@keyframes rwdcur185796 {
0%,12.4%,100% {cursor:url(data:image/png;base64,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) 0 0, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 0 0, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 0 0, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,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) 0 0, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 0 0, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,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) 0 0, auto;}
75%,87.4% {cursor:url(data:image/png;base64,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) 0 0, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,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) 0 0, auto;}
}
div.testarea{
animation:rwdcur185796 2s linear infinite forwards;
}