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Sets B and C are subsets of the universal set U.These sets are defined as follows.U= { 1, 3, 5, 6, 7}B={ 1, 3, 6}C= { 1, 3, 5 }Find the following sets.Write your answer in roster form or as Ø.(a) B' Ụ C' = (b) B' n C =

User Amater
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Given: Sets B and C are subsets of the universal set U.

These sets are defined as follows-


\begin{gathered} U=\left\{1,3,5,6,7\right\} \\ B=\left\{1,3,6\right\} \\ C=\left\{1,3,5\right\} \end{gathered}

Required: To determine the following sets-


\begin{gathered} B^(\prime)\cup C^(\prime) \\ B^(\prime)\cap C \end{gathered}

Explanation: The complement of a set A with the universal set U is defined as-


A^(\prime)=U-A

Hence, the complement of set B is-


\begin{gathered} B^(\prime)=U-B \\ =\left\{1,3,5,6,7\right\}-\left\{1,3,6\right\} \\ =\lbrace5,7\rbrace \end{gathered}

Similarly, the complement of set C is-


\begin{gathered} C^(\prime)=\left\{1,3,5,6,7\right\}-\left\{1,3,5\right\} \\ =\lbrace6,7\rbrace \end{gathered}

Now,


\begin{gathered} B^(\prime)\cup C^(\prime)=\lbrace5,7\rbrace\cup\lbrace6,7\rbrace \\ =\lbrace5,6,7\rbrace \end{gathered}

Similarly-


\begin{gathered} B^(\prime)\cap C=\lbrace5,7\rbrace\cap\left\{1,3,5\right\} \\ =\lbrace5\rbrace \end{gathered}

Final Answer: (a)-


B^(\prime)\cup C^(\prime)=\lbrace5,6,7\rbrace

(b)-


B^(\prime)\cap C=\lbrace5\rbrace

User Leijonien
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