Recent questions and answers in Theory of Computation

44 votes

6 answers

1

GATE2012-46
Consider the set of strings on $\{0,1\}$ in which, every substring of $3$ symbols has at most two zeros. For example, $001110$ and $011001$ are in the language, but $100010$ is not. All strings of length less than $3$ are also in the language. A partially completed DFA that ...

Consider the set of strings on $\{0,1\}$ in which, every substring of $3$ symbols has at most two zeros. For example, $001110$ and $011001$ are in the language, but $100010$ is not. All strings of length less than $3$ are also in the language. A partially completed DFA that accepts this ...

answered 6 days ago in Theory of Computation vipin.gautam1906 5.6k views

22 votes

7 answers

2

GATE2005-55
Consider the languages: $L_1 = \left\{ a^nb^nc^m \mid n,m >0\right\}$ and $ L_2 = \left\{a^nb^mc^m\mid n, m > 0\right\}$ Which one of the following statements is FALSE? $L_1 \cap L_2$ is a context-free language $L_1 \cup L_2$ is a context-free language $L_1 \text{ and } L_2$ are context-free languages $L_1 \cap L_2$ is a context sensitive language

Consider the languages: $L_1 = \left\{ a^nb^nc^m \mid n,m >0\right\}$ and $ L_2 = \left\{a^nb^mc^m\mid n, m > 0\right\}$ Which one of the following statements is FALSE? $L_1 \cap L_2$ is a context-free language $L_1 \cup L_2$ is a context-free language $L_1 \text{ and } L_2$ are context-free languages $L_1 \cap L_2$ is a context sensitive language

answered Oct 19 in Theory of Computation Shashank Rustagi 3.7k views

31 votes

5 answers

3

GATE2005-53
Consider the machine $M$: The language recognized by $M$ is: $\left\{ w \in \{a, b\}^* \text{ | every a in $w$ is followed by exactly two $b$'s} \right\}$ $\left\{w \in \{a, b\}^* \text{ | every a in $w$ is followed by at least two $b$'s} \right\}$ ... $ contains the substring $abb$'} \right\}$ $\left\{w \in \{a, b\}^* \text{ | $w$ does not contain $aa$' as a substring} \right\}$

Consider the machine $M$: The language recognized by $M$ is: $\left\{ w \in \{a, b\}^* \text{ | every a in $w$ is followed by exactly two $b$'s} \right\}$ $\left\{w \in \{a, b\}^* \text{ | every a in $w$ is followed by at least two $b$'s} \right\}$ ... $ contains the substring $abb$'} \right\}$ $\left\{w \in \{a, b\}^* \text{ | $w$ does not contain $aa$' as a substring} \right\}$

answered Oct 15 in Theory of Computation shubhamladey 4.3k views

1 vote

2 answers

4

Peter Linz Edition 4 Exercise 6.1 Question 6 (Page No. 161)
Eliminate useless productions from $S\rightarrow a|aA|B|C,$ $A\rightarrow aB|\lambda,$ $B\rightarrow Aa,$ $C\rightarrow cCD,$ $D\rightarrow ddd.$

Eliminate useless productions from $S\rightarrow a|aA|B|C,$ $A\rightarrow aB|\lambda,$ $B\rightarrow Aa,$ $C\rightarrow cCD,$ $D\rightarrow ddd.$

answered Oct 13 in Theory of Computation JAINchiNMay 89 views

0 votes

1 answer

5

Peter Linz Edition 4 Exercise 6.1 Question 5 (Page No. 161)
Eliminate all useless productions from the grammar $S\rightarrow aS|AB,$ $A\rightarrow bA,$ $B\rightarrow AA.$ What language does this grammar generate?

Eliminate all useless productions from the grammar $S\rightarrow aS|AB,$ $A\rightarrow bA,$ $B\rightarrow AA.$ What language does this grammar generate?

answered Oct 13 in Theory of Computation JAINchiNMay 60 views

54 votes

3 answers

6

GATE2016-2-42
Consider the following two statements: If all states of an NFA are accepting states then the language accepted by the NFA is $\Sigma_{}^{*}$. There exists a regular language $A$ such that for all languages $B$, $A \cap B$ is regular. Which one of the following is CORRECT? Only I is true Only II is true Both I and II are true Both I and II are false

Consider the following two statements: If all states of an NFA are accepting states then the language accepted by the NFA is $\Sigma_{}^{*}$. There exists a regular language $A$ such that for all languages $B$, $A \cap B$ is regular. Which one of the following is CORRECT? Only I is true Only II is true Both I and II are true Both I and II are false

answered Oct 13 in Theory of Computation Musa 10.3k views

0 votes

1 answer

7

Peter Linz Edition 4 Exercise 5.2 Question 17 (Page No. 145)
Use the exhaustive search parsing method to parse the string $abbbbbb$ with the grammar with productions $S\rightarrow aAB,$ $A\rightarrow bBb,$ $B\rightarrow A|\lambda.$ In general, how many rounds will be needed to parse any string $w$ in this language?

Use the exhaustive search parsing method to parse the string $abbbbbb$ with the grammar with productions $S\rightarrow aAB,$ $A\rightarrow bBb,$ $B\rightarrow A|\lambda.$ In general, how many rounds will be needed to parse any string $w$ in this language?

answered Oct 12 in Theory of Computation JAINchiNMay 79 views

1 vote

1 answer

8

Peter Linz Edition 4 Exercise 5.2 Question 20 (Page No. 145)
Find a grammar equivalent to $S\rightarrow aAB, A\rightarrow bBb, B\rightarrow A|\lambda$ that satisfies the conditions of Theorem 5.2. Theorem 5.2 Suppose that $G = (V, T, S, P)$ is a context-free grammar that does not have ... algorithm which, for any $w ∈ Σ^*,$ either produces a parsing of $w$ or tells us that no parsing is possible.

Find a grammar equivalent to $S\rightarrow aAB, A\rightarrow bBb, B\rightarrow A|\lambda$ that satisfies the conditions of Theorem 5.2. Theorem 5.2 Suppose that $G = (V, T, S, P)$ is a context-free grammar that does not have any rules of the form $A → λ,$ ... can be made into an algorithm which, for any $w ∈ Σ^*,$ either produces a parsing of $w$ or tells us that no parsing is possible.

answered Oct 12 in Theory of Computation JAINchiNMay 123 views

0 votes

1 answer

9

Peter Linz Edition 4 Exercise 5.2 Question 18 (Page No. 145)
Is the string $aabbababb$ in the language generated by the grammar $S → aSS|b$? Show that the grammar with productions $S\rightarrow aAb|\lambda,$ $A\rightarrow aAb|\lambda$ is unambiguous.

Is the string $aabbababb$ in the language generated by the grammar $S → aSS|b$? Show that the grammar with productions $S\rightarrow aAb|\lambda,$ $A\rightarrow aAb|\lambda$ is unambiguous.

answered Oct 12 in Theory of Computation JAINchiNMay 44 views

27 votes

3 answers

10

GATE2007-7
Which of the following is TRUE? Every subset of a regular set is regular Every finite subset of a non-regular set is regular The union of two non-regular sets is not regular Infinite union of finite sets is regular

Which of the following is TRUE? Every subset of a regular set is regular Every finite subset of a non-regular set is regular The union of two non-regular sets is not regular Infinite union of finite sets is regular

answered Oct 12 in Theory of Computation Musa 5.8k views

0 votes

1 answer

11

Peter Linz Edition 4 Exercise 5.2 Question 15 (Page No. 145)
Show that the grammar with productions $S\rightarrow SS,$ $S\rightarrow \lambda,$ $S\rightarrow aSb,$ $S\rightarrow bSa.$ is ambiguous.

Show that the grammar with productions $S\rightarrow SS,$ $S\rightarrow \lambda,$ $S\rightarrow aSb,$ $S\rightarrow bSa.$ is ambiguous.

answered Oct 12 in Theory of Computation JAINchiNMay 70 views

0 votes

1 answer

12

Peter Linz Edition 4 Exercise 5.2 Question 14 (Page No. 145)
Show that the grammar $S\rightarrow aSb|SS|\lambda$ is ambiguous, but that the language denoted by it is not.

Show that the grammar $S\rightarrow aSb|SS|\lambda$ is ambiguous, but that the language denoted by it is not.

answered Oct 12 in Theory of Computation JAINchiNMay 48 views

0 votes

1 answer

13

Peter Linz Edition 4 Exercise 5.2 Question 13 (Page No. 145)
Show that the following grammar is ambiguous. $S\rightarrow aSbS|bSaS|\lambda$

Show that the following grammar is ambiguous. $S\rightarrow aSbS|bSaS|\lambda$

answered Oct 12 in Theory of Computation JAINchiNMay 35 views

1 vote

1 answer

14

Theory of computation - Grammer
here answer is given is A won''t it be B? as with A we cannot get 100 string,but with B we can

here answer is given is A won''t it be B? as with A we cannot get 100 string,but with B we can

answered Oct 11 in Theory of Computation JAINchiNMay 158 views

0 votes

1 answer

15

Peter Linz Edition 4 Exercise 5.2 Question 7 (Page No. 145)
Construct an unambiguous grammar equivalent to the grammar in Exercise 6.

Construct an unambiguous grammar equivalent to the grammar in Exercise 6.

answered Oct 11 in Theory of Computation JAINchiNMay 38 views

1 vote

1 answer

16

Peter Linz Edition 4 Exercise 5.2 Question 6 (Page No. 145)
Show that the following grammar is ambiguous. $S\rightarrow AB|aaB,$ $A\rightarrow a|Aa,$ $B\rightarrow b.$

Show that the following grammar is ambiguous. $S\rightarrow AB|aaB,$ $A\rightarrow a|Aa,$ $B\rightarrow b.$

answered Oct 11 in Theory of Computation JAINchiNMay 32 views

0 votes

1 answer

17

Peter Linz Edition 4 Exercise 5.2 Question 3 (Page No. 144)
Find an s-grammar for $L =$ {$a^nb^{n+1} : n ≥ 2$}.

Find an s-grammar for $L =$ {$a^nb^{n+1} : n ≥ 2$}.

answered Oct 11 in Theory of Computation JAINchiNMay 44 views

0 votes

1 answer

18

Peter Linz Edition 4 Exercise 5.2 Question 2 (Page No. 144)
Find an s-grammar for $L =$ {$a^nb^n : n ≥ 1$}.

Find an s-grammar for $L =$ {$a^nb^n : n ≥ 1$}.

answered Oct 11 in Theory of Computation JAINchiNMay 52 views

0 votes

1 answer

19

Peter Linz Edition 4 Exercise 5.2 Question 1 (Page No. 144)
Find an s-grammar for $L (aaa^*b + b)$.

Find an s-grammar for $L (aaa^*b + b)$.

answered Oct 11 in Theory of Computation JAINchiNMay 51 views

0 votes

1 answer

20

Peter Linz Edition 4 Exercise 5.1 Question 22 (Page No. 135)
Define what one might mean by properly nested parenthesis structures involving two kinds of parentheses, say ( ) and [ ]. Intuitively, properly nested strings in this situation are ([ ]), ([[ ]])[( )], but not ([ )] or (( ]]. Using your definition, give a context-free grammar for generating all properly nested parentheses.

Define what one might mean by properly nested parenthesis structures involving two kinds of parentheses, say ( ) and [ ]. Intuitively, properly nested strings in this situation are ([ ]), ([[ ]])[( )], but not ([ )] or (( ]]. Using your definition, give a context-free grammar for generating all properly nested parentheses.

answered Oct 11 in Theory of Computation JAINchiNMay 16 views

0 votes

1 answer

21

Peter Linz Edition 4 Exercise 5.1 Question 21 (Page No. 135)
Consider the derivation tree below. Find a grammar $G$ for which this is the derivation tree of the string $aab$. Then find two more sentences of $L(G)$. Find a sentence in $L(G)$ that has a derivation tree of height five or larger.

Consider the derivation tree below. Find a grammar $G$ for which this is the derivation tree of the string $aab$. Then find two more sentences of $L(G)$. Find a sentence in $L(G)$ that has a derivation tree of height five or larger.

answered Oct 11 in Theory of Computation JAINchiNMay 52 views

0 votes

1 answer

22

Peter Linz Edition 4 Exercise 5.1 Question 20 (Page No. 135)
Consider the grammar with productions $S\rightarrow aaB,$ $A\rightarrow bBb|\lambda,$ $B\rightarrow Aa.$ Show that the string $aabbabba$ is not in the language generated by this grammar.

Consider the grammar with productions $S\rightarrow aaB,$ $A\rightarrow bBb|\lambda,$ $B\rightarrow Aa.$ Show that the string $aabbabba$ is not in the language generated by this grammar.

answered Oct 11 in Theory of Computation JAINchiNMay 19 views

0 votes

1 answer

23

Peter Linz Edition 4 Exercise 5.1 Question 18 (Page No. 134)
Show that the language $L=$ {$w_1cw_2:w_1,w_2∈$ {$a,b$}$^+,w_1\neq w_2^R$}, with $Σ =$ {$a,b,c$},is context-free.

Show that the language $L=$ {$w_1cw_2:w_1,w_2∈$ {$a,b$}$^+,w_1\neq w_2^R$}, with $Σ =$ {$a,b,c$},is context-free.

answered Oct 11 in Theory of Computation JAINchiNMay 38 views

0 votes

1 answer

24

Peter Linz Edition 4 Exercise 5.1 Question 16 (Page No. 134)
Show that the complement of the language $L=$ {$ww^R:w∈$ {$a,b$}$^*$} is context-free.

Show that the complement of the language $L=$ {$ww^R:w∈$ {$a,b$}$^*$} is context-free.

answered Oct 11 in Theory of Computation JAINchiNMay 26 views

1 vote

1 answer

25

Peter Linz Edition 4 Exercise 5.1 Question 19 (Page No. 134)
Show a derivation tree for the string $aabbbb$ with the grammar $S\rightarrow AB|\lambda,$ $A\rightarrow aB,$ $B\rightarrow Sb.$ Give a verbal description of the language generated by this grammar.

Show a derivation tree for the string $aabbbb$ with the grammar $S\rightarrow AB|\lambda,$ $A\rightarrow aB,$ $B\rightarrow Sb.$ Give a verbal description of the language generated by this grammar.

answered Oct 11 in Theory of Computation JAINchiNMay 29 views

0 votes

1 answer

26

Peter Linz Edition 4 Exercise 5.1 Question 15 (Page No. 134)
Show that the following language is context-free. $L=$ {$uvwv^R:u,v,w∈$ {$a,b$}$^+,|u|=|w|=2$}.

Show that the following language is context-free. $L=$ {$uvwv^R:u,v,w∈$ {$a,b$}$^+,|u|=|w|=2$}.

answered Oct 11 in Theory of Computation JAINchiNMay 50 views

0 votes

1 answer

27

Peter Linz Edition 4 Exercise 5.1 Question 14 (Page No. 134)
Let $L_1$ be the language $L_1 =$ {$a^nb^mc^k : n = m$ or $m ≤ k$} and $L_2$ the language $L_2 =$ {$a^nb^mc^k : n + 2m = k$}. Show that $L_1 ∪ L_2$ is a context-free language.

Let $L_1$ be the language $L_1 =$ {$a^nb^mc^k : n = m$ or $m ≤ k$} and $L_2$ the language $L_2 =$ {$a^nb^mc^k : n + 2m = k$}. Show that $L_1 ∪ L_2$ is a context-free language.

answered Oct 11 in Theory of Computation JAINchiNMay 45 views

0 votes

1 answer

28

Peter Linz Edition 4 Exercise 5.1 Question 13 (Page No. 134)
Let $L =$ {$a^nb^n : n ≥ 0$}. (a) https://gateoverflow.in/305106/peter-linz-edition-4-exercise-5-1-question-13-a-page-no-134 (b) Show that $L^k$ is context-free for any given $k ≥ 1$. (c) Show that $\overline{L}$ and $L^*$ are context-free.

Let $L =$ {$a^nb^n : n ≥ 0$}. (a) https://gateoverflow.in/305106/peter-linz-edition-4-exercise-5-1-question-13-a-page-no-134 (b) Show that $L^k$ is context-free for any given $k ≥ 1$. (c) Show that $\overline{L}$ and $L^*$ are context-free.

answered Oct 11 in Theory of Computation JAINchiNMay 42 views

0 votes

1 answer

29

Peter Linz Edition 4 Exercise 5.1 Question 11 (Page No. 134)
Find a context-free grammar for $Σ =$ {$a, b$} for the language $L =$ {$a^nww^Rb^n : w ∈ Σ^*, n ≥ 1$}.

Find a context-free grammar for $Σ =$ {$a, b$} for the language $L =$ {$a^nww^Rb^n : w ∈ Σ^*, n ≥ 1$}.

answered Oct 11 in Theory of Computation JAINchiNMay 28 views

0 votes

1 answer

30

Peter Linz Edition 4 Exercise 5.1 Question 9 (Page No. 134)
Show that $L =$ {$w ∈$ {$a,b,c$}$^* : |w| = 3n_a(w)$} is a context-free language.

Show that $L =$ {$w ∈$ {$a,b,c$}$^* : |w| = 3n_a(w)$} is a context-free language.

answered Oct 11 in Theory of Computation JAINchiNMay 42 views

0 votes

4 answers

31

Peter Linz Edition 4 Exercise 5.1 Question 8 (Page No. 134)
Find context-free grammars for the following languages (with $n ≥ 0, m ≥ 0, k ≥ 0$). (a) $L =$ {$a^nb^mc^k : n = m$ or $m ≤ k$}. (b) $L =$ {$a^nb^mc^k : n = m$ or $m ≠ k$}. (c) $L =$ {$a^nb^mc^k : k = n + m$}. (d) $L =$ ... $L =$ {$a^nb^mc^k, k ≠ n + m$}. (h) $L =$ {$a^nb^mc^k : k ≥ 3$}.

Find context-free grammars for the following languages (with $n ≥ 0, m ≥ 0, k ≥ 0$). (a) $L =$ {$a^nb^mc^k : n = m$ or $m ≤ k$}. (b) $L =$ {$a^nb^mc^k : n = m$ or $m ≠ k$}. (c) $L =$ {$a^nb^mc^k : k = n + m$}. (d) $L =$ {$a^nb^mc^k : n + 2m = k$}. (e) $L =$ ... $a, b, c$}$^* : n_a (w) + n_b (w) ≠ n_c (w)$}. (g) $L =$ {$a^nb^mc^k, k ≠ n + m$}. (h) $L =$ {$a^nb^mc^k : k ≥ 3$}.

answered Oct 11 in Theory of Computation JAINchiNMay 86 views

1 vote

5 answers

32

Peter Linz Exercise 5.1
Find context free grammars for the following languages (with n>=0, m>=0, k>=0) (a) L={anbmck : n=m or m<=k} (b) L={ anbmck : n=m or m≠k} (c) L={anbmck : k=n+m } (d) L={ anbmck : n+2m=k} (e) L={anbmck : k=|n-m| } (f) L={ w ∈ {a,b,c}* : na(w)+nb(w)≠nc(w) } (g) L={ anbmck : k≠n+m } (h) L= { anbmck : K>=3}

Find context free grammars for the following languages (with n>=0, m>=0, k>=0) (a) L={anbmck : n=m or m<=k} (b) L={ anbmck : n=m or m≠k} (c) L={anbmck : k=n+m } (d) L={ anbmck : n+2m=k} (e) L={anbmck : k=|n-m| } (f) L={ w ∈ {a,b,c}* : na(w)+nb(w)≠nc(w) } (g) L={ anbmck : k≠n+m } (h) L= { anbmck : K>=3}

answered Oct 10 in Theory of Computation JAINchiNMay 1.5k views

0 votes

6 answers

33

Peter Linz Edition 4 Exercise 5.1 Question 7 (Page No. 133)
Find context-free grammars for the following languages (with $n ≥ 0, m ≥ 0$). (a) $L =$ {$a^nb^m : n ≤ m + 3$}. (b) $L =$ {$a^nb^m : n ≠ m − 1$ ... $v$ is any prefix of $w$}. (g) $L =$ {$w ∈$ {$a,b$}$^* : n_a (w) = 2n_b(w) + 1$}.

Find context-free grammars for the following languages (with $n ≥ 0, m ≥ 0$). (a) $L =$ {$a^nb^m : n ≤ m + 3$}. (b) $L =$ {$a^nb^m : n ≠ m − 1$}. (c) https://gateoverflow.in/208410/peter-linz-edition-4-exercise-5-1-question-7-c-page-no-133 (d) $L =$ {$a^nb^m : 2n ≤ m ≤ 3n$ ... $^* : n_a (v) ≥ n_b (v),$ where $v$ is any prefix of $w$}. (g) $L =$ {$w ∈$ {$a,b$}$^* : n_a (w) = 2n_b(w) + 1$}.

answered Oct 10 in Theory of Computation JAINchiNMay 174 views

3 votes

2 answers

34

monotonically increasing grammar
Which of the following is not a monotonically increasing grammar? (A) Context-sensitive grammar (B) Unrestricted grammar (C) Regular grammar (D) Context-free grammar

Which of the following is not a monotonically increasing grammar? (A) Context-sensitive grammar (B) Unrestricted grammar (C) Regular grammar (D) Context-free grammar

asked Jul 20 in Theory of Computation Sanjay Sharma 427 views

0 votes

1 answer

35

NIELIT 2016 MAR Scientist C - Section C: 14
If every string of a language can be determined, whether it is legal or illegal in finite time, the language is called decidable undecidable interpretive non-deterministic

If every string of a language can be determined, whether it is legal or illegal in finite time, the language is called decidable undecidable interpretive non-deterministic

asked Apr 2 in Theory of Computation Lakshman Patel RJIT 48 views

0 votes

1 answer

36

NIELIT 2016 MAR Scientist C - Section C: 15
The defining language for developing a formalism in which language definitions can be stated, is called syntactic meta language decidable language intermediate language high level language

The defining language for developing a formalism in which language definitions can be stated, is called syntactic meta language decidable language intermediate language high level language

asked Apr 2 in Theory of Computation Lakshman Patel RJIT 76 views

0 votes

1 answer

37

NIELIT 2016 MAR Scientist C - Section C: 17
Regular expression $(a \mid b)(a \mid b)$ denotes the set $\{a,b,ab,aa\}$ $\{a,b,ba,bb\}$ $\{a,b\}$ $\{aa,ab,ba,bb\}$

Regular expression $(a \mid b)(a \mid b)$ denotes the set $\{a,b,ab,aa\}$ $\{a,b,ba,bb\}$ $\{a,b\}$ $\{aa,ab,ba,bb\}$

asked Apr 2 in Theory of Computation Lakshman Patel RJIT 59 views

0 votes

1 answer

38

NIELIT 2016 MAR Scientist C - Section C: 32
Two finite state machines are said to be equivalent if they have same number of states have same number of edges have same number of states and edges recognize same set of tokens

Two finite state machines are said to be equivalent if they have same number of states have same number of edges have same number of states and edges recognize same set of tokens

asked Apr 2 in Theory of Computation Lakshman Patel RJIT 45 views

1 vote

2 answers

39

NIELIT 2017 OCT Scientific Assistant A (IT) - Section C: 9
Which of the following definitions generates the same languages as $L,$ where $L = \{x^{n}y^{n},n \geq 1\}$ $E \rightarrow xEy \mid xy$ $xy \mid x^{+}xyy^{+}$ $x^{+}y^{+}$ $(i)$ Only $(i)$ and $(ii)$ only $(ii)$ and $(iii)$ only $(ii)$ only [closed]

Which of the following definitions generates the same languages as $L,$ where $L = \{x^{n}y^{n},n \geq 1\}$ $E \rightarrow xEy \mid xy$ $xy \mid x^{+}xyy^{+}$ $x^{+}y^{+}$ $(i)$ Only $(i)$ and $(ii)$ only $(ii)$ and $(iii)$ only $(ii)$ only

asked Apr 1 in Theory of Computation Lakshman Patel RJIT 151 views

0 votes

1 answer

40

NIELIT 2017 OCT Scientific Assistant A (CS) - Section B: 9
A language $L$ for which there exists a $TM\;\;’T’,$ that accepts every word in $L$ and either rejects or loops for every word that is not in $L,$ is said to be Recursive Recursively enumerable NP-HARD None of the above

A language $L$ for which there exists a $TM\;\;’T’,$ that accepts every word in $L$ and either rejects or loops for every word that is not in $L,$ is said to be Recursive Recursively enumerable NP-HARD None of the above

asked Apr 1 in Theory of Computation Lakshman Patel RJIT 87 views

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