Questões de Concurso Público CGU 2022 para Técnico Federal de Finanças e Controle
Foram encontradas 80 questões
Q1891974
Administração Geral
Um diretor de Recursos Humanos e sua equipe identificaram um
conjunto de alternativas cabíveis para a implementação da
gestão do desempenho no órgão, mas eles não conseguem
avaliar qual delas é a melhor.
A técnica de apoio à decisão que pode ajudar o diretor e sua equipe na situação acima é o(a):
A técnica de apoio à decisão que pode ajudar o diretor e sua equipe na situação acima é o(a):
Q1891975
Administração Geral
No documento que formaliza o planejamento de uma entidade
governamental para os próximos dez anos consta o seguinte
objetivo:
“Fortalecer a difusão do conhecimento produzido na instituição ao público interno e externo, por meio de ações voltadas ao ensino e pesquisa.”
Quanto ao nível hierárquico, trata-se de um objetivo:
“Fortalecer a difusão do conhecimento produzido na instituição ao público interno e externo, por meio de ações voltadas ao ensino e pesquisa.”
Quanto ao nível hierárquico, trata-se de um objetivo:
Q1891976
Administração Geral
Em um hospital público, toda vez que o estoque de um
medicamento alcança um ponto crítico, o sistema emite uma
notificação para que o gestor responsável pelo estoque prepare
um pedido de compra, visando à reposição do medicamento. A
quantidade a ser comprada a cada pedido é definida conforme
informações abaixo. Por exemplo, quando a quantidade do
medicamento V atinge o seu ponto crítico, o gestor emite uma
ordem de compra de 78 unidades desse medicamento.
[A] = nome do medicamento
[B] = demanda anual do medicamento (em unidades)
[C] = custo de emissão do pedido de compra (em reais)
[D] = custo anual de estocagem (em reais)
[Q] = quantidade do medicamento a ser adquirida por ordem de compra (em unidades)
Sendo que
A técnica de gestão de estoques usada por esse hospital é o(a):
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/86985/d974f82ec5f1109100a8.png)
[A] = nome do medicamento
[B] = demanda anual do medicamento (em unidades)
[C] = custo de emissão do pedido de compra (em reais)
[D] = custo anual de estocagem (em reais)
[Q] = quantidade do medicamento a ser adquirida por ordem de compra (em unidades)
Sendo que
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/86985/6ee2231333b8f3b1f799.png)
A técnica de gestão de estoques usada por esse hospital é o(a):
Q1891977
Administração Geral
Observe parte do organograma de um órgão público de controle a seguir. ![Imagem associada para resolução da questão](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASoAAAEkCAYAAACYMHxfAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAG7+SURBVHhe7Z0HnFvFubcftdWqbJW29957c8OmBBsXOqETwE6oCZDGTfKFEFIIISGEJFy4hDS4CYQQ4EIMdkKC6WAwxr2s29re6u29St8cSdulXe16bWSYx9ZvdYrmzJl5zzvvnDPzPyq7AIlEIvFh1K6/EolE4rNIRyWRSHwe6agkEonPIx2VRCLxeaSjkkgkPo90VBKJxOeRjkoikfg80lFJJBKfRzoqiUTi80hHJZFIfB7pqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DxSj8pH2FHV6vom8VVSogLw99O4liQnE+mofIBjbb186aF3XEsSXyU50swvbih3LUlOJrLrJ5FIfB7pqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9HOiqJROLzSEclkUh8HumoJBKJzyMdlUQi8Xmko5JIJD6PdFSfNlR+pGbFcNHiRC4oDCVG71rvq/gFcPrCKDINruVZYC3J4zerrK4lyacR6ag+VeiYf14J310YRIBajTUlkasKDCe8klXmKL7+xXRKZqGAotL5kxwbQLifa8Us0PrpCDZI+ZVPM9JRfZrQBrMgzcZr63bxpw0HePzvH3H/xh5srs0mayhnlMayNCuQkLE1r9KRmBrJstIoyiJ1DqMIsJiJ9NeRlhPD2SkGtI4dtcSK/ZaXRTM/xs+5Tu1HQpyZGIuJ1IRgMq3OPfVBQcwvjGFVaSQFllEnMjFdTVcL6948ypZ253ZPv5uINjCIRcXRLE40ole5VrpQ+Rspzo9hZXEYaeYJGyWnJJrvC1zfJZ8Q3X2DvPT+EdfS8aAlLT+WUmMPmw900TnsoQTWnGzuXRVCX3M/xuQkrs+HzTs66FAZWXppCbekqWgf8qdCdMOCDhzDcnY51xcGUxCsQm3rZ8dRG/MuLObmRBu1XVqKFqexhGbebjGzYnEUeVY9gf7+RGp7eL/dwtcujyVyYAhbgIVLlkai3lvHnm4Ni86fkG5DIDffmIjfljr2+Ud7+J3rJFyoQ6L59uoM8hlEnxzHucLhmTub+fvOLtSBEdxxbSZ5Az20+lu47OxI2F/Pvh7Xj4+DELMfy0piXEuSk4mMqD5N2Nr5+0uHqEnM5Je3FnFTaRBBSkChDmT5oiB2rt/O429W8afn9rLJEsvnYlRo42O5MKqV3/5lJ4+LSOyuR7fyjyYlMTWWnjoeeHYPj77TTF90LBfHtvH7Zyt55q39PLCuieiyKFJ7G3lqfR1H+9t56bltPPhuG/b2Gu5/7GMe+ucB/vzyTl6sD6AwzhlpTUy3y7VWYerfDaMitSSO1CP7+NHze3n4L1t46siwR1aRUpZA5pFK7l9/iGdf3cFv9xlYURTo2i45VZGO6lNG19HD3PfIRn70Tg/JSwr58bJQTH4mEkO15CzO58fXFvHjq1MoMupEhKAiINxIcFM7e3tdCQzZGHB8sXP4QBONLv1X/3AzUYZgLr1C/F6k8f0zQwkw6RGBkRvURKbHc8NF+dxzTS7nRAiHqFULN6IwPt3xTPW7YdTEiuitrqadTsdyPwfrexlyfNeQGG7AFJ/IXcp5XlvANSk6gkQkJDm1kY7q08hQL9s/2M096xoJyAwnXdSyzdbDW//axYPP7xSfbdz1yHs8sltEIorDUKvEJT41dpudoeZ6/vCC8nvx+dtmbnt4NxudHmIc2oQU7loRSuu2Azzy4m7W1Xqndu3t7xTxbI3G/b2nIbGxbsc+HnKc505++sT73Lq20bVVcqoiHdWnCJU5iKIY581wpRsUHOCHprOPlt529jX5kx6porm9j0bl0zXkiEI66jppCgulLMR54QfFWcl101PqqW2nJiiIZHW/8/fi095vd/g5+6Adm1qD0TUUwmQ1EtrSxIbKTup6tYSa3DuViXj3OxuHG3qJSgglXGxW+QdxRqbJ5WiH2F/TTViMGXWH6zzbB+hx40wlpxbyZroPMFc309XGEK68LJ/VRVbmFSVyYfIgr7xcydstfRxq1rBkaToXZIRSmh/HZQuDaN7aSFVLJy0hsaw5O5aKrFjOzVSza2szmtQ4Epqreb3WeZXbuzqp0Uewenk8FclWTi9P4qKYfjbs6WJgwIYlPZHPl4Yzz9LPy9tEt7MiiRWpISwsCELbr0bdUMMbIkJKyB6fLhozCyvM1H5Qx642lYffjXkqIGhtHiCmPJWri8NYUhRCb10/VnU7L+7qor2+G//8dG6Yb6UgLZJVSxJI76xj4zHvorqpkDfTPznkW2h8gDl9C41Kg1VEJiGaQeqP9dA+NprQ6IgON2Ac6qf2WC9dIzWvwhRsIko/SK2IVkbXT0ZnMhIfrGGws4cjbYMjQx/Q+hEXrmdAOL66HpGAVkeMxY++5i4anTe9vMPb3znORY+tpUtEXxMzrCbIYiJcb6OtuZuGSdtnh3wLzSeHdFQ+gHxd1qmBdFSfHPIelUQi8Xmko5JIJD6PdFQSicTnkY5KIpH4PNJRnVKoCIoKY/miJC5bEE15xPCYqU8IXTi335rLmSbXsheo/E3kJc7gBxKJQDqqUwYtWYsLefDyBId2k8oQyMpLirkhxbvBlO7x48yLSvlS6izNQK3BbNZhmMHPNVExfPm8WNfSVBxn3iSfKqQVnCJoYxO4eZ6Kl//yEQ/+6yBP/3s3dz/2Mc+OTDPREJ0UwbKyGM7MMDsnIzvQEh1pwKTzJycvhuW5wYQ7hnGrCIkIItlqJD46iJw4IwFirXt5F09pT8SNDMyUzCxvCu6lapzpmE2BLCqJpihEJRy5kaQQLfqgYJaUxrA4wR+da28Hfgbyc6NZWRZFuUvaRuK7yJHpPsD0I9NVZM5PZ2nfER56v4N+11psQ3Q7BkXqWXh+CXcW+tHVpyGlMIWr0obYtKODdn0Et92QyumJVlL9VYTnJHNpXC9v7OonrTyJsxKNWIw6wkI11FZ2knHuBBmWIzbKPaWtCWDxPDN1H9RROaDnNDcyMG/VDDim2QyjDrGwMkPFP95vEtmeSd7aINuDVI2SzpdSOUuZVqNRYetqpSoqg18sjSQvIxCTysCi05PIaq3n3WNDqALDue36PM4yDdLlF8DnzkqmpL9pUl4nIkemf3LIhuSUQE1ksB9tzT24k1XSxsZyeUonf3hyG4+u38NPn6xkd1Q8KxJcoY9WXOjvbuPel/bw87U19CSHkaUd4IMNe9nQOMTe93dw3/OH2eUYxT5B3mW6tF1oPcjApE1nYd7mze5ZqsaBTk/n1h38bO0ents/6Fjl59fN//11Kw+v3c6jmwcpyAwSa1WkCydY1FDJ3c/s4Xdrt3H3ujZS58eSM93MbMknhnRUpwh2cYGp1e77XAGRAViPtbLDJe5k725jd5OOGKtO/Epg66Oq3hktDLX30aLR4Fm5d7wMy7Rpu5iZDMwYvM3bFFI1DmxdbNnfOzqlRzDU1sVBh+iencb2fnR+SmdUR3KknqNVrYgYzUH7kTaqTUZi/V0rJD6HdFSnBKI71dxHsHAGwa41Y3H4FK0a7bBTUInv4mLvH7A5t41l0oqp8TbtmcjAeGSqvIltHqVqvEBkb1zyY3WuVMr52Wz0zSSvkpOKdFSnBHb2bq+nWnSvrsjyH6k0U2Q486PVtNe0U2+1UG5xXnq68HDKQjvYfsTZBfKI3cagTYXBXzMuOhqLt2lPJQMzKybmrd+zVM3MGKCyppe4FCui6ARq4rMtRNW1sLvPsYPEB5GO6hTBVlvFr9a3kbyyjP/5UjH3fnEeD10UgcVux1ZzhD99pObC6yr42XWl/OaqSNper+SVZvFDsX1IiXaGPYZYHhTLSoShXLQ7D3aRdkYx969Oo0L0jGzKvmOCFG/TtjUc5Y+bVFx8XTk/vrKAH6wR+VsZhtGZzChif+X4DmaSN00Xa1+tRrewmIeuLeCua0p5+KZMyhUNrInpCGyudSNJi4hJWRbf2P/ePtZr47n3llJ+8sUK7s4f4On11dSM+b3Et5DqCT7AjNQTFHmTMH8Mg31UN/YzrCCs4GcyEhekpqO5awbSJmpCwkyEDvZwsGWMbMsEvE3bowzMrHCTN49SNTNFTbDVhFUzMK20zTBSPeGTQzoqH0DKvJwaSEf1ySG7fhKJxOeRjkoikfg80lFJJBKfRzoqiUTi80hHJZFIfB7pqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9HOiqJROLzyEnJPsJ3/viR65vEV0mJMrNmWbprSXIykY5KIpH4PLLrJ5FIfB4ZUUnmnIeefoths0qKDuH8JbmO7xLJbJERlWTOeeH17Ty3wfl5Z1uVa61EMnuko5JIJD6PdFQSicTnkY5KIpH4PNJRSSQSn0c6KolE4vN4PTzhq49tdH2TfFa59qxUClNCXUueOePmR10v+4T5efH89MsrHd+norN3gLue2OxaknxW+dEXijH5a11Lo3jlqHr7h7j8vtddS5LPKl84K4WLFia4ljwzG0e17WALdz0pHdVnnR9+oYi8xBDX0iiy6yeRSHwe6agkEonPIx2VRCLxeaSjkkgkPo90VBKJxOeRjkoikfg80lFJJBKfRzoqiUTi80hHJZFIfJ7jd1Q6AzmZYSzICmNeeiiZFi1jB8D7R0VycVGQa+kk4hfA6QujyDS4lmeBtSSP36yyupZmhskaQlmSCZNreaaoAqP59i2ZlGvEwhycyygaUvITODtu8jQFX8U/NJiKrHDmCxsrSwkixqBybXHy2bQxLbFJVvLDtIwvDe8Zd+y5tLE5tVcnx+2otLFx3HZ+CstzIzi9OIGbrp3Pw1cmUeC6Qv2DzGRE+jsXZoQfZ15UypdSZ5dFlc6f5NgAwv1cK2aB1k9HsEHxFDNEZWLF+fnceVkWK8NmZ0YqjZZAsxZ/8fPx53J85aI4qrDIQJKCThVHpSK9Ios7zoxhcU4kyxZm8KMvz+N7S0IIdu0xWxtTmaP4+hfTKZlFFSt8kjamDovltsty+c75scTN0lONPfZc2thclMtEjj+iUuhp4bnntnPf05u549eb+QfRfHVlFIqvbjtUwzMfNDt2UxmMJIVoCYoJ55yiUCJdRzdZQzmjNJalWYGEONapCIkIItlqJD46iJw4IwGOPZXWNYTFJbGsKLCSZBqtoQCLmUh/HWk5MZydYkDT1cK6N4+ypd25XR8UxPzCGFaVRlJg8WwY2sAgFhVHszjRiH6CAaj8jRTnx7CyOIw0s2frUEdGMF9Xy3N79SzINY8WskpHTPTouaDyIy7aMBp1afRk5USzLDeYSJ1rncA+ci6eywU/A/m50awsi6Jc/Hj4mJPLvJ/tmw7x8oFe5w7CqDKzolhRHsPpyUaMzrW+hSjqjkNVPPDsNn70xEZufuIIlORwc4HeEU3MysbUfiTEmYmxmEhNCCbTOuq4fd/GVCTlhqHfUsUH5nBOixzdT200kip6NcNr1CZxfqGj5+bp2N7Y2Ikul6kYuYbmjIFO1v6nhpbkSOaLaNyQkcoPlkc4NhnSU7nn8/l8c2k4SVFmooTHteZkc/9lcaQIzx6Vm8V9l8UQo9KSmh1FToCaqNRYzi21EivOz5qdxQPXpbEw0kB8RjL33JDHcqtSYBrKzi7izstzWZNtJiXCgF4fxvXXZLDILKpVdKNuvyyJ8nA9QeGR3HJ9Pue5ibbVIdF8a00u5yWYyVuQw9dLjCJl17bACO5Ync+qKB2G0EhuE2kst7g2jkNEAMKI2FPLi9uaMGVFkOEqZZUxnBuuSWOeKyRWB4u8XJ1CiWJHKgPLPl/KNyuCSUhK4BsXxRA9bAsj5+K+XFSB4dz2pRJx7gFEhlu58upyvlNqdFTu5DLXUC7K6sYcpbnTs+z8PK5INxMiDPqMVSV8e57zd75Mb301T37UR0FBmKMxnI2NxRoCWZgfjEVroKQ0juVpzubilLAxdSCLM2Hjx0fYsF/LgrzAkdstAVnp/GBZOCJLDsLzM/j+Wc5Epjr2dDZ2ostlOk6ITdoauzg6pCcieNTrDqMPGGCDiL4eefkwm/sDWb4oiJ3rt/P4m1X86bm9bLLE8rmYQT7YsJcNjUPsfX8H9z1/mF32QFYuCeXwvz7mvrWVPPrMZh4/EsgFZcGuSlJj6akTre4eHn2nmS7HOif29hruf+xjHvrnAf788k5erA+gcNI9GhWpJXGkHtnHj57fy8N/2cJTR2wj21LKEsg8Usn96w/x7Ks7+O0+AyuKAl3bx6AJZnH6EBt3dNJ1sJ5NmjAWJ0xfzNroaFZFt/HHp3fy2Etb+OHrbfS7to0yMLlchoRjLE+iqKGSu5/Zw+/WbuPudW2kzo8lx2WF48rcFUg56WP9sx9w9/9V8ufX9vLLdztJSQ6e9X21k4ed6oZuBgMNhLspWm9s7KyQJp5aX8fR/nZeem4bD77b5nAAp4KN6RIiKBto5K26QbbtaEKbEUH2xENNYqpjj8WNjZ3wa296pr+CZoNajU5lp2/QtTyGoYYWPhI24cDPRKIIS3MW5/Pja4v4sYguiow6QtyEvCpjAMmB3Wyv6hdmqjDA7qNdBFqMrtbDzuEDTTS6Fa1RE5kezw0X5XPPNbmcE6FCq1WLqhuLmlirnrqadjody/0crO9lyPFdQ2K46KLFJ3KXks9rC7gmRUeQeXIn3D9ZGJGtnSq1ODfLIPtr1JTnhTDdHRQ/qwlLSzv7epzLbXWdHs5lIjqSI/UcrWpluFjbj7RRbTIS6zrouDKfgC7EwoXLc/ju1UV8o9SEViPKxrXNl1FrRP0N2dw480+7jWkoyLUyVNOJOtxMdG87e0VjuCR5JDbywFTHnpoTXy7Tc0IclX98MMlDneyf7koTm222Ht761y4efH6n+Gzjrkfe45Hdbjy9kpRKhei5jKAVxmobtIlimxptQgp3rQilddsBHnlxN+tq3edLUebSiAvVHUNiY92OfTzkyOdOfvrE+9y6ttG1dRgtxXkWtHYTK85OY83SVBYHDOGXFkmJ4jREGnZRRSLbk1EOLhz8bCtkbOWrxHetzUbfdFYoor9rrsikoKuOP6/dxcObOrwy3E8eDTmi+zJQ30G1u6BgLJ82G9NbWJymwmaNZfVSYWNnRWIdUFOSaxmJhFXiHDyZmKdjT8lJKJfpmGNHpcYaF8Oty8Jo//AIH/S5VntChN37mvxJj1TR3N5Ho/LpGnJeLHYbgzYVBn+N4wK0d7dT2WKiOMPobPE1ZhamGzh4qBVXEOIRk9VIaEsTGyo7qevVEjrmRuAoNg439BKVEEq42KzyD+KMTJO4JBSGRGTUTViMGXWHK5/tA/RMuKpVRiuLk/p4+dnNDhE452cXr/WGclq6TjREA7QP+pMQrqSqJaMgjHhXDfQe66LBEkyB41GW2JZvJc6ttY0vF6V1q6zpJS7FSrRjfzXx2Rai6lrYPU35q/RG4gK62bSliYMtA5gD/Gbc0p1sVFo9WaWZrM4aYP37jXS71ntkChuzD9qxqTUY9c5dTwUbC0yPIL+tmp+N2Jf4vFRHlxLJG4UddffTH2IiQZibI/0ssyv9qY49gZN+7U3P8Tsq4VUHA6L4r28s5n/vXMh9K6x0b9zKD19vd3hbm3Djw2qPw99HfKq9i7WvVqNbWMxDItS965pSHr4pk3KH4Qyw82AXaWcUc//qNCo0Hbz0ag26BcX8ek0xP7+lgDM6D/K7D3tEFYi0RbqiJzCK61hD4mAd++vZHBTPd67K54dXJBDR08eAK0+j2Dmw6RDvByVx740lPHB9CqGNnXQ79hOh7cZ9rNMmcu9NRXzvikJ+dms5N2eOr2ZTShgZzcd4t8m1QmGonbd395OdacE80Mz6zYOcdkkZP7+hmKuNXRzoE3kUu9lqq/nbbn+uuK6c+28o4Qsi1D7Y69w29lwmlYvWzv739rFeG8+9t5Tyky9WcHf+AE+vr6ZG7D+pzAXDZWXvaebN/f5ceHkh372mgEuCB2hRLl7Xfr5C/4CNkMI8nrjzNJ68o4QbMwZ5+ektPO0Kp2ZrY/auVrYcC+Sqa0v56TlWscLXbUxLUWYgtbsbHHU7zODRet7vCmZeqpa+/TW82hvBnTeW8sB1KQQ1dNDjSt/zsZXNo+dy8q+96fENKWKNjmjRPzcO9VN7rJeukRypCQkzETrYI1r8QecFpPUjNkyPtruHw22udd6g1RFj8aOvuYvGqeJVR1702Fq6RAswsWjUBFlMhOtttDV30zBpuzeoCAw1YbH1UtU6Mf8qkb6ZUNFVqRo+X7e4KRexLthqwqoZoFa0nKNlOB3KORkJHhDl2T40zqFN5JSWIvZkY8Ke4kR9D7SIFr/HtfJUtzG1M/2h1k7qxz08EUx57LF8AteewJMUsdRMl3iN1EyXnGikZrpEIjllkY5KIpH4PNJRSSQSn0c6KonEA1p/P4LGzLmUfHL4hKMaJ2kyQ/yCglhUmsDlSxI5r9BKyizHaUh8k1nZxhjpoYpURRbGtX5KNCw8fx53Fjg9k8oYxi2r81jhbo7OCZAxGYfKj9SsGC5anMgFhaHEuMZ5zRiv8nkyZH/0LLu0gluGJ73OAt9wVGMkTbxHTUJxDg9+KZtlMTpUdhXWxDi+sSabRTNX/JD4KLOxjbHSQ2fNz+QnXy7n1uzpjUJv8CPATzmQirTyGIwbd/G3atskOZgTIWMyio7555Xw3YVBBKjVWFMSuarAMKsL1bt8ngTZH5Uag1GU7XFEp5+co/IgaeJES2xqJMvLopkf4+ccDTsBbVQCX/mckQ+e/YDv/d8+nnrjIL9/YTO3/3E/20dGZGuITopgWVkMZ2aYCXIYu4qQsACix9itSm8gJWz4OO6PPVHKQpEHjI40YBLGkJMXIy6KYBwDzl14krZwpqMmPCGC5aUR5ASNrwK10UxJXjTLCyzEufLorUyGtzI0Ps9x2oYDl/TQvU9u5DvvDLJocbRrg2e5klHs1G7bz//u7GbQjRzMqCSKa3eVjkSRp2WlUZSNSOyIOo4L43NlsSzPCxkXFSnHP700lnNyhM1MPAFtMAvSbLy2bhd/2nCAx//+EfdvdA6sVPCcdxVBERZOL4nhrHSnrU/Mp3s7mij7YyBf2PPKkgiyg927B2+laKxx4SwrjiA3dPLcvsnSTlOj+b7A9d0jg0N2nn2ryrU0ByiSJpeWcEMSdPqFcl6FhQj/fja/20CVXc9pFxZzc6KN2i4tRYvTWEIzb9UMjBmMqCJ7UQZLu6v4+TsdjJ0pMtQ3iLPI9SKUL+HOQj+6+kR4W5jCVWlDbNrRRcrSEr4S08H6/b3CAFSkLC7k/6X3sn7PEPPcHtsm0irn+kJliosKta2fHQ2B3HxDKqcnWkkVzX14TjKXxvXyxq4u+kR35WuXxxI5MIQtwMIlSyNR761jT7eGRSKd1fkhlEWLKDA4gisWB3Fs2zEODwjTDoniv1ZniZZ7gKHQCC7N1/ByldlDWo6THMEhEXJtJnkDPbT6W7js7EjYXz8yyXkuKEgOJSveKVf32+ff57VN+3lna9Wkz+6qY459FDq6+6g51u52P+VTlBGDTquhobWX17bWzYFtKOVoYWWGig8/aKJObOg1hbAiHV54v8khV/KTS6IIFnaij4rmC2dY6N3XwL5uReMpnqSWo7xWg6OeLtHW8npLICsWR5Fn1RPo70+ktof3jgVz242J+G2po3LAyFKR31vSVLQP+VMhulpBB+pozM7h26UG+oRxhqYlcn2eig+2ttNpieW7V8cT1Cycj9VCsq2J7c1jc68lLT+WUmMPmw900TlmVKXnvEN0cT73rbKg6bERlpHImaZmNjSEjuRzn//UNqmc62u1elZeUcgF5h7qbEZKI+1squpxzo5w4a2dRSr5WRGCvVdDYUUcRSE6Wvcf5u0Gu0N2595VIfQ192NMTuL6fNi8o4MO8bszC6KICJ7cV/XYIJ1IRiRNHt3JG6KQQ7Kyuf88p1vVRsdycWwbv/+fSjb1CwdfreFX50SR9tF+9oxUmla0cHoajnQ6JCXUwWFctiDUGTENdPDv/9RwMDKWy1M6+cP/bOd1sZPK2Mo3b0pmRUINT+xoZs3ScDJfbWW7zcy8NB2bNzTTH53o4diHlKM4pCy+8WwtxxS70keJbGioffdjHtk3gCZ2kF9eHkaWtoF3HdIWwtod+NFqmUdJnJYXHZO01fg3H+HufzTRrg6i+6Z8KuLVvLXLTlZFAqlVe7nthWOO8zKbdKJVHPCQ1lhpilGJkNvXNwlHrWavrpwvFQXyyqvDzf7c8uoHldQ2KaY1NW2dvbz45k7X0mS+dEEFBv1o2HT8tuFCmUSr1xJsDGJ5eSj9B3cpV5lLruQD7t+mKAHo2HlJBVeVBfOvV9yXk727kafWG8iOD2KdiNDeVIpdPyovqI2P5cKoVn4r8vue0kJq1OjElT3QtJ2vbXLuozL3E3urhSz/IzREBJHUeYzfvlHF0bH+aRhbO39/6RDRF2Tyy1tj2PD2AZ7a1Eabaoq8/9POygUBbF/3Pr/crWRwHzqNSFw7Ks/slFvxZJMuNGYyI/t574+H+LtbQQEv7UyU87KKQHb/S+Rnu2iBzWHcviZLhA7ObU7ZnY08vk8UlKYd/c3pfC6mhj+5LRAnXgRdc89Ukib+4WaiDMFceoUidVHE988MJcCkZ7y0lR1l4LMyg9ux1N/HYZHGoWYNOSXhpIkuU0BkANZjrYgAyrlPdxu7m3TEWHX0Hahnk9rCQuEgtFFhlOmbeOvA0DTHdiNlYeujqt7Zmg+199Gi0eBUdp1K2sJOY72z9cDWS2OHCn/HfREdCaL7WVPdNjLRtlM4qanTGsZ7GRpf5/htw4nKHMGtN1Zw/6VJJNfv5yf/bPJCrmTmBIQbCW5qZ+/wVJUhl6KAxkDZgnS+fnkhP7g4hgSNSjgPccQDNfxbHcc9q7O5Itfs9rhdRw9z3yMb+dE7PSQvKeTHy0IxT5H3AIOJOFM3ldXDjZcdEThNwAs7Gmzm1Y9VrLq6hK8uiSBp0m09L+1MZyI2sId9rkjX3iWuzTZXJc5Admcsn4ijUiYtepI0sSuTGZvr+cMLTqmLB/+2mdse3s3GcQU/xKH6XiLiRB9fnJ8yu/vtj6pZv62NZlfL6igWRe5k+PxV4rswFGWCq32whTf32inODiE9y4qusp5too69O7YHXPWg4L20xfj1zmIZXyrepuWdDM3c8fh3P88/fnG924/JMBohnb8k2+0+wx/F0YzjuG3Dib2jjgd/9TY3/PeH/Hh9LQeV+wNK0c1SrsQjSppqlbiEx6Ii56x8bkrq5/UNe/jVP6rZ78qjvbeFP/1+I/dt7CXljCL+30KT+4twqJftH+zmnnWNBGSKxlfZaYq824WdTzCdcXhnR4NseXUTd/ztKA3RydxzRQIJE/yHd3Y2lZyRMonZS9mdMUxxaieOqSRNemrbqQkKIlnd75K66KO9f/zsf+Vs9390lF1h8dy0IGhUN1wYjPjvoL2mnXqrhXKLc4UuPJyy0A62H1FaHTu7dzQykJbItZkqPtzRJqrI22NPz+ykLQY4WN9HXKoF0dgJtCQmBHiZlncSIXNJgFFPoMnf7UfRQxpGr9O63Wf4ox6zr8Lx24ZnZitXMlEOZiwdIuJrCgulLMR5HkFxVnIDtY7Ju3X76thU10OXv971IEfYoVl8t/dTue0gT27pIUpEZGOdnMocRFHM8A15FcEBfmg6RbTe6Tnv3d2dHGw3UyyWld+pTUFUJI7PrFd2pPFD7EZrdR1P/buWhlATUeM8hJd21t9FVauB3GRnfkyxkVQoEYVj2xTSTlPwidxMt3d202GJ4/ozo5mXH03+QCfNgSoqNx7jcEcnNfoIVi+PpyLZyunlSVwU08+GPV3jWj17bwebq1UULErn+vkRlGdHc+GiMIIajvHPj1upb+uk3hDJdSKdRemRXCj6zHVv7ObJ/f2OQrF1DBCUl8B8Ww2/39BCi5KmCFHdH7uH6Ow4Epqreb3WVaSKoVSYqf2gjn39wqT8Ajit1MCh9xqo7FSRXJHEitQQFhYEoe0XEUJDDW+IVixhXDoaUvJiiKg7wlsNNpoa+4kqS+Pa0jDmlSVwZlAXL2zq8pDW+Baovb4b//x0bphvpSAtklVLEkjvrGOj44ba3DD2ZvpU/Hn9ZhG5OsspJ1nUTU684/tUDN9MnwvbUAeFsiwdNn7YRMO40+8XF5COJWenc2G2lTMWxJLefIjf/KeZFpt6pG42TKgnu4jCLemJfL40nHmWfl49qB6p+72NnbSExLLm7FgqsmI5N1PNrq0N7BwMYNXiWEqSwjkjTkWvTk3V5nqa07L5ySVxlKVFszwVEXEdYnPraF2qjSFceVk+q4uszCtK5MLkQV55uZK3WxS1DQ95H+rjcKeB5UtTWZEZxvJ5YegO1/FBs2Ekn7vavLDJDgu3XZ/DeelWPldqwb71IM8c6B1Xtt7ZWT+1PUZWLk1haUYkZycPcaBdNEo1R3n3mKiDZg1LlqZzQUYopflxXLYwiOatjRwRJuPpZvonqJ4wtaSJzmQkPljDYGcPR6aUlFAREGwiQrQQPa1d1HSJrp1ri4KfSCcuSE1Hs2ipvZTM8P7YUzADaYtxqPwcT7aW1m7lB+92O43E67TmQCJkCrxVT1jx1d/R2e0UCb70c/l8+fMLHd+nYrx6wlzZhgdmI1fiTg5mBBUmYYNR+sFxEjuK7cWYhsS6PteTaCd6s4m4QBG5NIr6dBbTeFQarCK0CdEMUn+sh3ZX2+hgiryr/f1JCNXS1dSJOORkvLAjlc6Zvlo0GEfEgd2XjXd2pjUaSQiwU9/QQ+fEXTzI7kiZl1MCFdEiAinKjeN8235u+Uezo0vqK5w8RyX5rCJlXk4JVGj8dJiaa3j4rRafclISySeJdFQ+hY0ju4/wzFvVbGmdNtCVSD4zSEclkXyKUev9CHbztPJU4zPjqE6cyoIf85aX8PDNxXy5LJSyMwq46ThmiUuOg7lSHTgF0IcEU5EVzvwsK8XKa9fdmbNfCKuvK+SSmOEJKKMKEZN3H6secTIUFWbGZ+CKmluVhYkz6VEbiBqq4SdP7KcqIpZzglt56/CMn0NJjpu5Ux3wfVRkzMvijjNjWJwTxYWrinnkxkzEqY9BRXxpHNHbd/HEgdG7naMKEZMZ3XYSFBVmyKfeUXmnsuBpRr6iviDWl8dwWrw/fm5m0mNr4+X3u4lLM2Ova+DFN46yfezoQT8D+bnRrCyLonxkZr1kzplGdcDTjH+HWkW+otRgIU/UaXaEXrg8CLQEjNGxUhE8RnFjspKGuMjdKhNMp5YxqnhwZqpp5AWiXqlliFPoOFTFA89u465HP+K5vnAuLXEOfXbm3c7hd7byg7c7MU5QC1GGP0QkCrsW6ee7lS6YoKgwJp/DygwK3qp6zAWf8utGRWZBBOEHD/P3Q4Pjxlf1t/fiuF+tUmbkl/Dt8gAC9AaWiFb526VGR8FEl+dx91khBOv8yCqNIs8cyML8YCxaAyWitVqeZnIIu91+WRLl4XqCwiO55fp8zrM6DiG2hXPbl0pYkx1AZLiVK68u5zuutCVzjK2PY116SgrDiJwQCDhm/K/OZ1WUDkNoJLeJOlpuERv8Ldx4XR7nR/sRmpzIN6/M4qrCYEJUOhYsL2JNpishlT+nryzkmlSl5jSUnV3EnZfnino1kxJhwN+jDTj3/a9L8/nq/BASkxP41vVZLHJ5pMiiXH5+RSJFYSYKT8vjmxWGKe3JI/ZeqltsGPyV/E6Vd8cKoktz+eaCYOLiYvnamgLOD5sYYWkoF/m+Mcc5hy+6OI8HHPk0kjsvl6/NN84un8fBp/yacaks1I+qLFyxIoObVorP0mjSRF2OzMh/tpJn3trPA+uaiBbRT5roPiSK6KltdxV/ffsgjz13kE3tykz6Oo72t/PSc9t48N0216z0j3nonwf488s7ebE+gEJH315FenkSRQ2V3P3MHn63dht3r2sjdX4sOSe28fls4lIdqElUVAeKuKk0aER/bHjG//3rD/Hsqzv47T4DK4oC0SWEU9ZdzX+L9U/9Yx8b2obYs71hwmh2dziVNB54dg+PvtNMp0cbcO6rqGX85OndPCL2f7U/1KGWIYyRVQsD2bFuCw+u28sv/vAhD27rncKeJqMSNmry9xO9gQRWpQyxpXJ6NQuFweqD/PAvu3ns+S386bCZpaIs3B9BoAl2KTMo+azkoSfe50eiBzGTfM4Fn3JHNb3KgucZ+Ta2bq5FXVHEfRcmsVg00xPbHSeeZqXrSI7Uc7SqlTbXnu1H2qg2GYmdxb0xyfS4Ux1QXlruaca/vbOfDrOJBNHF0wabidUP0NrtzbCQiUoaM1fLUBlNxI9TPBikzXFsb9QynITkZPHgTaIHsCSAqle38YdKb0be2WmoaXfZ5CAH6nsJDXF2X92h8qjM4H0+54JPuaPyQmVhihn5nQf2861Ht/Fya4DotuVz0fDEyjFMNyt9bOWpxHetzUbf2CkRkrllgupAuohePc74F3XRazdz8Rfm8evLI2h9o5J/KpM+BU4RB+FQnItTMiu1DPHVneKB92lB87Yd3PDLd7n1d1t5fEvniDzQjPIudhoask05jeh48zkXfOojqulUFjzPyFcTEqjD1tXOhg37ea3VSHyoatJMes+z0georOklLsVKtKOU1cRnW4iqa2G3u3lYkuPCo+qAzfOM/4CYIMLam3jhn7t56IU9/HVnl2tO3hDtPTYiIswOsTdl9v98N43UMLNRy7D3jFc8UOnN5EbrZqm8MZbp8q4iISOSRMcoBBOlKQYOV3d4nAVh96DMcPz5nBmfjBTxSWRalQWPM/IHKD+vhG/Os1JWHEsxdfzljWbqe8fPpH95m+hmuJ2VPkRLfQ+m/FRuWCiOmx/PqphennlpPx9NmqF5anAy1BNmi0fVgVYbbR5m/L9d60f5gkhSzAbSksM594xk5tPCm0f7aOjWctqZqZybFcHpCYPs7zCgccz+Fxf6BCWNgZ5ZqGUI2zjaaWTF0lSWZ4SxfGEU1oYGXj805IVahgprcgxlNPLKPkVOeyyiqzlV3rOiCR/ScPqSeIdmeUH/Uf7nn8eoH3KvHrFBOHl3ygzvHLZ5peoxU3xQPeFkM7XKgvsZ+SKqCjNhVfVz5Fif6CY4Voq4d8JM+ilnpasJtoo0NAPjZtafivj8pOSpVAdEPYyf8Q8l587nyvatfPP1Tkd9G/PyeKy0jTv/eJgapVqNBuIC7DR4U2+zVMtQmyP46nXR7H9qCy80uS7y2SpvjGG6vOsDTMQah6it7x3pMk6FW2WGOcjnROSkZOGWOlo72SfC3OoJTkphoKub/WJb1TjpDBstxzqoVGQ6xv5gUDiumo5RuY/BAarrPVWWjdbGDvYJgziVndQpgX2IRqW+6iY6KQXhoJrEtppRuZ/W9n4sGfFcVh7N2WVJ3Dw/gEO7nS+EUBjs7uGgt/U2pQ14QGMkL1lHf78/0cFjDjKbtCYwXd77OrrY76WTUrD19nKwZoJ8zBzk01s+Q45KIhmLnf2vf8zdG1rp9ddj0Q/wwbqPuOfdrjEN1YlGhcGopXbTbp496I03/OwiHZXkM8wgVXtreP6Ngzz91lHeODxezfKEM9TFe+8d4tlNLTScPO94SiIdlUQi8Xmko5JIJD6PdFQSicTnkY5KIpH4PNJRSSQSn0c6KolE4vNIRyWRSHwe6agkEonP49VcPwVlLpbks01e0uQ5WO6YzVw/BWljEk825rWjkki8ZbaOSiLxhOz6SSQSn0c6KolE4vNIRyWRSHwe6agkEonPIx2VRCLxeaSjkkgkPo90VBKJxOfxehzVmzvq+fsp+iYaydygUat44EtlriXPzGYcVUfPAHc9cZwvd5Cc8vzoC0WYDcq7vMbjtaN68t/7+fvb0lF9llGrVDx31xmuJc98Ym+hkZzyyLfQSCSSUxbpqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9HOiqJROLzSEclkUh8HumoJD6Pf2gwFVnhzM8KoywliBiDyrXFiX9UJBcXBbmWTiJ+AZy+MIpMg2t5FlhL8vjNKqtraSZoiU2ykh+mZXxpeM+4Y8/BuYwwl2m5kI5K4uOoSK/I4o4zY1icE8myhRn86Mvz+N6SEIJde/gHmcmI9HcteY/KHMXXv5hOica1YoaodP4kxwYQ7udaMQu0fjqCDTPPgDosltsuy+U758cSN0tPNfbY48/FjzMvKuVLqbNzD3NRLhORjkri+4gLseNQFQ88u40fPbGRm584AiU53Fygd0QTbYdqeOaDZueuBiNJIVqCYsI5pyiUSJeFm6yhnFEay9KsQEKUdWo/EuLMxFhMpCYEk2nVOncU+IeGsLgklhUFVpJMo14gwGIm0l9HWk4MZ6cY0HS1sO7No2xpd27XBwUxvzCGVaWRFFg8Ox9tYBCLiqNZnGhEP8HJqPyNFOfHsLI4jDSzJw+kIik3DP2WKj4wh3Na5Oh+aqORVMtolKU2ifMLHT03T8e2j5yLipCIIJKtRuKjg8iJMxLg2udEl8tUSEclOeXora/myY/6KCgIQ+m4GDJS+cHyCMc2Q3oq93w+n28uDScpykyUaNWtOdncf1kcKSJ6iMrN4r7LYog1BLIwPxiL1kBJaRzL00yO31uzs3jgujQWRhqIz0jmnhvyWG5VLkoNZWcXcefluazJNpMSYUCvD+P6azJYZBauIzCa2y9LojxcT1B4JLdcn895bnp06pBovrUml/MSzOQtyOHrJUaRsmtbYAR3rM5nVZQOQ2gkt4k0lltcG8eiDmRxJmz8+Agb9mtZkBcoOoJOArLS+cGycESWHITnZ/D9s5yJTHVsRs5FS2p2FDkBaqJSYzm31Eqs2OlEl8t0SEclOQWxU93QzWCggXA3FqwPGGDDc9t55OXDbO4PZPmiIHau387jb1bxp+f2sskSy1khTTy1vo6j/e289Nw2Hny3zeEAVi4J5fC/Pua+tZU8+sxmHj8SyAVlwS5HoMbSUyciuz08+k4zXY51TuztNdz/2Mc89M8D/PnlnbxYH0Bh3Ggk40RFakkcqUf28aPn9/LwX7bw1BHbyLaUsgQyj1Ry//pDPPvqDn67z8CKokDX9lF0CRGUDTTyVt0g23Y0oc2IIHvioSYx1bHHMsAHG/ayoXGIve/v4L7nD7PLfqLLZXqko5Kckqg1alRDNpxiMuMZamjhI+F3HPiZSBRdn5zF+fz42iJ+fHUKRUYdIW66VSpjAMmB3Wyv6heuUGGA3Ue7CLQYXRGKncMHmmh0K4ykJjI9nhsuyueea3I5J0KFVivy6NrqRE2sVU9dTTudjuV+Dtb3MuT4riEx3IApPpG7lHxeW8A1KTqCzBNv9GgoyLUyVNOJOtxMdG87ezVhLEmerks11bGn5sSXy/RIRyU5BdGQI7ovA/UdVLsLCsYiLh6brYe3/rWLB5/fKT7buOuR93hkt5sfKheaSoXfmGteKxyibdAmLs2p0SakcNeKUFq3HeCRF3ezrtbtVYui/qbRuL9Mh8TGuh37eMiRz5389In3uXVto2urC72FxWkqbNZYVi9NY81ZkVgH1JTkWnB2XpVTULm9sKc69pSchHKZjjlwVBqiE6zMzw5jfqaVolgjons7Bg0p+QmcPYtw73g5/sfWepZdWsEtGTMvJuWmaH56CHEzfxg1wtjHx3P5CP4Te5w/B6i0erJKM1mdNcD69xvpdq33iOja7WvyJz1SRXN7H43Kp2vIEUnYB+3Y1BqMeueu9u52KltMFGcYnV0ajZmF6QYOHmqlx7GHZ0xWI6EtTWyo7KSuV0vomJvNo9g43NBLVEIo4WKzyj+IMzJN4gpRGGJ/TTdhMWbUHa58tg/QMyHkCUyPIL+tmp89udkhNOj4vFRHV7LoDhqht7uf/hATCTpX+llmV/pTHXsCdhuDNhUGf40j8jnx5TI9x++oNIGsOj+ba0ojOC0vmotXFvHIlwu4ItnPFd5pCIsMJClo5o4qpCCHn59jYbIwqXfM9rH1CCo1BqMfAbPIQGxZNt/5fD63l5lmXchjHx+PPZfjfax+3OVykukfsBFSmMcTd57Gk3eUcGPGIC8/vYWnXeGUTYQKQzZnSz38faTdtnex9tVqdAuLeUh0p+66ppSHb8qkXDgne1crW44FctW1pfz0HNEg2Dt46dUadAuK+fWaYn5+SwFndB7kdx/2iMtcicyUtJ3JOnAda0gcrGN/PZuD4vnOVfn88IoEInr6GHDlaRQ7BzYd4v2gJO69sYQHrk8htLGTbsd+ovu0cR/rtInce1MR37uikJ/dWs7NmWMrWUtRZiC1uxuoGZP04NF63u8KZl6qlr79NbzaG8GdN5bywHUpBDV00ONK3/Oxlc2j56J07XYe7CLtjGLuX51GheZEl8v0HL8UsSaEG2/JRP2yCKf3K0lpSKrI5XuLbDz52238px3MlgCCezo4Kpo/5VGmqauPgJRwEnubeW1/D4OiAmJTreSFqGmtaeSD6n7xIzNli7L4StgxfvpGC00NbRx1uG8RwSWJfa1aBtrb2LS3kzbHGWiJjtTR3qGjMNNM14FaPu4xkGIeYF+jEqCqCY+zkB+pR9fbxda9LVT3Kb+biAprXBglYSqqqzpJO7eY9A/f5qfbnTWhPOYuTzSi62rngz3ttIytoGFUAVz1xSxMe7uoyOzh3scO4CgaQaAoi4Bu0WVxnIuK4DAzxo4Oanodmx2Pj+elCufW3EpVdCY/jqnm6r/VOyI0x7k0q0jMSOC288y8/7eDbGnvZHfjoPjliS4XseepLEWs0REdbsA41E/tsV66hq1e60dcuJ6BFtHi97hWinWxYXq03T0cbht0XIxeodURY/Gjr7kLR9F6wpEXPbaWLhFlDGdkGDVBFhPhehttzd00TNruBWpn+kOtndS77GqEKY89FjUhYSZCB3s42OIqgxNdLoKTKEU8xMGN+/lnR6gIO/3Fpaih/OwibsxRbgq6eZSp0nPahSV8u1xcwHoDS84T30tF9zE6nDPixcVjsbCiPIZSx6NQPQvPL+PeZeEkhZopP72QBy+PIdaxKYzrr87lOxcrj1ADxHbNuMfW1pJsvrXESrzZj/iCTH5yWZzzdxOILM7j/kviyI4I4aKLclhmGd3J3WPuGDdpaGMjmKdq5N/v1fGRfxhLRg6kY8HyItZkuqJLlT+nryzkGtfAuqkeHw+fi8rf3WP1E18upzxDA9TUim6g6P6MOCmFwX6O1HSMOikFse5obQeHZnIxKgwOUF0//cXozIvSFXLnKISDauqgsqZrdk5KwSbSr3PjpBSmPPZYbLQc62D/sJNSONHlMgUnwFEJ7N1UNdmwBvuPXGijjH+U2Rcdy8Wxbfz+2UqeeWs/D6xrIrosivB9B3h8azd9R4/ywN928sIRu3AAsVye0skfntzGo+v38NMnK9kdFc+KBNeVpdPTuXUHP1u7h+f2K1HGKI2btvO1/93F7187wGMvHKEqKhThR8ejDmRZRSC7/7WVX76ymx8+dZDdw8mIbe4ec39ukqdSk51rpW9PPQf7WnirUk15XjDTD9L17vGxvbtx0mP1E14uEsknzIlxVOKi89OoGBx053fHP8r0DzcTZQjm0iuUR7JFfP/MUAJMeoLdtOoBIiKwHmtlh2ughr27jd1NIqy06sQRBbYutuzvde/tNQbKFqTz9csL+cHFMSSI/OkmelGdidjAHvbVDDjucdi7OkXr4cqot4+5dSEsTrdT2aAiPsJIl2jFdekRFEx7n2v2j49PeLlIJJ8wJ8ZR6YLJjrRxqLaL8e33ZOzKTbfmev7wgvOR7IN/28xtD+9mo5sr1OEytGq0w75BJb6Li0q52Tp1IKsi56x8bkrq5/UNe/jVP6rZ79YDKDdhRWfVXamIA3jzmNuUFkGJxk5saRprlqZxba6eXp2VxWnO7p5yR1CtVjkdyASUbbN5fHziy0Ui+WSZc0flFxjE8nPTmN9dzYt7prf6HhFx1AQFkazudz2S7aO93/nUZmDIjlqvYXgSdruINuqtFspd94104eGUhXaw/ch07lDruAlYt6+OTXU9dPnrCXLnD/q7qGo1kJtscBSMKTaSCuVZrmOb58fco+goywnl2AfbuXvM4+OHtwxSkGMlSOzd3mMjIsKM8kRcSX/+cPoi3vH28fHEx+onvFw+k6gwm3WOevp0oyYoUOfFrYlPluN3VHYbfUN6zvz8afz5ztN4fHUG5X1HufcvB6l0XcVjH19OfJRpazjKHzepuPi6cn58ZQE/WDOPh1aGYRTb2g43czQmmXvXlPDFDDW2miP86SM1F15Xwc+uK+U3V0XS9nolryjzUcc9XnUy+th6gM3bm7EuyOdu0cX87iJ/OjvH7+vA3sH6N49hPb2YB1eXcd/n9BytHcLRg53iMfcI/qHMi+vmvV3dY7pZdvbuPEZbQhhFBhubN9XQlZvLg18s494z/agaTl/sN9Xj47GP4Cc+Vj/h5fKJMZtxbGoih8f1ZYSSZdF6ZeT+2Vn89yWRriUIyszkvktjiZ80quYEjwvUGcjJDGNBdrjzk2UlY/IsmjlCRWx5Hvd8oYj/KjfOwhmcvDGSPvOmZJ3JSHywhsHOHo6MeargZzYRH2CjXrT4Ha6c+ol944LUdDTP7MmI8rsY0xC1DX24eyAyjNZoJCHATn1DD+K6HY+nx9wzQGs0ECfSb5j4BErB28fHbh6rn+hyOenDE1QGLhDOOGPM8JBp0YRww615FLY2c6hPR1ycGfuePfzwHw0cm6JIjAX5PJ7fzJVPHhVpBHLFFQm0rtvOK406zrwon5StH/HbfUoe/Ji3NIP8mkoe2z5Vac0ObVI6D18aSsOBTpe929j/4R7+fmju++Tq4Gi+vlLPP15opvCCWJrW7uCfra6NXjH3ZeHzb0oe6Opmf3UHVRMeffZ3drGvdtRJKfQr+9Z0zvjxrfK7g9NcjAqD3SL9ejdOSsHTY+4ZMNjd47hR7vb33j4+dvNY/USXy8lBGccWzrLiCHJDJ88JmyTX4gaVfYBtb+/g/r9u5vY/HqYrJ5FlUa6U/Azk50azsiyK8kid+wtgqJvX/7Ofd5pwI3nSz3YR+b58YLi0VARFWDi9JIaz0s0jXWeP0iYiYsrPi2FlSQTZwR5OoKeF557bzv3PKp+dY5yU+2N5OqdhyRt9UDBLSmNYnOA/bvC0rbWeP7/TTXy2mfoPq3h/eH6kY+ydAZOS1/wYzs4wO6Re1OZAFoljLxlJ5ySUhQvN9wWu71OyVbR4u46MnInkM4gyh+yyJUmO77sONfDE2g95d1vVpM+2fXWOfRSOtXZxqLaFt7cecvspzoxBp9XQ0NrLa1vriCzO574VIdh7NRRWxFEUoqN1/2HebrA7xrHduyqEvuZ+jMlJXJ8Pm3d00OE6lgO1gdIyK6rKo3zYInq+/TryXMsf2cK57fo8zjIN0uUXwOfOSqakv4m3agbQRkZwXkQPf9/aLq6sCG67MRG/LY3oC5I4K9GIxagjLFRDbWUnmeeWc4m2ltdqhohW8rvKgqbHRlhGImeamnm9LYyvXR5L5MAQtgALlyyNRL23jj09RlZeUcgF5h7qbEZKI+1squoZd59THWJhZYaKDz9oom5Ce+P+WCEez8mQk8UvxLHzRN/RJKLTRacnkSWc07vHlCMqY+9KuLPQj64+0YUrTOGqtCE2ifJsV87/hlTOSLSQoFeTVpbCWWF+FJVFEKb2Z8HpiaQ117KxUcWi8+e2LJYURBERPFkadGo3JpF4oLqhjf97Y6fbz1gamjv5x1u7PH76hQGPMCfj2BRUaLRaTKJLW7IojsKBFjbVQHp5EkUNldz9zB5+t3Ybd69rI3V+LDnunlg4cCN5MtaraIJZuSCA7eu28OC6Sh564n1+9H63Z2kTjZnMyH7ee+sQf399L794vUnEJJNRBURw+1cW8PgdC3hsdTLZylXq9lg9056Tn183//fXrTy8djuPbh6kINM5x3PasXei8ah+dys//cdufvpaK1EZRjY/v4Vf/WM7j221UZAeJOKuMZygshhGOiqJ7zAX49gUVH4sElHPr9bkcXlkJ0/8tZIP+3QkR+o5WtXKcL+gXfQQqoUzi53lAFeVwUScqZvK6mFvasfpdz1Imww28+rHKlZdXcJXl0SQ5OG49s4G/ufxD/jaYx/w9T8fQhkB4/5Y05/TUFsXBx0zt+00tvej83O6l+nH3vVxuH7QUQ+9HX10dInIuN1RK7R2Doh0nBOWhzlRZTGMdFSSWbG4KJmXHrje7Sc/bfTp2bevPYO1D672+Ak0jX1sevzj2BzY+3j9+XdY86v3+ebTlfynfjQMGquFpFLGntmUp9auFbPALhJTT8ivZ2mTQba8uok7/naUhuhk7rkigeEAZhx2O709A7R3D9DRZxu5Z+vuWArenpPyoHc4J46/yr4jP/R27J1nTkhZuPjUOCpF8vTbt2RS7jGMd8NJfRTsgRPwxo6TgZ9OQ5DZ3+1HqxmtBINeR4BR7/Gj3Pca4bjHsU3FAJU1vcSlWIl2WL2a+GwLUXUt7PYwCdvBBMmTsdi7OznYbqY43ZlftSmIikS9Z2kTjR9iE63VdTz171oaQk1EeXkFuj+WanbnJJj92Dv3nOiy8LKYfB+VRkugWYv/RGuaAm1sHLedn8LynHAWCUe1SPzNDfXs6byXnfH+LR4n4o0dpyzHO45NYXjc2CQPZmf/e/tYr43n3ltK+ckXK7g7f4Cn11c7JFPGjlMbP/ZsguSJ6DmNjAW0tfHiaw2Enl7CQ6vFZ00GJQa7R2kTlcnCF9dUcP/VhY4J7bbNtWybmE9xsoMBUfzXNxbzl/8SnzsX8d0ScZIejuXNOQ3HMHYRaQ2f44zG3rmWXT91nP+g+CiLJ7QsxuAz46hmhUZPVqaFeFU32xoC+cp1gbzyi+284WgUJkvHTGwrHGNWzlXx6MN72DyhkJQ3bsxLNuHf08lHe1pp9ncnO+NOIkV5i4eVi8/PImH3Np4+KPr6R7rpEG2CezkVLdHRfnTVdjtkWSYet2F2DdwJwdtxVHc8+CIf7a52fP/BDUs5vSTF8X0qxo6jOrHj2NQEW01YNQPUej3ExI3kyRjU/v4khGrpauqkYTiS8SBtotI5pVLUnd0caR+alNZ0uD3WrM7JyWzH3nnieMvC58dRzRiVgWWfL+WbFcEkJCXwjYtiiB6OpjxIx3h7smpLLN++OoUCk4aQ+GjOSlRjciM7414ixcNbPDzJqYx5Y4e7434WObHj2Gy0Nnawz9M4Nre4kTwZg623l4PK+LWx3S0P0ib2Aef4t6pZOCkFt8ea1Tk5me3YO0+cqLI4Za8EbXQ0q6Lb+OPTO3nspS388PW2kcebWg/SMWluztbdo2BtRBBJncf4+xtVPPXKTp7aZ6Nt72TZGfcSKe4faXsjp+LuuBKJ5BR2VH4i1LW0iJbVJdrcVtc5K+kYd4+CBw7U8G91HPeszuaKXPPIO9ImMROJFC/29fq4EslnjFO3b6HcWlOr3Z7ATKRjlHQmPgq297bwp99v5L6NvaScUcT/W+hO93wmEine7evdcSWSzx6n7HXQe6yLBkswBcHKkpaMfCtxrrOZSjrGG3RmPUH2fiq3HeTJLT1EhTslgcfLzkwhkTLpkbZ3ciqejiuZGbMZquIfGkxFVjjzs8IoSwkixuCmgnyQiaoP7jiV3zo0zCnrqGy11fxttz9XXFfO/TeU8IXAbg72ikhK2TaFdMw4PDwKDkpN56e3lnDPVSV8pxj+vbkF5T7geNmZoSkkUiY+0p5CTmXMo2BPx5XMjJkPVVGRXpHFHWfGsDgnkmULM/jRl+fxvSUhONpBH0atU95UNG4yyyRO7luHvB+aMxNO7eEJwsCCLGZCbT1UuXki40k6xhv0ZhNxgdDa2EXjmElIE2VnPEukTH6k7Y2ciqfj+gIna3jCRLx6889xDVVRkb9iHl9W7eGWtc2Obf4Rsdx5VSID//6A+7b0OaJx5U1ARekhRGn72bu3kcrhx5KKCkBmKHF+gxzcf4ydrc4Mus+3861AbU12EpX82rvYtKuVhiGVsBczhjFvJFLpDSQHDlF1TORXUUhQ3hNpsHPsSCMf1g04bGpUnqba4+8Pd2hJcL11SFFUSPTvp5YA5if703X0GB/UDxEcE0Z5pIqj+46xo220gGd8Dm6H5igRawjlSSbMg73s2tfEQQ+PJz99wxMc2B1v7HA3tkXBk3SMN/Qp8jI1k53FRNkZzxIpkx9peyOn4um4n1W8evPPCRiq0ltfzZMf9VFQEIbyClh1YAR3rM5nVZQOQ2gkt12fz3KL2KAysvKyQr6Q4oe/OYhzCkIcapke8+0YjpLLty7P5oJEMwUL8/jJ+eEiclOTuSif7y4JFm5AQUXyglz+36Ig9IHh3PalEtZkBxAZbuXKq8v5zqRz8Pz7wDFvHTKki++fz+M758eSFRPJmi8UcvPZOdx5hoWU5AS+dV0G81yzJGZ+Dh6G5oju6QPXKW9BMhCfkcw9N+Sx3PFWKe85xR2V5FONl4oJczVUZTx2qhu6GQw0EK5WkVKWQOaRSu5ff4hnX93Bb/cZWFEkQl93KgDT5Vurofbdbdz70h5+vraGnuQwsrRDbN7RjF9aOI53jqrMzEvTiXUtxHql+uDp982T3mbsp+vmhb9u479f3MZThwxUWJr55Z938d9/38uGwVDKYkXhzOoc3AzNsQeyckkoh//1MfetreTRZzbz+JFALigbdqjeIR2VxHfxUjFhroaqTEStUaMasgmnpyEx3IApPpG7lHxcW8A1KTqCzCJ2cqcCMF2+bX1U1TsVIoba+2jRaFBeiN17oJ5NagsL49Voo8Io0zfx1gG116oP7n8/+fHyUHsXhxxlNURT5wBtjZ2IXpzwzf209KjxV+aIzfIcJqIyBojuZzfbq/od+yr3b3cf7SLQYpzR8BvpqCS+i7BsrxQT5mqoyjg05CSYGajvQHlz/JA4Rt2OfTzkyMdOfvrE+9y6tlHs50YFQKz1XunB9VdhsIU399opzg4hPcuKrrKeba6baV4pJEzxe68Zzo+3Za8w9hwmomxTKa/Pcy4qaEUDYBu0zehBkXRUEt/FS8WEuR6qotLqySrNZHXWAOvfb6RbHHF/TTdhMWbUHa58tA/Qo2TEnQrA4GyVHuzs3tHIQFoi12aq+HBHm3CDM1F9cPf7WTJbtYoJQ3Ps3e1UtpgozjA6u3qiq7ww3cDBQ62TuqRTIR2VxHfxUjFhLoaqKDpMIYV5PHHnaTx5Rwk3Zgzy8tNbeFoJp4QDOLxxH+u0idx7UxHfu6KQn91azs2Z4mJ0pwIwOEW+xwxHcSCWFSUC8d/B4NF63u4ykzTQwBtHlZUzUH0QTP79+H0mKio4lBBEZpxxkvirKCwoG6cq+ynPYcLQHE0HL71ag25BMb9eU8zPbyngjM6D/O7Dnhk94DrFhydITiaf1PAE7xQTTtxQlVHU4hgmwvU22pq7RybyelREmIM3Fo0ye4WE42JW5+BGbULrLCNtdw+Hpyj/T+nwBMlnAq8UE07cUJVRhIMSx6isGS+J4lEFYA7eWDTK7BUSjotZnYMbtYnBfo7WdnBoluUvHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9HOiqJROLzSEclkUh8HumoJBKJzyMdlUQi8Xmko5JIJD6P13P9FHZUtbi+ST6LqNUqsuKmVxGfzVw/BWlfkpyEyfP8FGbkqCQSb5ito5JIPCG7fhKJxOeRjkoikfg80lFJJBKfRzoqiUTi80hHJZFIfB7pqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9nRnP9Hvj7Dtc3yWeVK89IIip04nuGxzObuX5/ff0gu4+2uZYkn0UKkkO5YH68a2k8XjuqIZuNi3+0wbUk+axyxelJXLY4ybXkntk4qv/6/YfsOdruWpJ8FslPCuEH1xS5lsYju34SicTnkY5KIpH4PNJRSSQSn0c6KolE4vNIRyWRSHwe6agkEonPIx2VRCLxeaSjkkgkPo90VBKJxOeZG0elM5CTGcaCrDDmpYeSadGidW1S8I+K5OKiINfSScQvgNMXRpFpcC3PAmtJHr9ZZXUtzQyTNYSyJBMm1/JMUQVG8+1bMinXiIU5OJdRNKTkJ3B23Nha8lU0xCSFsyhHfLLDKEkwEayUxzD6QM46LZrsOSmXmaAhrTCRZfGzL0OVWdTvV7KYP4skVP4mijJDSZj1efux9NL53J6luIDjP5dR5jKtUebEUWlj47jt/BSW50ZwenECN107n4evTKLAdYX6B5nJiPR3LswIP868qJQvpc4umyqdP8mxAYT7uVbMAq2fjmDD2CvDS1QmVpyfz52XZbEyTOVaOTNUGi2BZi3+4ufjz+X4ykUxprDIQJKCTgFHpQlk5bmZXFEcRkV2JOctLeQ3XynimjQ/lFJVaf2IjTRhmUUdhxTl8suVFnSu5ZmhIdQaQFzAcZShRoPZqEXvWpwJMaVZ3HlRHreXm2d5EavRG3SIwwvGn8snXi5umBNH5aCnheee2859T2/mjl9v5h9E89WVUSixSNuhGp75oNm5n4i1oiMNmE2BLCqJpijEeRGbrKGcURrL0qxAQhy5UhESEUSy1Uh8dBA5cUYCHHsKxxcawuKSWFYUWEkyjTqBAIuZSH8daTkxnJ1iQNPVwro3j7JleAqZuNgzs6JYUR7D6clGPE2t1QYGsag4msWJRvQTfIzK30hxfgwrxYWTZp6wcQzqyAjm62p5bq+eBbljjEmlIyZ69FxQ+REXbRiNujR6snKiWZYbTOQYS7GPnIvncsHPQH5uNCvLoigXPx4+pspgJClES1BMOOcUhRKp7mf7pkO8fKDXuYOX5fJJobIPsP2dnTzw7Dbu/u27fOfNQU4/P4ulwUq5tPLvd2rY6qhjHbGibAOFbS0ui6HE4qwfJfooLYzl3NIIsgKd67QBAeQIOwy3BJKfFEy866RVeiNFon7PrYhmfrTfSM9AZTSSZhGNVkwEK0osRGv62flxFesPOctQJco+Ozuac+fFclbaFFG0xp+cvBhWFVuIn+ShtCSkRbGqIobT4vTjeiXjUJlZLCKhf7/ZQEB2BGPbq6CwQIRJuBC2Eh5I7EjUpSY8QeS/PJqycI3D0TsZPRdP5aLkLTYlkhUVsZydFeC6RhUmlvnAuHJRHFdkfDhLK+JYWWghbjbximDMKc4hA52s/U8NLcmRzBc9PkNGKj9YHuHcpg/j+qtz+c7FaSyMDCApVIM1J5v7L4sjRUQuUblZ3HdZDDEqLanZUeQEqIlKVYzMSqwIbKzZWTxwnfJbA/EZydxzQx7LrUqRayg7u4g7L89lTbaZlAgDeuVY12SwyOw4MMvOz+OKdDMhJhNnrCrh2/OMkwpAHRLNt9bkcl6CmbwFOXy9xChSdm0LjOCO1fmsitJhCI3ktuvzWW5xbRyHivTcMNhTy4vbmjBlRZDhOpDKGM4N16Qxz2U86uBIbrk6hRLFKlUGln2+lG9WBJOQlMA3LoohetiaRs7FfbmoAsO57Usl4twDiAy3cuXV5Xyn1Hl+hvRU7vl8Pt9cGk5SlJkoPw3loqxuzFHCEO/KxXewcfijA6xvDeb0LANqrZVrrk531rHWwtXCtv7fJaJ8hSOPE31ElaPOhI2IC1MbYOXG6wo4V0S4pkgri2L16EJC+JxoMIutakf93v6lYq7NEBFaSCiXXFHOXRUmh8PQpaRwt6MMw4gNMxGhU1NyZiE3ZCtl6MfnzsvlUtE4mvQGFiwr5rsLTZPLUNTvOZeW8PXSQCKjYvjKxbHEjuyk57QLS7iz1IReNFYVK4odx3ZXD9qYSOapGnnt/To2acNYEj+8l1bUayHXZwy7OD2LlhdyjcuTRZfkcZ+wqbSQAJaJ/K50XDcKo+firlyE9+a0C0r50efEuQcaKVxUwINXxpKgJDupzHVjykWJzkTkd5poHP21RGWl8ePLE4gf9ZBe464c5gRbYxdHh/REBLvJlU5P59Yd/GztHp47aGT5oiB2rt/O429W8afn9rLJEsvnYgb5YMNeNjQOsff9Hdz3/GF22UU3YEkoh//1MfetreTRZzbz+JFALigLdrU+aiw9daLl3cOj7zTT5Vg3TB/rn/2Au/+vkj+/tpdfvttJSnLwhJZPRWpJHKlH9vGj5/fy8F+28NQR28i2lLIEMo9Ucv/6Qzz76g5+u8/AiqJA1/YxaIJZnD7Exh2ddB2sZ5MmjMWOWp0abXQ0q6Lb+OPTO3nspS388PU20dZNZGByuQwJx1ieRFFDJXc/s4ffrRWRx7o2UufHkuPysvqAATaIiPeRlw+zebixc+BNufgY9h4ONw0RGuw/yYBVGj/atuzg569U8sL+IVJFnaVX7eX+f1bx/GuiXPf4c05xIG2VB/n9tm76qqt58NmdvHDYTnpFIgX1lXz/b3v547rtfP+VZuJEhJTnKkOdeYDXRBk+tm5iGfbzL1GG339pP0+/Xsmv3+sgISEIR/s4BqV+V0a18vund/H42q388D8tDCejjY7l4phWHn92H39/5wC/fKURa2k0mZPMRk1WnpX+PQ0c7G/lrUooE9H3tN1HdSBni27izn9u5aH1e/jxX/azfbJxuSkXm3CMcVyW3Mkf/ncbj/1rLz/7371sDYtnZZLz2h5f5oOOdcO0bN7O1/68mydeP8jvXjzCwYjgWd1nPWGOCrUancpO3/h8O7F1sWV/r2gbBX4mEkO15CzO58fXFvFjEV0UGXWEuOlWqYwBJAd2s72qH6c2zQC7j3YRaDG6jMLO4QNNNHoQrtGFWLhweQ7fvbqIb4iWS6tRTQiv1cRa9dTVtNPpWO7nYH0vQ47vGhLDRYsZn8hdSj6vLeCaFB1B5sk3R/yTIyiztVOlFudmGWR/jZryvBCmi3r9rKIlb2lnX49zua2u0+O5jEdHcqSeo1WtDCs6tR9po9pkJNZ10KGGFj7yIPc0fbn4Gir8tCoGB4cbkTGMtS1XnQUkJvE9R50Vcl2aqDOTuxtaOpIixpdh55F2qkW3OdrltYfqm70qw2+WmR1lOByJD+Os3w72ubxTe10Xja5T8I8Qka4xhMuvVPJZxD1nWwgy+hE08QrVhYhG0M6BRrUjOu6v70CdFkHhdJ5KZxLRUC8HapwXpL27k0Pt3knRBUSasRxrZcdwy9/Typ5GESFZnPcJx5f5BDQGyhak8/XLC/nBJbEkKbY1C69zwhyVf3wwyUOd7J/uShObbbYe3vrXLh58fqf4bOOuR97jkd1uTltJSiWMdIwFaDVqbMJgB1zLHhFRzjVXZFLQVcef1+7i4U0dLgc0HkWdSyMK0x1DYmPdjn085MjnTn76xPvcurbRtXUYLcV5FrR2EyvOTmPN0lQWBwzhlxZJieI0RBp2Ub0i25NRDi4c/GwrRSssYDjnKvFda7PR5+4kx+JlufgUuiCyI+0crOnCXTs4lol1dr+os1teOubaOhZRL6L4FXsaKUPxXWO30T+dcbnKML9zmjJUDiDSdHeT2m6zM9Rczx9ecObzwb9t5raHd/HehBM0pUZQqrETXZzCdZ9L5ZpcPX0aC0vSXE2Lw4RUI+cwitPutLNogUTWHPkWbYMTlTgHcQ32Dwwph5sCFTln5XNTUj8bXtvDr/5RjQhyZ8UJcFRqrHEx3LosjPYPj/BBn2u1J/pFBNHkT3qkiub2PhqVT9eQs6KFkQzaVBj8nTf+7N3tVLaYKM4wOlt8jZmF6QYOHmrFFYR4RLlJGhfQzaYtTRxsGcAc4GoNxmHjcEMvUQmhhIuNKv8gzsg0uVrGIREZdRMWY0bd4cpn+wA9EwpeZbSyOKmPl5/dzF1PDn928VpvKKelCxMdGKB90J+EcCVVLRkFYQzfYug91kWDJZiCYGVJbMu3EufWoY0vFyWyrKzpJS7FSrRjfzXx2Rai6lrYPU35e1cuvoPOHMQ5q9JY0FPNi7undVOOOguPDRhXZ92uOhsYsqPRa3H2RAadZZgR7rjnp5RhXI6V2PoWdo3r5k1muAw/2jp1GfY2dFIXGjJav6Luh+8I9NS2UxMcRIq635XPPtr7FOcyFp3o5oXS9OEOvjdiW5v59ccD5OWEESzst73HRmREgKMraI6PYmGEKyf9IoJqMZCXZHBc9KbYSOYNb5vA+HKBDtHDqA+3ssB1T0sXJnoM1k52HJmu/LXEhokeyr46PqrvoctfT9AsjcvdZTBzREQzGBDFf31jMf9750LuW2Gle6Pog7/e7oh0bKIlGXK4ZYHruygL13IXa1+tRrewmIdEd+qua0p5+KZMyh2h7AA7D3aRdkYx969Oo0LTwUuv1qBbUMyv1xTz81sKOKNT9H0/7HGEnTYl3bGB2Jhj2XuaeXO/PxeKEPS71xRwSfAALYP2CeGqCKk3HeL9oCTuvbGEB65PIbSxk25H3kW3cuM+1mkTufemIr53RSE/u7WcmzPHhHcCU0oYGc3HeLfJtUJhqJ23d/eTnWnBPNDM+s2DnHZJGT+/oZirjV0cEAapXDu22mr+ttufK64r5/4bSviC6OYe7HVuG19uE8pFa2f/e/tYr43n3ltK+ckXK7g7f4Cn11dTI/YfLv/hIlcYLivvyuUTRDjl3iE9Z37+NP5852n87osZzBuo5r6nDrLXWTDYRKE4y2XsdwVnnb2iSXDWmehW/fzWCr6c5Qwr2g43cyQmWZRXCTdkqjnwfiXriOXeW8u4/0sV3FM0wDPrj3JUSU+U4eDEMnSUq9gkyvD1fa4y/EIhl4cO0iIyMXZfBVudqN+dflx+fYWo+xKuCxb12+Msa1vDUf74oYqLRN3/+MoCfvjFeTx0btj4+1z+ocyL6+G9Xd1j6sfOvp3HaIoPo8RoY8vmGjpzc/jlDeX85Cw/DouunqM87J288uYxgk8v4VdfLOOnZ/tTU+vaJhg+F4Xx5aIRdnmE338I5143j1+sLuM310TR+UYlzs7ExDIfm9YAm7c1YV2Qz91XFHH3EiNdneP39RbfkSLW6IgON2Ac6qf2WC9dI7lSExJmInSwR7RWg84KUsbOCE+t7e7hcJtrnVeoCbIYCR4Qv2ufImx15EWPraWLOuEoxqOkYSJcb6OtuZuGSdu9QUVgqAmLrZeq1on5V4n0zYSK7nDV8Pm6xU25iHXBVhNWzQC1IjIcLcPp8LJcBKemFLFSpkqd2SfVmZ/ZRHyAjfq6Hjocq0UZin2t2pmXoVIfgf3dwianKsOp61drdD6ttAnbrha2MV3M4g6t0SAiPDsNbvKvpJ8QaKdeRDjCZ3hkcrkot7mMxAep6WgWkf8M7F5JK844RLXIz1TB6VRSxFIzXTIjpGa65EQhNdMlEskpjXRUEonE55GOSiKR+DzSUU2JCrNZN/2oX4nkZKDSEGLWfiYv2lPinGcjtaIPCaYiK5z5WVaKlYm73ozf0IVz+625nOkaiRyUmcl9l8biTrHiZErXjJN7kcwSPcsureCW4UmXXqEmMsHK/Oww5meEkmWZYycxhXTP5DrXkr+0kB9dW8iN6TrRhM6SOZULOnmcEo5q5lIrKjLmZXHHmTEszoniwlXFPHJjJgun8ytqjSOCMiiloglkRamWtS8eonIQQgpy+Pk5o9IXs5eumTlj5V4ks0SlxmD0I2Am2iWaIM47P5trSiM4rTCBW66fzy/PDWeWqj2TmEqGaGKd+8XHc5Gpmh/+7xH8yhPIm8l5jGEupI8+CXzWUR231IpY3XGoyiENctejH/FcXziXlgwLomiITopgWVkMZ2aY3Y+WHerm9f/s550mO1qzmcwoI9FhAWQnBDlkM8ZL14iCNJopyYtmeaGVJKMrQY/yKcrxI1ku1p8W749bm/Eg9+JES2yq+H1ZNPNjRqVIJBNRYY0LZ1lxBLmho1NjhpksLTQZRWJm29s7uP+vm7n9j4fpyklkWZTKjXSOc3+3ckXCbqLHtGkqvYGUML/JMkRT1Hn/4cM8vhWK0jVsfO0wO13TepzSRk75luXCoeaMmxyoIijCwuklMZyV7rTzUbkg5x76oCDmF8awqjSSAstUwcAna3Oa7wtc36dEGW71zBuHXEsnFkVq5durM8hnEH1yHOemGDB3NvP3nV1OqZVrM8kb6KHV38JlZ0fC/vqRibxOVESkxVKuamJtpTJqfYjAROfyS5V2Fp5fwp2FfnT1aUgpTOGqtCE27eigXRPA4nlm6j6oo1IVwW03JuK3pY666FguLQghJkiHOdCAX3Mjh+OyeHCRhr9vbUdtieZbqzMp0QwwEBzGxQU6Xt7ay7KL8lkRYqPb7kfpaWksVjXy+tEBosoLuHu+jrpmOzHpAQxVtlI7duSfIvdyaQk3JEGnXyjnVViI8O9n87sNVNkVOZBibk60UdulpWhxGkto5q2agSkHas4VeYkh5CaEOL7/8729fLy3hl0HG8Z91r27h0HXMOf2rl7qmjoc+038KHPFYsKdYe6rm2toap9uvtXMiCzO574VIdh7NRRWxFEUoqN1/2HebrA7pIXuXRVCX3M/xuQkrs+HzcIGOly/daA2UFpmRVV5lA9bxDXQryPPtbwzOosHlkaRm+SPRmWn7XAbgxnu0uwiZWkJX4npYL1j4q6KlMWF/L/0XtYfDOBml41VDsymzm3ClstZnR9CWbToDgZHcMXiII5tO8Zh4ciilfNfZUHTYyMsI5EzTc1saAgdset9/tF87fJYIkU92AIsXLI0EvXeOvZ0u85/GEXm5STYXESIgTMKolxL4/HBxnhUauW25+tpF/HG/AtKuc3RwoxKrdy+voleERDu1ZXzpaJAXnl18mBBlVqNyV+E+7GixUgZYsuLHWhjE7g8pZM//M92Xu8S+xhb+eZNyaxIqOGxWtcPJ9C29wCPhwbzi9hqEaHVO6RXjKHObUqessviSTm0l9teOOaQllEmtiJMUpFPWe/YR3QdO008nBaM6b1eEuPMtO3ey1/fHjsVYpQRuZdHd/KGMJqQrGzuP8/ZUjrkQGLb+P3/VLJJZERXreFX50SR9tF+9rhL7ATyxCubOFzX6lpyz6bd1Y6POz5/Vj7lOXGupTlGHciyikB2/+t9frldXLXmMG5fk+V8MCK2OaWFNvL4viHRXLejvzmdz8XU8CfHfJmxqNBotZhMOjLL4igcaOE3yrykQJd0zuPbeVVRVBBpXuMhzb/uaGbN0nAyX21lu83MvDQdmzc000248xCC2dW5Ejio8W8+wt3/aKJdHUT3TflUxKt5a28gKxcEsH2dOH/HnMh96DQi39rR+x/29hruf6zGteRHq2UeJXFaXmwcPx7eF2xubJzoI8yN1IpCSI6Iem4q4dtLAqh6dRt/qBwkIDIA6xjJCnt3G7ubdMRYZ3uDUke8CONrqtuE4TkZjibcy6fY2Lq5FnVFEfddmMTiSO2k404l9+IfbibKEMylVzjlQL5/ZigBJj3uZL8+0zhkTXrY52r17V2dHGpzFeIMpIUUBdZF55bzqzV5XB7ZyRN/reRDV+A3TjpnijR7D9SzSW1hoXAg2qgwyvRNvHXAadHDzL7O7TTWuyJBWy+NHSr8/ZSuqYk4UzeV1cNOx44InCagJjI9nhtE5H/PNbmcE6GoK0zuIvuCzfmgoxJFKiro+KRWnDRv28ENv3yXW3+3lce3dDociaPuFQmU4eRV4rvomvcP2GYdxir5VYvobRxTyKd0HtjPtx7dxsutAVx5dT4XKVINY3Em6LZy3MuB7GbjJCM88Xz3+rP49TfOd/v52VdW8th3LuaP37vU4+fKpYWulE4ETlkTR3A7EVG83ksL9fH68++w5lfv882nK/lPvYeCnirNwRbe3GunODuE9Cwrusp6tk2cxDcndS7SGINdmNVEsxyLNiGFu1aE0rrtAI+8uJt1teN/P4wv2NwUp/FJcfxSK1PRrkhWWC2Uu/S0deHhlIV2sH0ayQpF+kKt14xIX4wyICK+PuJSLThUM1Q6sjKDp5BPURMSqMPW1c6GDft5rdVIfKhzyzBTyb045ECCgkgeKwfSP3mm/skgMzGcgrRot5+K3HgyE8JJjrF4/FiCT6COaH8XVa0GcpNHZU0qhhuEqaSFZsuUadrZvaORgbRErs1U8eGOtkmTjee6zhVhvIPtZorTneevNgVRkTh+RKDJaiS0pYkNlZ3U9WoJHfP+gbH4gs355M301uYBYspTubo4jCVFIfTW9WNVt/Piri7a67vxz0/nhvlWcUFEsmpJAumddWw8NrbYVFiTYyijkVf2jVcetHd0Um+I5Lrl8SxKj+TCikDq3tjNk/v7GVL0rSrM1H5Qx76hMd9Fv7x/SE/5aYkszwwjurueLZowVoX38Py2dpqO9RNZmsZ1ZWHML42jQtvGup1taCLjuKzcSl52FFmaIfxUXfxrex8l55XwzXlWyopjKaaOv7zRTMOYq8Te2U2HJY7rz4xmXn40+QOdNAeqqNx4jMMi/zX6CFaL/FckWzm9PImLYvrZsKfLIalzohl7M30umfub6f3U9hhZuTSFpRmRnJ08xIF2f9Q1R3lX1FdVs4YlS9O5ICOU0nxRTwuDaN7ayJGx3krlT1GpFfZUs2nCrThNRLij/l/Z1uFSBBiYMk1bxwBBeQnMt9Xw+w0ttDgSGbWxyubZ1HkP0dlxJDRX83qtknENKXkxRNQd4a36Hg53Gli+NJUVwmaXzwtDd7iOD5oNI8fc1aYiuSKJFakhLCwIQtsvIrqGGt4Y92RH2KPoNp8Mm5vqZrrvqiecYKkVP5OIeGYoWeFO+mIElZZwRaamd6z0jCf5FKckiFXVz5Fjfbg//NRyIA7JjWANg509HJmR1M3x4Y16wmw4UeoJDlmTADv1DW5kTTxKCx0Hx5Xm3Ne52t+fhFAtXU2dNLhrB7Q6Yix+9InroHEar3OibU7KvEjmjFPNUUlOHaTMi0QiOaWRjkoikfg8nxpHpdb7YTXN/g0uEolvoMJo1hM0PIVGrSVE2PVnHZ8tAeU13HmJ3j2+DsnK5NdfLuG7V+Vy3lzNGJVIBP6hoyocpYlmQmYyN37G+DH/3Ar+e3UBd18UL5Z1zDu3hG+XTnyV6TAaUvITODvu0z/b02cdlSYqhi+fF+tamgotRflhtL/7MV97bCsvjBumMLeozFF8/YvplMzaWP0486JSvuR6xbbE11GRXpHF7WfGcFpOFCs+V8Cvb8pikZuXY88J/qGckdXP/z25ka/99TDamFiW+x3lV296esigISwykKQg6ah8BC3RkQZMOn9y8mJYnhuM47V4wpBCwoNJDFBj1xvIjNQLV+Dc12wKZFFJNEUhSoSlJjwujM+ViYrPCyFm3Lg3T7PCJygcqP1IiDMTYzGRmhBMptW5p3P2uo60nBjOTjGgVemIiTYyrNOgTMGIixZ5V/IaEUSy1Uh8dBA5ikaW2BxoCSBmZBSpiuAxM+0npS3WeT/bXTInCPNpP3CIXzy7jR/87mP+0RfOsozR9/a5V/LwZK/DuLE5YScJiQGEiv2MIopLClQ7RoP/72sN1LjGAUxW6Ohn+6ZDvHxg9N0u/qEhLC6JZUWB2GfsAE6dgXyRl5UlEWQHn3oN5amRY30Y11+Ty7cuz+YCEX4XLMzjJ+eHEyycSXJWFLlBKiKSxcWbH0yIv9j36ly+c3EaCyMDSBI1by3J5ltLrMSb/YgvyOQnl8URq9ShY1a4CK3LAwgQjm7JeUqYbXQUSnR5HnefFUKwzo+s0ijyzIEsFOlbtAZKSuNYnqZ0SzWUnV3EnZfnsibbTEqEAX9jODdck8Y8l/NRB0dyy9UplGi1pGZHkSOcalRqLOeWWonV6FiwvIg1mS73qPLn9JWFXOOIuNykHRjN7ZclUR6uJyhcpHt9PufNTE9QcjyoVKjVQ3T0OKdbOZQ8VuezKkqHITSS20R9LLeIDR7tVUnDvc1p/ANYIOzLqjZQWBrLGfF+GNJTuWd5hON3DoWOGwq4NNVETGIc37hImcytoVzYyI05zrmu1uwsHrhOsXsD8RnJ3HNDHsuVl4aqjKy8rJAvpPjhr7zAtSBENOinFqeOa9VqqH13G/e+tIefr62hJzmMLO0gm17fy38abOz/cCf3/7OeesWCdHo6t+7gZ2v38Nz+QRo3bedr/7uL3792gMdeOEJVVChZImoZmRX+bCXPvLWfB9Y1EV0WRZpa7VI4qOKvbx/ksecOsqm9kafW13G0v52XntvGg+8Oz0ZVY+mp44Fn9/DoO80O9QT3DPDBhr1saBxi7/s7uO/5w+waOwraLePT7nTMdv+Yh/55gD+/vJMX6wMo/Azcn/ikCUiM5ysXiMbuunzO7j/Cc7uUCTCjSh73rz/Es6/u4Lf7DKwocvUL3dqrZ5tL7Wvi6XW1HBns4JXnt/P77WPfgDeq0PGD5yt5/IXN3P7UUdc2F+pAVi4J5fC/Pua+tZU8+sxmHj8SyAVlwSIrZtHb6Oe9tw7xd3G9/OL1JocCyKnEqeOobH1U1Ttnwg+199Gi0eBR9NPWxRaH9o8LjYGyBel8/fJCfnBxDAkalePd+Z5nhU+vcDCKncMHmkZmus8tE9P2bra7ZG7pa27hnZ0NbPjwKJu0sXz1HIvotk+j5OHBXmenROBZoWMYlTGA5MButlf1O46pNIy7j3YRaDFiHmzm1Y9VrLq6hK8uiSDp5AjTzimnjqMay4ycgoqcs/K5Kamf1zfs4Vf/qGa/K5KZalb4tAoHnrBPMWvfDc5J8yqvnI23s90lc0t/eweb9jby3tbD/M9rTegzw8kWTsdrJY8x1TRbJQKnnUxhVMoxRNfUb0zjreii2QZtwmUNsuXVTdzxt6M0RIsu4RUJJJxirdup6ahmhNbx+ve6fXVsquuhy18/Ij3seVa4e4UD+6Adm1qDcYrX0tgHBmgf9CfBcfdUS0ZBGPHDpWy3MWhTYfDXuBzTEO09NiIizA5BN2WG//wpHKK3s90lJwiVH1nJZgxtPdTZZqfkMTslAvcKHWOxd7dT2WKiOMPovDmvTHhON3DwUCs9Gj+E6dBaXcdT/66lIdRE1Cl25ftudkXLMyg+DkRzMqS0RMO1KZaVbc7NynrxfTgSnrivqOTN25uxLsjnbhFuf3eRP52dzu22hqP8cZOKi68r58dXFvCDNfN4aGUYRhFqFy8r5eHVhXx/dT5L7TW8etCGvauVLccCueraUn56jvMutk051tgofKCZ9ZsHOe2SMn5+QzFXG7s40Cf2cW5k58Eu0s4o5v7VaVRobWzeVENXbi4PfrGMe8/0o6p2SJybY+dJaXfsr2dzUDzfuSqfH4pWMaKnjwFnIUhOEIpOmaU4nyfuXMyfv1nOzVEd/PGlI1QJOzu8cR/rtInce1MR37uikJ/dKrZnigZqCnv1bHMCZZ8xv7O50lH+7XnvAO8GJHPfTSX89KZSbkx1jggdsRF7By+9WoNuQTG/XlPMz28p4IzOg/zuwx7sJgtfXFPB/VcXct9lMdg217JtGofqa3xmJiUragkxpiFqG/pcshyjuJ8V7kHhQOtHXLiegRYR1fR4KjoVgaLVsth6qWqdOMvcmW7oYA8HXTPktUYDcQF2Ghq8mG0/g9nuJwI5KXkis1PymJUSgVuFjgkI+1R6ENru8fuodM716s5ujrQPeXe8k4xUT5DMGdJRSU4UUj1BIpGc0khHJZFIfB7pqCQSic8jHZVEIvF5pKOSSCQ+j3RUEonE55GOSiKR+DzSUUkkEp9HOiqJROLzSEclkUh8Hq+n0Cis+7Da9U3yWeWc0hjXt7nlWFsvu48OixFKPosUJIUSaBx+/c54ZuSoJBKJ5JNAdv0kEonPIx2VRCLxeaSjkkgkPo90VBKJxOeRjkoikfg80lFJJBKfRzoqiUTi48D/B96R0bTg6TuXAAAAAElFTkSuQmCC)
Q1891978
Contabilidade Pública
Após receber algumas denúncias nos canais internos de
comunicação, uma autarquia federal resolveu criar um comitê
para verificar possíveis irregularidades na execução de contratos
vigentes do órgão com empresas de prestação de serviços
gráficos.
O controle exercido por essa autarquia na situação acima é do tipo:
O controle exercido por essa autarquia na situação acima é do tipo: