate between Newton and Leibnitz over who discoverd Calculus
Published the first edition of the Doctrine of Chances
Published Miscellenea Analytica
Died in London on November 27th
Main Findings:
-Discovered 'de Moivre's theorem' of complex numbers
-Did important work on the Probablility theory
-Discovered the approximation to the Binomial Probability distribution, later known as the Normal or Gaussian distribution -Theory of Reccuring series -Completed Cote's work on the theory of Partial fractions
A Biography of de Moivre's life
Abraham de Moivre was born at Vitry in Champagne, France on May 26th, 1667. From the ages of 11 to 15 he studied Humanties at the Protestant College at Sedan. After that de Moivre studied logic at Samaur. It was only when his family moved to Paris did he become interested in mathematics. He studied at the College de Harcourt and took private maths lessons under the great Ozanam De Moivre emigrated to England in 1685 following the revecoation of the Edict of Nantes. Without friends, family and money the only thing he had going for him was his knowledge in mathematics. De Moivre established himself by tutoring maths to sons of nobleman.

60. µå ¹«¾Æºê¸£ (Abraham De Moivre 1667 ~ 1754)
The summary for this Korean page contains characters that cannot be correctly displayed in this language/character set.
http://home.hanmir.com/~october73/moivre.htm
µå ¹«¾Æºê¸£ (Abraham De Moivre 1667 ~ 1754)
µå ¹«¾Æºê¸£´Â Çؼ®±âÇϸ¦ ¹ßÀü½Å°´Â µ¥ Áß¿äÇÑ ¿ªÇÒÀ» Çß°í È®·ü·Ð ºÐ¾ßÀÇ ¼±±¸ÀÚÀû ¿ªÇÒÀ» Çß´Ù. "µå ¹«¾Æºê¸£ ÀÇ Á¤¸®"·Î º¹¼Ò¼öÀÇ nÁ¦°ö±Ù°ú º¹¼ÒÆò¸é»óÀÇ º¹¼Ò½ÄÀÇ ÀÚë¿ÍÀÇ ¿¬°á°í¸®°¡ ¸íÈ®ÇØÁ³´Ù. »ï°¢¹ý°ú Çؼ®±âÇÏ »çÀÌ °ü°è°¡ ¹àÇôÁö°Ô µÈ ¼ÀÀÌ´Ù. ¶ÇÇÑ ¹«ÇѼö¿­°ú µîÂ÷¼ö¿­¿¡ °üÇؼ­µµ ¾÷ÀûÀ» ³²°å´Ù. 1718³â¿¡´Â "¿ì¿¬·Ð(The Doctrine of Chances)"À» âÆÇÇØ ÁÖ»çÀ§³ª ´Ù¸¥ °ÔÀÓ°ú °ü·µÈ ¹®Á¦µéÀ» ¿¬±¸ÇÏ°í "Åë°èÀû µ¶¸³"À» Á¤ÀÇÇß´Ù. 1730³â¿¡ âÆÇµÈ "Çؼ®±â¿ä(Miscellanea Analytica)"¿¡´Â ½ºÅиµ ½ÄÀ» ÀÌ¿ëÇØ ÀÌÇ׺ÐÆ÷¸¦ ±Ù»ç½ÄÑ Á¤±Ô°î¼±À» ¾ò¾î³½ ¹æ¹ýÀÌ ±â¼úµÇ¾î ÀÖ´Ù. ½ºÅиµ °ø½ÄÀº À߸ø ¸í¸íµÈ °ÍÀ¸·Î ½ºÅиµÀÌ ¾Æ´Ï¶ó µå ¹«¾Æºê¸£°¡ ¹ß°ßÇس½ °ÍÀ̶ó°í ÇÑ ´Ù. 1725³â âÆÇµÈ "¼ö¸í¿¡ µû¸¥ ¿¬±Ý"Àº º¸Çè Åë°èÇп¡ Áß¿äÇÑ ±â¿©¸¦ Çß´Ù. ¿¬±ÝÀÌ·ÐÀÇ ±âÊ°¡ µÇ´Â »ç¸Á Åë°èÇÐ ¿¬±¸ÀÚ·á°¡ ´ã°ÜÀÖ´Ù. ÀÌ ¼¼±ÇÀÌ ±×°¡ ³²±ä ¸ðµç Àú¼­´Ù. ±×·¡¼­ Àμ¼¶ó°í ÇغÁ¾ß º°·Î »ýÈ°¿¡ µµ¿òÀÌ µÇÁö´Â ¾È ¾Ò´Ù. ±×´Â ¸¹Àº ¼öÇÐÀû ¾÷Àû¿¡µµ ºÒ±¸ÇÏ°í Æò»ýÀ» °¡³­À¸·ÎºÎÅÍ ¹þ¾î³ªÁö ¸øÇß´Ù.

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