@keyframes rwdcur21959 {
0%,12.4%,100% {cursor:url(data:image/png;base64,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) 0 8, auto;}
12.5%,24.9% {cursor:url(data:image/png;base64,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) 0 8, auto;}
25%,37.4% {cursor:url(data:image/png;base64,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) 0 8, auto;}
37.5%,49.9% {cursor:url(data:image/png;base64,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) 0 8, auto;}
50%,62.4% {cursor:url(data:image/png;base64,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) 0 8, auto;}
62.5%,74.9% {cursor:url(data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACAAAAAgCAYAAABzenr0AAAACXBIWXMAAA7EAAAOxAGVKw4bAAADiUlEQVRYhe2VT2gUVxzHv/PeJmM3jpNszJaMpckpFikiCRUqpaW0pC3bS2mtIh5S2lgwkZReFr2UnNI9hTGGGnKI0IX+2XNIl1rQQFyMGJBQjLG0cZvsuvaPruuYney+9+vBSZk1a52hWU9+LzPvvd/8vh++7/FGgV/1xEyciQ6ovbExAEcAXABwFsCgPR6VftspPoxHAPQ7ozmciXapvbEpAG+vl9jjUe/9HDGP5gWXOQB0oid22R6PvgNg0V0aNFMFvxD/W2pvzFZ7Y+QAUNBMjXj9NvCfq/uPMwCiYi4xtCFmezyqrgM46gdwzAvA47bgC9f7WjVzF0TFWtBMmZsB8KbzXERiSPXS0NHc/YGXBzYDYB+AH5AY2unTvCtopsY8Vbc2P5M1dL636uL+4w+aRPou+wBA0ExNBc0UPb4SYGCciXD7cFWIxNCnjnmnD/NreHA3XPAGoDBM/jizb/WVD8c2QET6TJ/mNoAOZ3jWGwCAlvCzmBg+uceK9E9UQEyOVhwkLUmPjNWJvN41NeiJujWs5TKrRBfvEI3+/DdtPfLl9QqISN8IIn20DqAlyfbU2KOU1patufnfC+G/ysBSETi3dBcn498u6RNHD2TyYtaBKGByVHMlsFh4S9nZEL9R7Xzcsw63aV4BGKSQdRwIMqCJA7t3bEPPwUPt+Z5T3/2bxOToww07tCRNWYfbugDMueZP+TEHABhNddlVQfSnTfSLRTRzmyiekfT5pTw1fHb6N/d2aEliWpIGtSTNONsxBgAN8Ruebr3qAI2BbEkQWSWiW0Wihbyg83+UKbG8Rh9P394AsdliIAJXgHoGbGES27hEMxcIc4FXn1Nx9MB77Xc+OZ2oFQQDAEUBFJKoI4ktENCZQIiX0RYooXO7ihPvdz9f+ODE17WAYAAgpQSRBKQAJ4F6WYKGMkKshB18DS82qhj+6GCHvbv7q80GCKwDCCEgpUAuu4zQ9hbUyTK6uzqmZX2QBe7m1gDAz+/QswydZ4vFIlmWRdcXr5Ghc+v7b+K0spIhQ+c/GTp/txa+FQBuc0Pnew2dz6fTabo0e5EMnc/X0p8BQGZlGa+9tOs+gNed2y89f2UOjU0hAEjXNAUnZst9wp0Uri4sLND0+XNk6PxKrfwDmbx44+HJTF7MGjr/9Vbu5gtNoWYAKNcK4JEydG4YOr9q6HzC0PmeJw7wVE/1pPQPF3N9eCSkYQEAAAAASUVORK5CYII=) 0 8, auto;}
75%,87.4% {cursor:url(data:image/png;base64,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) 0 8, auto;}
87.5%,99.9% {cursor:url(data:image/png;base64,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) 0 8, auto;}
}
div.testarea{
animation:rwdcur21959 0.53333333333333s linear infinite forwards;
}