@keyframes rwdcur246615 {
0%,-0.099999651094765%,100% {cursor:url(data:image/png;base64,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) 19 18, auto;}
3.4890523527491E-7%,-0.099999302189529% {cursor:url(data:image/png;base64,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) 19 18, auto;}
6.9781047054981E-7%,99.9% {cursor:url(data:image/png;base64,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) 19 18, auto;}
}
div.testarea{
animation:rwdcur246615 28661077.533333s linear infinite forwards;
}