Timeline for answer to Is $577^3$ the smallest cube that is expressible as the sum of $3$ positive cubes in $6$ different ways? by Arnaud Mortier
Current License: CC BY-SA 3.0
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7 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Feb 26, 2018 at 4:13 | vote | accept | Mr Pie | ||
| Feb 25, 2018 at 17:34 | comment | added | Mr Pie | Thank you. I will look into it :) | |
| Feb 25, 2018 at 17:30 | comment | added | Arnaud Mortier | Wolfram Alpha is the online version. | |
| Feb 25, 2018 at 12:53 | comment | added | Mr Pie | Thank you for that :) ..... But how do I get Mathematica on my computer? Is there an online version? | |
| Feb 25, 2018 at 12:50 | comment | added | Arnaud Mortier | I don't know, but I think a little script in Mathematica testing only strict cubes could answer that question. I can only use the online version so can't run For loops. | |
| Feb 25, 2018 at 12:45 | comment | added | Mr Pie | Thank you very much! But just out of curiosity, if $a_2^{\ \ 3}$ had to strictly be a cube number, and not like $216^3$ because that is equal to $6^9$ as well, then would $a_2 = 577$? I cannot vote now because I have reached my daily limit, so I have to wait a couple of hours. | |
| Feb 25, 2018 at 12:11 | history | answered | Arnaud Mortier | CC BY-SA 3.0 |