@keyframes rwdcur177815 {
0%,12.4%,100% {cursor:url(data:image/png;base64,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) 10 6, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 10 6, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 10 6, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,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) 10 6, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 10 6, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,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) 10 6, auto;}
75%,87.4% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAJlElEQVRYhaWXaXBb1RXH/+++J/lJenparMVybC22bMtJiB1sQkhDQprQoRQw085QWsqwdGiHAaYzpVNo+6WdaaedlrbTlg5pGVpgmsAApXSAhCUkISG2SWyHmMTxotiyIinaJVvrk97SD4mFRZyl7f/bffeec37v3HM3ClchjuM2EUIeuuaGW7h1224201DzNEURiqIgCiWxWpVCqWzsxPiRd/ZNjw6PAKhcjV8AYJY3GhsbmwkhblNre0t5MSMG/VNvAajIsjyrKMouLW/4Rff6G/sJYQi1ZKTIqFQqG8rF/K0uZ9c9ozbnGzPjR97nzE1GlVbD0jSNVDCQJ0QZDgaD0csCpFKp5Hd/9sxM7423aAFAkSTs271z5+t/f+phAEldo22REJoQQpZZETRoGDRotKzOYO5Us7of2ts6v3/jnfcRmjqPWS2XMH/mdGXord2vCOnUE6Ojh2sg9HKAdp+v5/aHfvxobHZapFUqqDVaqr1nQ//E4P4hW7Njfc/WW++xNbt5KArKhRzEigCGUYG6EIgQAs5kRiGbIRShKN5soyhCU4y6gWpsamHWXr/tGp3Fvj0b9Q+m4vF4HYDBYHDf/fivx/OZJMkvpkg6cY6KhwOIzs8glQgbuvq27PD1bfZptDqqVMjjyJ6XK4loUHE42wnNqD7LByEwWe04fngvPKuvrUs3YRjKZGt2yFVyWz4x97dMJiMsARCdTv/HqbHBXrevH+6efthtLTDaV0HH6iCKUoeh0doqCmUqODWOwMQY0pEQVS4VqdjZOWp+ehxTox+hUi5AZ2gEq9Mj6D+FyOyUmI2HZbuzvTZnhKbhcLbp/adGz4QD/uNLNSBbre7vffuXO7818fFBcDoDAEAFYHLkIJraO8nuXz0OWQG+dNdj6P3yAGhRRTQUBQFAAwCpWkEimcTE2BAykQAEsYx1fVsJb7F9vu6g1nGkdXVfz9GD73xWhFNTI+m3n//tvvXbBnYsHxwPzWPbxpvx5LPvQBJFHHjtOejVBkB9vp+9MI7RaODgDXC0taO6uIBPRw5jIR0jnrV9FwEAgKRUGQCopaapqclJyZSl2dMlA0A2GpGPHvy3yBttUKnVYLUcVA0sdEbrig6XS8UbsHrTDrAMj0+PvHdRvyKJ8tTQwXANwGQy8a41G/9w84OPreP0BgIAIx/txYFXnwfDNtQMh/e+DEdX1xUBAIBlWbSs60U2EUc6Fq7ry2TjWEyEp2sAnddtvWvLwL1fNPK2Wka233EvHn/qH4QCIIoiAqePYyGZQKt7Tc1RZGYSe159GqHpk5eE6Nm4Dcf2/aseIHpObmhomAQA4nJtZVe1dz/saOvkl9YzAFBqNWE0OmJotOLMJ0M4+v4b2HLPg9BqdbUxH3/4Jg69sgu5au6SmdBa7JBkBVWhXPuWS0VRKBTiAED4Vo612t1rG1jtig7srk4Mvvc6bv36I+BZc13fHXc/jJ/+5U10r7nhkgAAQGs1mD05gkq5dCEzHHRmMw8AxOxwiSpWLS//++UaP7wHG27/GnS2i4uP5jiwZstlgwOAIiuADEQD05BEEd6e68n6m+58wuFwaImABlESpYiiyCsaR8/Owt3We8Ugl1M6FIDd04nUuVD59NFDyXg0mNTrLbfRKvYlZjg+JrbFDfuFQt7NcvzyUwbVigCTsaVu3v9bSYUCcsko9EYzDBZr+r1Xdv7m+OEP9ni93iKrptUEH34onjl1bFdsbjqiKEqdMUUREM3KU3O1SpVTaHJ7QWgaDZzB4uzu1wLw+/3+kN/vnyUA8PEHbw+OHzv0TMg/USnnc5CqFciyjMV0AhRhrhDi8iqFs2jtuAYAoFBgiIrW9PX11TK95L2yd9fTvysVMkGLrfUFX/8WQlQMFEVBLhVHqViERrvyKrmSFqQUzPZVAIBquSRmoqHS6OhoreCWz3k54j85wJstsDS3oiqUZJqmZQoyYv6VN5qrUTmbgZY3Q5FlFNOp7OzYkTiAOgDGYDC4vT7fZtuqtjvXbtpBtHoD3nrxT7KiAO7uXpw+MQQhk/rfCBRAEqsQxQqqciUpFPN11zLCcZyR5/kt3t7N73LGRobVcgCAR37+V0aj0ZJSfhH2ZhdGh/ahWMivGGN+YuSS8bu6NmHy6AGIlSrkihxXFCW4vJ/J5/PJL9z2jezAd36kLRdyYFTnz1lCM6gKJdhaPFAUBVqDGTNjh6BidBWTvVVttVohqlRgWRaxeByu1SsDGFY1odHTiWP7/imzRuOiXq9PX7iNnQcAAJOthdA0Ax1vqjO2uzrq2lWpIj/75P2zmwfuIxFLk1fL6Ylaw+Hs1AgMnB6sVodMIQ2e5iFpaRhUJshawKpfhcGxl8hCPNgfDoXq9hoGAPK5ZFqWJBC67o56kY69+zokSfpzcPpT9Vc2bv+JzeU1E0Jj7uQINDoOnrX9yGeTyC1kUFzMIhafhaIoMJgt2DrwTXlieH8ol45ziUSi5pMGgHI6umB2OO+3tXi45WeCLEmInT2DBi0HmmZw8LXnlGwy+oPFZPQAy/GNvNnaLEuKTpZFEg/Nwtm1DtlkRNQbLbA726kmpxcOlxcmWzNM1maKM5irQkWIkGphKpPJCDWAhYWFslzKvela3feATm9ULwHMTY7JiVCAmho9hNNH9yMemqMkufpC7Ny5gJCNDpXL5VJs3u9pdLiODL+9u7m1c91CNDRHy5IMQlHVfC5DqkJJqQhlBbKiEEatL+QWPZHANCGKNF8qlXK1nEfOBlIaVj10dvKEVxalCVmWuMjcjKp9bV/F1uqlXav7lFXt3QqrNVyXTwSng8HgVC4RMp2bPdUxPXKAyS1mkrMnBoV0LDJcKS6Mq1TMq8lY+KNsLPJJPByYjAZnJxbT8U8WouHZROgMXRVK/kKhkFyKTwDA5XJ9taOjY8PSR4/H8ygA+Hy+JofDsQnADo/Hc5Pb7b4WABwOx289Hs+6ZWVCmpqaNrtcrvtdLpcRAONyuYxms7kZgJNl2RaPx2NraWlptlqtXK0Iu7u7fYIgbKlWq9t7e3sfmJmZAQBIkjTp9XrVk5OTUQBRq9XKybLcryiKr62tbUOhUFjN8/zydS0LgjBOCLlJkiQjgOz8/HwWQBYAyuUy5ubm6gq77qjzer0Wv9+fBIA1a9b4BEHYRFEUUalUL05MTFQAEKfTycuyrCWEsJIk9YbD4TdwYWvt6OjwURR1S7FY7FGr1VlZln8fCATqNp7P6/87a8+/DmpPca/Xqy4Wi5wkSQzLsmR+fj6NKzzV/wPK8hzyYmLrNwAAAABJRU5ErkJggg==) 10 6, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAAGklEQVRYhe3BAQEAAACCIP+vbkhAAQAAAO8GECAAAUcBoIgAAAAASUVORK5CYII=) 10 6, auto;}
}
div.testarea{
animation:rwdcur177815 1.3333333333333s linear infinite forwards;
}