ï¿½ï¿½ï¿½ï¿½ï¿½È½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ No.15

ï¿½ï¿½ï¿½ï¿½ 15.1 ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ø·ï¿½ï¿½ï¿½ $x \sim y {\Leftrightarrow}x-y \in 6{\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ë¡£ ï¿½ï¿½ï¿½Î¤È¤ï¿½ï¿½ï¿½

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ï¿½Ê²ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤Ï¡ï¿½ $x \in {\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½ $\sim$ ï¿½Ë´Ø¤ï¿½ï¿½ë¥¯ï¿½é¥¹ï¿½ï¿½ ï¿½È½ñ¤¯¡ï¿½ ï¿½Î¥ï¿½ï¿½é¥¹ ï¿½ï¿½Â°ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Î¸ï¿½ï¿½ò¤¹¤Ù¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
${\mbox{${\mathbb{Z}}$}}/\sim$ ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ø¤Î¼ï¿½ï¿½ï¿½ ï¿½ï¿½ ($x$ ï¿½ï¿½ $3$ ï¿½Ç³ï¿½Ã¤ï¿½Í¾ï¿½ï¿½) ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½
${\mbox{${\mathbb{Z}}$}}/\sim$ ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ø¤Î¼ï¿½ï¿½ï¿½ ï¿½ï¿½ ($x$ ï¿½ï¿½ $4$ ï¿½Ç³ï¿½Ã¤ï¿½Í¾ï¿½ï¿½) ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½

ï¿½ï¿½ï¿½ï¿½ 15.2 ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ø·ï¿½ï¿½ï¿½ $x \sim y {\Leftrightarrow}x-y \in 12{\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ë¡£ ï¿½ï¿½ï¿½Î¤È¤ï¿½ï¿½ï¿½

$\sim$ ï¿½ï¿½Æ±ï¿½Í´Ø·ï¿½ï¿½Ç¤ï¿½ï¿½ë¤³ï¿½È¤ò¼¨¤ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
ï¿½Ê²ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤Ï¡ï¿½ $x \in {\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½ $\sim$ ï¿½Ë´Ø¤ï¿½ï¿½ë¥¯ï¿½é¥¹ï¿½ï¿½ ï¿½È½ñ¤¯¡ï¿½ ï¿½Î¥ï¿½ï¿½é¥¹ ï¿½ï¿½Â°ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Î¸ï¿½ï¿½ò¤¹¤Ù¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
${\mbox{${\mathbb{Z}}$}}/\sim$ ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ø¤Î¼ï¿½ï¿½ï¿½ ï¿½ï¿½ ($x$ ï¿½ï¿½ $5$ ï¿½Ç³ï¿½Ã¤ï¿½Í¾ï¿½ï¿½) ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½
${\mbox{${\mathbb{Z}}$}}/\sim$ ï¿½ï¿½ï¿½ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Ø¤Î¼ï¿½ï¿½ï¿½ ï¿½ï¿½ ($x$ ï¿½ï¿½ $4$ ï¿½Ç³ï¿½Ã¤ï¿½Í¾ï¿½ï¿½) ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½

ï¿½ï¿½ï¿½ï¿½ 15.1 Ì¿ï¿½ï¿½ P: $\forall x\in$ $\mbox{${\mathbb{R}}$}$ $\forall y\in$ $\mbox{${\mathbb{R}}$}$ $( x<y \implies \exists z\in {\mbox{${\mathbb{Z}}$}}( x<z \text{ and } z<y)))$ ï¿½Ë¤Ä¤ï¿½ï¿½Æ¡ï¿½

P ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ì¿ï¿½ï¿½ (not P)ï¿½ï¿½ï¿½not ï¿½ï¿½È¤ï¤ºï¿½Ë¡×½ñ¤¤Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
P ï¿½ï¿½ not P ï¿½Î¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ç¤ï¿½ï¿½ï¿½Î¤Ï¤É¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½

ï¿½ï¿½ï¿½ï¿½ 15.2 ï¿½ï¿½ï¿½ï¿½ $f:{\mbox{${\mathbb{Z}}$}}\ni x \mapsto x^2-2x \in {\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½ï¿½Ð¤ï¿½ï¿½Æ¡ï¿½

$\overset{-1}{f}(\{0\})$ ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
$\overset{-1}{f}(\{1\})$ ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
$\overset{-1}{f}(\{4,5,6\})$ ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
ï¿½ï¿½Ã±ï¿½Í¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Í³ï¿½ï¿½ó¤²¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
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ï¿½Ë¤ï¿½Ã¤ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½ï¿½Æ±ï¿½Í´Ø·ï¿½ $\sim_f$ ï¿½ï¿½

$\displaystyle x\sim_f y {\Leftrightarrow}f(x)=f(y)$

ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½Þ¤ë¡£ï¿½ï¿½ï¿½ï¿½ $\sim_f$ ï¿½Ë¤ï¿½ï¿½ ï¿½ï¿½Æ±ï¿½Í¤Ë¤Ê¤ï¿½ ${\mbox{${\mathbb{Z}}$}}$ ï¿½Î¸ï¿½ï¿½ï¿½ ï¿½ï¿½ï¿½Ù¤Æµï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½

ï¿½ï¿½ï¿½ï¿½ 15.3 ï¿½ï¿½ï¿½ï¿½

$\mbox{${\mathbb{R}}$}$ $\ni x \mapsto x^2-2x \in$ $\mbox{${\mathbb{R}}$}$ ï¿½ï¿½ï¿½Ð¤ï¿½ï¿½Æ¡ï¿½

$\overset{-1}{f}(\{0\})$ ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
$\overset{-1}{f}(\{1\})$ ï¿½ï¿½ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
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ï¿½Ë¤ï¿½Ã¤ï¿½ $\mbox{${\mathbb{R}}$}$ ï¿½ï¿½Æ±ï¿½Í´Ø·ï¿½ $\sim_f$ ï¿½ï¿½

$\displaystyle x\sim_f y {\Leftrightarrow}f(x)=f(y)$

ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½Þ¤ë¡£ï¿½ï¿½ï¿½ï¿½ $\sim_f$ ï¿½Ë¤ï¿½ï¿½ ï¿½ï¿½Æ±ï¿½Í¤Ë¤Ê¤ï¿½ $\mbox{${\mathbb{R}}$}$ ï¿½Î¸ï¿½ï¿½ï¿½ ï¿½ï¿½ï¿½Ù¤Æµï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½

ï¿½ï¿½Ç¤ï¿½Õ¤ï¿½ï¿½ï¿½Ê¬ï¿½ï¿½ï¿½ï¿½ ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Æ¡ï¿½ $f^{-1}(A\cap B)=f^{-1}(A)\cap f^{-1}(B)$ ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Î©ï¿½Ä¤ï¿½ï¿½È¤ò¼¨¤ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
ï¿½ï¿½Ç¤ï¿½Õ¤ï¿½ï¿½ï¿½Ê¬ï¿½ï¿½ï¿½ï¿½ï¿½Â² $\{A_\lambda\}_{\lambda \in \Lambda}$ ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Æ¡ï¿½ $f^{-1}(\bigcap_{\lambda \in \Lambda} A_\lambda =\bigcap_{\lambda \in \Lambda} f^{-1}(A_\lambda)$ ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Î©ï¿½Ä¤ï¿½ï¿½È¤ò¼¨¤ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½
ï¿½ï¿½Ç¤ï¿½Õ¤ï¿½ï¿½ï¿½Ê¬ï¿½ï¿½ï¿½ï¿½ï¿½Â² $\{A_\lambda\}_{\lambda \in \Lambda}$ ï¿½Ë¤ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Æ¡ï¿½ $f^{-1}(\bigcup_{\lambda \in \Lambda} A_\lambda =\bigcup_{\lambda \in \Lambda} f^{-1}(A_\lambda)$ ï¿½ï¿½ï¿½ï¿½ï¿½ï¿½Î©ï¿½Ä¤ï¿½ï¿½È¤ò¼¨¤ï¿½ï¿½Ê¤ï¿½ï¿½ï¿½ï¿½ï¿½