{"name":"Sin Orbit Alt","description":"-- sin orbit alt\n-- alexthescott\n-- 8/20/21\n\nfunction burn()\n\tfor p=0,512 do\n\t\tx=rnd(128)\n\t\ty=rnd(128)\n\t\tif pget(x,y)==13 and rnd(2)\\1==1 then\n\t\t\tif x<64 then\n\t\t\t\txd=-1\n\t\t\telse\n\t\t\t\txd=1\n\t\t\tend\n\t\t\tif y<64 then\n\t\t\t\tyd=-1\n\t\t\telse\n\t\t\t\tyd=1\n\t\t\tend\n\t\t\tpset(x+xd,y+yd,13)\n\t\telse\n\t\t\tpset(x,y,0)\n\t\tend\n\tend\nend\n\no={}\npal({7,6,134,5,1,129,13,141,133,131,140,6,2},1)\n\nfor n=6,1,-1 do\n\tadd(o,{0,n/300})\nend\n\ncls()\n::♥::\nburn()\nif t()<2 then\n\tprint(\"sin orbit alt\",38,64,1)\n\tcirc(64,64,63,13)\nelse\n\tfor n=1,6 do\n\t\tx=64+n*9*(sin(o[n][1]))\n\t\ty=64+n*9*(-cos(o[n][1]))\n\t\tcircfill(x,y,5,n)\n\t\tcircfill(-x+128,y,5,6+n)\n\t\to[n][1]+=o[n][2]\n\t\tif o[n][1]>=2 then\n\t\t\to[n][1]=0\n\t\tend\n\tend\n\tcirc(64,64,63,13)\nend\nflip()\ngoto ♥","tags":["pico8"],"symbol":"OBJKT","artifactUri":"ipfs://QmXae8pafqpWScmAtumGjRELxQmembbF6LCxoNZP9iq482","displayUri":"ipfs://QmWtjZ3VD3F1Dvy5uYCxMSmfNa8dv7ctPPJb4N4WS63nwG","thumbnailUri":"ipfs://QmWtjZ3VD3F1Dvy5uYCxMSmfNa8dv7ctPPJb4N4WS63nwG","creators":["tz1St3n29AbYXZXV8W1BG41qYzz86J2CFAW7"],"formats":[{"uri":"ipfs://QmXae8pafqpWScmAtumGjRELxQmembbF6LCxoNZP9iq482","mimeType":"application/x-directory"}],"decimals":0,"isBooleanAmount":false,"shouldPreferSymbol":false}