Timeline for Is $577^3$ the smallest cube that is expressible as the sum of $3$ positive cubes in $6$ different ways?
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| Feb 26, 2018 at 4:16 | history | edited | Mr Pie | CC BY-SA 3.0 |
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| Feb 26, 2018 at 4:13 | vote | accept | Mr Pie | ||
| Feb 25, 2018 at 12:51 | comment | added | Mr Pie | @GerryMyerson I commented here $\longrightarrow$ mathoverflow.net/questions/138886/… | |
| Feb 25, 2018 at 12:43 | history | edited | Mr Pie | CC BY-SA 3.0 |
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| Feb 25, 2018 at 12:42 | comment | added | Mr Pie | @GerryMyerson yes I did, because I knew of the one with $1^3$ so thank you for reminding me :) | |
| Feb 25, 2018 at 12:31 | history | edited | Arnaud Mortier |
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| Feb 25, 2018 at 12:11 | answer | added | Arnaud Mortier | timeline score: 4 | |
| Feb 25, 2018 at 11:57 | comment | added | Gerry Myerson | $577^3$ is certainly not the smallest cube that can be expressed as a sum of three cubes in six different ways, as $1^3$ can be expressed as a sum of three cubes in infinitely many different ways – see, e.g., math.stackexchange.com/questions/32559/… But perhaps you meant a sum of three positive cubes. If so, please edit your question to reflect that intention. | |
| Feb 25, 2018 at 11:26 | history | edited | Mr Pie | CC BY-SA 3.0 |
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| Feb 25, 2018 at 11:21 | comment | added | Mr Pie | @ArnaudMortier true that. Perhaps I will make it clearer. Thanks for pointing that out :) | |
| Feb 25, 2018 at 11:09 | comment | added | Arnaud Mortier | Is this the smallest cube that is expressible as the sum of $3$ cubes in $6$ different ways? In symbols, does $$577^3 = \text{taxicab}(3, 3, 6)\,?$$ This is not exactly the same question: taxicab(3,3,6) may not be a cube itself. | |
| Feb 25, 2018 at 10:49 | history | asked | Mr Pie | CC BY-SA 3.0 |