@keyframes rwdcur222495 {
0%,19.9%,100% {cursor:url(data:image/png;base64,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) 3 3, auto;}
20%,39.9% {cursor:url(data:image/png;base64,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) 3 3, auto;}
40%,59.9% {cursor:url(data:image/png;base64,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) 3 3, auto;}
60%,79.9% {cursor:url(data:image/png;base64,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) 3 3, auto;}
80%,99.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAH50lEQVRYhd2WbWxT1xnH/+fc42v72o4dx84LeQFCEqAFQoBBCKwl7Rh9QS1bu250mraWbtWS0QmVadrWCk1V9yKt0xCl2+hWurXb6LZOdKijLxKFtZS2CRCSCPIGJDgvjuPc2I7v9fX1vefsAwNtjAp7H/Zhj3SloyPd//PT/znPOQ/w/xJ/3AQ6+liFUuh/9MrizPb62ujXwy28DXKhIrs+AXr7XMeD3uzU7olHHEv+K4DJND71tnfjKx96b32at6GuEJHtK+Q7nNR+3EX5Ay5JPD68zT2nYIDsrMp6NVdVR3HrzjdKtj4/+ljFPbwNrnxEsjleFc/AywVMPYdQxrRCBQNQQqHGotbQtIHeopUbjoYfeP6Eo/kp0Y7aG4mMaPTIjEnGBUAVBw4vKsr15gvA/mXNs0YWIp2EEfAh5m8o5eEFO6nW1Dz6jb/urhRjB8leWNeXIRYBIABKCTHJXvB8Aa46QASH7JLhVTwwdA1ccATnLYbR9Pn1p5a0/fx91vxD3oaG64noNuESJZwAXODjIG8AINmWJTPGFY8HF4YG+PHXDhj93V1IaDomXTWhD4OtO/8gb/n1xbbwZ3kbFAB4Z8tlB8vcoo5CKAAsW5Cqzs8h7zMgAYB4arE8PK3dejpbersUKJeonsi1qG++3n/2TPL0sFolORWYzIUR013To8obNZsFf9cSv1D7EuJ9D3lC0ZT5RNApmkpcoPEsCelC7tjXY43mDfCdZcZ8uXXHtzPlS+dG4yqJj16U1rnHX9yxKPnTrq5zrnOjU/VTOuScZWGWBdzJQP1as6h21Q9WpFKSFu+dtZkvbfJ1IFTiAi+EHebrP+mCmTfAo4vMqtLPfG/b6s1fLAmVzkFkoBe+yZNHVv4Jfzl2H47K2uSl/qHIgqkcKw3NqUFxRRWMYH11BKUbaC4XvsUz9ueLaRZN5ehQbcizJ/TLbKqgEuxoRFhpumeLw5UNVNbW2GuaW6WQ4uLtnnffC7+AyVeGcPrIZqNjfDzK+idSC2V/2OEPliAl+TzDdnBtxC5ZscydOLLcl3rZ/Ww2kW/yqwDfakLQ1bz1ftLznNd+f0/C0/yQD7K/JH50/9tb6zGx/zYEvfsw+M699ltUi6l9g5GaiQwtDYbLYDsUjHFfTV/KfVtGOIp+2xw7//0OzOQLQAGAC3DbJlyYjInOTo7JUyYhzFKohLgmrX+yp+I3f7vL+RVCQLe+hWd/tHT8S5X9rx44ffgV/dLIMAwzhyESDr0lrd55gG7cf2pb5V2iPT8ABgAC4MZshjOmXLaE6xzUB4fLRRWnFjypld8xgQXrhwYHPpn+WmyPdx+6eJv56IHBzmOHPhz95lTl8obi0nI6ZliIZotuiZjFqabqsfcA3PAsXHUgnTG4aRMQAsDSLEElKpw+JhFANwwzE17o7QxsePjJgbqXXtvsbAPAH3wbv9h1c3SXJ94fTc1qMDI6YlOT8HN1GICetwNFMngkrXGfZYIAyHEnFYQy5pAZJaA5wwCDjZuaWzA9tXjJob4Tz/Sc626NPRzd3TdDA5pcEijyKMiaWcjCNJZ40yc+/tq+XgkEuJXReMJXhvGGdcwvql1u29YpGLU4GKESzZlZNBpvqFb9Sld3yWalpyN8/67zHct8lprIeooVB5Og6xwNRcbZlmDqg3ySXy2BUwJ3MWIly1plquvcOXIwZYGAeLzUtEFNywajFGE5bdW4E/oiV3eiZm7ImqxY2/B3c/7q2bSGGVUFz+ool/RThGC8IADdAmceD/dovaZ7eoBHrQrZzIEhEfUSAkaIAOc5XAysl/u9d4ca0meMB42X4ytKJvXQnCoYpo3zw5cANWKsdsVPkr0wCgJwM3DL0HnCtVAZlEspnTlnuIPlzHvvE9t8C9bebQvJyhgmyiJvWou6vhutiPbwZWKaf2HhVOLeJjN+03yfWeTzYSxty4cnHJtEe/6PEQMAhcGKTcYtp1sym0iM22X1NFhZyVj19g1eZQmsYzuQ0TWUxgd5g0hbANhoIMw/CH81ON/fq+cm3kgPx+YFVd2i0w6uCJH/PHBlIOFTsVHumVNFL6x5OiAF7/R6NANFPhecoTLYXEBLqTzur6VKVZmrZPgjS9GTtGT0kOE0pvlI3KJT6gz80PjKQOYdQpD3dcwAgBBwXU9hPBlgsiF7ldlzSE4lsXjxfCTi0xDChp2z0OddwXoDdxetKVbjjZGT1qaLr+v9OdCOaGNQ0zVUO0z10xXZjwqZiK60oU6TY2dTPYfXW95yxeGvwHQiiol4BBMTo+Ccw+IOmBNdZiUZiVUnh64m6Ml4MJGGLAsTC9xmd6XP7ss3+VUA+hzM0S+ffiYy3Xd8JFndqCXDq4S/ssYWN9dlEoZs2RwzaYP+/rgdqPTM8sESpJuCCm9wZa3jMyFFMywo3ERj2OospAUBgFy78c9HJJS1ERoLzFt1Ysx93zPvqveMZSQqyU4IysAYgd/twNygqas6k8dVm80lM+qPlye3tbxqHizYgX8j2gsAiF/+hvsSj+D92XnysbMp1hrRWMPALKvL5BwspjkwOSMrisxhWRbqgubQ2nLzVCHJrwtwbQR+hQuA+TPRbr6o6Zh3ZMqxqluVGk+qrGXaZFVjOislNsFcZ65TCEQLBfiPEuQToh2yEKgaUKXaQ5eklumctPTWcr73zkPZo/8TgGtgKAAFgF5I+12JfwD7Ysrd2ymAMgAAAABJRU5ErkJggg==) 3 3, auto;}
}
div.testarea{
animation:rwdcur222495 0.25s linear infinite forwards;
}