| № | Пользователь | Рейтинг |
|---|---|---|
| 1 | tourist | 3690 |
| 2 | jiangly | 3647 |
| 3 | Benq | 3581 |
| 4 | orzdevinwang | 3570 |
| 5 | Geothermal | 3569 |
| 5 | cnnfls_csy | 3569 |
| 7 | Radewoosh | 3509 |
| 8 | ecnerwala | 3486 |
| 9 | jqdai0815 | 3474 |
| 10 | gyh20 | 3447 |
| Страны | Города | Организации | Всё → |
| № | Пользователь | Вклад |
|---|---|---|
| 1 | maomao90 | 174 |
| 2 | awoo | 164 |
| 3 | adamant | 163 |
| 4 | TheScrasse | 159 |
| 5 | nor | 157 |
| 6 | maroonrk | 156 |
| 7 | -is-this-fft- | 152 |
| 8 | Petr | 146 |
| 8 | orz | 146 |
| 10 | BledDest | 145 |
Lagrange interpolation and partial fraction decomposition
Hi everyone!
Today I'd like to write yet another blog about polynomials. It's quite well-known that the system
has a unique solution $$$P(x)$$$ among polynomials of degree at most $$$n$$$. One of direct ways to prove that such a polynomial exists is through Lagrange's interpolation. To have a better grasp of it, let's recall that $
| Rev. | Язык | Кто | Когда | Δ | Комментарий | |
|---|---|---|---|---|---|---|
| en11 |
|
adamant | 2021-12-28 14:17:03 | 1113 | extra about switching from x^k to (x+a)^k | |
| en10 |
|
adamant | 2021-12-28 00:19:18 | 13 | cut | |
| en9 |
|
adamant | 2021-12-27 23:59:16 | 44 | ||
| en8 |
|
adamant | 2021-12-27 23:57:40 | 7 | ||
| en7 |
|
adamant | 2021-12-27 23:55:41 | 234 | ||
| en6 |
|
adamant | 2021-12-27 23:52:54 | 1150 | (published) | |
| en5 |
|
adamant | 2021-12-27 19:00:47 | 541 | ||
| en4 |
|
adamant | 2021-12-27 17:05:24 | 2 | ||
| en3 |
|
adamant | 2021-12-27 17:04:17 | 2638 | ||
| en2 |
|
adamant | 2021-12-27 14:45:47 | 555 | ||
| en1 |
|
adamant | 2021-12-27 02:35:01 | 477 | Initial revision (saved to drafts) |
