Basically the title. The problem statement can be found here. No idea how to solve it efficiently.
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smallest K such that number of arrangements of primer factors of K equals N?
Revision en1, by pabloskimg, 2018-10-27 17:41:36
History
Revisions
| Rev. | Lang. | By | When | Δ | Comment | |
|---|---|---|---|---|---|---|
| en6 |
|
pabloskimg | 2018-10-29 20:56:46 | 125 | ||
| en5 |
|
pabloskimg | 2018-10-29 20:46:41 | 4 | Tiny change: 'r)!}{k_1! + ... + k_r!} < 2' -> 'r)!}{k_1! * ... * k_r!} < 2' | |
| en4 |
|
pabloskimg | 2018-10-29 20:45:40 | 605 | Tiny change: '_r$ ($k_i >= k_j$ for ' -> '_r$ ($k_i \geq k_j$ for ' | |
| en3 |
|
pabloskimg | 2018-10-28 19:15:30 | 30 | Tiny change: 'ficiently.' -> 'ficiently.\n\nUPDATE: why the downvotes?' | |
| en2 |
|
pabloskimg | 2018-10-27 17:43:02 | 1 | ||
| en1 |
|
pabloskimg | 2018-10-27 17:41:36 | 227 | Initial revision (published) |
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