hi, i think all of divisors of n(1 to 10^18) with in 9 sec is quit immpossible. if any idea or solution.please share it :) thank you
→ Pay attention
→ Top rated
| # | User | Rating |
|---|---|---|
| 1 | Benq | 3792 |
| 2 | VivaciousAubergine | 3647 |
| 3 | Kevin114514 | 3611 |
| 4 | jiangly | 3583 |
| 5 | strapple | 3515 |
| 6 | tourist | 3470 |
| 7 | dXqwq | 3436 |
| 8 | Radewoosh | 3415 |
| 9 | Otomachi_Una | 3413 |
| 10 | Um_nik | 3376 |
→ Top contributors
| # | User | Contrib. |
|---|---|---|
| 1 | Qingyu | 161 |
| 2 | adamant | 150 |
| 3 | Um_nik | 146 |
| 4 | Dominater069 | 144 |
| 5 | errorgorn | 141 |
| 6 | cry | 139 |
| 7 | Proof_by_QED | 136 |
| 8 | YuukiS | 135 |
| 9 | chromate00 | 134 |
| 9 | TheScrasse | 134 |
→ Find user
→ Recent actions
Codeforces (c) Copyright 2010-2026 Mike Mirzayanov
The only programming contests Web 2.0 platform
Server time: May/11/2026 14:55:05 (g2).
Desktop version, switch to mobile version.
Supported by
Iterating from 1 to sqrt(n) and using divisor pairs will give you the answer. In 9 secs, I think you can do 10^9 operations, even with the constant of the modulo operation.
Good day to you,
well firstly you can start with "Pollard Rho" (you will also need something like miller-rabin), which could factorize the number in O(N^(1/4)) [it is somehow long coding with many possible mistakes, but the core is not that bad].
As you have it, you can generate all divisors by "simple recursion" in O(#NUMBER_OF_DIVISORS)
Hope I guessed rightly what you asked for ^_^
Good Luck & Have nice day!!
thanks i got it...yeah there have some mistake.. for large number it's quite impossible there is no exact solution for this ques with 9 sec :) thank you :)
Well imho there is something more exact, but this is a lesser pain ^_^
Also the probability is "soo big" you can treat is as exact :)
Have nice day ^_^