Today's quickie is a variation of Zigging. I put heptagons in and was required to add a few more polygons to make them all fit together. Without the squares and the triangles, the heptagons would overlap with each other.
The outline of the gaps reminds me of ducks. To help make that more visible I need to use better colours. Perhaps, I'll have to update PolygonR&D to have more colours. Then again I guess postediting in photoshop or gimp could easily fix this.... If that is the case, I guess I'll have to have an option to not use antialiasing so it is easier to swap colours... The work of a programmer is never done.
This blog is devoted to patterns made with polygons. I'll try to have something interesting posted regularly.
Saturday, June 23, 2007
Tuesday, June 19, 2007
Zigging
Here is a quick little pattern with the triangular grid only partially expanded. The diamond shapes are two triangles that did not have a spacer inserted. These last week have all been variations on a theme. I'm sure I'll switch themes soon. Perhaps I'll start introducing a few of my concrete constructions....
Hour glasses and Pythagoras
There's lot's to see in this pattern. The idea was to elaborate a square grid using triangles. By using larger triangles, the pattern creates a number of interesting features to focus on.
The first features are white hour glasses made with the two white 120 degree isosceles triangles. They have two orientations that alternate. These are the holes that come from the vertices of the original square grid. The size of the orange triangles was selected to have the triangles share a vertex. A smaller size of triangle would leave a gap which could be seen as the white isosceles triangles overlapping.
The second features are large squares that are defined by a purple square and it's four neighbouring equilateral triangles. This square that also be identified as a propeller can be chunked together with similar squares of the same orientations to create a tiling that is a Pythagorean tiling. What is interesting is either orientation of a purple square can be the basis for big squares and that each produce a Pythagorean tiling. It really is just a mater of switching your point of view and chunking different polygons together.
The first features are white hour glasses made with the two white 120 degree isosceles triangles. They have two orientations that alternate. These are the holes that come from the vertices of the original square grid. The size of the orange triangles was selected to have the triangles share a vertex. A smaller size of triangle would leave a gap which could be seen as the white isosceles triangles overlapping.
The second features are large squares that are defined by a purple square and it's four neighbouring equilateral triangles. This square that also be identified as a propeller can be chunked together with similar squares of the same orientations to create a tiling that is a Pythagorean tiling. What is interesting is either orientation of a purple square can be the basis for big squares and that each produce a Pythagorean tiling. It really is just a mater of switching your point of view and chunking different polygons together.
Monday, June 18, 2007
Little squares and big squares
Today I'm playing with size a bit. I have two patterns that seem a lot different but only differ by the size of the squares used. As with my recent trend of elaborating a triangular grid by inserting polygon sequences between the triangles, here we have a trianglesquaretriangle being inserted. By changing the size of the square inserted the squares can be made to meet in the middle of the hole produced by the insertion.
The change in the amount of white space and the addition of the pointy features makes the pattern feel a lot different even though they are closely related.
To highlight the path of the insertions and the role of the original triangles, I have included closeups showing the path of the new loops.
The change in the amount of white space and the addition of the pointy features makes the pattern feel a lot different even though they are closely related.
To highlight the path of the insertions and the role of the original triangles, I have included closeups showing the path of the new loops.
Sunday, June 17, 2007
Another Triangular Grid Variation
This pattern uses the same strategy as the last one. In this case, the inserted polygons are a square, a pentagon and a triangle. There seems to a little too much going on to be attractive. The holes in the pattern are reminiscent of the shurikens. If you look back at that pattern it is pretty much the same except the inserted pattern does not include a square. The three different shapes of holes are analogous.
Friday, June 15, 2007
Triangle Grid Elaboration
This pattern used the same technique of expanding a loop path with alternating squares and triangles. Here, I am using an orange triangular grid of and inserting purple squares and red triangles. The difficulty arises that I cannot expand all the triangular loops in the same way: the neighboring loops affect the possible choices. To help show how the particular loops of six orange triangles are expanded, I have included a zoomed in version below. On the left, I have drawn in the augmented paths of the two loops. On the right, I have filled in the polygons involved with each new loop where the square/triangles pairs are recoloured black and/or blue so as to highlight the choices of the orientations.
This style of elaboration is more complicated when using the triangular grid as a base. This is due to the oddness in the number of sides of the triangle and the asymmetry of square/triangle inserted pieces: there is no simple (uniform) choice of fitting things together like in the octagon case below. But it does produce a more interesting pattern.
This style of elaboration is more complicated when using the triangular grid as a base. This is due to the oddness in the number of sides of the triangle and the asymmetry of square/triangle inserted pieces: there is no simple (uniform) choice of fitting things together like in the octagon case below. But it does produce a more interesting pattern.
Thursday, June 14, 2007
Octagons, Esses, and Zeds
Here's another pattern that comes from a grid of octagons. It would be orange octagons and white square but the focus is on the loops of four octagons. Inserted between every pair of octagons is a triangle(red) and a square(blue). The pattern of insertion is alternating. For instance, if you follow a loop of polygons (clockwise) that surrounds a hole that resembles an S, then you will see a trianglesquare that bends to the right where as the next trianglesquare bends to the left. In fact, the original white squares (from a octagon&square tiling with vertex 488) are transformed into the distorted S's and Z's seen in the pattern.
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