Legitimate Authority and Just War in the Modern World Free Essay Example, 1500 words

This paper illustrates that states are the major actors in the international system, and on this basis, there is no actor that has the capability of regulating the affairs of the states. Krehoff further explains that under realism, states will only relate with other states, in pursuance of their interests, and not the interest of the global good. Dominese defines international anarchy as a concept whereby the international system does not have a leader, i.e. a sovereign worldwide government does not exist. On this basis, Dominese denotes that the international system does not have a hierarchical authority which has the capability of enforcing laws, and resolving disputes, just like states in the domestic politics. This observation by Dominese is correct, and this is because legal international institutions such as the International Criminal Court (ICC) only depends on the goodwill of signatory states to arrest and handover people indicted by the court. On this basis, Goldstein deno tes that without cooperation from member states, ICC won t be able to carry out its mandate. Tight denotes that this lack of a hierarchical structure at the international system is one of the main reasons as to why institutions formed by the principles of liberalism will always serve the interests of rich states of the world. We will write a custom essay sample on Legitimate Authority and Just War in the Modern World or any topic specifically for you Only $17.96 $11.86/page For instance, the League of Nations failed to be a legitimate authority because of suspicions between the various states that formed the League of Nations. Based on these arguments of realism, Goldstein explains that a legitimate international authority does not exist.

The Strong Character and Unavoidable Destiny of Oedipus...

The Strong Character and Unavoidable Destiny of Oedipus Rex Oedipus the King, by Sophocles is about Oedipus, a man doomed by his fate. Like most tragedies, Oedipus the King contains a tragic hero, a heroic figure unable to escape his own doom. This tragic hero usually has a hamartia, a tragic flaw, which causes his downfall. The tragic flaw that Sophocles gives Oedipus is hubris (exaggerated pride or self-confidence), which is what caused Oedipus to walk right into the fate he sought to escape. Oedipus pride pushes him toward his tragic end in the initial journey, when he kills his father, in the episode of the sphinx, and in his adamant search for truth. Pride like that of Oedipus has been the downfall of many great†¦show more content†¦This shows that he was so zealous that he thought he could avoid destiny. Also, in trying to avoid his destiny, he got into an argument over a small right of way incident. Had he just swallowed his pride and let the carriage have the right of way, he could have avoided everything. He showed his arrogance in the beginning of the story when he spoke to Teiresias. He said: When the dark singer, the sphinx, was in your country, did you speak word of deliverance to its citizens? And yet the riddles answer was no the province of a chance comer. It was a prophets task and plainly you had no such gift of prophecy from birds nor otherwise from any Fod to glean a word of Knowledge. But I came, Oedipus, who knew nothing, and I stopped her. I solved the riddle by my wit alone. Mine was no knowledge got from birds (Pg. 27, 1.391-9). Oedipus knew that even the most intelligent men of Thebes had been killed attempting to answer the riddle. When he answered the riddle, he proved his intelligence was superior to theirs. When Oedipus solved the riddle it was fuel for his arrogance. He just became completely cavalier and even more self confident then before. It was because of this that he was brought to a tragic end. Even as the pieces of the puzzle were coming together and Oedipus was beginning to learn of what had happened to him his inner colors were shining. When Jocasta, his wife, knew that heShow MoreRelatedOedipus: The Scapegoat or The Murderer?1359 Words   |  6 PagesIn the Sophocles play, â€Å"Oedipus Rex,† discrepancy between whether Oedipus is the main culprit for murdering King Laius or if Oedipus has become the scapegoat for the cause of the city’s plague that took many lives. The murder of King Laius strikes the interest of many readers and therefore creating the discussion of who would be a culprit for the crime. One side of the argument shows the Greek Gods set a curse upon Oedipus making his destiny one of wrongful conviction for a murderous crime. On theRead MoreThe Unavoidable Fate In Oedipus Rex By Sophocles1010 Words   |  5 PagesUnavoidable Destiny Fate is an unavoidable force that controls life. Oedipus Rex by Sophocles is a Greek tragedy about Oedipus finding the truth about his origin, while also trying to save the city of Thebes from a terrible plague. Oedipus unknowingly ends up killing his father and marrying his mother. When the truths about his sins are discovered, Oedipus blinds himself and exiles himself from Thebes. Oedipus ultimately could not control fate. Oedipus could not control the fate of citizensRead MoreThe Global Positioning System ( Gps )935 Words   |  4 Pageswidely known example of fate is in the Greek tragedy Oedipus Rex written by Sophocles. Oedipus Rex suggests that people have little control over their own lives, and that ultimately people are just puppets in the hands of the mythological Gods. Oedipus is blind to the truth and reality of his own life. The blind prophet of Apollo, Teiresias the first to tell Oedipus about his unknown fate and plants the unwanted seed of doubt within him. Oedipus ridicules Teiresias for being a blind man, and TeiresiasRead MoreOedipus Rex : A Tragic Hero882 Words   |  4 Pagesmany gods. They believed that the gods would guide them and that everyone was destined to live out their fates. In the case of Oedipus Rex, fate drove him into a downfall. Oedipus Rex is a part of the great Sophoclean play, written by Sophocles. Sophocles wrote this story to exemplify a tragic hero, he uses specific character flaws to explain the downfall of his hero. Oedipus is a perfect tragic hero because his early life forces the audience to admire as a privilege young man and also pity him as heRead MoreA Comparative Tragedy Study of Fatalism and Determinism: Oedipus Rex and Thunderstorm2489 Words   |  10 Pagesï » ¿A Comparative Tragedy Study of Fatalism a nd Determinism: Oedipus Rex and The Thunderstorm 1. INTRODUTION The Thunderstorm and Oedipus Rex, the representatives of Chinese and Greek play, both tell tragic stories about incest and unexpected destiny. The two masterpieces reveal much about the literature patterns and philosophical implications of the different cultures. The exploration of the two plays could help further understand the oneness of world literature and the tragedy of unlike culture

Johann Carl Friedrich Gauss was a German mathemati Essay Example For Students

Johann Carl Friedrich Gauss was a German mathemati Essay cian, physicist and astronomer. He is considered to be the greatest mathematician of his time, equal to the likes ofArchimedes and Isaac Newton. He is frequently called the founder of modernmathematics. It must also be noted that his work in the fields of astronomy and physics(especially the study of electromagnetism) is nearly as significant as that in mathematics. He also contributed much to crystallography, optics, biostatistics and mechanics. Gauss was born in Braunschweig, or Brunswick, Duchy of Brunswick (now Germany)on April 30, 1777 to a peasant couple. There exists many anecdotes referring to hisextraordinary feats of mental computation. It is said that as an old man, Gauss saidjokingly that he could count before he could talk. Gauss began elementary school at theage of seven, and his potential was noticed immediately. He so impressed his teacherButtner, and his assistant, Martin Bartels, that they both convinced Gausss father that hisson should be permitted to study with a view toward entering a university. Gausssextraordinary achievement which caused this impression occurred when he demonstratedhis ability to sum the integers from 1 to 100 by spotting that the sum was 50 pairs ofnumbers each pair summing 101. In 1788, Gauss began his education at the Gymnasium with the help of Buttner andBartels, where he distinguished himself in the ancient languages of High German andLatin and mathematics. At the age of 14 Gauss was presented to the duke of Brunswick Wolfenbuttel, at court where he was permitted to exhibit his computing skill. Hisabilities impressed the duke so much that the duke generously supported Gauss until thedukes death in 1806. Gauss conceived almost all of his fundamental mathematicaldiscoveries between the ages of 14 and 17. In 1791 he began to do totally new andinnovative work in mathematics. With the stipend he received from the duke, Gaussentered Brunswick Collegium Carolinum in 1792. At the academy Gauss independentlydiscovered Bodes law, the binomial theorem and the arithmetic-geometric mean, as wellas the law of quadratic reciprocity. Between the years 1793-94, while still at theacademy, he did an intensive research in number theory, especially on prime numbers. Gauss ma de this his lifes passion and is looked upon as its modern founder. In 1795Gauss left Brunswick to study at Gottingen University. His teacher at the university wasKaestner, whom Gauss often ridiculed. His only known friend amongst the studentsFarkas Bolyai. They met in 1799 and corresponded with each other for many years. On March 30, 1796, Gauss discovered that the regular heptadecagon, apolygon with17 sides, is inscriptible in a circle, using only compasses and straightedge the firstsuch discovery in Euclidean construction in more than 2,000 years. He not onlysucceeded in proving this construction impossible, but he went on to give methods ofconstructing figures with 17, 257, and 65,537 sides. In doing so, he proved that theconstructions, with compass and ruler, of a regular polygon with an odd number of sideswas possible only when the number of sides was a prime number of the series 3,5 17, 257and 65,537 or was a multiple of two or more of these numbers. This discovery was to beconsidered the most major advance in this field since the time of Greek mathematics andwas published as Section VII of Gausss famous work, Disquisitiones Arithmeticae. With this discovery he gave up his intention to study languages and turned tomathematics. Gauss left Gottingen in 1798 without a diploma. He returned to Bru nswick where hereceived a degree in 1799. The Duke of Brunswick requested that Gauss submit adoctoral dissertation to the University of Helmstedt, with Pfaff chosen to be his advisor. Gausss dissertation was a discussion of the fundamental theorem of algebra. Hesubmitted proof that every algebraic equation has at least one root, or solution. Thistheorem, which had challenged mathematicians for centuries, is still called thefundamental theorem of algebra. Because he received a stipend from the Duke of Brunswick, Gauss had no need to finda job and devoted most of his time to research. He decided to write a book on the theoryof numbers. There were seven sections, all but the last section (referred to in theprevious paragraph) being loyal to the number theory. It appeared in the summer of 1801and is a classic held to be Gausss greatest accomplishment. Gauss was considered to beextremely meticulous in his work and would not publish any result without a completeproof. Thus, many discoveries were not credited to him and were remade by others later,e. g. the work of Janos Bolyai and Nikolai Lobachevsky in non-Euclidean geometry,Augustin Cauchy in complex variable analysis, Carl Jacobi in elliptic functions, and SirWilliam Rowan Hamilton in quaternions. Gauss discovered earlier, independent ofAdrien Legendre, the method of least squares. Pepsi Project Report EssayThe paper arose out of his geodesic interests, but it contained such geometrical ideas asGaussian curvature. The paper also includes Gausss famous theorema egregrium: If an area in Ecan be developed (i.e. mapped isometrically) into another area of E, the values of the Gaussian curvatures are identical in corresponding points. During the years 1817-1832 Gauss again went through personal turmoil. His ailingmother moved in with him in 1817 and remained with him until his death in 1839. It wasalso during this period that he was involved in arguments with his wife and her familyregarding the possibility of moving to Berlin. Gauss had been offered a position at theBerlin University and Minna and her family were eager to move there. Gauss, however,never liked change and decided to stay in Gottingen. In 1831, Gausss second wife diedafter a long illness. Wilhelm Weber arrived in Gottingen in 1831 as a physics professor filling TobiasMayers chair. Gauss had known Weber since 1828 and supported his appointment. Gauss had worked on physics before 1831, publishing a paper which contained theprinciple of least constraint. He also published a second paper which discussed forces ofattraction. These papers were based on Gausss potential theory, which proved of greatimportance in his work on physics. He later came to believe his potential theory and hismethod of least squares provided vital links between science and nature. In the six yearsthat Weber remained in Gottingen much was accomplished by his collaborative workwith Gauss. They did extensive research on magnetism. Gausss applications ofmathematics to both magnetism and electricity are among his most important works; theunit of intensity of magnetic fields is today called the gauss. He wrote papers dealingwith the current theories on terrestrial magnetism, including Poissons ideas, abso lutemeasure for magnetic force and an empirical definition of terrestrial magnetism. Together they discovered Kirchoffs laws, and also built a primitive electromagnetictelegraph. Although this period of his life was an enjoyable pastime for Gauss, his worksin this area produced many concrete results. After Weber was forced to leave Gottingen due to a political dispute, Gausss activitygradually began to decrease. He still produced letters in response to fellow scientistsdiscoveries ususally remarking that he had known the methods for years but had neverfelt the need to publish. Sometimes he seemed extremely pleased with advances madeby other mathematicians, especially that of Eisenstein and of Lobachevsky. From 1845to 1851 Gauss spent the years updating the Gottingen University widows fund. Thiswork gave him practical experience in financial matters, and he went on to make hisfortune through shrewd investments in bonds issued by private companies. Gauss presented his golden jubilee l ecture in 1849, fifty years after receiving hisdiploma from Hemstedt University. It was appropriately a variation on his dissertation of1799. From the mathematical community only Jacobi and Dirichlet were present, butGauss received many messages and honors. From 1850 onward, Gausss work was againof nearly all of a practical nature although he did approve Riemanns doctoral thesis andheard his probationary lecture. His last known scientific exchange was with Gerling. Hediscussed a modified Foucalt pendulum in 1854. He was also able to attend the openingof the new railway link between Hanover and Gottingen, but this proved to be his lastouting. His health deteriorated slowly, and Gauss died in his sleep early in the morningof February 23, 1855.