{"id":23815,"date":"2013-08-15T09:52:44","date_gmt":"2013-08-15T13:52:44","guid":{"rendered":"http:\/\/blogs.ams.org\/mathgradblog\/?p=23815"},"modified":"2014-06-24T13:55:46","modified_gmt":"2014-06-24T18:55:46","slug":"ramanujans-taxicab-number","status":"publish","type":"post","link":"https:\/\/blogs.ams.org\/mathgradblog\/2013\/08\/15\/ramanujans-taxicab-number\/","title":{"rendered":"Ramanujan’s Taxicab Number"},"content":{"rendered":"

\"imgres-1\"<\/a>Mathematical discoveries are not always birthed in the delivery room of revolutionary thinking.\u00a0 Often times, they are found in small interactions that emerge from casual conversations.\u00a0 Throughout history, the frontiers of mathematics have been riddled with concepts protruding from the foundation of humble beginnings.\u00a0 \u00a0\u00a0With this in mind, many mathematicians see collaboration, both small and large, as an important key to advancing their respective fields.<\/p>\n

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This can readily be seen in the early part of the twentieth century.\u00a0 \u00a0\u00a0In 1914, the prodigious mathematician, Srinivasa Ramanujan, left his native home in Madras, India and traveled to the University of Cambridge in England at the invitation of two legendary mathematicians, G.H. Hardy and J.E. Littlewood.\u00a0 \u00a0\u00a0A year prior to his arrival, Ramanujan sent a letter to Hardy that contained a collage of mathematical notation scattered throughout the text.\u00a0\u00a0\u00a0 At first glance, Hardy dismissed the letter as gibberish.<\/p>\n

However, after a more careful examination from both Hardy and Littlewood, they came to the conclusion that it was the work of a genius.\u00a0\u00a0 This started an ongoing collaboration that yielded some of the most elegant work ever produced in the history of mathematics. \u00a0In light of this, \u00a0it could be said that Ramanujan’s time in England was bittersweet. \u00a0 While living in Cambridge, he became ill due to the contrasting climates between England and India. \u00a0Hardy later retold a story about visiting Ramanujan during his illness:<\/p>\n

\u201cI remember once going to see him when he was lying ill at Putney. I had ridden in taxi cab number 1729 and remarked that the number seemed to me rather a dull one, and that I hoped it was not an unfavorable omen. \u2018No,\u2019 he replied, \u2018it is a very interesting number; it is the smallest number expressible as the sum of two cubes in two different ways.\u2019 \u201c<\/i><\/p>\n

As Ramanujan pointed out, 1729 is the smallest number to meet such conditions.\u00a0 More formally, \"1729 and \"1729. \u00a0In honor of the Ramanujan-Hardy conversation, the smallest number expressible as the sum of two cubes in \"n\" different ways is known as the \"nth taxicab number and is denoted as \"Taxicab .\u00a0 Therefore, with this notation, we see that \"Taxicab(2).<\/p>\n

Extending this concept a little further, a generalized taxicab number can be defined as the smallest number that can be expressed as a sum of a \"j\" number of \"kth powers in $n $ different ways and is denoted as \"Taxicab(k,j,n)\".\u00a0 For example, \"Taxicab(4,2,2), since \"635318657= , \"635318657=, and \"635318657\" is the smallest such number that meets the parameters given by \"k , \"j=2\", and \"n=2.<\/p>\n

Interestingly enough, no one knows what the general taxicab number, \"Taxicab(5,2,n)\", \u00a0equals for any \"n. \u00a0 Even for the weak version, a solution has not been provided.\u00a0 In other words, if one removes the condition that the number has to be the smallest and we let \"n=2\", the question can be restated the following way: \u00a0Does there exist any number that is expressible as the sum of two positive fifth powers in two different ways?<\/p>\n

So far, all attempts to prove the weaker version have failed.\u00a0 One possible attack is to produce an example computationally.\u00a0\u00a0 Another method would be to prove or disprove its existence rigorously.\u00a0 In any case, don\u2019t underestimate the effectiveness of good collaboration emerging from casual conversations.<\/p>\n

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Mathematical discoveries are not always birthed in the delivery room of revolutionary thinking.\u00a0 Often times, they are found in small interactions that emerge from casual conversations.\u00a0 Throughout history, the frontiers of mathematics have been riddled with concepts protruding from the … Continue reading →<\/span><\/a><\/p>\n

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