[F] A4 P1 Q1 Fix variable duplication
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@@ -41,8 +41,8 @@ We need to prove: $1 | (a + kn) \land 1 | n \land (\forall e \in \N, e | (a + kn
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\begin{enumerate}
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\begin{enumerate}
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\item[1.] Proving for: $1 | (a + kn)$ \\
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\item[1.] Proving for: $1 | (a + kn)$ \\
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That is: $\exists k \in \Z$ s.t. $(a + kn) = 1 \cdot k$ \\
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That is: $\exists c \in \Z$ s.t. $(a + kn) = 1 \cdot c$ \\
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Take $k = (a + kn)$ \\
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Take $c = (a + kn)$ \\
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$(a + kn) = 1 \cdot (a + kn)$ is true.
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$(a + kn) = 1 \cdot (a + kn)$ is true.
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\item[2.] $1 | n$ is given to be true.
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\item[2.] $1 | n$ is given to be true.
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