問題文全文(内容文):
これを解け.
(1)$C_{\alpha}:Z=\alpha+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C\alpha}^{} \ \dfrac{1}{(Z-\alpha)^n}\ \alpha_Z$
(2) $C_{\alpha}:Z=1+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C}^{} \ \dfrac{2}{Z-1}\ \alpha_Z$
これを解け.
(1)$C_{\alpha}:Z=\alpha+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C\alpha}^{} \ \dfrac{1}{(Z-\alpha)^n}\ \alpha_Z$
(2) $C_{\alpha}:Z=1+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C}^{} \ \dfrac{2}{Z-1}\ \alpha_Z$
単元:
#数Ⅱ#複素数と方程式#複素数#数学(高校生)
指導講師:
ますただ
問題文全文(内容文):
これを解け.
(1)$C_{\alpha}:Z=\alpha+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C\alpha}^{} \ \dfrac{1}{(Z-\alpha)^n}\ \alpha_Z$
(2) $C_{\alpha}:Z=1+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C}^{} \ \dfrac{2}{Z-1}\ \alpha_Z$
これを解け.
(1)$C_{\alpha}:Z=\alpha+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C\alpha}^{} \ \dfrac{1}{(Z-\alpha)^n}\ \alpha_Z$
(2) $C_{\alpha}:Z=1+re^{it} \ (0\leqq t\leqq 2\pi)$
$ \displaystyle \int_{C}^{} \ \dfrac{2}{Z-1}\ \alpha_Z$
投稿日:2021.02.25
