Mathematics
Grade9
Easy
Question
An oblique cylinder has a radius of 0.5 units and a slant length of 0.75 units. Find the volume of the cylinder.
- 0.1789π cubic units
- 0.1800π cubic units
- 0.1875π cubic units
- 0.2π cubic units
Hint:
Use the volume formula
and substitute the given values to get the volume of cylinder .
The correct answer is: 0.1875π cubic units
Given , r = 0.5 unit and h = 0.75 unit
Use the volume formula V = πr2h
= π × 0.52 × 0.75
= 0.1875π Cubic units
Therefore, the Volume of given cylinder is 0.1875π Cubic units.
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+XrqXigFR5SReD2XS5LrroIts0jTDAj8L0FT48Ks+UgPRA0NONY5aQM9QYs1t44YXD+uuvb0Jj/DXjbRkEY1x09UpkUTOrSdykV+nWu/EuxMfdBVdmeX/nnXd22giusKgsemVCgDV6d9xxR7juuutsHJG8FrHQFuGPG4KS9NBlJe2M2wGff6j+WaJWRRJkdQbPkJ5BPcHAVCqISkQXju4NJ78ycGxrpjKmj8NAVFLFLdXsC0iQVc1aKowgs3eXnspOpWWNFfdn0iWjpaPKKCicyNKHEtsXQE94kdzREz/vj1BBeCAUGHNiwSob50eMHGGLdlme8vkX+WSIQHg+DCx5sHhZnsH6sewD4PPS8j3zE4PFyBJ0Pm252vlDEAO/taBne71/hqdWRRJkdQoxJaoYVsBMi4uFlQgKWj60Dui64UalspX+xRICW0bAwoNicSXI2D5Xi/iF7lpk+PdpkdkT/k0oZBX75ptvtvGgXYfvGm666SZraeDu4+wNCIdggYhfgpF3R3Aef/zxtmqe1hfdP2YC1157baNLLr3E1mvlM7rF+jviIL8yoWXCy2Y2s/wijYUg4528cMWOcLwjEwJKg9xF9o4WjjRnAnBKHoawEGUo4W7+s+dNzeIjXYTVu/q4geKWGXh9KyIJsjpCFaNKDwGpgJYOYyrjxo2zFhCVxCok4bJfFsoqpQgbIX6W0NMWmczeDb0qJUQlRWhc/ufLw4orrWjjeNyPCUgrkN/OlMdLnCLMMRiYp1XKcTrsfWQb0HzzzWdjT6zCZ1yMMSboo4/zZQ4IFxNGLDhFUBRCjOzJnmzPzv6ZPzObXf5spS9/V8JnVAg7kdBul+cLAtOoEE6oEsbAPj4WX9YqRKBG7107/nb3VkUSZHUEz5jG+AXDe2aWGcHFIDMVlrEXoK+7Ae/E5X6YUTyIl/gECbL48hGRT6PslE7sfJrzlk8IDzzwgHXvuKyEkzhwowKDOC4z23aivEJbuh1wZyzp9ddfty4kM4WMDzJ4fvgRh4fLLr/MdhgwBqXxQg9aRWqBeRBv+6N4av7jzwgFP7XgnOwduvJbgU7+vTHTe/eq+Hv7vGZDEmR1BM+gVGovzLCXkGLwl9YGM2GsMK9c3kA0MW9X2OGX+IVagkzP98/A3lOVPf45EQPhwvIQlhqwzgx/pFlhLO6sZVPGkzWPoBicNMGWnnXXXddmHskDFqkeddRR4cmnnix8tYNnTJk8JUz+crIJMIFnCDyNn0dp5/KsQxj0Mjo/wNLv/FYh9tMhPiA91hV+vRnE5lZDEmR1hJhBJQywQ1UrhpYI+/2oyKw/Aoy3lEIA0i8yC9IrbqFW1xJC2HR4RkFA8XgzoJUISDOCbJZZZrHr5ABuiltxKZxA15EZxmOPPTacdNJJJrSYdVx99dWtJcZ+Ug/yyIRXRnGrryuy7DClwpxrDKVZevwWKOMqUOVW5YefR26T23l9Qm0kQVZH8BXaCwX0CBFA5WQAnf2UrEKntSN7X0F6Cj1LqCXIJMSAwkDoaxHuCBTAViXO9ifdxK3lDqRb7yZg5mamiXdNtD2b7D9k3GueeeaxNVcsuMWPTxPwz+2QtqyrWuodJTQPkiCrI6hyoaqColdlR2VmjgFtWiKMFWEnIdaXyumfBSTIOE5G6CQYijCyA95NZrmTdgQawozjoVdZZRVbAkG6BcbTEG7MKrL2i5Xz8847rx1xw9INxruwZ2wshp4lvSelU2nxlNA8SIKszuArmq+AgIFttrfQstE2GoAf0JfKqecIVWNkvuWjtImURkj+qvwItKZoZbEsgq04AIHGMhI2Y0NMCrCEgpYb3VBNGgj+ufGzRKQFqnJTHAnNgyTI6gi+cqGXcBA4nO973/teuWVFfqTvC3wcQILMryPzAkotQIVBlZtIIBxjd5BvfQE2SLP3kO4xY2ecHEErjI3VCDG9oxA/A3OerlxYxX58uqQKXp/QHEiCbIChiuX1MQmxHqISst2H7SoHH3Kw3Raen87QLkSAD9sb6BlClSCTIOj0jMzo7RAsGmjX2JgH6eZkDm47Z3P73HPPHWaYYQZbQnLXXXdZt5IV+WzX8VAaIZ6Rp4V0IcjyNVfAL/gF5q84FDG2T2guJEE2wMgrXV5xpI9J8HZUPrViUFnsyYUX3CVZNdvXV+hZQq3BfoHz/+kefvaPz7LAuRvpQ3B5f4AxMca12DTO1XSnn366CS02ko8fPz7st99+1ipjDKzTO2RGhFbe6mp/T/S5ORdc2kNqbizZKPxZFIV/2XlKE4HNhSTI6gBWsQqoolEBJchooTDozQJYIa7kwMfTU+hZQtwiw12tIIQYkw2M1XGBBnakEcIPY1m0qCCEHeNs7HFkcoIlExx5c+KJJ9qaMs5P4xQKzq1HOAOE4ZeTv7Rjuy1NyJsiffHMI8dPt7Fi3rYTZR7xXrS+POGe72zIzK7FlsViakJzIAmyAYYqnvRxRfNuIi+gEB7sH2TZAQIAe1Arjt6CMIoTSJBp1lLuCJlHH33UWmqck/X8c8/bKnkvPAjLBvaRo0aGPffc0zays3gVIcx5XaQfIUdXGeHHQD7jYmzkZusSzzIBzYr+4rkSPhJkSpPthSwElNxNmClcRrbNiXZasT0r85X/8J/9EpoHSZANMKzSZCS9KpmnKne6jxyoxz5KtvfQLWMMKfYvkrm3IAxxCu2C7PdmNrcs2i8+/8I2pnMkDyvzEWKGzI3N4Cxa3W///cKyyy8bll5m6bDyKiuH8847z7Yk4Z/lE7Qs9X4ILN6HsOuut2445dRTrGVmK/ALQQ5JgPn3NDdaWPITubfrM7I//uV6o4SmQxJkAwxfySBf8VQRIfnVIDlnadHy4TwvrhzTwleF83pIcfYWPj4gQXbOufnyi/JZmUDhYpEL/nBBuO22v9hm7CeeeCLcfNPNdg4aN5rvsece4aqrr7Lz7K++5mrrXsbQLKbipTvK4D+bylmOgQDnNcgHe5/ilbK3K98TlQ3WphZ25idTq6mjm/lNEq2pkATZAMNXIEgVGHg7VUgqOeBcLbbl/O///q+1WgBdMt/tjMNCvYXiEMoxsnPbx8joBnKu/TXXXGOTDhtt/AsTXqxpo8uLHaeacgNTDAQS6UZAoVdaUTUGyPYlDjxkLRmLYnGXsNM7KQzvj17m2E8n4ie1+JnfQk1oDiRBNsBQhfJ6bwdUQanoqAgxhAbrq/bZd5/w+OOPl2F8Za6qyL2F4hFKQeaWXzCuxU4CjuFZZ+11MgG2sQkxiAtPdHkGQGBBWjum9Ilk9ukmfjbBc0Et42i05AjrBZ/CSJB7UjxSE1oPSZANAlQRBZm9PSoCALAYFCHBKnfGl6isar2glyBDVcX2cfUGhCG80C7I2pdfMBCPUOVmJMbrrr/+emuhIcCYjJDAEsVpkh7ILDupCD4OP+Q4HiYVgAS79wdVvbcooTWRBNkgwFcyVWKRr4SYAeuuWLbAZmmNjVFxBfz5igyk9hb+uUCCTOvIcGMA/tVXXrWbmjh5dfTo0Xbj9mWXXWbLMBDASpPeRfHWMqOXWaCbyoUcpAHgpji7il9+pU9oPSRBNgjwlQw1rsRUULW4EGIsWWDLDqvdOUBRLR5B4T36WomVHiEWZD5eWkjMLD708MOWtovGXWRrxdS1lKABSiNmPUPP8WaIcBCLZ2n5cT+kjvoBvsWn+CDCxHYJrYkkyAYYvpJBqpAiVUZm75gVpCKztkoD/AAB4sP7+ERAam9AGOIUYkEGOBLajn+OwEkUHDP9IReeZD8vWFB9Wr051kuQAW4NYs0ZxC1HjBfipvEyoPAKSzxAakLrIQmyAQaVy5Ov7BAVVP64+HWhhRayo26AKrj8+orrKzNmILU3UFxCpxZZ9pvcxtoud95Z9Bjs+bFdSGlWujzVSrPs1CpFiC+66KJh22Hblq09Zj4Vxscfx5XQmkiCbIBB5apFgErJQDeLXzm2mYMHuUgDYI878OGovLWERW+h+ITOLbKvwtRpU9qPoWaBarnKvnhepuTPzwVSLGikl1l6meUfYQW4Z5LLfYcNG2YtNFqr5AWIw4pkl9CaSIJsEBBXMlU+CSkG9FmLxdgYyw84a0xdqaoKKjtvH/vpKQjHc4SqrmXHW4IyCyP0WfrYGsQf5kKwtfvtSHITYnfyA+JOAu6kRLDTSuXkD6AuthCH924JrYUkyAYYvoKhSjgBLbfgQo1FFlnEDhRkwBvITVA8Cit4u9itJyBMlSCrda9lFqKgAl7r0lIFn85a/vTer732mm2Sp4t5ww03mB27HQQfvqtnJrQGkiAbYKjSQggEWhzSAy02XWONNewmINZn4e4H+CGPKvvYT09BuO4EmW+RlXLMtPnP/nBHg1PhNya5CVXuGjMkX7hshLVlhxxySHlCBmmNw3lKaE0kQTbAUOVCpRKqIqKyHYe1WZyWyqZwNlYzHsSgtyqmyKPKPvbTUxCuXgSZiPQwXsasKOlgOQZCjfPNaLF5f7E+oTWRBNkAQ5VLlU3jYoBLZLnSjUWmDPYD/MnPYFRMpUvovms5cIjzCpVdBRxjRLeblqtmNskj+YnfIaH1kATZAEMVTeQFGfsUGRt78sn8YlkqqV+O4dWBAvHXmyAD5AWtU8CWLe6w5GRZ5R8q/mNKaE0kQTbAqKpoqLTAOFBwm222MUGmFoZvaQCvHwgQd70IMkB6lCbN3DIZwuka5NUDDzxQuRRDlNCaSIKsD/CVxlciT95Nei8QWMG/9dZbh5dfftk2XqvSihRW4QcKcbrqRZBJj9BitpLxw/33398G/3W7uvIJKJzMwJur3BOaB0mQDRLiSsQlteuuu25hyrtKdKfUZQKDUel4Rr0Isvh9MaurTb7Qgp1lllnKS3rjtHvB5tFTu4TGRRJkgwBfaRj34cDEbbbdxk5GZVM47hCVFRIGo7LxjHoUZEoX+YFKq4z1ZOzB5D4AJgG8P1ArnVX5WGWX0LhIgmw6QYWISZBZFZIV/BdccEFYffXV7QgcAXf5s5XyBXxcAwU9VxhqQaZ3lh7ywp0tS2uttVb47W9/G1544QVLm0hhPRRHjCq7hMZFEmR9gK8cVCC1GuIKhd4vF+AyjgUWWCBcdeVVpZ8yLv4KtdQX7gMJ4iedwlALMuUfqvQigTPQuEaOhbIC+ev9ipT22D6huZAEWR/gK4OvHCJfARnjQWXQ+swzzwyzzTZbmDhxooXtUFm1Z5FfZi6FGfUwUwYKPEOVHdSbIBPpYwGYHEGQccEvHwr8y93yLIOPy8fn3ROaB0mQ9QGqHCJfYTxRuSCOouFaN+58/N3vflceTeP92v2MJr2yv7ZMV3QxJeAGCvbsLP1CPY2RefKCiI8CXfPddtvNdkS89dZbZV57gebDerMooXmQBFkf4CsCqq9kvtJoQSdba3bccUfbAM1maECFkz8LL0GWyQwEmQm0zG0ghRjQ84WhFGSCvXehWt4Ueer15B/3GnDcD7eWA7YvqQUcxxGbE5oLSZD1AXFFAXElk5mKdeutt9r1aZtttpldfQZiQSbV9FkrTG6tJsjK9y70yhNPwsEHH2wD/1yGolMzcFccotjOx5HQHEiCbDpApRB8BUFI0f2hRXbvvfeG4SOG29la6FlG4CuVJ8J7kv1AQs8VhrprWUU+T5QWVG6YYpxsiy22sCO3daOTPiRSfRw+3oTmQRJkfYCvDJCvIKowrA+jJTZy1EhbM8Y9leYva23FFcpTHp7WWlFh1eUcIOiZQj0JMp7rhZHsvMolKDvttFPYeeedw/jx4+1QRty8QBMpDlFC8yAJsj4grhCqKICWGHa0Dg488MAw33zz2ekNtM7o/kxraxcKPqy6k2b+KhNkoah4A9y31DOFehdk8ocdR/3Qdb/88sstzWz7YuAfqKspv3HYhOZCEmTTAV85RLQEqETsodxrr73C6qutbhUNfPnFl1YxvX8RLS+ruFlrrG1acWtRFn2rtcgEnzdKI+TtJKzYSM4i4xEjRtjlvtj7QX/Io8ouobGRBFk/QpWHvYAHHHCAbQofO3aszVTaeidaXUXXEgElECazydXMvo0WWeHeSoIMkB5IkF7plLuID8OkSZPC1VdfbfnNKRlPPPGE+UWg4Ufw+oTmQhJkfYAqkfSq6AgywCD0MsssY8dXP/Z4fga/3RCUBVFYhQdmdsIqNxXxF+pAwacf1KMgk1l6b6dWGUsw2IS/+OKL2/2gwAuyOFxCcyEJsj7AVwqIik7LADA2xn7KTTfd1LbQcJYWftRa81D43JCbTW7Jm9QBBM+sF0Hm88fnjdcDb6alCzjjf/To0XYsNouOWbsHSLv8x5TQPEiCrI+gIvgKjqBiaQUnWjBewwA/K/gRcKpstSqSmQuples6mgcSPLteBFkVOuVTZAbkMcRHhJX+rC0j//1yDA8fR0JzIAmyPoLKoK+9cMYZZ1glokWgY2ZArVaBYGYnuPSTeSDBsxtNkMVE+pRGupjnnHOOXehy6KGH2jIY4N+BMAnNhSTI+oC4EgnDhw8PM844o135D3DTuJn368MPNeJ3qDdBVgXSA/l8pNWl8bI77rgjLLHEEnZru1rDNtlS+AVSE5oDSZD1AVQCL5RYO8biVxZljtptlM2aqUuJIPMVz6MeKpN/F9Bogkwgv5XXTLawfYlZzD//+c+2LUz+pdZD3if0H5Ig6wN8hRAYZOZqt+eef85aBgg3Khf+RPVYgfQuQiMIMuWj8lLvAJHvCDQmWUaNGhV+9KMf2QGMQOXhwyY0B5Ig6yNUcag0zJBxVdl2221XnsSAPRUH+IqmSlQvlUlpExpNkCn9ylt1L5nF/PWvfx0WXHBB28aEPeWBHyA1oTmQBJmDKobXezuAXpUGMDN5zDHH2DnyE66dYLeHq2J58nF5GmqQBtInNJIgk97nL8IKYsbytttus5uX9t577/DYY/l6PqAw0pfExAp/mb4EWmdMqE8kQdZDiNkBlUCtLe6nZBHmKaecYvspGRfzA8v4FcnO01CDNKhSg0YQZEKch9KT/6SZRchsD2O/q7aJ4aaWmQ+b0NhIgszBM7f03g54M+vGLrroorDSSiuFSy+91OxA3IWBJMy8nfwMJZQ2odG6lqTNmwHCCmDmfVZaeaVw2GGHdTiZt70s7L9p4nhAbE6oTyRB5uCZFkZHIKG2M31714WvPcfGrL/++uHcc8+1C2S7+tLXsh9qkCa9H2i0rqUvJ6D3gRj45+aqCRMm2GQMrWbKraN/4sCcEfEW+2H5mXthTqhvJEHmEFcQSBUDVRWAlthVV11lB/ox/qJTX314IHNsV08gParUoJHHyGSWnU/3SSedFDbddJMwbtyF5eGWCteWqZw4kv3PXjaLg439bNonSqKor9dPqEASZA6qBJ5kD9Ory8KAPmuUWHT5ySefmJ1aY8CHFbyd9LGfoQBp8BW+0cfISKsElC8zwKzyCius0KHMrNwyPWfA2TlwCLEivPU4U4usIZAEWQFfCQCqF06qFHRXWHC57bbb2jn8dqpFBvyJGgl6b6ERBZnewZPKwaedY7FZ7c8MprqYlKn8IrA4D07hPSXUN5Igc4iZV5UAVULtkUcesS4lxys/88wzVhF8ZWk0+PcEjda1BDLXIpUdh12yVGbttde2M/5lL5X3tPPfinBQQmMgCTIHz8CQKjCLW9VFuf/++8Lss88eNt98czODJMgGFyofwZu9SrpREVQClyR/85vfDDfffHNh0348Of504CVmxZVQ/0iCzEHM68lXAra9HHbYoWHDDTcMF144ziqKqFHBO/r0N4IgU56TdpnVqpKd3surEKv8f/nLX9ox5I8//rj5BepiJkHWmEiCrAJiYFQYnIWuTz/9tHVL1ltvvQ6LK1WphEZjftLr099oggxCiFlrytmJ5N/8FO/B8ACnyXI5DONl7AKg1Y3/qjighPpGSwgyMWIt5qyyR4W5AWvEWGaBELv44ovLG8R9K8BTI4H0UnmFRutaKv2o1cKs3U9bcYMVet7zpz/9qd03ymklQBv9uS9B4Wmhxa00SOaE+kDLt8hqMSP22oD85JNPGtMvtdRS4b777jM7Zr3yytFZmDUSSC/vITSCIIuhfCedUEdzu/6rtqyFPTkf6+TCkuWWWy6sssoq4d6iTLnlqryKr/hlMdiPODxkju0ThgYt3SLryt66IhnRGjvrrLPCjjvuGI499li7IQmoKyJBBhS2kUB6vaBqtBaZILPcRBJsJtQo06n5mCfdSU7y3X777cOY340JTz71pH24prEwNhNmtgyDllnxAz5emaVKnzA0aHpBBoOpIkov5hZk591Y/Q0mjJ8QVlxxxbDrrrvauVZ0PzSDiT8fTyNCeSI0YtfS62N06CYWZYtKObIjg1NLll1u2XDBHy4w/wizqVM7HoapeBUWktm7JQwdWkaQeSaUuZYdoMXFV/vEk04MCy20UDjg1weUK8I1dkaYRofyQGi0rqUvM6kecvfEh4iWNKCVTflyoiyCDXu6o54fIJlRRXJLGHq0pCATA+ZM25kx5feaa64J2++wvV22+9fb/2pbkxRGfgSFazTE79GIY2RAea9y6I4oR1pf3FLOtX1sX/rDH/5gl5XI3cfny1wkNyhhaNGyY2QwYiyUIACD33777WHYsGE2q/Xggw/aV1zLLYCPK6ZGAunVO4FGFWS1EJcNJHvNUrKebJ999rH1ZZzxzym/njcgr5fZ2yUMLVpCkAHPbDETivQV/vTTT22dETOVfLElxHCPhV8cB9RIIL28h9BsggyonASVE/Z8tChT1paxf5Yz/h966CHzxxACfhReYXx8UhOGFi0jyGoxoyfsAGMlyy+/vN0W/sYbb5idGN77lX8g+0aDf2/QCi0y3gcVaNP/22+/bZeVLLLIImHixIlmp5lp+ZXem6V6+4TBR8sJMlSRmE9mwMW6XFrBFpZrr73WLrFQSwwSYsaNzY0Cvb/QTILMv5v0ngAq5frxxx+HW265xVb7jxwx0tYLKkytcpU9qihhaNASgkzMCImJpfd2gK1IM8wwQzj66KPNDLSpWP49MMvO6xsFpFfvDppZkOljhJ0vS1rbwtixY8O3vv2t8Pvf/97MGlKQX1TpE+oHTS/IYDoxrRjYmz0YGxs3blxYdtllrSIjwADM7OMR0Iu8uZFAen0+tKIgUxcSgcbJvyuvsrKd8U/rHMivp4T6Qku0yMR4XpVeTM3+SS4SYdsKM1f+Wjf8er03Cz7ORoLeRWhGQebLS+TtpEfIUe4c8bPWWmvZEAMLo72/OE7ZiRKGBi0jyERiShF2DPhyThUHJlKBtapfYWI96M7cKCDN5IPQjIP9Uj15O+n1nrTAr7jiCuOHI444wlrqQH7ENzL7OBKGBi3TtZTedy3QC5z4uswyPypnseQHeAZF30wM6/MHNJsgq4W4DJUPeleE2TbbbGPLMcQncvd+0cdxJQw+WnaMDIJZP/roo3D//feHUaNG2oyVID9AzFpFQmxuFJBmvSdolRaZJ7mLJ2THYQGbbbaZ3Vj+3nvvlR9B+ZVelDB0aKmupRgPhoRhAadZ8OUdOXJEeOWVl0tGrkVCd+ZGAWkmX4RW71pKZQKAwf4xY8bY3aXczwDgHd9CUxyihKFByw32w3wIKzHho48+mnUpl7GDE4WYQZsZyhOhVbqWVVBZq/zBlVdeGRZYYIFwxx13lPb6CCrv5FdqwuCj5Qb7vRDjVp1DDz3U9thdffXVhe+OjAy8vtnAu/G+QqsLMuWH3vnhhx8Ow4cPD3vssYedJCs/apXJnDC0aLmuJYKMAX3upjzxxBPDeuuvF/70pz/ZzJQYWH4VDmpW6F2F1CJrzxNUluWw35Z9txz188STT9istvZhyr/CJgwNGlaQeabzVGUnexY8on/zzTeNKdlPyYAupx1gD2OKgaWKmhV6V6GVBRnwZa5yp/U1YcIEOxZ75KiR4bXXXjM3LaQFcZiEwUXTCbKuSEsrOOmVDeELLrhgeO6558yOL6/3K0EGpDYj9K5CEmQFD3DWf0YIK2GllVYyYcY2NsDOD+VNGS4iwZtjt4TpR9N1LWsxiGabaI2df/75ds4Y+ymZtSQMbmIwkeD1zQbeLQmyAlkx+/JHkPHu6OlO6ox/Fk8zvqruJe4W3KkiwZtjt4TpR9O0yGKGEsmsfZN0EdhLydlTnHgANAtlcfAlNo42q6YHeeMFVRojy96XK+C4OcluT5oWprZNtctIcGd2m5Y846oAftHAP1AcAmZvF7sn9A8aVpB5wQUjaTYSYI9efmBM/GC+5JJLTJAxE6Wupp9OF3UQZE3Me8oroVUFGR8vf3/l1K8y4RWmmjCbOi0XZIAtS4sttlg499xz81MzMt6QIIvzEpT8VMDrE/oPTdEig3likrv/WiLENt54YzvWmPVjOizR/OuXheP+w4x/s8gLRsy+us0K5Z/Q0i0ylT95oh8fwa/yDyVdSbqURx55ZNhggw3CeeedZ3dhAh31FJPgzbFbwvSjaQSZVASTGEX23H7EJmDGNzgwkWvyAcwp/9adgKi0mexTHBACrVlh7+4EVepatrf2jYoffKKB/1deecVmvbmwhHxi3BVegpSfCo9eVMZZUEL/oakEGfAMoy4jR1evscYaNuPEpSLACzHFgSCzeLJ6K72Zm5jn9O5CEmT5+4rEAyLxFBeWsLZshRVWsMtpAEMVcTh4DKqKK6H/0DSD/TJ7RoKBWFbB6uxVV13VVvCzOhtgjz+gMEBxKQ6EWOpato4g8+XvyXghg06TffXVV23mG75iVwgLqrUcQ34Vj+KUXUL/o+EFGYgZDkKIATb7jhgxwrqUN954Y3nVF4Q/HxaSfUzNCt6N9xaSIKsm8kAqPMIBjOy/5M5Trg3kMEag7iWQf4WVXUL/o+nGyKTqy8kRLHPMMYfNNnGRCO5a4S//IsyQpto9NSv03kISZO1kvJAJLVRvr4F9hNlvf/vbMOuss4YTTjjB4lD3EigOkY8DSug/NJUgg3yLikHYo446ysbHuEVaJ33aQkY3BhYzGrNUpZlfpgK5i2I7ocrd62MSarn1xK4re6iWG+9JngkSZCwvEPDnVeDj8PZC7O5JiO2q3Dy68+vdhditigRvp3wxKj5s4hO1uhie4Fj0tdZeK+y6667lsAWQ3zhOIHNC/6GpupZiFoiV2OyjXG+99YzZuJ+SqfJpxRdWgkz+IRsPwy4TZF8VZpCxXSXjxXaYvV1VmCrE4Tyq7HvjtzsQxgsyWrBVLTLFjdrdc3riHvuROXaTObaT6u2FWvZdwcIUY6HojSfasvdmgbTMjqZOnWKC7J133gkTrp0QNt98czvjX9cHyp/SUkUJ/YemEGToYRpfIS+++GJjrtNOOy189tlnZmdMWTCXmEwMZ2Zzz+wQZJmgk2Czn3ueENuZX2dXFaYKcTiPKvve+O0OhGl0QebdQJVdd1DZmz4LK36AB2wWu8gDUVvbVFvxD+hO0uJnjeJxxx1X3vkQh4kpof/Q0IJMBMNAvkIyQ7n22muXDEN30twzo/z7OIwQYrhlQszI+QOx/9hOqOVei4TYnmdX2Xs7pVHplOrdURXGuyuczzd1Lc8555zCJg8H4rhFteyrCL+Cno89kArk38PbeZX0y032wNt1Rbnn9vSgl2ArqfCXh+Ed8nehVQbobnJT+cILL1xuffPxo1rchV72Cf2DhhVkYgpUvyYMgcWJFjvssIMxFoth5c+6k/xqMJFnMPwTZ9VYmkj2MXm3WF9Fco/9+Arq7b0ZPyKZ5ebNCuPdfRhBguzss88ubPK8IHwct8g/I05rTN4vem/2aq04vVmqyt+7C1XhYjL7rJwZCyMeCS6j4gcw52pBmT/4DXsG/mmN/exnPwt33XVXubfXP0OU0P9oihZZ2drKwAA/CxWZFufMdbnFTOTDV7lJhWDEuKKIYn/yAxTOu0vv7WI/3l+sxy8kyK0KClsLcsOfMHHixDDnnHOWLTL8+Od5+LR1Bdzx60nh5MYzvLvyxNv5MMoHH15m2XkVEmQvKLz8+TDVLbJ2wi+CFD5799137YZyjvt56KGHzH8cN5TQ/2gKQQYjiTERXrPMMkvYc889zQxgJDGnUMVQis/rIcIqfFU8cvf+RFVugneP/XszqiA7wbvF8HFVAfs4PhYPzzXXXJWzljG6eragZ3i/6JWumLx77Ed2IHZHr3L29j6c7BW+yo+3g6wx1p70Et4P/CdwU/0MM8xgHwSAuwQZ8csOSug/NPxgP0wisNqaY1bYA3fTTTcVtrlfz8SgipGwk72YDsR6HxazZ9RahB+1DuXfh/HvIWCHWy1QgYiDLVhMbrDod/fdd7fZM7o3ip91c2xw5tx5iHPY2FajdHAl3mWXXWZuDFj/93//t8UnED+Cbc+99rT4jznmmHDPPfcUrvlgN2e84QZxD4JuHSL+WiBtXbnH+UT+QegVNo7Du8keM3EpPhCHUV57d+8nhtwhH+8jjzxi5bDjjjuWW5dAb+JO6D0avkUGEzFLxKmdo0ePtgH+++67r4MfT4LXC95Pd34B9jCoKoIqmiqb3GsBd8IJb7/9dhg/frwtF3n++efLCoLKO40dO9YIocOBkDwHsLSE9XLcBrX44ovbntJLL73U3ACChhM/fvjDHxr9/Oc/D9dff30Znjsbjz322LDEEkuEueeaO3z7298Ol19+ubkBWrlUzqWXXroMf9VVVxWuwWaF99tvvzJ+ygBBp3dnNwUtlIsuushm99jAz8Zr3g0ifbfccou58X7XXnutvRPv3V3+4Q7hF0K4q4Wu+L1eiN1FshPVgvfjwwLyc5NNNrGPKoIN/lRZekroPzS0IFNFZGxi//33t4rGYLUgBhMTga6YKHbzZlRVFsgzrw/jgT1+qFgIKTYac/IGKpVbaaPF9OKLL4aTTz7ZbrbmLoELL7zQ3AEDxwcddFCYeeaZrdu85JJLmiAiLNB6JoQfEx0c5U0rSyCet956yy5coaWEEGESROGJnzwkDX/84x/DbLPN1mH5BelDmBE/4TnKRpMogHh4P+KHXnrpJRNuKh/SgyCcZ555wuyzz27vxwGXAmndaqut7Lm8I2v/2PIjgcT7IdjIO+ipp54K//jHP8wN6i7/pZLOmOQuUjjB23vIzodHL/ChWWeddezO1EmTJpld/LyE/kPDCjKgTbowORt4ObmTygh8q0hMJr2oO8T+YUR98dHLHlDZmLmCqGSkTRWZinrKKaeYAFpkkUXCUkstFa655hpzA0xQsDJ8iy22sK0uuFFZVTF41r333mvdQ7XI6EbrneQvhk93FXz6hYcefijMPffcPRrsx63Ws4HcWI5AV5cWGQKaFhnpFxCUN918U4cW2Wuvv1bmH/nDsTksbYBWX331cjAdUB60epT/EqJ6P9KhspOKncj7E2RXC3KL4/B5xaQTrVeEPPbiSdBV3Am9R10JMl+4YgyRB8wAY0B87U899VQ78ZWz1NUSwU0MBuJ4zMwvtsPMX6ZquQbxwPwxPFMyW8UCXMaYfvWrX9nC0s//ma8xonJxQsJuu+1m6WQcSd1fwGpwFu5y8CNMD8PzPEtD8Q6Y6YJR6RGSvJ93BzJ7O5ll5/0IXn/nnXfarKUf7PfPEvm4YlV6IDveibRXpb/KncWmyvNJ708KYy8Ya8IeYkaachf4kDGswPHlXCrDGKHy16clBvY+fcrzWuTh7fUO3h8qZc4SIK4dZOiDdyvTgzeUIox+eeDcXnpZJ9RGw7TIVOCASqCFiLRUGBOiGe+3hwAfhkWM+ULGHGbvGIRwVCCRVbTsp312gJYFg+C0rpjdkz3PY/Mw6eB8KgQarYovPs+P0oaBCUt3g6vEqHi02pQ+nse4inYgeKiSxCCc3LyedFMhvb1UuXl3SGbwl7/8pdNeS8IprPT493HE7rKvBdwUh57t4d0RMu9/8L7lHUQLDaGucLTu9t1337Dmmmva0gcG2vmQAOIhX7kxnDI6/vjjreVHV1vuHjwLUtxKg4fCoHrCn/TkAWlk9pxxSz4Q2Ct+hU/oH9StIBNDCDJDYi5aOozlMK5ES0cM4iuSmFCCzBY+FpWtuy+dwlMR6OrR3Vp33XXDiiuuaNPsAn5wZ6b0hhtuMKalsikd9qwKEE7pFPDrBYvSgJ0n/MkP8PEojI9Xdt4eFSI+gYMnqwRZHM7H1RXJP8+gfPw7KA69s/fj3WoBd8BHga4mEwYc1XT33Xdby1bPZ9Z11G6jwgILLGBdUwbiGWvTYmfGsGgx8YHxwC1OI6p/L0/yC8kPNy8xpHD66aeXY2XyI8iv8WNGWWy5OQN6b06oRt12LWEYMY23hwFgKIQLTXe6Ewz0M9VNK01M4onwbW1ZZSpvw8njMhYpDAhFBrQRQFSCz/75WZg8JT8KCAZn1TYtLZ41ZswYawkqLAsma0HpJ820vKioqJjL8IV7bBeTR2znzdJXmb09QO+FRdUxPnE5oCpfY31Xdh5duQlyIy6ff1CtMB4KD69cfMnFdpQT5+3zQXrjzTfClKn5h++BB+4PBx98kLXWGGOldcyYm38HD8y4AVSfPz4MeiZfWK4C7zCRokmeqVOyj0fhr+rYKAh4fUJt1KUgQ5Ugo9DFHFLpprE8gPVijJlozRTM7plKZOEyvrMtKF/l8cLEfJEFuoKMbUHMEN6fMfcXk/PuK4LstFNPMwFG10ZpgvhY8gzipKJJSJlbL0E83UHvJFSZPWKzIHtUn9Zam8YF/IsAbionoPjkB73Mcq8F7xbrq8J7O/JcQg5SerxKOpVWC9OWC8THH3vcJhOYbGEtHR8tWtgAd/wTJ2UrxPEqTqkWf/FhorVHvFtuuaVNZrz7zrt2skZb4Q5fwov8spDZQ/N4cWPDOuaErlF3gqwWATESY03MCK288srhuuuuM4apao0pLHqB5j1dD7oiig93ugDzzz+/zXyyPGD8NeONQQFjXCw3iI8zVtzGhKiO5B4TqLKHYjdvjhHbe7P0Ve5V9npP0JMWGZC+6n19PnjyfqoI1NIDr4+h+KueBVB5D5HcJKBYfoKQYdiA4QN4RKB1xtghd1lqoS8gnvi53oyqAX74jdlWxvE0EcEYGjD/xYkr6GnhE0ZuUELXqCtBpsKHxCQCdjAd9hxg94tf/MJmCLV6GmbTlxgSwwIEHYxK15ElAJtttpl1M3TQIu4MGHN0McRiTroXSgskECf+lTY9z/tpJJBuvQuoEmTe3cPnDaryvCpP/HN8uMGAnq30qaUkO4GWPkLmgQceKLuAgKEGZkNZ58aMM+sA4TcEoA8PCAPpHRFkgFY9LT7WyLHUhGEOP4tpx0shwGipZXEqPJTQPepWkEkviPm4j3KnnXaypjqtMQQObhQ+YQT8iskYDGYK/Cc/+YnNbrKFhgoLM+pZVcBe6eAZvgKgAlS/qbjRoPcReirI7L0dkddxBYQEn5fefqBR63k+LeKfGPLD+ClLY+AhFu5uvfXWtmBXH04f1j8PVe9NHEyksNp/2HbDwo033Wj27R/fwm8myFABquJK6Bp137WkMGEUdQNvvfXWMNNMM9mXkS8okFsMMQKDvSzEZEyNKXi+sAAGlh+eAVOJMOPmmUl6pcub5afRoHcReiPIpPq8ENB7N8Uh+8FC/DyZRT7tqPCEyl92Hggw9qoyLotfwE4GluT4Rc6A8ID4hEMOOSR8//vft3WDIOY1pQV4fULXqCtBBlRwYiIKWQzD2h9WvnPmE8dYs24M0LJi7IK1QuxT1F5FxQHF8G48Q4xrboWd3L2/OH2oMTUSSC/vIUiQafkF7npvkfJDbj4f0FflHW6Kbyig9JXPz5Q4XTL7dIs6hC2gfKGryUeSwzyZSaenQNdUgH/xxzguQxsMi7CoFx4V2p/B89rTCiV0j7oXZCJaX2xs5h5BBBVNdVpi+GMgnsF6VqQzjgH5dVCEjyEm0XM6VsiOzCt3MaQgt9JfMVjbSNA7CJq1vOCCCwqb6YPyxtOgonicPdsNAahM43KW3tt58sAMT0B8ZA8//HDjPdaN+YtIBJ7HuBj7TPkYs9ODySfCW9wkTc8mrfwyvd4hoTYGXJBZQRQQc1TZSS/E/mASCv+SSy8pB+n1RUSgsVmZkyNolbGXT1tYFI8JGZhDX7uCSTzBTFqiIaFkv8IN8nqZY2okkF7eQ5AgYwaPbg952xdSd0rxK1+GIn94ZkwqX9JmfJTxBQKjdC/sxWOKR3Z6J/QCE0Z8ZNnQr2EPxeM/gvQg6IayHIPlQ2z4B2020A9ftfOfqSQsA2bF4fUJddgiE2AASGBKnKlrzQIBK+iCoWKooM2NP/QwKx++TC0FVUZ6lvTldXBtuX8LU/qDyRB2LK7NmLNY+6O4+DUS9F4Cs3a0bBdaaKGw0UYbGTE7LH0VsVJeflA32GADmxlmcFvwgg0aNBRlb8VSUIcPGu+P8CgERl72CK+cJ0RegHk76auAO/EzC8r+T8bX5Pdvb/0tbLLpJnaIJbPpoG1KFifx2lKMPM2kSbwqxHpvblUMiiDzmS29twO13PmyMebAiuyjjzk6nDzm5DDm5DG27AKhhh8Ypivgx9RCkEGeOUpmxIgbP8yFXzG9/OW/doYv489U6RsFei+BSocg47gdWsCcLbbWWmuZWouYCfZmPjionFHGliGWvkgQKI8GLZ+Kx3R4Lq+bsUyZBqwQXJCVKx5yN/xgltASjA8yknsZl4P48v7777c7JNgDyrIfuu0PPvRgOPOsM8OGG24Yxp4/1rqmxmfZz3oF5FVh5tcdqp7fShhwQaZCVoF7BohJ9mJ6wGkWtMY4z+qs358VVl1tVVtYyOJEllUAvvY+nDFBZhakz55iqiHTej+GyCgQrpPfAliX8WdqLX/1CtJLvgs6/YIlKgxis5CTjwZqTwi/bKhnLR6tMwa2iROonMCg5VPxGJVN+dxM6ZAGtGZ2dg7dpVdxe/4TMRTCAlsEO4utWU9GnrARnt0iP1rmR+HuifkCXM/DVh9ceogrrjuC17cihkyQAdmpEORWFmJmz1aR5Zdb3g7lO/CgA8P5551vG7affPLJspvp40CNyex7wKD4MX+FVWmOgVVk7Z/VSCDN5J+gMTJm16YHjJMhyKikjBkBBJl/1mAhLhdfrp3KrdB2si9Qy74WaF0BxsiYAGAZEKf3qjvJ+jQ2s7Plzvg4a4WVa8rU2ueveK7Z468wi1odgzLYX4tUKJ4QYgID9hyDwpds1+G7WiuMygDhjzgEr++Ewsn8oEcp0iD7Dm78nNnsCj9G+jk98PpGAe9AvgtafqGDFamACCXUnhB+iZPW8lZbbhXW/Mmatr0HDGWLzNSIfBrQl7/Y3pEQ23sSzJz9EEj6OIt/0ZNXHIVNd5OjyOmCYk84qVnwQri1Cy/03ixqZQzqGJmnuDDQUxHQA7Z0sPCQgWO6KczssOQC+LBSgdSEnkN5KMTryFQuyvPuSGXIzBwr4BFkOhvMC7JWgeUvY29Z3iDMbCA/+6Enr+hVcHQ4ezw5IYMN5j6/VT7SV5lFrYxBaZFJrSoQ6WMhxikUnDNGt8TPVMIAapEpPh9PQu9AnpF/Qk9X9teC/LL4E0H24x//uLJF1kpQHkOcugKvs9dSecXiWT7Y3/zmN8Nhhx1mdkA8Lt4WyQ7IrtUxJIIsLhzMAidbHHjggXY3IKd98mUHCDMv7KrikVtCz0Ge+fxPgqx/kXFlxzzOXh+9tc4ywo3JAJaq6IYqnR6slpnyzKu1qFUxJGNkKkj0+uoAFhQyHsa9ilzSwaC+ClXwccSF7P0l9AzKSyEJsv6F+NKI5RRtuRrzL2CR7M4772y3adErUd1Qnnq/ilOIza2GQR0jEygYCokvDipjX4yDsc1o/fXXN0HG9g0BP4A4PAN4vcwJHaG88Xoz81folb8gHiMDymOgMPx8HILiSoKsAK9rWZX9y9jTFlkrCwrV5y87WGadddYO56FRT4Q4vxNyDGqLTFDBibE5dZWVzywYZLaMdTZc7ybEwkpxySw71IQaiHjfKhZqlm9ekHV1QqzyvQpyk98kyApkr2stsK+QYoXe8axI4EYwupiX//ny8M/P82EVykf5Gofz4aW2IoZEkPmMp5BgetaLccQOg56ccc7RKCpAqSIf3hcs+oQaiHg8y7FcLcpASIKsn8HrIsN470wlf7Q+DBL/olIO7ILgasE11ljDzvjXKbLkHfD+RRa3c2tFDErXUiCTfUZrMJNZG44/4bBEWmZc2ABUMCowX1CKy8fn9Qk5fB6hVi2y9IKMm4hMkJ3XUZD5OMojmSMCissLMs6QA1RG4gLy3/TgNfWqCDLyrrAgD3x+KO/YzXLc6OPsYh2Oq2ICDH+4qyxEmFsuTyswaGNkQJmuQhBYI8ZJAAzwc6UaiMcFPOLwCdWgwtgapowA6tRiQ7xaB+SjjVUWK9DZMTHvvPOG08883cyATdWc0WZ64mM/IhWSweuoq6RyqyXIVG6tVn6URYlM698fvfJPwuzV114Niy66qB2NzckugJl7+fOEHUDfqhjUrqUYXi0x7huk4nAX5Pbbb2+nKLC6GWjtmMJ6xOaEamQ51y7IrPLkeqsMhQCi4uhatCmTp9gFxJxgetEf83s7rcymIvWKMiR8JsisDCgGi7dj2QK6RKlr2XMoX5R/nGLMWDF1ghu+aKWRf2qViQinsK2ct4MiyKSS8RSECouTEdj9D7OzSZm7IpnBxB1/KqSYhCpzQkdkOZT/LG9yUr55wcOHg1NGaBWzho89gRqXaZvallNWJvnJDPl2JKtUdoZW4ZaRhBXHi1MRGeuhu4odwg13XxETdSbylvxj0z7DLeSj9quW+Z75k5qXbXsLuxUx6GNkKijA1fXf+973wv/8z//YfjMdD6wBTkCYVi2cfoHkF4rLS1pWtMQwUyFYw8T1el/72teMOIqHlpT8T56SH5ZI2U3NVPSezD4j9g8SH4s8GS7gwhcEGeVOd1P7Nn2YRO1E3vFRIX/IM9ZVMot59tlnWzko3yS0YmpVDFqLTMBMYQHWKnGqBS0ydv/D/BQQhaVwrV5A/QXlI2Qfk6xVhSDjFqrLLrvMBM43vvmN8I1vfMME2b/927/ZeWR+PVNvgMBiOQ0nYGi4IKH3YMsSZUP9APpQAMpRJHOr1pVBFWSqRCoIupNciMvXhvEyfYlU4RKmH8pLT+QxRDlwaimtr3/5l38x4cV+PwQZAu1f//Vf7SJkxs2YhLnhxhtsPJMhAakizCLi5Nhx9spyRM1vfvMbC0/3KA6XqDORT+QhHxFmLvnYc/s96y0pNy/ARJSr1FbEkAoyTreA2Tmehz2V2MsNv3HYmLx9QjU0s+jzjcqg7gnjYsstt5wJL8bGEGBf//rXTYgh1Gacccaw1FJLhdVWW80ufoHQr7ZqRqgFyQ1aY/U1wiqrrGLDBv/1X/8VFltsMTsME7syfKJKsjxcJc8jWmJzzz13+I//+A/bd8wHhRYZZUj5Wfm6coVaFYM+RgbpK8Lgvp01tuuu1r1hoB93hJn8dkU+zoQKZNkiQWZG5V1mZtCeriV7+s4686yw+OKLmzBDiKFCVCRaApQPs8rQDtvvkNMOO5R2nWi7zF/mvt/++9m6wBEjRpg94Tr5TdSJdtxhx7DpJpuG7373u3Z3AlfN0cXko6MeS6060qoYlBZZnNGoWl5B4Sy99NJh2LBhVqkAXx3Bh4sR29fy17IgOxg+YfVFljfW9UCoZX+ci/XllPzOgy8+/yKcd955Yb755iuFGF1CbgSiwlAefSENYFP5qtwTVRP5xQEK7DumXjB7STmoFW3lWJSn9KJWxYALMp/RynhIgow1MtwD6K/FoiCBLxjF4Sm2T+iMWnmlW4LURWFGkSUXrCGDEGIqo8y3qQkDD5UVY8Zc+sKdB48++qjZSZDhR6ohU0zfwsU0qC0yCTHIt8i4kGHkyJG2CBCo2Vyr+aw4pEcFUhN6BuWfwNolBpghLYGhDET4tXVkGWn92LTCvhb5sP1FijMmKjqq96t3lD1mb9cdKZ6+ko8HlY80pLR6N0gfljfffNPGFdl7zKUugDKx9PNDLcY+rdWdQa3tVsSgjJGJeTxRYBAFxiZZrptnHECtMprY3r+AnoKXvfRyS+g9lJcxfN4KmU/7lRiCLFd6q6i3UDjeFfJ2fYkvho+H+CW4lLd6JlBPhDrBh52xMS6bpnWm+mLx8SNOgooyJEE2wPCF6fX6+tCtOf300+0uxIMPPji88sorZk/BVoVDFTOIIWSfEIEsKbKlzEP7yy1lV5V33q0rsvi8uUZY2U8v4ng9ISgAPMVlw9xSxCU2bIVjATYnrJx55pl26YdaOOIjCRnZoU4vfFxqdel5spcfwIEJHPPOXaEMuygN/sPOYmYTWrxqIcjMLQmygYMyPya5qQA5Cfb888+3LS0HHHCArZkBKmwVPMDsmUJxQgkRyJIiW8o8sr/OeSZzV/aKr7QzQ+QnChPbTy/ieCHxgVo1zIAfe+yxYaaZZgrDhm1n438s0OXiYZabYPaX2YiXUOO4ob6CsEqbeNbHKwIvv/SyCTHqAEdf4xfwwVccqNLrtNkyjunP2obFoAgyQRleFoTTAxiLM5hYoEmBasuSGADCv1TFIUpoLfhyhx8gtfKxHz9hvC0rYfKCtYoch8NC07vuusu6b/IrnqrFV1Bf4cP7uJVWngngdSa8aIndcccdHcLgR2Gkl5sIpBbZIEMFAVRAKgwWxnJWP1PPu+++u+36BzSt9WWCCKewis/Hm9C8UNmr/D0/SDCwN/Shhx+yE1ePPfaYsNVWW9nFuPgV5D/mJ28WTS98XMSvpRaALi5jYhv+YkNb2a80xmmR2dtXtYZbEYPatRSqzBSMmJDZM1pmfJ1YUMl+QAE/MIC+TDElND98RYakR1Ur64MPPzAeonv53HPP2tgYZ3uxOl7Q7KHi8/H4uKG+QvFA4l0fHzeOw+Psa2VgX26WBrqNGSkNPq4qO6hVMWRjZBSCgJlCFgFaZlzbz1qa448/Plw47sLw1NNPmZsgYQZ83B6lHX+RH68HVW4xCd2ZEwYOXVVstXLoOnKBDWsUX3zxxfDWW2/ZrfW09NkHKnhhJn6qildmITf3jA8Ut4D54Ucetp7Hsccda5NcdH21JImlLZB4Nk6DaJqWwmRuFo5JgBbtWw5K1zIugLwQ2gsHVUyEqkKnyU1hc9ffoostGg497FBbHMgslBjWh4VilPYFU3h/Xg+q3GISujMnDByU157ESxIGCC7GWRdeeOHwxBNPmB18I2HG5nWtldNYVcxLVSTk5q7L3ccHPv744/D888/bvQh77b2X7TNm2REtR3ohAMFq71K0xBS/yNvlgiwXwiAJskFCXCAxeTcJMwTWaaedZvf9jRo1yk4dReWsLF3eq+6E4pDqERewd9dze4LYrzfHbgmDA+U75Gctr7zySutSaqE14JIbBtVZMc8ZbCzTAF6QeV4UCbFZMHs3gyg/4uNJkyZZD4NnM3uKkN1rr73sQ600lEKsiAu9CaciPjMbZXp2ZnBsuVHB99kv82lxtRoGtUUmSK/Ckbv0AD1MgJCioDmrjK8o51uxmXn48OHhqquuKicDFF6kOEWUbwdzEUZ64N1rkdCdOWHgUJX3QGUP4B1aQNxKJOGGit+nn37aFptuuumm4YorrygFCbymuKt4CBLa7RAohd9MwEgQKjxAkHL2Hs/k7D0msVjjxpIjPtQaN5N/xYXq42onWl+ZmwkuKLPgD4cWxZC0yGK94AsMhhAJCDPGOyZOnGgnKtAsZ+3ZY489Fl5/4/XCVzsU3uLlK6ZtNcVzYgbBDAFv9hT7ldlTwuCju3zH3fMDwowTOjbYcAO7Q1LdTJVrXL6dzagZj2XduyltkzM15xsPeJWZ09NOPy2su+661jp88MEH7XAEdYGBjxfqHoUfFFGLY1AFmeALyxegJzEOxJdS3UeAO2Nlo0ePtjOu2Kt5yqmnWOvsk08+KS9qEMr4nCCD0PtnSY/aIVxhV8uMKv/SJwwOfJ7H+S+zd1f5A8bOho8YHtZbfz0bp/JDFL6MPclN7iBzMZW4aQUy3kVriy13Cy28UFh7nbXtg8sEhAf+xYMe/nnVVPhxv/yvYzythLoSZN4svZgGoPIlk5CCMRg/Y6yBMQdunGHsgwtNdK2coHhFijcmMbr8eSic3DzJXfqEwUFX+Y9e5SUzoIzFQxyRA+8wAYCw8X58uFrkwZgb/AcfQkws7LH7HhavJqcQluriCnE8Pv5qKvy4X/7XMZ5WwpAIsq5AAQm+8LyAQfUtNAATse6MXQEs2WAc4owzzrAvrW/GCz5er9dzfAUQMHs3VEFxJNQfqsoRknChC7j33nvbOjP2Y0rIwQsAv1X8AP721t9saRC9Ayah4D14kLEwhkA8xC96fkL/oe4FmVQJGTGB9ILshGOOOcYOCuToYE6fZWzigQcesE25VYINJtMzoCrG1TPkLsYEuMX+E+oDVeUIUX76INK658ACjphm0SzjsVXAnmENeIkBezagcww1lxrTOwDEHX9o9TzpoYT+Q90LMgrfC44qYiA/BiumGdBlCn7Nn6wZfvCDH4Q55pjDZj3pdjKWAcGYVU19izdTpS+fVdjFfjwl1A+qykflhgpvoQcMwjMgz7grC1RxhzfgE8ZdUWmxrbDCCsZLCK9tttkmTJgwwU7XYO1aDP9cI36FPqH/UFeCrEOBZ+QZDlUwdzc9bXpmJQvGRBUYdKVFdtJJJ9kX86ijjgqbb765nYAAsQdPJ3DGIC4Y2ZPSIsIsOyA1oT7gy0XlhEpZ0rVEpYUufwirsWPH2lIJbjPiY0g3kQtY4BeOnmanCXs4TznlFNuEruUbQPxHfCIWrkKZKUsIf/kvof9Qd4JMkIAQPGOYPzFEoYcURozkVQmhl19+OZx40olhs802s+UbXLfFIkWIcbVddtkl7LPPPnZSQhXoMsD4Wv8jIu5aUJpjEqSvcpdaT4jTF6dxoNNc9cwqIFTicqLs4m6fwEmsRx55pC3L4Pif+eefPxx++OF2bSELsRnIZ+CemXF95JQOpQk+8JR/YHNBxtov49vCb0L/oe66loIYQfDMARnTsBiwYA4xiNxgNBgWs0fGQuHDjz60yx3oSjAFz8kDXFlGl2GZZZaxrgV3MV5wwQV2bhVfaFZlcxhfHJ8Hz4O5IelRxbRSuwP+ehtmMBGnr4pquXn7/gDxTJ3Sntciyr8WEGi33nqrdRNF5/7fuWH/A/Yvr61j0fWyyy5rQxHcX8DCWs7I0xlmHvBE29T2lhiq2dEKY9gDu5C7J0E2MKjbMTIxhApdzNGBWFENo8AffPkys5r2UglrX8+pWVdiatZyyvzEQJhdffXV1pVg/IwxD1pm7IVDsHHLE0KOlhpboxBoIr7iqL57EUNp6I6U3kaEysmnPzb3BirD7sg+YjXAFjYWSz/88MMdyoyjchhSoGwRVpTvqqutaoIMPsCdqwqhE044wYYi4AsEJEBFGPJ8K7OM9/KWVzu/QqUgy5Bxq7knQTYwqOsxsq7IM40xc8EgMTMpXhN62U/CTi0nwYeBUTlmmCNgjjjiCJsBpcuBIIOpOXKFtWpsZmfFNhdEIOAYEPbEYXksjlQLgbSpAqKvoio3nzZRLfuhIg9v5/1AXaXbu+nduyLyCoFCV4+8Vp5L5cPEei5uS6e8KCf0DCkwQ8l4KWVM93HMmDE2CwlP8HyBY9dZmsEJFWyJ0w4A/JGGqnQLsjNyvQdM/BL6D3XbtewvGPN4wEiOwVQpRBI0MCzdCCoJKoPAfKE5GobKwD49xkygjTbayMbXGEthNTeksRW6pXRj4+dUEVDlRPhBcZcpJvzrHTu96wBBeQeUdtlBeheAnjRWpT0m+VN8irsreuqpJ8OJJ50QDjnkkDLvyXfMfpE0XUT0fHj22GOP8NrreTdRZcyk0JTJU6yLCKm7SjpYZ8beXsqZbqY+gLWEmWBm/Qo3Twn9h7rtWoK44KsIwSSqdPfxmMeOwB4mpBKpcqCvAozLZAFdUWazOElBKq01ZrboptBdoVuKnkrE7BYtPLotnIUFsYAXohuLGZWvv9LcGxDGC4J6IKWlL+/DR4QV9+SZ8kb55okWFwtRWftFXpPnzCxSDtjR4iIelROEWZfbVIF0Mwyh94AfAMfv7LTTTtaqQ5j5k1ckxMQ/6GX2egjILqH/0LKCzLtXQYwM0ULSV7gWHnn0EbuxB2K5B8cqQ2effbbNeC2xxBIdxtxEEnhUQLqwjOEwqEwrgApXi2jlIVTpQtUzyDsGykkraa56FxHvzATMnXfeaavk+SD4cayYFllkERMul19+eZnf6CkDPhoIn1pg7Ioy9WRjWhlP2DBEwRv6wAHG2zhOiu1MPEPCDHf8WdhCYEHiMVFsl9B/aPquZW9QxWCe8RBqTN9r+UWpTum8U0BgEoCV4nRnuB1qv/32q0mc6LHFFluU3SCpVcTyEVoHxx13XHjppZesIkngeiE8FEQaSAsV95577gn77ruvtUwZXyTtXb0X3TcWmbJPkTwh7P77798pryBmm2mZdQWV05df5OX25eR8r26VoDEqBu1F2FkrLQsDmDigm0neM6MtYSZBBhFOAtDHA+RH5oT+QRJkDlVMFjOhGNT7/Sozq/JKmMissD0Bs2UsuGQJAGM57NmrRQw+033SwDUr0ulmobJ0BHWgiPj1DK8XkQ6IGT8EEcKJRaWkuepdRLzzyiuvbGNbzz77bJEr3YM8Vr77MqCs5E4rSy0t+6FiXwgaX6bezttrZpouKmlEmLFER6e7SpgRBoEeCzOAe0L/IwmyCojZxJSoIjGlzMasrCFqy+yYho/8xf69myB7mJ/xIb7yPSEqELOlTDzMPffctoATmmeeeWz7zFARe1xJx1xzzWUtUSp+VfqriHciD8iPnsLyr8h7E1gV+S57jS7Izfvz9qAMW/iBEJCArjCtQoQzLTMmDGLhpfCKw5uhhP5DEmQOnsFivRhRZhjWvsBUIF2UGgkyr+ds9fyiiMJchIeoANj1BbQ+GHtirx+D2pDXDyWRDn/MdG+hvPN5aUR+u8tptY6QnwRWnLdqkZkgI0imt7AF0Lc/C3O7HfHYcwvCDrD7g2U5tKDZm4kbz5M/4MMDqQn9iyTIHDwDSg9VMSNmMbRVjOLQRh9GZGZWdlvlycN7d8iicfbo4woUk8I1ApRferda5P0AqR3Aa0M4QZnewvMr4tDzUO0DQt7bLw+TPaXDM9qfm7ujMeFX2udxA+IUmJxgYgHBDareEz3wcQBvlt67J/QcSZA5eGaCxJCeOrgXX3VaAybIigrTKVxml1Unc8+ekoUpKljE9D6Mf05P4P3XG/E+vKv0qNOFQpApftNTBi7vfd6S721c0pGVQRbC/Muv0mQ3EhUXeVBGkOJR2svn4VqoHnqe9wthJ3h7weuBd4/9JlQjCTIHMY1IjClG9Ewqs9lllcgqE8xfVBDvbnZm3y7ISrcapGdIrQWlZyhI6axKu9d7s9I8XSAa8ruI2/SRIOtA2a/tq6yLmZH8Q7G/XJAh8Dq/F0CgaSJB42GC/CtNfrzMC0LvR/B64N1jvwnVSIKsAjETxWahg3thnZlKP969nWrZd6bacXQm+R0sxM+vRYI3e/euSH47AauMMl/2s78obAfi58z4rwqDIJQqAWbmQhhVAYGFYPPxeFTFIz/ev/QyJ/QOSZA5xIzl4c3en5DZ5HaFdezeF/RHHEONOK+G5J0qHkl5eZAsJmJyfftkjgQRAovlF8xOfvThR3Ygp4QYqt5T/nHX7Ctmucf+YrO3U1qkT6iNJMgqEDNRbBY6uBfWman0491FteyrSH7rFT6Nnryd0JVbr0HQjLJY7Gd/RZyVxM+Z8d9dGAkVhBRAqF1xxRV20c32229v+znZZC4h5lts7733ns1mXnfddYVN3jLzcXtBKXu5yQ7IPqFrJEGWkODghYYECq0rtj6x44A7IJZbfjlbwMvBAOxcwN0LH5bDsIvhvPPOMzsEFmNrEl5qxRFGwkzhY0roGZIgS0ioAEIE4QJYL8aWsAMPPNBaZSy3QEghrNi1wMU2QItl6VLedtttnXYneMGEHiGm58SCTGb5TegaSZAlJBTwgsMLErqKnNH/zDPPmBmwfox9sQsttJDtrgDaHsU4moQaKkcFsc8TECdjbfhT/LUEGZA5oWskQZaQUMALkpg8uDru9NNPt5M32FtKVxI/CB9O3OAUE/aZcorJCy+8YIc2cpw2p4CwcJZdAJxyAtQqE1UJtYTukQRZQoKDBIeEilTNUHL6LAP57GdlQzzCCT9qgd1+++1hgQUWCN/5zndsXI0jiTiGiL2nbK7nBiZO/+CsNK4sJJx/TizEoITukQRZQkIFvBBBuNAVROW464UXXjjMPPPMdsIHgg1/CCRUThLmIMjvf//74eijjzYzt91zdtpss81mAmzcuHF2ZBFHFUkAEjcgDgk0mZWOhNpIgiwhoYCERhVJsHCSBwc4nnvuuWGPPfewCQBur8ddQonDLhdddNFw0EEHmZlbyTkgkmOK0DPTyXFFCDO/vAPoWf7ZCd0jCbKEhAJeeEBa6a+9tBJmYNKkSWGrLfObmOg+AlptgNlKjjKSIGOWE8FGl5RjiriRiZOBOW1Wwk/r0QSfjoTukQRZQkIBLzxsm1IhyKrw7rvvhW222tYEUinIvswFGUIOwcVEAGApBv44zZcz12688SY72pzDGWvBpyWheyRBlpCQIRMZJrhMn7XAdBIGegQUdw5wvhpdS2YeaVVtveU2diUg3UWAP25jYsB/zjnnDHvvs7f5Z4aTCQBu4OJYclb8L7/88rY2jRlQlmZgzzIPL7ySEOs5kiBLSCiAMJMg8a2xd955xy6QYZCfriQXyay44op2QixCi3VjCkfrjNbXt771rTDrrLOGJZdc0mY4v/3tb2fm/7Ubte6443Y71XfGGWe0CQGWaHDE+VlnnWXPA2mwv3dIgiwhQcjkhRcg0jMzybIJLh3h6G5ueGKv5cSJd5ULW+WXVhuXzOCOSisMgcd2Ju5WuO66a8Nbb71lrTLG0LiYhmUYJ510Uoe9mUmA9Q5JkCUkOMSCDJWBeLp9rOZH6NAdZP2YBveB/LJq/5233wkffPBBeG/Se6VfZjKx075MupPvv/++CUniYVyNHQD+uaKE7pEEWUJCBXoqSHKh0y54eoKu/BFfEmS9RxJkCQkFJDRQ/RgZKq0yWk4ilk34Td+oEHa4Qd7/5KwFpnDaJSA94eWmuFD1bCihayRBlpAAMlnBDKWEiAkUmTOhJrvSDQGT/XIzfgp/rnXWkdoFFMJLC2BBhzgLwgxkTugKIfw/NKxOZOR32yUAAAAASUVORK5CYII=)
Find the lateral area of the following cone.
![](data:image/png;base64,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)
MathematicsGrade9
Mathematics
An oblique cylinder has a radius of 8.6 units and a slant length of 12.9 units. Find the volume of the cylinder.
An oblique cylinder has a radius of 8.6 units and a slant length of 12.9 units. Find the volume of the cylinder.
MathematicsGrade9
Mathematics
A box held 540000 cubic inches of space inside. If the length was 120 inches and the height measured 90 inches, find the box’s width.
A box held 540000 cubic inches of space inside. If the length was 120 inches and the height measured 90 inches, find the box’s width.
MathematicsGrade9
Mathematics
How do you find the total surface area of a cone?
How do you find the total surface area of a cone?
MathematicsGrade9
Mathematics
An oblique cylinder has a radius of 15 units and a slant length of 25 units. Find the volume of the cylinder.
An oblique cylinder has a radius of 15 units and a slant length of 25 units. Find the volume of the cylinder.
MathematicsGrade9
Mathematics
How do you find the lateral surface area of a cone?
How do you find the lateral surface area of a cone?
MathematicsGrade9
Mathematics
A box held 11.25 cubic inches of space inside. If the length was 1.5 inches and the height measured 5 inches, find the box’s width.
A box held 11.25 cubic inches of space inside. If the length was 1.5 inches and the height measured 5 inches, find the box’s width.
MathematicsGrade9