Consider a grammar: S --> | aS | SS SSb | Sbs, Where T={a,b} V={S }....
Consider a grammar: S --> | as SS SSb Sbs, Where T={a,b} V={S}. a. Show that the grammar is ambiguous. b. What is the language generated by this grammar?
Consider a grammar : S --> a | aS | bSS | SSb | SbS, Where T={a,b} V={S }. a. Show that the grammar is ambiguous. b. What is the language generated by this grammar? 2. (20 points) Consider a grammar: S -->a | aS | SS | Ssb | Sbs, Where T={a,b} V={S}. a. Show that the grammar is ambiguous. b. What is the language generated by this grammar?
Consider a grammar : S --> a | aS | bSS | SSb | SbS, Where T={a,b} V={S }. a. Show that the grammar is ambiguous. b. What is the language generated by this grammar?
Given the following Grammar G, S->ASB A -> AAS | a B -> Sbs | A|bb (a) Identify and remove the A-productions. (b) Identify and remove unit-productions from the result of (a). (c) Convert it to Chomsky Normal Form.
Given the following Grammar G, S->ASB A-> AS a B-> Sbs Albb (a) Identify and remove the A-productions. (b) Identify and remove unit-productions from the result of (a). (c) Convert it to Chomsky Normal Form.
Given the following Grammar G, S->ASB A-> AS a B-> Sbs Albb Identify and remove the -productions. Identify and remove unit-productions Convert it to Chomsky Normal Form.
Show that this grammar is ambiguous for the string a+b+c: <S> - <x> <X> - <x>+ <x> <X> - <id> <id> - abc Give the derivations.
6.(20) Let G=(V, S, R, S) be a grammar with V = {Q, R, T}; { = {q, r,ts}; and the set of rules: SQ Qq RqT R~rrt Qor T>t | ST a. (5) Convert G to a PDA using the method we described. b. (15) Convert G to Chomsky normal form.
Let G = (V, S, R, S) be a grammar with V = {Q, R, T}; { = {q, r,ts}; and the set of rules: SQ Q→ RqT RrrT QQr T>t | StT b. (15) Convert G to Chomsky normal form.
S->ASB A-> AS a B -> Sbs Albb (a) Identify and remove the l-productions. (b) Identify and remove unit-productions from the result of (a). (c) Convert it to Chomsky Normal Form.