@keyframes rwdcur20096 {
0%,9.9%,100% {cursor:url(data:image/png;base64,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) 31 31, auto;}
10%,19.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
20%,29.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
30%,39.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
40%,49.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
50%,59.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
60%,69.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
70%,79.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
80%,89.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
90%,99.9% {cursor:url(data:image/png;base64,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) 31 31, auto;}
}
div.testarea{
animation:rwdcur20096 0.66666666666667s linear infinite forwards;
}