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@ -216,15 +216,28 @@ $$ so $\overline P$ is the set of composite numbers and 1.
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**Definition 1.7**
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**Definition 1.7**
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$A_1, A_2,\dots, A_n$ are sets.
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$A_1, A_2,\dots, A_n$ are sets. Then
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$$\begin{align}
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$$\begin{align}
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A_1 \cup A_2 \cup A_3 \cup \dots \cup A_n &=
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A_1 \cup A_2 \cup A_3 \cup \dots \cup A_n &=
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\left\{x : x \in A_i
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\left\{x : x \in A_i
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\text{ for at least one set $A_i$, for }
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\text{ for at least one set $A_i$, for }
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1 \leq i \leq n\right\}\\
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1 \leq i \leq n\right\}\\
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A_1 \cap A_2 \cap A_3 \cap \dots \cap A-n &=
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A_1 \cap A_2 \cap A_3 \cap \dots \cap A_n &=
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\left\{x : x \in A_i
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\left\{x : x \in A_i
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\text{ for every set $A_i$, for }
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\text{ for every set $A_i$, for }
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1 \leq i \leq n \right\}\\
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1 \leq i \leq n \right\}\\
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\end{align}$$
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\end{align}$$
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Given $A_1, A_2, \dots, A_n$ we define
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$$\begin{align}
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\bigcup{i=1}{n} A_i &= A_1 \cup A_2 \cup \dots \cup A_n\\
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\bigcap{i=1}{n} A_i &= A_1 \cap A_2 \cap \dots \cap A_n\\
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\end{align}$$
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$$
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A_1 = \{-1,0,1}, A_2 = \{-2,0,2}, \dots, A_i = \{-i,0,i}, \dots\\
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\bigcup{i=1}{\inf} A_i = \Bbb{Z} \text{ and }
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\bigcap{i=1}{\inf} A_i = \{0\}\\
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$$
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