@keyframes rwdcur31049 {
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:rwdcur31049 2s linear infinite forwards;
}