MCQOPTIONS
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MCQOPTIONS
This section includes 15 Mcqs, each offering curated multiple-choice questions to sharpen your Automata Theory knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
Given grammar G:S->aS| ABA-> eB-> eD-> bReduce the grammar, removing all the e productions: |
| A. | S->aS| AB| A| B, D-> b |
| B. | S->aS| AB| A| B| a, D-> b |
| C. | S->aS| AB| A| B |
| D. | None of the mentioned |
| Answer» C. S->aS| AB| A| B | |
| 2. |
Consider G=({S,A,B,E}, {a,b,c},P,S), where P consists of S →AB, A →a, B →b and E →c.Number of productions in P’ after removal of useless symbols: |
| A. | 4 |
| B. | 3 |
| C. | 2 |
| D. | 5 |
| Answer» B. 3 | |
| 3. |
For the given grammar G:S->ABaCA->BCB->b| eC->D| eD-> dRemove the e productions and generate the number of productions from S in the modified or simplified grammar. |
| A. | 6 |
| B. | 7 |
| C. | 5 |
| D. | 8 |
| Answer» E. | |
| 4. |
For each production in P of the form:A-> x1x2x3…xnput into P’ that production as well as all those generated by replacing null variables with e in all possible combinations. If all x(i) are nullable, |
| A. | A->e is put into P’ |
| B. | A->e is not put into P’ |
| C. | e is a member of G’ |
| D. | None of the mentioned |
| Answer» C. e is a member of G’ | |
| 5. |
Let G=(V, T, P, S) be a CFG such that _____________. Then there exists an equivalent grammar G’ having no e productions. |
| A. | e ∈ L(G) |
| B. | w ∉ L(G) |
| C. | e ∉ L(G) |
| D. | w ∈ L(G) |
| Answer» D. w ∈ L(G) | |
| 6. |
Consider the following grammar:A->eB->aAbCB->bAbAA->bBThe number of productions added on the removal of the nullable in the given grammar: |
| A. | 3 |
| B. | 4 |
| C. | 2 |
| D. | 0 |
| Answer» C. 2 | |
| 7. |
Simplify the given grammar:S->aXbX->aXb | e |
| A. | S->aXb | ab, X-> aXb | ab |
| B. | S->X | ab, X-> aXb | ab |
| C. | S->aXb | ab, X-> S | ab |
| D. | None of the mentioned |
| Answer» B. S->X | ab, X-> aXb | ab | |
| 8. |
Statement:For A-> e ,A can be erased. So whenever it appears on the left side of a production, replace with another production without the A.State true or false: |
| A. | true |
| B. | false |
| Answer» C. | |
| 9. |
CONSIDER_G=({S,A,B,E},_{A,B,C},P,S),_WHERE_P_CONSISTS_OF_S_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚Àւ†AB,_A_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚Àւ†A,_B_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚Àւ†B_AND_E_‚ÄÖ√Ñ√∂‚ÀÖ√∫‚Àւ†C.?$# |
| A. | |
| B. | 4 |
| C. | 3 |
| Answer» B. 4 | |
| 10. |
For each production in P of the form: |
| A. | |
| B. | are nullable, |
| C. | A->e is put into P’ |
| Answer» C. A->e is put into P‚Äö√Ñ√∂‚àö√ë‚àö¬• | |
| 11. |
Let G=(V, T, P, S) be a CFG such that _____________. Then there exists an equivalent grammar G’ having no e productions.$ |
| A. | e ‚àà L(G) |
| B. | w ‚àâ L(G) |
| C. | e ‚àâ L(G) |
| D. | w ‚àà L(G) |
| Answer» D. w ‚Äö√Ñ√∂‚àö‚Ć‚àö‚Ć L(G) | |
| 12. |
Simplify the given grammar: |
| A. | |
| B. | |
| Answer» B. | |
| 13. |
Statement: |
| A. | |
| B. | |
| Answer» C. | |
| 14. |
The variable which produces an epsilon is called: |
| A. | empty variable |
| B. | nullable |
| C. | terminal |
| D. | all of the mentioned |
| Answer» C. terminal | |
| 15. |
The use of variable dependency graph is in: |
| A. | Removal of useless variables |
| B. | Removal of null productions |
| C. | Removal of unit productions |
| D. | None of the mentioned |
| Answer» B. Removal of null productions | |