@keyframes rwdcur28884 {
0%,49.9%,100% {cursor:url(data:image/png;base64,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) 11 13, auto;}
50%,99.9% {cursor:url(data:image/png;base64,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) 11 13, auto;}
}
div.testarea{
animation:rwdcur28884 0.2s linear infinite forwards;
}