# How would I use recursion to generate all possibilities?

Lets say if the input is 4 then the output should be all possible 4 letter words with letters a to f. All the way from aaaa to ffff. How would I do this through the use of recursion?

My apologies for not including my attempt at the problem in my initial question. And some for you are wondering why I am using recursion instead of using a simpler method (such as a for loop for example) and the reason for this is that my prof wants us to use a for loop to solve this problem.

Here is my attempt at doing this:

``````void allPossiblilities(int n)
{
char*result;
if(Done(result))/*since the last possibility will be all f I am using that as my base case*/
{
printf("%s",result);
return;
}

/*This is where the recursive part should go but I am totally lost as to what it should be*/
}

bool Done(result)/*This function just returns true if all the array's index are f*/
{
int i;
bool a=true;
for(i=0;i<=n-1;i++)
if(result[i]!='f')
a=false;
}
return a;
}
``````
-
What have you tried? –  DrummerB Nov 13 '12 at 23:27
Personally I'd write a computer program to do it, and likely utilize a recursive algorithm (though thats not a guarantee). Answering your question, how would you do it? I have no idea. –  WhozCraig Nov 13 '12 at 23:33
Why do you want to use recursion? It doesn't seem necessary for this. –  Blorgbeard Nov 13 '12 at 23:38
My prof is making us use recursion even though it would be easier to use looping. –  Easytoread Nov 14 '12 at 0:34

I will give you a hint, to make you think:

How many possibilities are for 4 digits and 10 possible numbers (0-9) base^digits = 10^4 = 10000 possible outputs 0000-9999, in your case they will base = 6 (A-F) and exp = 4 (4 positions) 6^4 = 1296 combinations.

How are recursive functions made? They have 2 steps:

• Basic Step: it's the criteria or the condition when the function doesn't call itself ( the final condition).

• Recursive Step: It's the criteria or the condition when the function calls itself, and the result of it should be nearer to the Basic Step.

Example the famous factorial function, the basic step is the return of 1, and the recursive step is the second one.

PD: I am trying to make you analyze the problem and get the solution by yourself, and giving you some tools.

The code:

``````#include <stdio.h>
#include <stdlib.h>

void recurs( int * s );
void print( int * s );

int main( void )
{
int a[] = { 0, 0, 0, 0 };
print( a );
recurs( a );

}

void recurs( int * s )
{
int i;

/*Basic Case*/
if( s[ 3 ] == 5 && s[ 2 ] == 5 && s[ 1 ] == 5 && s[ 0 ] == 5 ){
print( s );
printf( "\nAccomplisshed!\n" );
}

else{
s[ 0 ] += 1;
for( i = 0; i < 3; i++ ){
if( s[ i ] == 6 ){
s[ i ] = 0;
s[ i + 1 ] += 1;
}
}
print( s );
recurs( s );
}
}

/* This only prints. */
void print( int * s )
{
int i;
printf( "    " );
for( i = 3; i >= 0; i-- ){
printf( "%c", ( s[ i ] + 65 ) );
}
}
``````

Part of the output:

-
Thanks this helped a lot! But would this algorithm work for a pattern larger than 4 or even less than 4? –  Easytoread Nov 15 '12 at 1:00
`````` int inc(char *c,char begin, char end){
if(c[0]==0) return 0;
if(c[0] == end){   // This make the algorithm to stop at char 'f'
c[0]=begin;     // but you can put any other char
return inc(c+sizeof(char));
}
c[0]++;
return 1;
}

int all(int a, int n,char begin, char end){
int i,j;
char *c = malloc((n+1)*sizeof(char));
for(i=a;i<=n;i++){
for(j=0;j<i;j++) c[j]=begin;
c[i]=0;
do {
printf("%s\n",c);
} while(inc(c,begin,end));
}
free(c);
}

int main(void){
all(4,4,'a','f'); // Generates from 4 letters words starting in aaaa to ffff
}
``````

If you call all(1,4,'a','f') it will generate a,b,c,d...ffff

If you call all(4,4,'a','z') it will generate from aaaa to zzzz

-

Just for the hell of using hex notation to generate `a-f` characters:

``````#include <stdio.h>
int v(unsigned char* i, unsigned short n) {
return !n || (*i>=0xa0 && (*i&0xf)>=10 && v(i+1,n-1));
}
void f(unsigned short i) {
if(i) f(i-1);
if(v((char*)&i,2)) printf("%x\n",i);
}
int main(){ f((1<<16)-1);}
``````
-
Hmm..i'm not exactly sure I understand what this code does. –  Easytoread Nov 14 '12 at 0:32
Yes, sorry. I figured too late it would not be very clear. The idea is that it loops over all integer between `0` and `2^16-1` (`ffff` in hexadecimal), and only prints them if they contain only `f`s or `a`s when printed in hexadecimal notation. –  jvivenot Nov 14 '12 at 0:45
Anyway, my answer was quite inappropriate for your problem (even though it works), and I believe you should focus on @alberto-bonsanto 's hints. –  jvivenot Nov 14 '12 at 0:48
thanks for the help anyway –  Easytoread Nov 14 '12 at 0:49