Venn diagrams

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	$A \cap B =\{2,3\}$
	$A \cap B =\{4,5\}$
	$A \cap B =\{3,4\}$
	$A \cap B =\{1,6\}$

	$A \setminus B$
	$B \cap C$
	$B \cup C$
	none of these

	$\{3,15,9\}$\
	$\{2, 3, 6,12\}$
	$\varnothing$
	$\{15, 9\}$

	$R\cap S\cap T^{c}$
	$R^{c}\cap^{c} S\cap T$
	$R^{c}\cap S\cap T$
	$R^{c}\cap S\cap T^{c}$

	$(A\cup B) \cap (A \cap B)$
	$(A\setminus B)\cup (B\cap C)$
	$(A\cap B)\cup(A\cap C)$
	$(A\setminus B) \cap (A\cup C)$

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	$(S\cup T)\setminus(R\cap S)$
	$(S\cup T)\setminus(R\cup S)$
	$(S\cap T)\setminus(R\cap S)$

	$(A \cup B)\cup (A\cap B)$
	$(A \cup B) \setminus (A \cap B)$
	$(A \cap B) \setminus (A \cup B)$

	$6\in A^{c}\cap B^{c}\cap C\cap D^{c}$
	$6\in A^{c}\cap B\cap C^{c}\cap D^{c}$
	$6\in A^{c}\cap B\cap C\cap D^{c}$
	$6\in A\cap B^{c}\cap C\cap D^{c}$

	$(A\cup B)^{c}$
	$A^{c} \cup B^{c}$
	$(A\cap B)^ {c}$