About
The superformula
The superformula is a generalization of the superellipse and was first proposed by Johan Gielis.
Gielis suggested that the formula can be used to describe many complex shapes and curves that are found in nature.
Read about the superformula on Wikipedia.
Gielis suggested that the formula can be used to describe many complex shapes and curves that are found in nature.
Read about the superformula on Wikipedia.
Transformations
0: None
1: x
2: sin(x)
3: cos(x)
4: sqrt(x)
5: sin(x)²
6: cos(x)²
7: 1+sin(x)²
8: 1+cos(x)²
9: atan(x)
1: x
2: sin(x)
3: cos(x)
4: sqrt(x)
5: sin(x)²
6: cos(x)²
7: 1+sin(x)²
8: 1+cos(x)²
9: atan(x)
Enter params for superformula plot
Example 12
Superformula Shape
| a | 1 |
| b | 1 |
| m | 7 |
| n1 | 3 |
| n2 | 6 |
| n3 | 6 |
| p | 1024 |
| t | 0 |
| r | 0 |
| s | 500 |
| pdfpaper | 0 |
| Width | 1.51 m |
| Height | 1.55 m |
| Path | ~5.86 m |
Notice: The SVG-files (Scalable Vector Graphics) can be edited with various applications. Inkscape is a great choice!
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