Q. ε-transitions does not add any extra capacity of recognizing formal

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Q. A nondeterministic finite automaton with ε-moves is an extension of nondeterministic finite automaton

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Q. Is an ordinary NFA and a NFA-ε are equivalent

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Q. Which grammar is not regular

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Q. If is a language, and is a symbol, then, the quotient of and, is the set of strings such that is in: is in. Suppose is regular, which of the following statements is true?

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Q. Here is a context-free grammar G: S → AB A → 0A1 | 2 B → 1B | 3A which of the following strings are in L (G)?

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Q. The grammar G: S → SS | a | b is ambiguous. Check all and only the strings that have exactly two leftmost derivations in G

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Q. For the following grammar: S → A | B | 2 A → C0 | D B → C1 | E C → D | E | 3 D → E0 | S E → D1 | S Identify all the unit pairs

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Q. The classes of languages P and NP are closed under certain operations, and not closed under others. Decide whether P and NP are closed under each of the following operations.
1. Union

2. Intersection

3. Intersection with a regular language

4. Kleene closure (star)

5. Homomorphism

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Q. Ndfa and dfa accept same languages

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Q. If the NFA N has n states, then the corresponding DFA D has 2n states

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Q. An NFA is nothing more than a ε-NFA with no ε transitions

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Q. For every DFA, there is a ε-NFA that accepts the same language

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Q. DFAs, NFAs, and ε-NFA s are equivalent

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Q. Consider the languages L1 = and L2 = {a}. Which one of the following represents L1 L2* U L1*

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Q. Given the language L = {ab, aa, baa}, which of the following strings are in L*?
1) abaabaaabaa

2) aaaabaaaa

3) baaaaabaaaab

4) baaaaabaa

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Q. Which of the following are regular sets?
I. { a^n b^2m | n>=0, m>=0}

II. {a^n b^m |n=2m}

III. {a^n b^m | n!= m}

IV {xcy |x,y€{a,b)*}

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Q. Let L1 = {w ∈ {0,1}∗ | w has at least as many occurrences
of (110)’s as (011)’s}.
Let L2 = { ∈ {0,1}∗ | w has at least as many occurrences
of (000)’s as (111)’s}.
Which one of the following is TRUE?

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Q. The length of the shortest string NOT in the language (over Σ = {a, b}) of the following regular expression is _____________
a*b*(ba)*a*

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Q. How many minimum states are required to find whether a string has odd number of 0’s or not

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