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Peter Linz Edition 4 Exercise 4.3 Question 21 (Page No. 124)

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Let $P$ be an infinite but countable set, and associate with each $p ∈ P$ a language $L_p$. The smallest set containing every $L_p$ is the union over the infinite set $P$; it will be denoted by $U_{p∈p}L_p$. Show by example that the family of regular languages is not closed under infinite union.
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Peter Linz Edition 4 Exercise 4.3 Question 24 (Page No. 124)
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Peter Linz Edition 4 Exercise 4.1 Question 21 (Page No. 110)
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