@keyframes rwdcur153950 {
0%,12.4%,100% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC4AAAAuCAYAAABXuSs3AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAGzUlEQVRoge3Zy29cVx3A8e8599zHPDzvsZPY1G4UJ6FKFNEFZcWiqgoSYgELQEIVSCwQRSwAiQURfwBsWFVs2FRISBEIEBuQwmPTNkiQyqmSNG1etZM4yXgmGXs8M/dxHiyuY+ymLbuZLPLbzL0zZ/G5P/3Oub9zBp7G03gaT2SIPdfPXL586ZfdS/84ajtvUvnU53kQLp5+6QtfWgHWpgX8uFB7rteUcMcPqO5zB56fI022mTv83Gu9Xu9Ys9mcGvDjQu69ub92DfPwDkp5CE8z7D9YwLnytHCfFHszzmBjncKd29igipUGGw73F9MTFPvgLhmDMQhVQCDQgwc466Zl+8TYB/ekwPN9nB8iUPjiyUTDh+FY4kGftOPjwgRRt9Ny/d/YnZydzv1fReXqcZslkMZIo5FWI57QGt+Fx+O4lo5HshCG+FEI0mJHW+CezHLZLRVrDcIZpBQ4IRECpMkYjYbfvrt+Z8sPwrdardY708TuDbX/VqDCAqLWQFiPZHOD1fNv/Lxca7CwfOLtXq/7SrPZujwd6v7YhQsBypMEUQFpHE44BqsrXL36B4xfwn3zp8/PHz155v333r09U6leO3jw0A+mDu9ubMjhcCBxFjPcwg0UIijg2zFFmYIzrJz9PTevXzvhxf0Tjfml9OrlC7I+e+j7rVZ7evDB5sOfXL/47691Lp5jrigQQiCkwPMV2kFBWPpXz7Hyn3McqcOdQi0oVk+/WihX4tur11+PStV7rVarM0m47G5sHBj1O6eu/PN39G9dQooduO+jpWKQWDLrKPqg0GzFlmzU580/vs5ffv2LH7177u8XsjQ5P0k0gMqy9Gf3129/I+msUVUC6xzWOaSUxBq2EkctgkgJyoGgMzQUfYFZv8gHa5ZhZ5WZ9nyr1+1+sdlq/XVScLlx68arN8/+hqM1Syn0McZgrQGjcVbjhKQUCNolyWLNoxpJagXJUk3SKkhGnRv0Vt+L0iQ+Myk0gHr/7G85Ed2jVGrwQV8zShKyOMGT25QZM18WVEJJ0RdUQoUQhkroODTj0Sgp1jYN8d1r3LlxpTJReCm+TzWU9MaajW1NaBJmB9t4OmNGxBxvB4QKfCmoqwDpK6yOqRccraCC8wXpuMf6tUuTdKOsXyIda8ajTbaGjr4QZA5kqUg9iigWfIQD4fn41TrNVJJsPSSQGaLYwIaGcVjEtGcnC9+UVcpjg7EWJRR+VKM4N4dqVVDWEGUpIBGqiKg1cKMEtxlC4OFUlaA0ZlCYRS8sTRZePXySYfdtbj18wOqmY3HOJzMhzg+RTiN8BVKBKkCgEE4jRA2CAJKAwozHuDwHxdpE4XLp+ClMWGWQWvpjTZJmDPpDrLYgJAgPpAcug3QEzkAQ5r9ZjbMWv9wgLFf0ROGVenN76NXYTkEbi7EOCbjEAAL8IIciwAFS5vtQAwiL1QbPC7b9IPzyROHWua83Tr1ITEikBMoT+FKih2meaT/MR+725SKH23yHoaVHaqWd5MsHQBYr9fWDyydXwuYzVAo+xcBHCoHJLM55+Shr82w/giPzB5EKE1VIw8nWN4Bst9srlUb7zGdf/iqlKAIhEUKghITUgjWAAyl2al6Ae1T/QKmBqM5NHg5QKlf+NLew+FZtfplx9mhpFBBnkJmdkfJ/ZyzCA1ye9KhBoVr/4VTgrXb7ysFnj60dfeFFxtoRZxpnNCRpjneOfbtm68BZNAHDcBYp5d+mAgcIo8Irs4tHLoftRYZJRpImuCyBOAFjd7ItgByNtQhZwmsvdZDeRJfCffBWq6UPPHvsjZn5ZbbilGGcYNIElySgd1yCncw7nIWRqOD73neazdb61OAAzujvVZY+jQvLjNKMNNPYLIUs21lZXP5pLdbAQFUweJM2Pw4PoiKHjpwgmGmSZinaWqwlBxsDaX5YhNVYnTFOU+yUzl32wVvttlWe/Na2qjBOUyQWqXxQQb78ZWmOtxY73mJw8wLOcbrX60VThQPE8fid2J8hMxrlOaRndycjcqcFcAbPxcwFCWky/hy4yfa0Hw2PuXvv/o5RIjAQj2C0DUbnD+E0XjGiXisj3HQORh+DW6MZDYcgFEJ5OTRN8jJxLscLiSgUkGFIliZTOUN/DC6EQHnenre9zZfDRzjndpqvACcFLktwU5igj8GjYpmFw8toAtIky18+1oK3M1Tk7a3Fw83MUW4fRHpeOmm4+vAXlUabF17+Ct1/SZIH5ynaDKFk3qsADkmqGtj6MuP2Zwij0neBe5OGf+SxfbfbfUkP+6+ZtQsLYbJZ1OkApMGbaaEKVeKgfkPWl/7s+cGPhefbafyd+F/aixOw8Tb2ygAAAABJRU5ErkJggg==) 5 4, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 5 6, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 5 6, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC4AAAAuCAYAAABXuSs3AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAGQklEQVRoge3YT4wbVwHH8e/7N7bHa6+99jq73u1mSZoStSmEtoeCEJQ/lXpB3BASSBw4IIE4wY0rhx5AXOBUFYkDEhJqRU45BJS2AimEKIJEKiSkzZ/1/knWpuv12p4/b97jMNs0m1Bys3PITxrNWNbIn/np6c3zg8d5nMd5nMcBxD3XywBvv/n6b/zWn4Ly0ouUjn7p6okTz353Srb/G33PdWft5o3Xen/93Usrzy/KTEiGgW5NTfaQyHs/7PTurJhxTwZS4JIBaX97Wq6H5t7G2bmzQXFrHZQHESFWR1NiPTwHGpc+Q2uBKFUQEmS0Ny3XQ3Og8fFwgBgPybISigwjP+626ecA3I52GXbXsXWL0GXUgp2W66E5ADcStAKlJBiNko9u5QdkgZKEQYDSBq8U/sA0/2jlLrzX6xWN1oGQEh8UkCYgyfyRyxfP31zvrL3X63aPTBN6f+4OlTRNfizD2ktBWEGWqzjr6Vw8o69sj1aax07y3CvfPLu+3vmeUgqtzVvNZjN6JOA2SUmjEWWXwmiAUEVs7xZys8P2sMu/WqsrOiicrlQq1JqtXwI/nKI7h29urJ/obd761t7tm9SyFGyKkAohHEpC1l/j9OuvUg2gXi5y5Kvf/v7Geud2e2n5p9OCS4B42H/q8lt/OH7tL2+ipUIIgTABsTBE1qOEp2j7DAZ94sE2750/K8+d/v1P3jn12/WtzY2z04Drbrf7qdudG29sX7uMyDIE4BEIrRmkglHiqRQFtZLkn3dSZowgXrvEhff/XmwurraDmXq71+0+3Wg2350kXI4H/VOXzrzBktukFgY47/DOIVxGkjkQkmogaFcU82VF0QiWKoJDoSDq3WL93b+RJvGpSaIB9LULb6801s6wujzLxkiTpBE2iVHjEQ2dkIV52wUlQCh2xpZ2RdGuBlzf8dg777Nx/eqTE4fvda7IJ0qOUeK49UEKxTGH9vZQNmGxkFCuawpKUNCSUilka5BQL6WUiyEEJUbJDp0r/5i0Gx3WW8SdDJvu8sGuI3SSOM0ozxY41JqlPmOQKFQYIouztHYGSDsgKFdhqBnLAsn85P9vaF1fZHssKCmLQqILdQqtRVSjQmhTwtSCNDBTQ5gSpZltvJ+DYo32bsKwUCNaXp04XFYXDuNrR1jrZ/y7l8/fUazwWiOMQYQlRLmEKBjQDlENkbU5pAkphCFmdh5drk8e3lxY2ik2D7OXeHYjS5ymDHdHeOtBSFAalAIb54fSIDU4i88ydLFKoTLbmTi8UCr9PKu22bUavMc5jxYSF2UgFQTF/OwBoUAIcAAej8N5gzHmsxOH4/2rK89/EV99gtBICkahBKSjBHSQt+19fuT6/E4vcMoQiwLYdGvicKWNnak1frT0zIvUyiWKxqCEhEyAE+BcjhYiHzpC5H4pccUZ0sohvFSTdiMbjQalcuXPJz//lf9U6k2sy78wQkBsIXN5yULkZ/9R6yKYIWi0bwmp3MThAPOt1vlKbe4Xn/zcK4ySlCTLEM7DOAGb5VC53/R+4957IlkjMOo7jWZzOnCAar35x/bR41ez4izjOCWzMX4cQZIC+0MF8sadwztF3HgSr0uTNh+Ez7da59rHnr3ROPYC/XHMOIrxSQRRnI9zIfbxHrzDOkOpUvu11ObCVOEApfLM18PFw1GEZhglJEmCi2PIsv2xzd3Gd8UsiZfXG83mVHaNDsCbzWbUPv4ZV6jMEdkE6xw+y3K4TSGNwSb4LCPyiozpbV888MtheeZne7pCnMRIIRDKgDL57DIagrV4m7B74xJZGr/c63aXHwn4eDQ8FQU1UpuilENIPnrvGANSQjamIQa4NP6Cc27ia3H4H/A4Tti8s41WAmMEwqcwHsB4f+fWWaSRzDWqKBz5U00+D8AzmzIcDBDKILQEZyGK8nGeWfAOggKyXCZNEpyb+BQO3Ld3CCClRGtNkoHLfN7qh+sU7/MFlw4Ag8+S/EGmkAcaf/rkCxePPnOS2Gnsh698fD624a4/DQ9RWTiMMsFUdv8faBzguS9/rdOfKy7HG+8QkCKkzuFCkugqSePTzs49dUmFs79qNufPTxoNfPx27NaNq6+JwfY33KhfteM+BIZibQGhzTkbti4uLH/iB5OE3p//AhQpo/BrjklgAAAAAElFTkSuQmCC) 5 6, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 3 9, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,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) 4 9, auto;}
75%,87.4% {cursor:url(data:image/png;base64,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) 4 7, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,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) 5 7, auto;}
}
div.testarea{
animation:rwdcur153950 1.3333333333333s linear infinite forwards;
}