Any hints to solve this problem ?
I tried to get the least common multiple (lcm) of the increasing factors of these two sequences but there was a bug which is that the starting points are not always equal
Any help please?
# | User | Rating |
---|---|---|
1 | ecnerwala | 3648 |
2 | Benq | 3580 |
3 | orzdevinwang | 3570 |
4 | cnnfls_csy | 3569 |
5 | Geothermal | 3568 |
6 | tourist | 3565 |
7 | maroonrk | 3530 |
8 | Radewoosh | 3520 |
9 | Um_nik | 3481 |
10 | jiangly | 3467 |
# | User | Contrib. |
---|---|---|
1 | maomao90 | 174 |
2 | awoo | 164 |
2 | adamant | 164 |
4 | TheScrasse | 159 |
4 | nor | 159 |
6 | maroonrk | 156 |
7 | -is-this-fft- | 150 |
8 | SecondThread | 147 |
9 | orz | 146 |
10 | pajenegod | 145 |
Any hints to solve this problem ?
I tried to get the least common multiple (lcm) of the increasing factors of these two sequences but there was a bug which is that the starting points are not always equal
Any help please?
Name |
---|
If you've found the LCM of the increasing factors and the first number x which is in both sequences, then find the maximum terms of each sequence m1 and m2. The answer is 1 + (min(m1, m2) — x)/LCM.