@keyframes rwdcur39222 {
0%,24.9%,100% {cursor:url(data:image/png;base64,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) 1 1, auto;}
25%,49.9% {cursor:url(data:image/png;base64,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) 2 2, auto;}
50%,74.9% {cursor:url(data:image/png;base64,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) 2 2, auto;}
75%,99.9% {cursor:url(data:image/png;base64,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) 2 2, auto;}
}
div.testarea{
animation:rwdcur39222 1.3333333333333s linear infinite forwards;
}