Изменения
→Полиномиальная формула
<tex> (a_1 + ... + a_m)^{r + 1} = (a_1 + ... + a_m) \cdot \sum \frac{r!}{k_1! ... k_m!} \cdot a_1^{k_{1}} ... a_m^{k_{m}} = </tex>
<tex> = \sum \frac{r!}{k_1! ... k_m!} \cdot a_1^{k_{1}+1} ... a_m^{k_{m}} + \sum \frac{r!}{k_1! ... k_m!} \cdot a_1^{k_{1}} a_2^{k_2 + 1} ... a_m^{k_{m}} + </tex><tex> \sum \frac{r!}{k_1! ... k_m!} \cdot a_1^{k_{1}} ... a_{m-1}^{k_{m - 1}} a_m^{k_{m } + 1}} = </tex>
<tex> = \sum_{\beta : |\beta| = r + 1; \beta_1 \ge 1} \frac{r! \beta_1}{\beta_1!\beta_2!...\beta_m!} \cdot a_1^{\beta_1}...a_m^{\beta_m} + \sum_{\beta : |\beta| = r + 1; \beta_2 \ge 1} \frac{r! \beta_2}{\beta_1!\beta_2!...\beta_m!} \cdot a_1^{\beta_1}...a_m^{\beta_m} + </tex> <ещё <tex> m - k </tex> суммы> = <tex> \sum_{|b| = r + 1} \frac{r! (b_1 + ... + b_m)}{b_1! ... b_m!} \cdot a_1^{\beta_1}...a_m^{\beta_m} </tex>;
