{ "name": "rainbow fonts", "id": "9YNBonyhXfyFjpYzJ", "sources": { "main": "/*\n Rainbow fonts\n \n This pattern displays a rainbow and its mirror, but stretches regions and\n melts them into each other. Font means \"fountain\", and you'll notice there\n are fonts (sources) and drains (sinks) for the colors.\n\n This pattern's functions have been built up for you to follow along in \n Desmos, an online graphing calculator. Check it out here: \n\n https://www.desmos.com/calculator/fxykibqkjc\n*/\n\n// The denominator of this is the number of times it repeats across the strip.\n// If `scale == pixelCount`, there will be one source and one sink.\nscale = pixelCount / 2\n\nexport function beforeRender(delta) {\n t1 = time(.1) // Time it takes to melt = 0.1 * 65.536s\n \n // Speed and scale of how the sources and sinks of color oscillate in space.\n // Set this to zero to easily visualize the fonts.\n offset = sin(time(.2) * PI2) * pixelCount / 10\n}\n\nexport function render(index) {\n // A peak near lower index\n c1 = 1 - abs((index + offset) - scale) / scale\n\n // Yields a rainbow that reflects (ROYGBIVIBGYOR) and stretches out the reds\n c2 = wave(c1)\n\n // wave(wave()) yields an alternating M/W/M/W shape within 0..1\n // Since t1 can effectively double the final period, \n c3 = wave(c2 + t1)\n\n hsv(c3, 1, 1)\n}\n" }, "preview": "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" }