a 24gon with every corner connected to every other corner by lines. Took over an hour to make! 连接 双面 多边形 24gon 连接
5 overlapped triangles arranged to make a pentagon but also a cool pentagram in the middle 5 重叠 三角形 5 重叠的三角形
These are the heptagon,octogon, and nonagon, as well as their polycurves. I felt sorry for them because they weren't included along with my 9 supreme shapes for certain reasons. heptagon 八角 多边形 7 8 9 Gons 和曲线
I haven't been uploading things lately to openclipart since I'm trying to sell my art, but this is a very special one that I think should be shared with the world. There are some amazing illusions that can be done and this is one of them. 神圣 双 五角大楼 神圣的双五角大楼
I am very proud of this picture. For so long I've been trying to find a way to fit regular triangles into a square. I found that it works if I rotate the triangles just right. I also added the red green and blue triangles just to fill the extra space. 广场 满足 三角形 广场满足三角形
dodecagon connections This is one of many in my series I call connections. It connects every point to every other point in a regular polygon. These take a lot longer to make than tessellations. Go to http://www.fmepedia.com/index.php/Polygon_Art to see more examples. 正 连接 双面 正连接
this is one of the coolest things yet. It almost competes with the chessboard in it's awesomeness. Each of the shapes I could go on forever about but it would be more important to describe how I did it. Starting with the top going clockwise, I made the 4 supreme regular polygons. They are the most well known polygons. The next four shapes I'm unsure if they have a name, but they are created by the gaps between different numbers of circles. They may not be as well known as the regular polygons. Since they are curved instead of straight edged, they could be called polycurves. Last but certainly not least, the circle is in the center. It's not a polygon or a polycurve, but it's the most commonly occuring shape in the universe as far as I know. Also I had to include it since the polycurves were made from circle gaps. 多边形 最高 形状 9 最高形状
This is a picture containing 12 kinds of polygons, some of which also could also be considered a star. The main goal of this is to show that the more points a regular polygon or star has, the closer it becomes to being a circle. The circle is in the middle because I like to have it included and because something should be in the middle. There is also a dodecagon in the vector file which is what held the 12 polygons in the proper place. 圆 三角形 广场 多边形星星和圆
I was looking in a geometry book at the library and saw regular polygons inside circles. I was curious to see how it works in inkscape. It's actually very easy with inkscape's polygon tool. If you create any regular polygon, then snap it to the center of a circle, then you can snap the 1 node to one of the four orthagonal snap points. 多边形 内部 圆 内圆的多边形
full mesh network, each 12 points are connected with each other. this drawing can be used as an example to network topologies (e.g. cisco full mesh) 网格 林 多边形 全网 12 点