@keyframes rwdcur228845 {
0%,6.15%,100% {cursor:url(data:image/png;base64,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) 15 15, auto;}
6.25%,12.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
12.5%,18.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
18.75%,24.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
25%,31.15% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADqklEQVRYhe2Xv24cVRTGf+fO7B+Pd51NbBbbCAeEFcJaSKGhoqCiCaJEVIg3yANQWH4FGjokiqTKC6ShRlQUgCKEHGNsr1jW6/V6/8zMztxDce8SyUq848Siytdc7eqc73z3nHPPvSMUhO6sAdSACLBA5lcLhP73eaSy3U4v4pWCwUMfOAI1IDXQBsg6EIP2gV2Q8TPcY9luP0sceOXzggNUna0akAZwC6QFLPt9HHqBPz0nxosLAMp+NSBlYMMHW/bCGqBLQAqyB3TO+ZuLyIsImBFY0DLIBlBT1dYksXeiCgPEzMT94UUdOPuZ38sJ8ATaAPkM+MBam04S+/FiFFRZDlbpZl2QfWAF6Pl1lonnpr+ogAxognwK+iaqd8xrpdbi9QCsQjWAYb6Sj3Q1COSJ96nOfC9qQJhTHwDZbltgHYistau55TYlAzercDuCSGBrEVX7VTrNfS8Q47o/nsc/V4BHDKT9of0EMFQEygJR8J9BeD0InxzG90CHwNG8nV9WgAW69YXgR+B3jECq0Ju6Ag0tGMN6s/IQZFBk54UF6M5aDRgCu6WS+T4ITIdRDsdTOJw6IZmAMdSj8BFP6381AnBnPgX2gVXQHoMpjBUU14QVILOADoBQd9aKZraQgJlNCJRBDUZg0YDmkOQwsnCWZSCbuIYtcroKC0g9YQjaBWkiuN1fK8FSCGkOyG/AFmgKbOjOWqFSFBEw8HY1EAvyM0NrOUggVChbMALQBCYgVW/fKFKKInMgA7puDFMFlhS1xBYGCvuJ04X+ArqHm4K+XPNLcak5APoe8JEYEyLijmEaQN8CsgQs4Q5m1a8vnwGPEGQFaAGrLAgsCGyU4WYJ3imD6Ifuqta+9xkz5x7wxBfD1zHENWNGmZB6AO9X4Zq/qScB9HL4K4txM6PH01fThSiSgZnILrCHVffPFFfluoEc6GWAvgHSwZVsLNvtueSXmQNdkDaZHDG20J/CaQ4JMMxhZC1wguuD3lXeBbMHxXg0yV9XzSNEIQzcANqPoZuiSvdslNdxV/CFD9HLCpiRmUmSfSFIg1OFTuZ238ngb4uqNNv/JJ/jmq8wiswBZqT1qPT18SAbJLmFkbrGO8lhkDNJ8ni9WbmHa8CrE+BFWKBfKZuHgtw9PEg6ZydjSIZMjieMRvm4UjLf1KLwB9luXyoDhb4LzuPXL+tvHbXjR2tvV279+Th+vLm5ePfd7053X4TrhXG/xY0HW3x7v8WN/zXwK7zCVeNfu2B24Ovhq58AAAAASUVORK5CYII=) 15 15, auto;}
31.25%,37.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
37.5%,43.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
43.75%,49.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
50%,56.15% {cursor:url(data:image/png;base64,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) 15 15, auto;}
56.25%,62.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
62.5%,68.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
68.75%,74.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
75%,81.15% {cursor:url(data:image/png;base64,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) 15 15, auto;}
81.25%,87.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
87.5%,93.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
93.75%,99.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
}
div.testarea{
animation:rwdcur228845 2.6666666666667s linear infinite forwards;
}