16.6. Sierpinski Triangle¶
Another fractal that exhibits the property of self-similarity is the Sierpinski triangle. An example is shown in Figure 3. The Sierpinski triangle illustrates a three-way recursive algorithm. The procedure for drawing a Sierpinski triangle by hand is simple. Start with a single large triangle. Divide this large triangle into four new triangles by connecting the midpoint of each side. Ignoring the middle triangle that you just created, apply the same procedure to each of the three corner triangles. Each time you create a new set of triangles, you recursively apply this procedure to the three smaller corner triangles. You can continue to apply this procedure indefinitely if you have a sharp enough pencil. Before you continue reading, you may want to try drawing the Sierpinski triangle yourself, using the method described.
Since we can continue to apply the algorithm indefinitely, what is the base case? We will see that the base case is set arbitrarily as the number of times we want to divide the triangle into pieces. Sometimes we call this number the “degree” of the fractal. Each time we make a recursive call, we subtract 1 from the degree until we reach 0. When we reach a degree of 0, we stop making recursive calls. The code that generated this Sierpinski Triangle is shown below.
This program follows the ideas outlined above. The
sierpinski does is draw the outer triangle. Next, there
are three recursive calls, one for each of the new corner triangles we
get when we connect the midpoints.
Look at the code and think about the order in which the triangles will
be drawn. While the exact order of the corners depends upon how the
initial set is specified, let’s assume that the corners are ordered
lower left, top, lower right. Because of the way the
function calls itself,
sierpinski works its way to the smallest
allowed triangle in the lower-left corner, and then begins to fill out
the rest of the triangles working back. Then it fills in the triangles
in the top corner by working toward the smallest, topmost triangle.
Finally, it fills in the lower-right corner, working its way toward the
smallest triangle in the lower right.
Sometimes it is helpful to think of a recursive algorithm in terms of a diagram of function calls. Figure 4 shows that the recursive calls are always made going to the left. The active functions are outlined in black, and the inactive function calls are in gray. The farther you go toward the bottom of Figure 4, the smaller the triangles. The function finishes drawing one level at a time; once it is finished with the bottom left it moves to the bottom middle, and so on.
sierpinski function relies heavily on the
getMid takes as arguments two endpoints and returns the point
halfway between them. In addition, this program has a function that
draws a filled triangle using the