@keyframes rwdcur4474 {
0%,6.15%,100% {cursor:url(data:image/png;base64,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) 13 14, auto;}
6.25%,12.4% {cursor:url(data:image/png;base64,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) 13 14, auto;}
12.5%,18.65% {cursor:url(data:image/png;base64,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) 13 14, auto;}
18.75%,24.9% {cursor:url(data:image/png;base64,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) 13 14, auto;}
25%,31.15% {cursor:url(data:image/png;base64,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) 13 14, auto;}
31.25%,37.4% {cursor:url(data:image/png;base64,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) 13 14, auto;}
37.5%,43.65% {cursor:url(data:image/png;base64,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) 13 14, auto;}
43.75%,49.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAE1klEQVRYhe2WS2xdRRKG/6qu7nPu8fW1cRKPYSJkBQSJZSCwQLxmBjYkWQQNjyUs2GdBeEqgLFkgghCb2bCbHYyGDdIYIVYIzQwPQZQhKIIoRMgDxjHX9vW9557Tp7uaBUQ8fINMALGAf1ldpf9TV3Wpgd/1K4s2RZ4GAygAMBkqjeMQDsVfDEBGxAoAN5GhWZvLSWPpNP+NusGHSh+Afj+5/U/hRMgTpSIiFYHVK2MlHUS4MABCYEPiMrsvH3cHWfBmU4d3mHHKPxeXNaQeHvqa9CWTC3jWEF8HYI9X3akpnEjQvydg+YIAjOFgnekWbefbnfxqtnxpE5prqkH9P6z7Yw3i6xFpzbxMHaM8lxm5Pbf2LxTNVFlGH0P9cdIGiq21bRNASkkToQ9GT4xokWfO5NmuetJOAf2rBj2/GBHelcT7W2Jvbhet+dxl7aam4LXxNqY1BXy4UABNSVNKfYWuQVLfiqhj1vEdFr4Os3UVrsYCTlvP90+08rxotaTxpmKCc+Mh1Iq1Jmyt/yMBkABVrZLq5yS6LG0SLakg77gz2apWl4d/AlDZxLPtsXw5JVuxUmhNJNWofZShFxG2DMCbIg8DSVMVgy7F2HSlFfquoH69kXIxOcTJXgxwW062D4iEGiEfI+U8otFmJWhcUdWfAAAgavKh0a6vYmga7+xELBOi+o2US+YKbGA+50x8DSAlNoUW/XroB3VzoglxMWn6CS0AgIjQVNpbP1spETrbLkmeM5s3vTTl8lYl0V4ukXuxTL1WR6aqpg4bpT82bJrXg+pSOJC26j9iE57TM2gboTkj/GcyuI2Jp3e0Jxyfju7M8dUr8lL+S7fwZHatXSSX3mpiWPAaj/l9sdyy+w8CnNMCGCUeRY27M2R765O14ikICpQ4gi5dyYcT60s48GNsv9HIGTgnu8C5YzOfjYvrzLS6nYuL42PZ2Cm6DF0WaW8b7GzvOnPt1IWaA4A534EssIgxV2Qi9465/CYJWT48G2sekNNb4/95WlBMTM4ownXTd8z+Z/Vfny3+rADmPu5YY25xJruValPUazq0mfEX7clSNea315f5e8yKnTHRXt8kv3/bwT++sH7z8hC3Q/Ha1gFGvgJeIBDRdgJfozVtDwP1WYurqYszT6wu9rUEoL1Hzt5pj7oT0mS7h2njbYn2cNDmLTyJLgR9RDAMAh47P8DIGWAmIaKdUJrXBiKOw7ZLsn5n3PiBrzUm/Tfw1bpV0RtVQpcCz0xkf3jeBDkCj7sQMIeI3YiYxlHk5wMY+Qrcq84Z8F9Z5YgEW3U6srR9h12r6iZfWtsoe5V/Pu7XN87lTzw7Pe+09aaQrVRVmlCtsJFFJqMiUorJ+kL2idOH3ju1pRtIgVgbKlJIk0aSkNV8fTCU1X75adXEBSAd/3b++uHl9zfoi7vJ8KsibjnP2s5yNidsLyfwXELaFRGmR3mNnIFQBjAICVyGIn1SejqVav2oDvGDEONJTeh/v6Z6sP/Kp0c/fG3SzNxAytf7engjgc4oxVXO+TiB3x/lNXoR/QMCpTkD3uta/AkXtKRJu0G1F1W9Htj8NfuOjiJHwBwCVpDg0UIPQIWHN9edfxO+CCElkYwDCmizL/6w6WYIQUCAAnj8R1X+prWA3b82wu/67elLI4xszJ7TJMQAAAAASUVORK5CYII=) 13 14, auto;}
50%,56.15% {cursor:url(data:image/png;base64,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) 13 14, auto;}
56.25%,62.4% {cursor:url(data:image/png;base64,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) 13 14, auto;}
62.5%,68.65% {cursor:url(data:image/png;base64,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) 13 14, auto;}
68.75%,74.9% {cursor:url(data:image/png;base64,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) 13 14, auto;}
75%,81.15% {cursor:url(data:image/png;base64,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) 13 14, auto;}
81.25%,87.4% {cursor:url(data:image/png;base64,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) 13 14, auto;}
87.5%,93.65% {cursor:url(data:image/png;base64,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) 13 14, auto;}
93.75%,99.9% {cursor:url(data:image/png;base64,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) 13 14, auto;}
}
div.testarea{
animation:rwdcur4474 2.6666666666667s linear infinite forwards;
}