## How to write grammar for formal language?

Before read my this answer you should read first: **Tips for creating Context free grammars**.

## Grammar for {a^{n} b^{m} | n,m = 0,1,2,..., n <= 2m }

What is you language L = {a^{n} b^{m} | n,m = 0,1,2,..., n <= 2m } description?

**Language description**:
The language **L** is consist of set of all strings in which symbols `a`

followed by symbols `b`

, where number of symbol `b`

are more than or equals to **half** of number of `a`

's.

To understand more clearly:

In pattern **a**^{n} b^{m}, first symbols `a`

come then symbol `b`

. total number of `a`

's is `n`

and number of `b`

's is `m`

. The inequality equation says about relation between `n`

and `m`

. To understand the equation:

```
given: n <= 2m
=> n/2 <= m means `m` should be = or > then n/2
=> numberOf(b) >= numberOf(a)/2 ...eq-1
```

So inequality of *n* and *m* says:

numberOf(**b**) must be *more then or equals* to **half** of numberOf(**a**)

Some example strings in L:

```
b numberOf(a)=0 and numberOf(b)=1 this satisfy eq-1
bb numberOf(a)=0 and numberOf(b)=2 this satisfy eq-1
```

So in language string any number of `b`

are possible without `a`

's. (any string of b) because any number is greater then zero (0/2 = 0).

Other examples:

```
m n
--------------
ab numberOf(a)=1 and numberOf(b)=1 > 1/2
abb numberOf(a)=1 and numberOf(b)=2 > 1/2
abbb numberOf(a)=1 and numberOf(b)=3 > 1/2
aabb numberOf(a)=2 and numberOf(b)=2 > 2/2 = 1
aaabb numberOf(a)=3 and numberOf(b)=2 > 3/2 = 1.5
aaaabb numberOf(a)=4 and numberOf(b)=2 = 4/2 = 2
```

Points to be note:

all above strings are possible because number of `b`

's are either equal(=) to half of the number of `a`

**or** more (>).

and interesting point to notice is that total `a`

's can also be more then number of `b`

's, *but not too much*. Whereas number of `b`

's can be more then number of `a`

's by any number of times.

Two more important case are:

only `a`

as a string not possible.

**note:** null `^`

string is also allowed because in `^`

, `numberOf(a) = numberOf(b) = 0`

that satisfy equation.

_{At once, it look that writing grammar is tough but really not...}

According to language description, we need following kinds of rules:

**rule 1**: To generate `^`

null string.

```
N --> ^
```

**rule 2**: To generate any number of `b`

```
B --> bB | b
```

**Rule 3**: to generate `a`

's:

(1) Remember you can't generate too many `a`

's without generating `b`

's.

(2) Because `b`

's are more then = to half of `a`

's; you need to generate one `b`

for every alternate `a`

(3) Only `a`

as a string not possible so for first (odd) alternative you need to add `b`

with an `a`

(4) Whereas for even alternative you **can** discard to add `b`

(*but not compulsory*)

So you overall grammar:

```
S --> ^ | A | B
B --> bB | b
A --> aCB | aAB | ^
C --> aA | ^
```

here `S`

is start Variable.

In the above grammar rules you may have confusion in `A --> aCB | aAB | ^`

, so below is my explanation:

```
A --> aCB | aAB | ^
^_____^
for second alternative a
C --> aA <== to discard `b`
and aAB to keep b
```

let us we generate some strings in language using this grammar rules, I am writing Left most derivation to avoid explanation.

```
ab S --> A --> aCB --> aB --> ab
abb S --> A --> aCB --> aB --> abB --> abb
abbb S --> A --> aCB --> aB --> abB --> abB --> abbB --> abbb
aabb S --> A --> aAB --> aaABB --> aaBB --> aabB --> aabb
aaabb S --> A --> aCB --> aaAB --> aaaABB --> aaaBB --> aaabB --> aaabb
aaaabb S --> A --> aCB --> aaAB --> aaaCBB --> aaaaABB --> aaaaBB
--> aaaabB
--> aaaabb
```

One more for *non-member* string:

according to language a^{5} b^{2} = `aaaaabb`

is **not** possible. because 2 >= 5/2 = 2.5 ==> 2 >= 2.5 inequality fails. So we can't generate this string using grammar too. I try to show below:

In our grammar to generate extra `a`

's we have to use C variable.

```
S --> A
--> aCB
--> aaAB
--> aa aCB B
--> aaa aA BB
--> aaaa aCB BB
---
^
here with firth `a` I have to put a `b` too
```

While my answer is done but I think you can change `A`

's rules like:

```
A --> aCB | A | ^
```

Give it a Try!!

**EDIT:**

_{as @us2012 commented: It would seem to me that then, S -> ^ | ab | aaSb | Sb would be a simpler description. I feel this question would be good for OP and other also.}

OP's language:

L = {a^{n} b^{m} | n,m = 0,1,2,..., n <= 2m}.

@us2012's Grammar:

```
S -> ^ | ab | aaSb | Sb
```

@us2012's question:

Whether this grammar also generates language L?

Answer is **Yes!**

The inequality in language between number of `a`

's = `n`

and number of `b`

= m is `n =< 2m`

We can also understand as:

```
n =< 2m
that is
numberOf(a) = < twice of numberOf(b)
```

And In grammar, when even we add *one* or *two* `a`

's we also add *one* `b`

. So ultimately number of `a`

can't be more then twice of number of `b`

.

Grammar also have rules to generate. any numbers of `b`

's and null `^`

strings.

So the simplified Grammar provided by @us2012 is CORRECT and also generates language L exactly.

**Notice:** The first solution came from derivation as I written in am linked answer, I started with language description then tried to write some basic rules and progressively I could write complete grammar.

Whereas @us2012 answer came by aptitude, you can gain the aptitude to write grammar by reading others solution and writing your for same..like you learn programming.

I have added my answer hope you find helpful. – Grijesh Chauhan Mar 22 '13 at 19:47