Harter-Heighway Dragon
From Math Images
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|ImageName=Harter-Heighway Dragon Curve | |ImageName=Harter-Heighway Dragon Curve | ||
|Image=DragonCurve.jpg | |Image=DragonCurve.jpg | ||
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- | The Harter-Heighway Dragon is created by iteration of the curve process described above, and is thus a type of fractal known as iterated function systems. This process can be repeated infinitely, and the perimeter or length of the dragon is in fact infinite. However, if you look to the image at the right, a 15th iteration of the Harter-Heighway Dragon is already enough to create an impressive fractal. | + | The Harter-Heighway Dragon is created by iteration of the curve process described above, and is thus a type of fractal known as '''iterated function systems'''. This process can be repeated infinitely, and the perimeter or length of the dragon is in fact infinite. However, if you look to the image at the right, a 15th iteration of the Harter-Heighway Dragon is already enough to create an impressive fractal. |
- | An interesting property of this curve is that although the corners of the fractal seem to touch at various points, the curve never actually crosses over itself. Also, the curve exhibits ''self-similarity'' when iterated infinitely because as you look closer and closer at the curve, the curve | + | An interesting property of this curve is that although the corners of the fractal seem to touch at various points, the curve never actually crosses over itself. Also, the curve exhibits '''self-similarity''' when iterated infinitely because as you look look closer and closer at the curve, the magnified parts of the curve continue to look like the larger curve. |
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+ | To learn another method to create the Harter-Heighway Dragon, click [http://sierra.nmsu.edu/morandi/coursematerials/JurassicParkFractal.html here] | ||
|Pre-K=No | |Pre-K=No | ||
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|HighSchool=Yes | |HighSchool=Yes | ||
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==Properties== | ==Properties== | ||
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+ | The Harter-Heighway Dragon curve has several different properties we can derive. | ||
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===Perimeter=== | ===Perimeter=== | ||
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[[Image:DragonCurve_basic.png|thumb|right|1st iteration of the Harter-Heighway Dragon]] | [[Image:DragonCurve_basic.png|thumb|right|1st iteration of the Harter-Heighway Dragon]] | ||
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For example, if you look at the picture to the right, the straight red line shows the fractal as its base segment and the black crooked line shows the fractal at its first iteration. | For example, if you look at the picture to the right, the straight red line shows the fractal as its base segment and the black crooked line shows the fractal at its first iteration. | ||
- | If the first iteration is split up into two | + | If the first iteration is split up into two triangles, the ratio of the perimeter of the first iteration over the base segment is: |
- | + | ::<math>\frac{s\sqrt{2} + s\sqrt{2}}{s + s} = \frac{2s\sqrt{2}}{2s} = \frac{\sqrt{2}}{1}</math> | |
===Number of Sides=== | ===Number of Sides=== | ||
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[[Image:DragonCurve_Sides.png|900px|center]] | [[Image:DragonCurve_Sides.png|900px|center]] | ||
The number of sides (<math>N_k</math>) of the Harter-Heighway curve for any degree of iteration (''k'') is given by <math>N_k = 2^k\,</math>, where the "sides" of the curve refer to alternating slanted lines of the fractal. | The number of sides (<math>N_k</math>) of the Harter-Heighway curve for any degree of iteration (''k'') is given by <math>N_k = 2^k\,</math>, where the "sides" of the curve refer to alternating slanted lines of the fractal. | ||
For example, the third iteration of this curve should have a total number of sides <math>N_3 = 2^3 = 8\,</math>. | For example, the third iteration of this curve should have a total number of sides <math>N_3 = 2^3 = 8\,</math>. | ||
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===Fractal Dimension=== | ===Fractal Dimension=== | ||
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The [[Fractal Dimension]] of the Harter-Heighway Curve can also be calculated using the equation: <math>\frac{logN}{loge}</math>. | The [[Fractal Dimension]] of the Harter-Heighway Curve can also be calculated using the equation: <math>\frac{logN}{loge}</math>. | ||
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Thus, the fractal dimension is <math>\frac{logN}{loge} = \frac{log2}{log\sqrt{2}} = 2 </math>, and it is a <balloon title="A space-filling curve in 2-dimensions is a curve with a fractal dimension of exactly 2. This means that the curve touches every point in the unit square."> space-filling curve</balloon>. | Thus, the fractal dimension is <math>\frac{logN}{loge} = \frac{log2}{log\sqrt{2}} = 2 </math>, and it is a <balloon title="A space-filling curve in 2-dimensions is a curve with a fractal dimension of exactly 2. This means that the curve touches every point in the unit square."> space-filling curve</balloon>. | ||
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+ | ==Changing the Angle== | ||
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The Harter-Heighway curve iterates with a 90 degree angle; however, if the angle is changed, new curves can be created. The following fractals are the result of 13 iterations. | The Harter-Heighway curve iterates with a 90 degree angle; however, if the angle is changed, new curves can be created. The following fractals are the result of 13 iterations. | ||
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Image:CurveAngle110.jpg|'''Curve with angle 110''' | Image:CurveAngle110.jpg|'''Curve with angle 110''' | ||
</gallery> | </gallery> | ||
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}} | }} | ||
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|other=Algebra | |other=Algebra | ||
|AuthorName=SolKoll | |AuthorName=SolKoll | ||
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|Field=Dynamic Systems | |Field=Dynamic Systems | ||
|Field2=Fractals | |Field2=Fractals | ||
- | |FieldLinks= | + | |FieldLinks=:To read about an alternate method of creating the Harter-Heighway Dragon http://sierra.nmsu.edu/morandi/coursematerials/JurassicParkFractal.html |
|References= | |References= | ||
Wikipedia, [http://en.wikipedia.org/wiki/Dragon_curve Wikipedia's Dragon Curve page] | Wikipedia, [http://en.wikipedia.org/wiki/Dragon_curve Wikipedia's Dragon Curve page] |
Current revision
Harter-Heighway Dragon Curve |
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Harter-Heighway Dragon Curve
- This image is an artistic rendering of the Harter-Heighway Curve (also called the Dragon Curve), which is a fractal. It is often referred to as the Jurassic Park Curve because it garnered popularity after being drawn and alluded to in the novel Jurassic Park by Michael Crichton (1990).
Contents |
Basic Description
This fractal is described by a curve that undergoes a repetitive process (called an iterated process). To begin the process, the curve has a basic segment of a straight line.Then at each iteration,
- Each line is replaced with two line segments at an angle of 90 degrees (other angles can be used to make fractals that look slightly different).
- Each line is rotated alternatively to the left or to the right of the line it is replacing.
The Harter-Heighway Dragon is created by iteration of the curve process described above, and is thus a type of fractal known as iterated function systems. This process can be repeated infinitely, and the perimeter or length of the dragon is in fact infinite. However, if you look to the image at the right, a 15th iteration of the Harter-Heighway Dragon is already enough to create an impressive fractal.
An interesting property of this curve is that although the corners of the fractal seem to touch at various points, the curve never actually crosses over itself. Also, the curve exhibits self-similarity when iterated infinitely because as you look look closer and closer at the curve, the magnified parts of the curve continue to look like the larger curve.
To learn another method to create the Harter-Heighway Dragon, click here
A More Mathematical Explanation
- Note: understanding of this explanation requires: *Algebra
Teaching Materials
- There are currently no teaching materials for this page. Add teaching materials.
About the Creator of this Image
SolKoll is interested in fractals, and created this image using an iterated function system (IFS).
Related Links
Additional Resources
- To read about an alternate method of creating the Harter-Heighway Dragon http://sierra.nmsu.edu/morandi/coursematerials/JurassicParkFractal.html
References
Wikipedia, Wikipedia's Dragon Curve page Cynthia Lanius, Cynthia Lanius' Fractals Unit: A Jurassic Park Fractal
Future Directions for this Page
An animation of the fractal being drawn gradually through increasing iterations (a frame for each individual iteration)
Also, an animation that draws the curve at the 13 or so iteration, but slowly to show that the curve never crosses itself.
Leave a message on the discussion page by clicking the 'discussion' tab at the top of this image page.