Hello everybody)
help me with problem
we looking for quantity of integer solutions (x,y) equation ; |a|,|b| <=
→ Pay attention
→ Streams
→ Top rated
| # | User | Rating |
|---|---|---|
| 1 | tourist | 3857 |
| 2 | jiangly | 3747 |
| 3 | orzdevinwang | 3706 |
| 4 | jqdai0815 | 3682 |
| 5 | ksun48 | 3591 |
| 6 | gamegame | 3477 |
| 7 | Benq | 3468 |
| 8 | Radewoosh | 3463 |
| 9 | ecnerwala | 3451 |
| 10 | heuristica | 3431 |
→ Top contributors
| # | User | Contrib. |
|---|---|---|
| 1 | cry | 165 |
| 2 | -is-this-fft- | 161 |
| 3 | Qingyu | 160 |
| 4 | Dominater069 | 158 |
| 5 | atcoder_official | 157 |
| 6 | adamant | 155 |
| 7 | Um_nik | 151 |
| 8 | djm03178 | 150 |
| 8 | luogu_official | 150 |
| 10 | awoo | 148 |
→ Find user
→ Recent actions
Codeforces (c) Copyright 2010-2025 Mike Mirzayanov
The only programming contests Web 2.0 platform
Server time: Mar/07/2025 05:24:02 (h2).
Desktop version, switch to mobile version.
Supported by
I found this:
a.y + b.x = x.y
b.x = y.(x-a)
y=(b.x) / (x-a);
x,y are integers so (a|b means b%a=0)
x-a| b.x
x-a| b.x — b.(x-a)
x-a| b.x — b.x + a.b
x-a| a.b
for every z (z|a.b) there is an integer pair (x,y) suitable to all conditions. So the answer is same with quantity of divisors of a.b