# A fractal in c - Sierpinsky triangle

I am trying to code a project in c, that displays a fractal called Sierpinski fractal, (where the nodes are represented by '#'). So a 1-sierpinski triangle looks like :

``````##
#
``````

a 2-sierpinski triangle

``````####
# #
##
#
``````

and so on... Here's a link to find what it looks like : http://fr.wikipedia.org/wiki/Triangle_de_Sierpiński

I was told it could be done without any loop, just by recursive method. So I tried something like :

``````//extracting the power of two's index
int puiss_2(int N){
int i=0,j=1;
for(i=0;i<N;i++){
j=j*2;
i++;
}
return j;
}

//the recursive method
void fractal(int N)
{
int M;
M= puiss_2(N);

if(M==0){
printf("##\n");
printf("# ");
}
else{
fractal(N-1);
fractal(N-1);
printf("\n");
fractal(N-1);
printf(" ");
}
}

int main()
{
int N;
scanf("%d",&N);
fractal(N);
}
``````

Of course it didn't work because, when I jump to a line, I can't reverse it. So when I call it two times :

fractal(N-1); fractal(N-1);

two contiguous motives are not gathered one aside the other... Does anyone has an idea on how to make that ? Or perhaps I went completely wrong in my algo's design?

-
google Sierpinsky triangle to understand what it actually looks like. –  Jim Balter Oct 2 '12 at 14:06
Do you need to do this recursively? If you don't there's already readily available code to do it iteratively: rosettacode.org/wiki/Sierpinski_triangle –  Mike Oct 2 '12 at 14:11
@Mike : yes I would like to do it recursively –  user1611830 Oct 2 '12 at 14:34
@JimBalter, yes I am going to edit my post –  user1611830 Oct 2 '12 at 14:36
Here (as the first answer) is a recursive solution in Java: stackoverflow.com/questions/8448908/… –  Jim Balter Oct 2 '12 at 21:36

Here's some code that is perhaps complicated but recursive !

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

void sierpinsky(int N, char c[1000]){
int i=0,j,k,l,born;

for(i=0;i<N;i++){printf("%c",c[i]);}
printf("\n");

if(N==1){}
else{
if((c[0]=='#')&&(c[1]=='#')&&(c[2]=='#')){
for (j=0;2*j<N;j++){
if(c[2*j]=='#'){
c[2*j]='#';c[2*j+1]=' ';
}
else{
c[2*j]=' ';c[2*j+1]=' ';
}
}
}
else if ((c[0]=='#')&&(c[1]!='#')&&(c[2]=='#')){
for (j=0;4*j<N;j++){
if(c[4*j]=='#'){
c[4*j]='#';c[4*j+1]='#';c[4*j+2]=' ';c[4*j+3]=' ';
}
else{
c[4*j]=' ';c[4*j+1]=' ';c[4*j+2]=' ';c[4*j+3]=' ';
}
}
}
else if ((c[0]=='#')&&(c[1]!='#')&&(c[2] !='#')){
k=0;
while(c[k+1] !='#'){k++;}
born = k+1;
j=0;

while(j<N){
if((c[j]=='#')&&(c[j+born]=='#')){
for(l=0;l<born;l++){
c[j+l]='#';
}
j=j+born+1;
}

else if ((c[j]!='#')&&(c[j-1+born]=='#')&&(c[j-1+2*born] !='#'))
{
c[j-1]='#';
for(l=0;l<born;l++){
c[j+l]='#';
}
j=j+born+1;
}
else{
c[j-1]= ' ';
c[j]=' ';
j++;
}
}
}
else if ((c[0] =='#')&&(c[1] =='#')&&(c[2] !='#')){
for (j=0;4*j<N;j++){
if(c[4*j]=='#'){
c[4*j]='#';c[4*j+1]=' ';c[4*j+2]=' ';c[4*j+3]=' ';
}
else{
c[4*j]=' ';c[4*j+1]=' ';c[4*j+2]=' ';c[4*j+3]=' ';
}
}

}
else{}

sierpinsky(N-1, c);
}
}

int main()
{   int i,size;
scanf("%d",&size);
char c[1000];
for(i=0;i<size;i++){c[i]='#';}
for(i=size;i<1000;i++){c[i]='a';}
sierpinsky(size, c);
}
``````
-
Thanks it seems to work just fine! –  user1611830 Oct 20 '12 at 1:55
In fact each condition in the sierpinsky function is related to the way three first elements of each line begins, and it prescribed the rest of the line, right? –  user1611830 Oct 20 '12 at 2:00
Exactly, but sure there should exist something simpler :) –  Newben Oct 20 '12 at 2:01

I think you dont need recursion for this. Let a triplet of `#` be 1 set. So The value of `n` = `No. of levels of the set` you're supposed to print one below the other. In the first line, print the set n times. In the next line, n-1 times, and so on. Try it iteratively.
Edit : If you were looking for a recursive solution, kindly ignore my answer.

-
Yes I was trying to find something recursively –  user1611830 Oct 2 '12 at 14:35

you can probably code this using the pascal triangle. 1 1 1 1 2 1 1 3 3 1 1 4 6 4 1

If you can print out this triangle as a whole with a loop, then , perhaps you can skip over even numbers.

to print the plain triangle just count the number of spaces in relation to the number of lines you want and code using a for loop(or a couple of them).Check which (pascal) number corresponds to which printing and skip over the even ones.

-