@keyframes rwdcur52979 {
0%,6.15%,100% {cursor:url(data:image/png;base64,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) 15 15, auto;}
6.25%,12.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
12.5%,18.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
18.75%,24.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
25%,31.15% {cursor:url(data:image/png;base64,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) 15 15, auto;}
31.25%,37.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
37.5%,43.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
43.75%,49.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
50%,56.15% {cursor:url(data:image/png;base64,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) 15 15, auto;}
56.25%,62.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
62.5%,68.65% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADvklEQVRYhe2WT2xUVRjFf/f6Mr4Ok+kwbcZaSx1gOgGbKFqJgAEibjQuSDAxLgzYohJijG5csdCtC2KiiVsEkfiPVGuCIalEUhW1SoEINEVoNdrUsa3NMJ08Z17vdTHv0jdvOn80GDc9yZfMn3ffOfd857vvwTKW8T9DNHKRzC4ASF8ZKFMqest/I0BmFyRg+coIUIDrq38loqYAH7ntVcj7jkfqeFUwIvzrGxFk1flfeqQ2ENVXr8T1x8e3Ac0UCuPipZcHRVOT0udHpP7pSkQ+/sRUYANQx5mqArzFlicgrE6eSDF+bb946OEkrqv00OkMU5PfsXqtg1ZS3NWdCQiHkiOSgDMNCWCx5zYQ5syXz4q9+5I3/p3PJXAcCUixoSfvJ1fHjqzDcdKy77kBQMnsQtV2VAjwJd5YXxIAnbguWBbMTEtWRAZZk8pT3vvSlDSFY9xqj1E5MRWoCKEXvBt9B6J68reEfvdwL6HQ/QA4zqDY/8IhEW2eBrKUgugGNmWsN+Uu5UKZAG/3hjwCRPXZ4aQeH0+KVavyQI5UelbEW+Y84iyQpzQFBmZU/QLMmFa4EGyBWWgBtnrrjR3EYr2ird3W50YyYvODr4t4yyyQC5Ar//307IylT3yaRqmc3N03QY0gyiq/Weq9ownC4T1i63aLri4X122jWDCkuQC5SbsEpB7o3yZ6Nr4CbKnCUVMAgBTru0s9zeXg9yn4yzkl7ts455EGDx7/KSm5nv1FD51+n9vbB6rt3CCYAYk5dE4NJvXopUex7QS2fVU88tj3It4yDcx5Dpjg+du21HPCCG0ohGYCSukvFmMoFdED/Z3M55BPP3OBUu+NgPLxKyd3qRNAqAyhuai0uFhw9cHXDoit2xP6j4ylL1/cJ9Z3O55Icx06d13qY+/soFjooaPzTblzV7YRcqN8kb1kkbGuoE9+1smmLa2sTbncmczoSxdjgKXPDsfU0bc78B5Q+sihTeKBzXvFPfeu48cLcd9GapIv5YAR4AIFxkbbaGl19c8TilDoQ7m7b1Id/+BuQqE9zEwX9LkfXhQbehy60mP6i88/oTn2jTzw6gTlB1BN1DsJbf31UIxUWorEbVL1f9QhVq58ntVrWvXo5Wv8OXtQPvnUJOXj6A+dG7x/IwJg8bkf8n/W50dsPfxtL+FwmBWRw3Lnrl9ZHElD7H9L+ucO+Fzwj1YIkDo/b+kzX0VF+x2OF0Y3UPjI63FXF+CJgPL3wOCsLzVqDZE2JKCOGIOGrb5pkNkFI2gZy7gp+BsKD6SSFwVfnQAAAABJRU5ErkJggg==) 15 15, auto;}
68.75%,74.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
75%,81.15% {cursor:url(data:image/png;base64,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) 15 15, auto;}
81.25%,87.4% {cursor:url(data:image/png;base64,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) 15 15, auto;}
87.5%,93.65% {cursor:url(data:image/png;base64,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) 15 15, auto;}
93.75%,99.9% {cursor:url(data:image/png;base64,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) 15 15, auto;}
}
div.testarea{
animation:rwdcur52979 0.8s linear infinite forwards;
}