Page:Shinshiki Sanjutsu Kogi 00.djvu/203

卽ち

${\displaystyle e_{1}'\geqq e_{1},\quad e_{2}'\geqq e_{2},\quad e_{3}'\geqq e_{3},\ldots }$

なるを要し，又之を以て足れりとす．

${\displaystyle \beta ,\beta '\ldots }$ の最大公約數 ${\displaystyle \delta }$ 及最小公倍數 ${\displaystyle \mu }$ を得んと欲せば

${\displaystyle \delta ={p_{1}}^{d_{1}}{p_{2}}^{d_{2}}{p_{3}}^{d_{3}}\cdots }$

に於て ${\displaystyle d_{1}}$ を ${\displaystyle e_{1},e_{1}'\ldots }$ の中最小の者，${\displaystyle d_{2}}$ を ${\displaystyle e_{2},e_{2}'\ldots }$ の中最小の者となすべく，又

${\displaystyle \mu ={p_{1}}^{m_{1}}{p_{2}}^{m_{2}}{p_{3}}^{m_{3}}\cdots }$

に於て，${\displaystyle m_{1},m_{2}\ldots }$ をそれぞれ ${\displaystyle e_{1},e_{1}'\ldots }$，${\displaystyle e_{2},e_{2}'\ldots }$ の中最大の者となすべし，

例へば

${\displaystyle {\begin{aligned}\beta &={\frac {5}{6}}=2^{-1}\cdot 3^{-1}\cdot 5\\\beta '&={\frac {3}{8}}=2^{-3}\cdot 3\cdot 5^{0}\\\beta ''&={\frac {15}{4}}=2^{-2}\cdot 3\cdot 5\end{aligned}}}$