(Solved) : 3 Hot L 40 E 60 3 Let L W E 0 1 W Odd 1 S Let Dfa Tabular Represen Tation 0 1 P P Q Qp Pr Q44085244 . . .
3. Hot L= 40 e 60.) 3. Let L = {w e {0,1}* : w has an odd no. of 1’s }, and let A be the DFA with tabular represen- tation: A || 0 | 1 →p || P a *q|| qp Prove that L = L(A). Hint: Do the L(A) SL part of the proof by induction on the the length of the string processed by A. You need a mutual induction with a claim for state p and a claim for state q. Show transcribed image text 3. Hot L= 40 e 60.) 3. Let L = {w e {0,1}* : w has an odd no. of 1’s }, and let A be the DFA with tabular represen- tation: A || 0 | 1 →p || P a *q|| qp Prove that L = L(A). Hint: Do the L(A) SL part of the proof by induction on the the length of the string processed by A. You need a mutual induction with a claim for state p and a claim for state q.
Expert Answer
Answer to 3. Hot L= 40 e 60.) 3. Let L = {w e {0,1}* : w has an odd no. of 1’s }, and let A be the DFA with tabular represen- tati…
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