@keyframes rwdcur17999 {
0%,74.9%,100% {cursor:url(data:image/png;base64,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) 3 6, auto;}
75%,81.15% {cursor:url(data:image/png;base64,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) 3 6, auto;}
81.25%,87.4% {cursor:url(data:image/png;base64,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) 3 6, auto;}
87.5%,93.65% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAH6klEQVRYhe1Wa1BU5xl+zmW5czhyXbksB0QuAssCBrFGWWrCpDTKAlWrU1E0nUln0hbSznTGaeuknTFN2tRcOq1t02isV5SLokRtJlIUSCmXZQvIfQ8HEOR6XNn7nj39kbJt1FCn02n/+Pz6znzv8z3P977fe74PeIqn+D+DWB7U1FcflQho5mcX8HL5N/NPX65VUwT4r28rNg3zA6oELkngx4fUJE1DtTrO8PBCRmGAoWkadrsVJEmxJKUAF50gXP2oijFbbMjKyubM5iU2I21DEwDUN1SrtxWWGjwGfvfhsZutrZ1ay5ILmg2peetSNHzRc1uF6oZ6prRwm+lhQX1P+5YAxk/v5eUDlTLeMz89KzBOtwSX042BPgPS1WpYLRYsLsyzYcoYcNFrhKvXahlZlkGRBOsxcLPlVll93SXuTv9IsSS5WS5OdbiodLve6XCAICi44eKLC140DQt9TIJqnQkARow9zJq4NBMAjI71MxRNc27JLVLeXnDZnRq3JDVSNM3FxSQYAIAXjIxMy4iLjDfxwgjT1tXxzxKcuXiOiY2OZNs62iv/dKNZ5026QVA06yboE+nqlFraixIz16/nXTaLFoSsLyksEZa5H92oZSLCgtnxu7Mo+urXBAAYNvYwPt7eiI5ca+rquqViVoWLfX29bErKOjEhLtk0NXeXsVhsoJcXIQkZm3K3CAAqz9dUHZYcS+zt5q79oyOj5YYufUVQoD86mlv4pAxNXdK6ZAAQ3vr1OwwXE8ma7ZKYlZknNFyvYZbXS/hHZgBgamZezMzcbOod0LN2h10zxA/qV4dGmob4QcaTgTv9BiYlWf1IraurTzO9/QMVgz09lcLIXdahCICblEUVF6OXCem7uRs0/NrEFE73fKGhrqFmi66wpGmZ29ZxW5WT/awAAOOTwyqZpKBaHSdcuVrLgJQhu2XOY6CzR89kpWkeMQAA1bUny/xJSd+uH3jt4oWbugDWB6RfIGxOFwL9fRozs9VihFJZS8FV9+q3vmMCgJr6KpU6Qy329fUhNTUVkNxc39AgwoODRS4+XoxYFWW6WHdWTTxO8Itw7vzvmWs3WsfamttZigacIKFUxYOmCAQE+EIZEVw3cXf2+J49pSLPj+sPVVSaGq7XMHaHVRMVpQKlUPDZ6bnC5PQYE6WMNbV0tKoeMdDR181kr8t4bCZ+8MPvHx8Zndo/YTRiiudhcQMx8fEIjYiExeYAQZCQJDdiooIRHhaSl56WICooHz4iNBB+AQEa7aaCptGxQZWXlxdrNBqxsDAvPnEGTp99X9WqH3nHYXfoOj9tBiVZMDoygZi1yZBlN0KVUbA5ZZAUCavVAZJ0I3ltrMjFRurDleFHo8LZRi8fBWjCTxPEBvGyW8aGrFyBehJxI29gJucXkqcXbG9YLBYoWZrPUKcd7m7v2gjAJ2K1EjTckF1O2FwSJJKCLAMLi2af/n4jd+/e3G5+ZDRlfHKGT0xM4hQKLz44NFgs3bkz6d8a6Bv9G0OQFHurtbtSJrw1U8KwqFSG7Hrj9Xertm0vnDL2DxVv3pyNnp47CPRVwJeQoYAEs9UOmSQhE4DTZsfktJg8NztTvmS16QP9ffMX5udFs9WSS68k3j/aw9gcLq750xbcX3Jol6wOULLjRGLCGj0A7NhdoieAult//qtu61fycfQXvyIAYEdpoUxKTkiyHfNWOxYdEswPHsBMy+icnytub2zRsH7eFUHeOEGuZMDlcqH/Tq9od9NaGSR3f34GCWsTav0CV3EAUKLbazhzvrY4JTUZPd2DHt6F6gYiOTUGJGlHdEgQQoP84XRaERQUjIDwEI06O7nu6sfXicwtm46uaCAtUWPKyszC5NRsMUEA08Lo22EhwfzeXWUGAPjDH4+pAGBTXk4dbA6UHTwgL3NDQiPwTI4GAYwvTFYHfH194AIQFhuF37x3rBgAwqOitZ8z8MtjbzN4CB9/0sial5a0c3cFaPNyFiteedVzBxzc+7IAANGx0fs25ufw473DHp63j2/ez15/j5iansG96UmEhTDIfSZJf/K3xz2dJ8P9ZG34oyNHZOPwEE59cPwL40+efb/s9vWm1xbvm7kLtdWeOF2xrqutq1eT++x61Jw6SwDAyXMfqq0Ol+hNQLNiCQaMfSoA+OmhQ8TjxG80XlMvj8t2v3SyaFfRYRouce/+fZ5SMEGBoq+/L8xmKwCg/vpltVOSQcqS7v7i/UsrGnA6JQDApStn1DWXzqkfni/QvmC4drNetfyt8KYbU7PTTgQF+OClb78iA4DZbNVDBmw2OwBgfGKC91bQGsopsd363qIV2zAtMV0AgKIX9zzyBFvGC/nbPGei4MtFwidNV462/aVL19nczgEARZGsy+GAt+Kzvfr7+Wn6+4fFexPjYmhshH7FDPwnCF4VwhUUPJ8Rrgzmt+asP1p1rqp8bLifuHH5KgEAU3PzetPMXL4NMv/m4SPCf92AJn1jEz8+vn/zc9p9TAij25KzQf29H//E010PRie0Vjg4lYrjgX95FY8MdDBrkrIfews+Cbp6OpnMtCwP/1TVB0xl+QHkFWyvsLtpvZ+bFMMi2HK/VX6aN3/+buZynOcMrCReXXda5UuT4rzJgr17Dn4uztDbyRBwwemyfWaku4XJzPiS6Rs7D5gAoGSH7sTggAHjY1PakNWBxyNVnIdbd7n6kf/OU/zP8Xea1nJDkMv0JAAAAABJRU5ErkJggg==) 3 6, auto;}
93.75%,99.9% {cursor:url(data:image/png;base64,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) 3 6, auto;}
}
div.testarea{
animation:rwdcur17999 1.3333333333333s linear infinite forwards;
}