QUESTION 22 Using the grammar, <S> <A> <S> + <A> + <A> | <id > <id...
3. Using the grammar below, show a parse tree and a leftmost derivation for the statement. A = ( A + (B)) * C assign <idxpr expr>? <expr> <term> term <term factor factor (<expr>) l <term I <factor l <id> 4. Prove that the following grammar is ambiguous (Give sentence that has two parse trees, and show the parse trees):
Show that this grammar is ambiguous for the string a+b+c: <S> - <x> <X> - <x>+ <x> <X> - <id> <id> - abc Give the derivations.
Consider the following grammar <word>= empty string<word><dash> |<ch><word><ch> <ch> AB <dash> = - Provide a recursive recognition method isIn(strg) that return true if the string strg is in this language and returns false otherwise
- Using the grammar in Example 3.2, show a parse tree and a leftmost derivation for the following statement: B = C * (A * (B + C)). EXAMPLE 3.2 A Grammar for Simple Assignment Statements <assign> → <id> = <expr> <id> → A | B | C <expr> → <id> + <expr> | <id> * <expr> | ( <expr> ) | <id>
Considering the following BNF grammar, answer the questions. <prog> - <assign> | <expr> <assign> = <id> = <expr> <expr> := <expr> + <term> | <expr> - <term> | <term> <term> := <factor> | <factor> * <term> <factor> ::= ( <expr> ) | <id> | <num> <id>::= ABC <num> := 0|1|2|3 2a - What is the associativity of the * operator? (5 points) 2b - For the * and + operators, do they have the same precedence, does the * operator...
Q3. Convert the following recursive BNF grammar to EBNF: (20%) <assign>-> <id> = <expr> <expr> -> <d>+ <expr> | <id> * <expr> 1 (<expr>) | <i>
Question 9 (10 points) Consider the following EBNF grammar for a "Calculator Language": <calculation> <expr> = <expr> > <term> (+1-) <expr> <term <term> <factor> (* ) <term> <factor> <factor> > (<expr>) value> <value> → [<sign> ] <unsigned [. <unsigned> ] <unsigned> <digit> { <digit> } <digit → 011121314151617189 <sign → + - which of the following sentences is in the language generated by this grammar? Whx.2 a. 3/+2.5 = b. 5- *3/4= c. (3/-2) + 3 = d. 5++3 =
4. Construct a grammar over {a, b} whose language is {a"b"|0sn<m<3n}.
Use the grammar given below and show a parse tree and a leftmost derivation for each of the following statements. 1. A = A * (B + (C * A)) 2. B = C * (A * C + B) 3. A = A * (B + (C)) <assign> → <id> <expr> = <expr> → <id> + <expr> kid<expr> <expr>) ids
Question 9 (10 points) Consider the following EBNF grammar for a “Calculator Language": <calculation> → <expr>= <expr> <term> (+1-) <expr> <term> <term> <factor> (* ) <term> <factor> <factor> → (<expr>) <value> <value> → [<sign> ] <unsigned> [. <unsigned> ] <unsigned> <digit> { <digit> } <digit> → 01|2|3|4|567| 8 | 9 <sign> → +|- which of the following sentences is in the language generated by this grammar ? Why? a. 3/+2.5 = b. 5-*3/4= c. (3/-2) + 3 = d. 5...