It's slightly buggy morphs between shapes. It uses my own messy equation to determine the shape though isn't too buggy. Now with a redone equation!data:image/png;base64,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It's slightly buggy morphs between shapes. It uses my own messy equation to determine the shape though isn't too buggy. Now with a redone equation!

1804360

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Draw shapes going up in side countiDraw shapes going down in side count1003606083