https://tcs.nju.edu.cn/wiki/api.php?action=feedcontributions&feedformat=atom&user=216.229.9.100TCS Wiki - User contributions [en]2026-05-26T10:15:33ZUser contributionsMediaWiki 1.45.3https://tcs.nju.edu.cn/wiki/index.php?title=Taxicab_number&diff=7725Taxicab number2013-04-26T13:46:42Z<p>216.229.9.100: /* The story about Godfrey Hardy’s taxi */ oversimplification: mathematicians do more than "always think about numbers" (and some almost never think about numbers).</p>
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<div>A '''taxicab number''' is the name given by [[mathematics|mathematicians]] to a series of special numbers: 2, 1729 etc. A taxicab number is the smallest number that can be expressed as the sum of two positive cubes in ''n'' distinct ways. It has nothing to do with [[taxi]]s, but the name comes from a well-known [[conversation]] that took place between two famous mathematicians: [[Godfrey Hardy]] and [[Srinivasa Ramanujan]].<br />
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==The story about Godfrey Hardy’s taxi==<br />
[[Godfrey Hardy]] was a professor of mathematics at [[Cambridge University]]. One day he went to visit a friend, the brilliant young [[India]]n mathematician [[Srinivasa Ramanujan]], who was ill. Both men were mathematicians and liked to think about [[number]]s. <br />
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When Ramanujan heard that Hardy had come in a [[taxi]] he asked him what the number of the taxi was. Hardy said that it was just a boring number: 1729. Ramanujan replied that 1729 was not a boring number at all: it was a very interesting one. He explained that it was the smallest number that could be expressed by the sum of two cubes in two different ways.<br />
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This story is very famous among mathematicians. 1729 is sometimes called the “Hardy-Ramanujan number”.<br />
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==Explanation of the Hardy-Ramanujan number==<br />
*When a number is multiplied by itself the answer is called a “square”, e.g. 3x3=9, so the number 9 is a square.<br />
*When a number is multiplied three times by itself the answer is called a “cube”, e.g. 3x3x3=27, so the number 27 is a cube.<br />
*Another example of a cube is 8, because it is 2x2x2.<br />
*27+8=35, so 35 is the “sum of two cubes” (“[[sum]]” in this sense means “numbers that are added together”).<br />
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There are two ways to say that 1729 is the sum of two cubes.<br />
1x1x1=1; 12x12x12=1728. So 1+1728=1729<br />
But also: 9x9x9=729; 10x10x10=1000. So 729+1000=1729<br />
There are other numbers that can be shown to be the sum of two cubes in more than one way, but 1729 is the smallest of them.<br />
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Ramanujan did not actually discover this fact. It was known in [[1657]] by a [[France|French]] mathematician [[Bernard Frénicle de Bessy]].<br />
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==Known taxicab numbers==<br />
Since the famous conversation between Hardy and Ramanujan, mathematicians have tried to find other interesting numbers that are the smallest number that can be expressed by the sum of two cubes in three/four/five etc. different ways. These numbers are very, very big, and have been found by [[computer]]s.<br />
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So far, the following six taxicab numbers are known {{OEIS|id=A011541}}:<br />
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:<math>\operatorname{Ta}(1) = 2 = 1^3 + 1^3</math><br />
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:<math>\begin{matrix}\operatorname{Ta}(2)&=&1729&=&1^3 + 12^3 \\&&&=&9^3 + 10^3\end{matrix}</math><br />
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:<math>\begin{matrix}\operatorname{Ta}(3)&=&87539319&=&167^3 + 436^3 \\&&&=&228^3 + 423^3 \\&&&=&255^3 + 414^3\end{matrix}</math><br />
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:<math>\begin{matrix}\operatorname{Ta}(4)&=&6963472309248&=&2421^3 + 19083^3 \\&&&=&5436^3 + 18948^3 \\&&&=&10200^3 + 18072^3 \\&&&=&13322^3 + 16630^3\end{matrix}</math><br />
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:<math>\begin{matrix}\operatorname{Ta}(5)&=&48988659276962496&=&38787^3 + 365757^3 \\&&&=&107839^3 + 362753^3 \\&&&=&205292^3 + 342952^3 \\&&&=&221424^3 + 336588^3 \\&&&=&231518^3 + 331954^3\end{matrix}</math><br />
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:<math>\begin{matrix}\operatorname{Ta}(6)&=&24153319581254312065344&=&582162^3 + 28906206^3 \\&&&=&3064173^3 + 28894803^3 \\&&&=&8519281^3 + 28657487^3 \\&&&=&16218068^3 + 27093208^3 \\&&&=&17492496^3 + 26590452^3 \\&&&=&18289922^3 + 26224366^3\end{matrix}</math><br />
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[[Category:Number theory]]</div>216.229.9.100