#Christmas Fractals You might know the "Koch Snowflake" Fractal. It is stitched together by 3 segments of the Koch curve, which folds at 60 degrees turns. The Cesaro curve is a generalized Koch curve that works with any folding angle from 0 - 90 degrees. In this example I've made a pentagram using the angle of 72 and a total-turtle-trip-theorem of 5 times 144 degrees to make a star of stars. I love the Cesaro curve, because you can turn it into so many shapes! Which are your favorites?data:image/png;base64,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#Christmas Fractals You might know the "Koch Snowflake" Fractal. It is stitched together by 3 segments of the Koch curve, which folds at 60 degrees turns. The Cesaro curve is a generalized Koch curve that works with any folding angle from 0 - 90 degrees. In this example I've made a pentagram using the angle of 72 and a total-turtle-trip-theorem of 5 times 144 degrees to make a star of stars. I love the Cesaro curve, because you can turn it into so many shapes! Which are your favorites?

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