@keyframes rwdcur106348 {
0%,12.4%,100% {cursor:url(data:image/png;base64,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) 13 17, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 13 17, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 13 17, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,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) 13 17, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 13 17, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,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) 13 17, auto;}
75%,87.4% {cursor:url(data:image/png;base64,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) 13 17, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,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) 13 17, auto;}
}
div.testarea{
animation:rwdcur106348 0.8s linear infinite forwards;
}