Recent questions and answers in Theory of Computation

1 vote

2 answers

1

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

answered 2 days ago in Theory of Computation wafer 174 views

0 votes

2 answers

2

UGCNET-Jan2017-III: 62
Which of the following pairs have different expressive power? Single-tape-turing machine and multi-dimensional turing machine. Multi-tape turing machine and multi-dimensional turing machine. Deterministic push down automata and non-deterministic pushdown automata. Deterministic finite automata and Non-deterministic finite automata

Which of the following pairs have different expressive power? Single-tape-turing machine and multi-dimensional turing machine. Multi-tape turing machine and multi-dimensional turing machine. Deterministic push down automata and non-deterministic pushdown automata. Deterministic finite automata and Non-deterministic finite automata

answered 3 days ago in Theory of Computation Pallav98 74 views

0 votes

1 answer

3

UGCNET-Jan2017-III: 63
Which of the following statements is false? Every context –sensitive language is recursive The set of all languages that are not recursively enumerable is countable The family of recursively enumerable languages is closed under union The families of recursively enumerable and recursive languages are closed under reversal

Which of the following statements is false? Every context –sensitive language is recursive The set of all languages that are not recursively enumerable is countable The family of recursively enumerable languages is closed under union The families of recursively enumerable and recursive languages are closed under reversal

answered 3 days ago in Theory of Computation Pallav98 38 views

0 votes

7 answers

4

NIELIT 2017 DEC Scientist B - Section B: 2
According to the given language, which among the following expressions does it correspond to ? Language $L=\{x\in\{0,1\}\mid x\text{ is of length 4 or less}\}$. $(0+1+0+1+0+1+0+1)^4$ $(0+1)^4$ $(01)^4$ $(0+1+\varepsilon)^4$

According to the given language, which among the following expressions does it correspond to ? Language $L=\{x\in\{0,1\}\mid x\text{ is of length 4 or less}\}$. $(0+1+0+1+0+1+0+1)^4$ $(0+1)^4$ $(01)^4$ $(0+1+\varepsilon)^4$

answered 3 days ago in Theory of Computation Lakshman Patel RJIT 125 views

26 votes

4 answers

5

GATE2005-57
Consider the languages: $L_1 = \left\{ww^R \mid w \in \{0, 1\}^* \right\}$ $L_2 = \left\{w\text{#}w^R \mid w \in \{0, 1\}^* \right\}$, where $\text{#}$ is a special symbol $L_3 = \left\{ww \mid w \in \{0, 1\}^* \right\}$ Which one of the following is TRUE? $L_1$ is a deterministic CFL $L_2$ is a deterministic CFL $L_3$ is a CFL, but not a deterministic CFL $L_3$ is a deterministic CFL

Consider the languages: $L_1 = \left\{ww^R \mid w \in \{0, 1\}^* \right\}$ $L_2 = \left\{w\text{#}w^R \mid w \in \{0, 1\}^* \right\}$, where $\text{#}$ is a special symbol $L_3 = \left\{ww \mid w \in \{0, 1\}^* \right\}$ Which one of the following is TRUE? $L_1$ is a deterministic CFL $L_2$ is a deterministic CFL $L_3$ is a CFL, but not a deterministic CFL $L_3$ is a deterministic CFL

answered 4 days ago in Theory of Computation Mitali gupta 2.2k views

2 votes

1 answer

6

COA-PIPELINE
An instruction pipeline consists of following 5 stages: IF = Instruction Fetch, ID = Instruction Decode, EX = Execute, MA = Memory Access and WB = Register Write Back Now consider the following code: Assume that each stage takes 1 clock cycle for ... are required to execute the code, without operand forwarding over a bypass network ________. Someone please confirm this i am getting 12

An instruction pipeline consists of following 5 stages: IF = Instruction Fetch, ID = Instruction Decode, EX = Execute, MA = Memory Access and WB = Register Write Back Now consider the following code: Assume that each stage takes 1 clock cycle for all ... cycles are required to execute the code, without operand forwarding over a bypass network ________. Someone please confirm this i am getting 12

answered 5 days ago in Theory of Computation sachin486 235 views

58 votes

7 answers

7

GATE2006-34
Consider the regular language $L=(111+11111)^{*}.$ The minimum number of states in any DFA accepting this languages is: $3$ $5$ $8$ $9$

Consider the regular language $L=(111+11111)^{*}.$ The minimum number of states in any DFA accepting this languages is: $3$ $5$ $8$ $9$

answered 5 days ago in Theory of Computation Duy Le 8.7k views

0 votes

6 answers

8

Doubt-DFA
what is the grammar generated by the complement of this DFA and what is the type?

what is the grammar generated by the complement of this DFA and what is the type?

answered 5 days ago in Theory of Computation tech_beardo 96 views

0 votes

1 answer

9

This question is taken from a sample paper
Consider the following grammar G. Is this regular? S →EF E → a|∈ F → abF|ac

Consider the following grammar G. Is this regular? S →EF E → a|∈ F → abF|ac

answered Jul 27 in Theory of Computation tech_beardo 42 views

33 votes

8 answers

10

GATE2008-52
Match the following NFAs with the regular expressions they correspond to: P Q R S $\epsilon + 0\left(01^*1+00\right)^*01^*$ $\epsilon + 0\left(10^*1+00\right)^*0$ $\epsilon + 0\left(10^*1+10\right)^*1$ $\epsilon + 0\left(10^*1+10\right)^*10^*$ $P-2, Q-1, R-3, S-4$ $P-1, Q-3, R-2, S-4$ $P-1, Q-2, R-3, S-4$ $P-3, Q-2, R-1, S-4$

Match the following NFAs with the regular expressions they correspond to: P Q R S $\epsilon + 0\left(01^*1+00\right)^*01^*$ $\epsilon + 0\left(10^*1+00\right)^*0$ $\epsilon + 0\left(10^*1+10\right)^*1$ $\epsilon + 0\left(10^*1+10\right)^*10^*$ $P-2, Q-1, R-3, S-4$ $P-1, Q-3, R-2, S-4$ $P-1, Q-2, R-3, S-4$ $P-3, Q-2, R-1, S-4$

answered Jul 24 in Theory of Computation Asim Siddiqui 4 4.3k views

27 votes

6 answers

11

GATE2007-74
Consider the following Finite State Automaton: The language accepted by this automaton is given by the regular expression $b^*ab^*ab^*ab^*$ $(a + b)^*$ $b^*a(a+b)^*$ $b^*ab^*ab^*$

Consider the following Finite State Automaton: The language accepted by this automaton is given by the regular expression $b^*ab^*ab^*ab^*$ $(a + b)^*$ $b^*a(a+b)^*$ $b^*ab^*ab^*$

answered Jul 23 in Theory of Computation Asim Siddiqui 4 3.5k views

23 votes

5 answers

12

GATE2011-45
A deterministic finite automaton ($\text{DFA}$) $D$ with alphabet $\Sigma = \{a, b\}$ is given below. Which of the following finite state machines is a valid minimal $\text{DFA}$ which accepts the same languages as $D$?

A deterministic finite automaton ($\text{DFA}$) $D$ with alphabet $\Sigma = \{a, b\}$ is given below. Which of the following finite state machines is a valid minimal $\text{DFA}$ which accepts the same languages as $D$?

answered Jul 23 in Theory of Computation Asim Siddiqui 4 2.9k views

20 votes

2 answers

13

TIFR2014-B-14
Which the following is FALSE? Complement of a recursive language is recursive. A language recognized by a non-deterministic Turing machine can also be recognized by a deterministic Turing machine. Complement of a context free language can be recognized ... enumerable then it is recursive. Complement of a non-recursive language can never be recognized by any Turing machine.

Which the following is FALSE? Complement of a recursive language is recursive. A language recognized by a non-deterministic Turing machine can also be recognized by a deterministic Turing machine. Complement of a context free language can be recognized by a ... both recursively enumerable then it is recursive. Complement of a non-recursive language can never be recognized by any Turing machine.

answered Jul 22 in Theory of Computation Srivathsa 2.1k views

23 votes

5 answers

14

GATE1993-27
Draw the state transition of a deterministic finite state automaton which accepts all strings from the alphabet $\{a,b\}$, such that no string has $3$ consecutive occurrences of the letter $b$.

Draw the state transition of a deterministic finite state automaton which accepts all strings from the alphabet $\{a,b\}$, such that no string has $3$ consecutive occurrences of the letter $b$.

answered Jul 20 in Theory of Computation Aditi0103 3k views

0 votes

1 answer

15

Peter Linz Edition 4 Exercise 4.1 Question 2 (Page No. 108)
Find nfa's that accept (a) $L ((a + b) a^*) ∩ L (baa^*)$. (b) $L (ab^*a^*) ∩ L (a^*b^*a)$.

Find nfa's that accept (a) $L ((a + b) a^*) ∩ L (baa^*)$. (b) $L (ab^*a^*) ∩ L (a^*b^*a)$.

answered Jul 16 in Theory of Computation Himanshu Kumar Gupta 59 views

27 votes

5 answers

16

GATE2008-IT-34
Consider a CFG with the following productions. $S \to AA \mid B$ $A \to 0A \mid A0 \mid 1$ $B \to 0B00 \mid 1$ $S$ is the start symbol, $A$ and $B$ ... $\{0, 1\}$ containing at least two $0$'s

Consider a CFG with the following productions. $S \to AA \mid B$ $A \to 0A \mid A0 \mid 1$ $B \to 0B00 \mid 1$ $S$ is the start symbol, $A$ and $B$ ... $\{0, 1\}$ containing at least two $0$'s

answered Jul 15 in Theory of Computation prajjwalsingh_11 3.3k views

0 votes

1 answer

17

is language L={ a^p*b^q*c^r*d^s | p+r=q+s }is dcfl?

answered Jul 14 in Theory of Computation Rahul bhatt 252 views

0 votes

1 answer

18

Peter Linz Edition 4 Exercise 4.3 Question 23 (Page No. 124)
Is the family of regular languages closed under infinite intersection?

Is the family of regular languages closed under infinite intersection?

answered Jul 14 in Theory of Computation Himanshu Kumar Gupta 47 views

1 vote

1 answer

19

Peter Linz Edition 4 Exercise 4.3 Question 16 (Page No. 123)
Is the following language regular? $L=$ {$w_1cw_2:w_1,w_2∈$ {$a,b$}$^*,w_1\neq w_2$}.

Is the following language regular? $L=$ {$w_1cw_2:w_1,w_2∈$ {$a,b$}$^*,w_1\neq w_2$}.

answered Jul 14 in Theory of Computation Himanshu Kumar Gupta 48 views

0 votes

1 answer

20

Michael Sipser Edition 3 Exercise 2 Question 49 (Page No. 159)
We defined the rotational closure of language $A$ to be $RC(A) = \{yx \mid xy \in A\}$.Show that the class of CFLs is closed under rotational closure.

We defined the rotational closure of language $A$ to be $RC(A) = \{yx \mid xy \in A\}$.Show that the class of CFLs is closed under rotational closure.

answered Jul 14 in Theory of Computation Himanshu Kumar Gupta 41 views

0 votes

1 answer

21

Michael Sipser Edition 3 Exercise 2 Question 53 (Page No. 159)
Show that the class of DCFLs is not closed under the following operations: Union Intersection Concatenation Star Reversal

Show that the class of DCFLs is not closed under the following operations: Union Intersection Concatenation Star Reversal

answered Jul 14 in Theory of Computation Himanshu Kumar Gupta 34 views

3 votes

4 answers

22

GATE2020-CS-10
Consider the language $L = \{a^{n}\mid n \geq 0\} \cup \{a^{n}b^{n}\mid n \geq 0\}$ and the following statements. $L$ is deterministic context-free. $L$ is context-free but not deterministic context-free. $L$ is not $LL(k)$ for any $k$. Which of the above statements is/are TRUE? Ⅰ only Ⅱ only Ⅰ and Ⅲ only Ⅲ only

Consider the language $L = \{a^{n}\mid n \geq 0\} \cup \{a^{n}b^{n}\mid n \geq 0\}$ and the following statements. $L$ is deterministic context-free. $L$ is context-free but not deterministic context-free. $L$ is not $LL(k)$ for any $k$. Which of the above statements is/are TRUE? Ⅰ only Ⅱ only Ⅰ and Ⅲ only Ⅲ only

answered Jul 14 in Theory of Computation kartik.kharbanda 1.9k views

1 vote

1 answer

23

Recursive Enumerable Language
Consider statements S1: The language of all TM’s that accept nothing is a Recursive enumerable language. S2:Complement of the language of all TM's that accept nothing is also Recursive enumerable language. Which of the statements are TRUE?

Consider statements S1: The language of all TM’s that accept nothing is a Recursive enumerable language. S2:Complement of the language of all TM's that accept nothing is also Recursive enumerable language. Which of the statements are TRUE?

answered Jul 12 in Theory of Computation Gaurav Yadav 79 views

37 votes

9 answers

24

GATE2015-2-35
Consider the alphabet $\Sigma = \{0, 1\}$, the null/empty string $\lambda$ and the set of strings $X_0, X_1, \text{ and } X_2$ generated by the corresponding non-terminals of a regular grammar. $X_0, X_1, \text{ and } X_2$ are related as follows. $X_0 = 1 X_1$ $X_1 = 0 X_1 + 1 X_2$ ... $X_0$? $10(0^*+(10)^*)1$ $10(0^*+(10)^*)^*1$ $1(0+10)^*1$ $10(0+10)^*1 +110(0+10)^*1$

Consider the alphabet $\Sigma = \{0, 1\}$, the null/empty string $\lambda$ and the set of strings $X_0, X_1, \text{ and } X_2$ generated by the corresponding non-terminals of a regular grammar. $X_0, X_1, \text{ and } X_2$ are related as follows. $X_0 = 1 X_1$ $X_1 = 0 X_1 + 1 X_2$ ... in $X_0$? $10(0^*+(10)^*)1$ $10(0^*+(10)^*)^*1$ $1(0+10)^*1$ $10(0+10)^*1 +110(0+10)^*1$

answered Jul 8 in Theory of Computation TheAnteamatter 5.8k views

0 votes

1 answer

25

Peter Linz Edition 5 Exercise 12.1 Question 6 (Page No. 308)
Consider the question: $“$Does a Turing machine in the course of a computation revisit the starting cell $($i.e the cell under the read-write head at the beginning of the computation$)?$”$ Is this a decidable question$?$

Consider the question: $“$Does a Turing machine in the course of a computation revisit the starting cell $($i.e the cell under the read-write head at the beginning of the computation$)?$”$ Is this a decidable question$?$

answered Jul 7 in Theory of Computation roh 76 views

0 votes

2 answers

26

Turing Machine - Membership Problem
Is membership problem for TM decidable or undecidable?

Is membership problem for TM decidable or undecidable?

answered Jul 2 in Theory of Computation manikantsharma 841 views

3 votes

6 answers

27

ISRO2020-41
Minimum number of states required in DFA accepting binary strings not ending in $”101”$ is $3$ $4$ $5$ $6$

Minimum number of states required in DFA accepting binary strings not ending in $”101”$ is $3$ $4$ $5$ $6$

answered Jun 28 in Theory of Computation akash18tripathi 716 views

0 votes

1 answer

28

Geekforgeeks full length
Let L = (0+1)*1(0+1)^(n−1) and following statements regrading language L: The language L can be recognised by a non-deterministic automaton with (n+1) states. Deterministic automaton recognises this language must have at least 2^n states. (Assume n≥1). Which of the ... ---------- According to me, L can be written as (0+1)*1(0+1)* which makes option D most suitable.

Let L = (0+1)*1(0+1)^(n−1) and following statements regrading language L: The language L can be recognised by a non-deterministic automaton with (n+1) states. Deterministic automaton recognises this language must have at least 2^n states. (Assume n≥1). Which of the following statement(s) is/ ... -------------- According to me, L can be written as (0+1)*1(0+1)* which makes option D most suitable.

answered Jun 23 in Theory of Computation ninja_hattori 48 views

17 votes

2 answers

29

GATE2008-IT-35
Which of the following languages is (are) non-regular? $L_1 = \{0^m1^n \mid 0 \leq m \leq n \leq 10000\}$ $L_2 = \{w \mid w $ reads the same forward and backward$\}$ $L_3 = \{w \in \{0, 1\} ^* \mid w$ contains an even number of 0's and an even number of 1's$\}$ $L_2$ and $L_3$ only $L_1$ and $L_2$ only $L_3$ only $L_2$ only

Which of the following languages is (are) non-regular? $L_1 = \{0^m1^n \mid 0 \leq m \leq n \leq 10000\}$ $L_2 = \{w \mid w $ reads the same forward and backward$\}$ $L_3 = \{w \in \{0, 1\} ^* \mid w$ contains an even number of 0's and an even number of 1's$\}$ $L_2$ and $L_3$ only $L_1$ and $L_2$ only $L_3$ only $L_2$ only

answered Jun 20 in Theory of Computation TheAnteamatter 1.9k views

23 votes

7 answers

30

GATE2007-IT-73
Consider the regular expression $R = (a + b)^* \ (aa + bb) \ (a + b)^*$ Which one of the regular expressions given below defines the same language as defined by the regular expression $R$ ? $(a(ba)^* + b(ab)^*)(a + b)^+$ $(a(ba)^* + b(ab)^*)^*(a + b)^*$ $(a(ba)^* (a + bb) + b(ab)^*(b + aa))(a + b)^*$ $(a(ba)^* (a + bb) + b(ab)^*(b + aa))(a + b)^+$

Consider the regular expression $R = (a + b)^* \ (aa + bb) \ (a + b)^*$ Which one of the regular expressions given below defines the same language as defined by the regular expression $R$ ? $(a(ba)^* + b(ab)^*)(a + b)^+$ $(a(ba)^* + b(ab)^*)^*(a + b)^*$ $(a(ba)^* (a + bb) + b(ab)^*(b + aa))(a + b)^*$ $(a(ba)^* (a + bb) + b(ab)^*(b + aa))(a + b)^+$

answered Jun 20 in Theory of Computation TheAnteamatter 4.4k views

31 votes

7 answers

31

GATE2007-IT-72
Consider the regular expression $R = (a + b)^* (aa + bb) (a + b)^*$ Which deterministic finite automaton accepts the language represented by the regular expression $R$?

Consider the regular expression $R = (a + b)^* (aa + bb) (a + b)^*$ Which deterministic finite automaton accepts the language represented by the regular expression $R$?

answered Jun 20 in Theory of Computation TheAnteamatter 2.6k views

33 votes

3 answers

32

GATE2007-IT-71
Consider the regular expression $R = (a + b)^* (aa + bb) (a + b)^*$ Which of the following non-deterministic finite automata recognizes the language defined by the regular expression $R$? Edges labeled $\lambda $ denote transitions on the empty string.

Consider the regular expression $R = (a + b)^* (aa + bb) (a + b)^*$ Which of the following non-deterministic finite automata recognizes the language defined by the regular expression $R$? Edges labeled $\lambda $ denote transitions on the empty string.

answered Jun 20 in Theory of Computation TheAnteamatter 3.2k views

42 votes

10 answers

33

GATE2003-14
The regular expression $0^*(10^*)^*$ denotes the same set as $(1^*0)^*1^*$ $0+(0+10)^*$ $(0+1)^*10(0+1)^*$ None of the above

The regular expression $0^*(10^*)^*$ denotes the same set as $(1^*0)^*1^*$ $0+(0+10)^*$ $(0+1)^*10(0+1)^*$ None of the above

answered Jun 19 in Theory of Computation Jhaiyam 5.4k views

1 vote

3 answers

34

made easy workbook

answered Jun 19 in Theory of Computation Avik Chowdhury 152 views

0 votes

2 answers

35

MadeEasy Test Series: Theory Of Computation - Regular Languages

answered Jun 19 in Theory of Computation Avik Chowdhury 168 views

1 vote

5 answers

36

ugc net 2018-33
A pushdown automata behave like a Turing machine when number of auxiliary memory is: (1) 0 (2) 1 (3) 1 or more (4) 2 or more

A pushdown automata behave like a Turing machine when number of auxiliary memory is: (1) 0 (2) 1 (3) 1 or more (4) 2 or more

answered Jun 16 in Theory of Computation pritambiswas000007 2.6k views

4 votes

5 answers

37

Peter Linz Edition 4 Exercise 2.1 Question 24 (Page No. 49)
Let us define an operation $truncate$, which removes the rightmost symbol from any string. For example, $truncate (aaaba)$ is $aaab$. The operation can be extended to languages by $truncate (L)= $ {$truncate(w):w ∈ L$} Show how, ... From this, prove that if $L$ is a regular language not containing $λ$, then $truncate (L)$ is also regular.

Let us define an operation $truncate$, which removes the rightmost symbol from any string. For example, $truncate (aaaba)$ is $aaab$. The operation can be extended to languages by $truncate (L)= $ {$truncate(w):w ∈ L$} Show how, given a dfa for any regular language L, ... $truncate (L)$. From this, prove that if $L$ is a regular language not containing $λ$, then $truncate (L)$ is also regular.

answered Jun 16 in Theory of Computation roh 805 views

0 votes

5 answers

38

NIELIT 2017 DEC Scientist B - Section B: 56
Which of the following statement is true? Deterministic context free language are closed under complement. Deterministic context free language are not closed under Union. Deterministic context free language are closed under intersection with regular set. All of the options

Which of the following statement is true? Deterministic context free language are closed under complement. Deterministic context free language are not closed under Union. Deterministic context free language are closed under intersection with regular set. All of the options

answered Jun 15 in Theory of Computation pritambiswas000007 54 views

47 votes

7 answers

39

GATE2010-39
Let $L=\{ w \in \:(0+1)^* \mid w\text{ has even number of }1s \}$. i.e., $L$ is the set of all the bit strings with even numbers of $1$s. Which one of the regular expressions below represents $L$? $(0^*10^*1)^*$ $0^*(10^*10^*)^*$ $0^*(10^*1)^*0^*$ $0^*1(10^*1)^*10^*$

Let $L=\{ w \in \:(0+1)^* \mid w\text{ has even number of }1s \}$. i.e., $L$ is the set of all the bit strings with even numbers of $1$s. Which one of the regular expressions below represents $L$? $(0^*10^*1)^*$ $0^*(10^*10^*)^*$ $0^*(10^*1)^*0^*$ $0^*1(10^*1)^*10^*$

answered Jun 11 in Theory of Computation Tsering_Dorjay 6.8k views

0 votes

2 answers

40

net 2016 july exam
Let L be the language generated by regular expression 0*10* and accepted by the deterministic finite automata M. Consider the relation RM defined by M. As all states are reachable from the start state, RM has _____ equivalence classes.

Let L be the language generated by regular expression 0*10* and accepted by the deterministic finite automata M. Consider the relation RM defined by M. As all states are reachable from the start state, RM has _____ equivalence classes.

answered Jun 9 in Theory of Computation Duraikrishnakumar 699 views

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