@keyframes rwdcur181622 {
0%,24.9%,100% {cursor:url(data:image/png;base64,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) 8 9, auto;}
25%,49.9% {cursor:url(data:image/png;base64,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) 8 9, auto;}
50%,74.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAGAklEQVRYhcWXS2xc1RnHf+fcO9dje2Y849f4MXEmxo5NCBCUxFZCBGqlIFqBChRaCYFa6IIWsUBV1UpVF60QUlu16qKrlkXVdoGiUlGVRUK74JGGgvN2/CAT23Gc8WQ8nozHY3ue957TxR0nFoohdoz6SUd37uOc7/+9/t838H8Wsc5zE/BWlwVIwAaK1VUG1JcFyuInQz9m19cLdO3VeLyagWc1PxuaZM83HgOigK8K6ktQ/v13nuLQSxrQeOocghEHT60m1Kl58rV3CXY+BfQAdVuh0Fjz2+QXEy9w9q2/8sHv4cCLcM8jS0QHMwi5gpA+tu+5i33PNHH6rXEgBxTYwlD4+HX6OKAZ/I7m8A+v8uqREnACeIcnX9dYdZrXRuaAl4H7cENxR2JWr5KXh7/FH587BEBoO7z48wivdAOkgQR+y/1S2CbQCQTX7L9jACbFrPfG0wqggZYofPd3A1i1y7z3J/jKC5BPFKv7JFuQiDctUJWbhzlA+pri4Lclx99sw/RAbAie/1WON34wBMwDy7jluCViAT28OnGexl6NWav53n8dvvajJf5wpcQb8RK/HFqguetd4LfA00B3dd8dyWoVaMBD16F2HvrpICd+IxBSoH3w/l+SfHI0xeV58O4wuD56ElW5CMziekFvFQAY/dsM5ZVlOvYPMv53yeyQwbbH6mk6GGTqaIgdj4dJffI+pew0bnIWucMyXMsDCqgwP5Zm99MhSsV+rKBg7qTk6r8Ngr1lWvovG11OXu4/XC+371LaLpTIpsWa/Rv2xmcB2Ci7zOS/ptjxRBP17Sv4o4uE+tKUU5eMfpkzv/nKgLxnYFBs27nf2PPwvbq5S+orw4uUSmoNiFsD2bvXpKbPJDstqFbQrZqRBTTjJlk30ApYhMKm56XXD4h9Xz2oFxd8ulSQwttQJp0cU6MfH3NiJ99j4doUpWKOXCLP9es2oIgckPQ8WEddR6PVdvdOEWhosxcmJ5w/Pz8C5G9FJGUgg9v9UkAAMCmsWHp6NCc6dnSoa1f7ndhZS7R3W7KhfTct0Q6zYdtBUROYwXbiemF+XGfnElCvRKg3KqzgAwgRFf7OCB69bCTPv+1AEkitx2TFKoAcq6RTXDbt4eM5IxjuFLX+Zq6nOvS5D3FqAyZtva2ye6BZ+kNKNDSUZaAnTbud1YUKenmlWecWGqlrMpEeW82PnnGG3izjMmnGWAfAzZxwPVICSswnSrrGWxaRXXeLmrqIvnRWMjMGycvoa5eEmp+WOpPy6IVkg87lwiodD+tcxq9X5iRCrejc9JyKHZtQEx/EsIsJILMRLlfAMlemJnigckZ23b9P90z4dDoOSylYSsPsONrjRRseqAlC5BDm7meUMCp5Nf6PuD11fIxc4izl5QSQBcobbSY2ejEjCqWL0gqkVetdPu3xQnHJxVfJu6u+DVrux4g+BIVUXk0em3ZG3j6FXbgAfApMUeWRjQJQzM7mdW4prm2RFY2dihqfZGm++lpCfTui73GMnYeVTg7nnAtHxnR28hROZVX5TNX6PGBvpp3a2GS1ozPC8CuElCBAeMDfCZEHEaEepWPHMs7E0XPkZodAnwdiQAI3sW/MlJsBoBynkPfYLGsl1Q3K8YWh7wmM8H2o+Imcmjw6zNLsR8DpquUp3N5hrz1sc/3cEWWhDRujDrwBkB4I78HsexTptYokT8VYmh2qKh9bY7n92aM2OVBYUEFia3Ac8Hcgex9B+AJKzX6U0otXR4ALwAQu4eRZp2ltaqTyWIYJhlcoIbH8YDViNEUhE8urxJkYpYVR3Ez/XOWbBqDNoCWUWacLthSBKKK1H5VPlvWn/5zWydERlPpCy1dlMyGQ2tfcDDXNKI0I34sR2adIxzLq8n/OUcpdAKZx+8kXjmwb90DkgClqAm3CqAlS2yJl2LT1Yjyv4idjFBZHceOe4jas3xyA/octEWpqJeAzpTSK6uJw0hk+Mq3jpz8GNQbEWSfjbyXr/Tn9PLFwZ4SdwC6gEbe+p3DJJl69v61RbXNM6CqYwXWzt3pN48b9tly/Kv8DFc6cFM9BR70AAAAASUVORK5CYII=) 8 9, auto;}
75%,99.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAF80lEQVRYhcWXXWxbVx3Af+fc62vXcZzE+U6dNYyk6RdNSkvR1opNGRSYRJmEugcktD0wwTO884B44YknJAQ8lIeBJtAG42MdIAZr12VJm7b5bLw0zVLHcxzbca4Tx7HvPYeHa0MoydZ8IP7S0bF8fO//d/7fhv+ziG2+l4C5aQdQleVU1r6IsaXy77x9lsz8C/hrPs96boATzz7NpR8eY6MQZzFWBjTg/i8AJN/8dTdDLz/P2O/CrNshAuEgiYkgk39uoPdpH9n5LMV8Cc8Kaj8BJN+bOsnQy19n8HKIY1+upeszZaJ9GYQoolSExs5O+r8qGX8zAVQh9F4A5KbPJkJ+mnd+GuToF0PUNX9Ae2eQqz+Z4P7ge/Sch2uXTcKtPUA9EHjo+T0CfGv4CJdf6gGCBCNBnrzYx1s/DwFFwCYUKAGgNywgtF8A1QiXFNIWyrUAi5Jr4Tom4WaHi9/9LP5gnsFXoe8ClHLFTYr3DQDcsqy8UKI0rOUdes9Jhn//GKbl8GASLnw7xx9/NAwU2KcgrNYBCYR54S8v8uqLfawthRn4vqI4NcupgTYMn2LdtvnND94lE08CCSAJrO4VopoFGpAceuoAx7/Ww9gvfWhh4fp8TL83wcxogsSKgf+gn5W5WVQpA6zhZcKeZHMaCqZfz2L4l6k7dJgH10wy0xb1fY3UdDexcL2Z1rON2DN3KK3YeMG55zTcDOBVt8z0Kkefg4IdxQwa5GImSyMmoegGnzidMs/31ctzFzvEoeM+XchpcumqG9VuYB7uBRIIAvUcf2kAdyOCWwp4R7lV36Xne+WZZ55FK0unFxPks3edkatvqj/8eBDbzvJxwXn6tEmmVjL39+q5Mh/6iaq8BCZ+9le8ghMETLqOh4m0ndKCiM5lw9p1oiLS2W/0D5wUvuAVNzb8FssfzrJRtLETBTIZDyT6hKT7XJBgR8RqO3pYhOvanOV7M+4vvjEOFB4GqEIUN+0WIMmmAjp286oIBPvVwtwJN3bLEu2PW7Ku/QTNXR1mXeeTwh+ex3HjenlpSucWE1CjRENPl7DqTyFEl6g9GMWnV43knddcL4tSWwGwyYzVKJfYS5bz7p9uGIb/byJQ00Ym1aFvv417IGzS1tMiHz/bJGsblKirK8lwd5p2J6fXy+jVtSZtL0cINppIn6OWJkbcoV+VKtbNbtWOq6L59wzgAg6peFn7/SURPXZU+INR/f4tyfwkJO+jP3xfqKU5qbMpn15O1mnbblXpeKu2s7V6bVEi1Jq25xZV7MqMmvlHDKeYALLbWWArUcAqH8zOcKo8Ih/rO6O7Z0I6HYd8CvJpWJhC+wJowwf+eoiexzxxSQmjXFBTv407s1cnsRO3KK0mgBxQ2gmA5xq9khXrG9PSCqdVyydD2heAYt7jKxe8VdMGzX0YXZ+D9VRB3bsy546/dgNnfQy4C8wCaaC4UwDFwkJB2/m4dkRORA4q/CFJfqlyLKGmHdH7FYzDX1A6OWq7Y69M6ty9G7jlqvL5yu0LgLNTAM8KDjnt6qwwahVCShAgfFB7EKLnEA3dSseuZN2ZN25jLwyBvgPE8HqIjRfcCjZ3wx1YwXXXCz6HVa2k+lftC7VC73MYrSdR8Xdsde+NUfIL14GblZun8JrXfwy0u+vnrigJbTgYQQiEQfqgtR+z90vIgFUkeSNGfmGoonxy083/a5re5UBhQRmJo8F1obYD2XMBEQortXA9pVcejANjwAxewSmwTXnejQvwWYYJRkAoIbFqwYpgNHZBNlZQiZEYG8sTeJH+kcp3DaDNeksoM6jXHSnCXYiWI6hCsqTvvj6nkxPjKPWxN6/KblwgdaipCfxNKI1o/RRG9IwiHcuq+9dus2GPAXNAlkcYWHZugegTpvCH24Thr+dAs5StpqNX4gUVH46xvjKB5/cUj3D73QEcecoSDY0thEOmlEZRTY8m3dFX5nT85iCoSSDONhG/lWz35/SjxAJagMPAMSCCl9+zeMUmzg6G1d1VQk/BPJ6ZA5U9jef3RzJ9Vf4JGSet3YnB9r4AAAAASUVORK5CYII=) 8 9, auto;}
}
div.testarea{
animation:rwdcur181622 0.66666666666667s linear infinite forwards;
}