@keyframes rwdcur68046 {
0%,12.4%,100% {cursor:url(data:image/png;base64,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) 8 8, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 8 8, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 8 8, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAEGklEQVRYhe2WzW8bRRiHn/1ef6WJ06ZNHNKkbZSCKBLQWhZf4sSl4GOrSBxQQULiZCT+EEs9wj1I3HzhCIeqiiyQgBaplLRA2hSaBNdx/LFez+5wmDFKq7R2jXoir2Stdjw77zO/+c07AwdxEAfxfw9jYI+3PpEzh44we/LVxWq5uNZvzpcqaaBdLRfjZwaQL1Xyf9y4+pVlu3Op9AQTx06eAcaAcSAEasDtarlYHxXAHPC/ffz0a+dB3s1kZxDd9jXgQ+B14BXgJWB21OQDAarl4lVge/bUucuR6LVbjS0213++BMwBbwLngRefGUC+VMkCx4Cml8gkXT+N56ewvdT7pu2+q5OfyZcq9qgAj/VAvlRJAqeBNHAR8P++d/PS+NQC2YWX6bV3MC2P5ubaF8BlYB2IUcYUwwI8SYEscBg4AdwC2gC9botgZxPT9jFsB5QpPwbe0f0P50sVd1iAQdL5gAsEQGBaDl4ig5SS+p1roWEYLoZxwbLdOjAPNICfNNT2MADWfo35UsUEUjrxhAY5aln2meTEtOOmJhHBzjfA/NjMaePQ/Dk/DluLott0gd8AkSss72ysrgysEYO2YQ34ASW/7SYyV3qdBs37vwLYjp827UQG0a7jeBkcP3MBtTN8hlyKfQF0dQv1a4AyYg0w/UNHSR1ZwPZSb2OYGIaNZbkkphZI5Z4nOXn8M+BTYAblo5EVqOnkJmptbwFNJMRRiJeZwstM0qndIZJdpONg+Wksx8UwrQ9Qxjyhl/Oxsa8HADZWV+TG6konV1g2gS3UMsyJYLcrOo2Wkxw/YnkZLCdBcnqOyUWDGBdDpggbW8Si+wDlnxsbqys7oyjQD6F/ANeA74C/es1tvIkZ/MPPIYGd+xAHELYf0Os0asAbqEJ19kkqPFaBfuQKyzGwBEwDGeA9YCkW4a7sttOm6wIOotnBMD0at79HxiKBlDWtAEA3V1g2coXl9sbqykNFavBxDORLlQLwggb5yHL9rIwi4qgXJrI51zAMItFDRhFhc/tb4BSqfjSBz4HrKFNfB+rVcrHdH3vYGr6NWq4/DcPM2v4YsQhxHM8VnRaR6CBFiJRyXff/ErUDfgHuobZlf+ZpdFWF4TzQB1gHfCnjK+HuFlG3BVJgAKblYPsZDMOc0zM3UX5pAkkN009q50uVfwceVgEBrOnnkpTyLEg/CgJE2KqjSm9f4k1gCrVtV/ckDzVYUC0Xnxog0IP8DnwNJGUkjolIbKJOwHGt0o9aAUf37d+UzD3Ph25PQ5kQIF+q+DqRj7qQmBpsSr/XUQULlCJ3gZu6n69B1x89qocG2ANiV8tFkS9VxlCz7QPsrfttlGeae9qa1XKxwSPx1AD7AJmodZ5FObyOkj9AzdwEwmq5GPzXXINARvruH7QUciEGAmVIAAAAAElFTkSuQmCC) 8 8, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 8 8, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,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) 8 8, auto;}
75%,87.4% {cursor:url(data:image/png;base64,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) 8 8, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,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) 8 8, auto;}
}
div.testarea{
animation:rwdcur68046 1.3333333333333s linear infinite forwards;
}