Skjærehastighet

Skjærehastighet
Den ideelle skjærehastigheten varierer fra metall til metall. Noen typer stål ha en ideell skjærehastighet på 80 m/min.
Hvor langt sponflak kan du i teorien få, hvis skjærehastigheten er 80m/min om du dreier i ett minutt?[br][br]Diskuter med sidemannen din, og skriv inn svaret under.
Dersom du skjærehastigheten økes til 90m/min, hva skjer da med lengden til sponflaket?
Omdreiningstall
Antall hele omdreininger arbeidsstykket gjør per minutt, har en enhet og et symbol. [br][br]a) Hvilken enhet har omdreiningstallet? [br]b) Hvilket symbol har omdreiningstallet?[br]c) Forklar forskjellen mellom enhet og symbol.[br][br]Diskuter med sidemann og skriv svar under.
Formel for omdreiningstall
[br][math]n=\frac{V\cdot1000}{\pi\cdot d}[/math][br]a) Hvilke symboler kjenner du til i formelen for omdreiningstall?[br]b) Hvilke av symbolene representerer et fast tall, en konstant?[br][br]Diskuter med sidemannen
Video som viser hvordan du regner ut omdreiningstallet når du kjenner skjærehastigheten
Logg inn på linken og du ser formel for omdreiningstall og for skjærehastighet. Snu om på variablene, slik at begge viser formel for omdreiningstallet.?
Aktiviteter til simuleringen Sett glideren for omdreiningstallet til 30 r/min i den interaktive simuleringen over. Start dreiebenken. Observer at arbeidsstykket roterer. Kilde: NDLA
I spørsmålene under, skal du svare ut fra simuleringen over. Jobb i par.
Forklar at du kan finne omdreiningstallet  ved å telle antall omdreininger arbeidsstykket gjør i løpet av ett minutt. Kontroller at omdreiingstallet virkelig er 30 omdr/min.
Vil de to blå punktene på arbeidsstykket ha samme omdreiningstall?[br]Begrunn hvorfor du mener svaret er ja eller nei.
Hvilke omdreiningstall er det mulig å få på dreiebenken i simuleringen?[br]
[br]Forklar hvorfor det ytterste punktet på arbeidsstykket går fortere enn det innerste punktet.[br]
Hvor lang tid bruker arbeidsstykket på én omdreining når omdreiningstallet er 30 r/min?[br]
Hvert punkt går rundt i sin sirkel fra animasjonen over. Under er allerede punkt for diameter lik 15 allerede regnet ut. Kan du gjøre det samme for diameter lik 30 og sammenlikne avstanden rundt sirkelen?
Regn ut hvor omdreiningstallet n til de to punktene i simulatoren. Du trenger kun endre diameteren i oppgaven under.
Vi antar at diameteren for det ytterste punktet, gir den ideelle skjærehastigheten på 25 m/min for materialet. Hva må omdreiningstallet være for at vi skal få ideell skjærehastighet, dersom vi skal dreie på den delen av arbeidsstykket?
Regn ut hva omdreiningstallet for dreiebenken blir når arbeidsstykket vårt i rustfritt stål har en diameter på 30 mm og den ideelle skjærehastigheten for materialet er 10 m/min. Du kan sjekke svaret i kalkulatoren nedenfor. Start med å definere variablene
Her kan du sjekke svarene dine.
Oppgaver i boken side 185
Oppgave 4.16, 4.17 og 4.18 i læreboken Mønster 1TIF
Kilde
[url=https://ndla.no/nb/subject:1:919bde2e-9525-4eb1-88f4-3f730f793cf9/topic:9:8a5f5ad6-30ba-4f6d-abc1-606a98c676c4/topic:9:985542c4-60f2-4fe3-b9cb-3d14dee8a2cd/resource:30afaac8-03f0-4fb9-b2aa-6e6f7f4e04b6]NDLA Skjærehastighet[br][br][/url]Skurdal, B., Hove, H. (2020, 20. mai). Skjærehastighet og omdreiningstall. NDLA. https://ndla.no/article/17698[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAacAAAB4CAYAAABW8D3WAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAF38SURBVHhe7V0HgF1F1Z5NspvtvWR30wNJSIAUei8iFkR+AaWIigWRDqICYkEFAaWJCCqCgPwiIiDtB5HeCYSQ3nvZ3vtuyn++c++8d999c+/Ma7ubcL9k9tyZ+2bmvnfuzJwzc+ZMmnhmxS4RIECAAAECDCOkiWcxOKXRJcaogAY0oAENaECHngaaU4AAAQIEGHYYwX8xUAU0oAENaEADOkxooDkFCBAgQIBhh0BzCmhAAxrQgA47GmhOAQIECBBg2CFSc5II4pEI4pEI4pEI4pEI4pEI4pEwjFuDk1t3CuKRCOKRCOKRCOKRCOKRCOKRMIz7a05uKhHcV1OJ4L6aSgT31VQiuK+mEsF9NZXYQ+7T4ETDFI9UcvhyxN2UoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUoUiXlKFIl5ShSJeUEY4HBhEBAgQIEGDYwdKcGAENaEADGtCADg8aaE4BAgQIEGDYgQan5TQ4pdFAZZEQMGSF4sH94H5wP7hvR4HgfnA/xfcDzSlAgAABAgw7hNecMHLxtRyrXPHgvn1tx4P7jgDiigf3HQHEFQ/uOwKIKx7cdwQQV/wTcD/QnAIECBAgwLBDmnh6OYYoa8DaDWjOiBEie1SayB81QozLShf75o0WcwsyRVXmKE47rCiLPuiPd1t6REPfDlHfv10sbO8TSzr6xMbuAdG5Y6fo3L5T9OykyjTPEVBvmkN8yB5BPEonHmUSj/Lj5FE/8ajP5hGFzb0Don1gp+gm/nQRn0yfJ6BhmkY0h/iSS+2oIGOEGDs6XczIyxDTczOYR6OJb5NzMkQB8UkFNI35bb18Pa+1R2zp2S6WdPaJNZ393H46iC8dRHcSe0yeJ6BqOjrNaj85IykQL/anfg7tqJCuDyq02g/aUzUFJ5oHdoi1XQN8vaqrXzRTG3qf+LSK+NNE97q272L+dO8G7cehOXl9SmLo7ucSQ2bnZ4hDi7LFftSQJtCgtE/uaFE+eiTfTwY29wyIdTRAraXwETW+he294uN2anBgIsP7+Sx8su8XUUPajxrQwUWZRDOJR6OSzqN6EiiWU0e4kTrExR29YhHxZwHxCoOY7vk+6fdLaSBCp3ZAwWgxg/gyOcdqQxAWkoFu6vDQdtZSh7icOsKlJPC909Ir1lOaBf/nC+7vEhkkMMwl/hxYkBUSGNDXIYx0fjRObOvdTm1nQKymwWsZ8edjEvjeIyGwjfs4/fMN9v1hrTlNoQb0vQlF4sSyHFFBnVxxxkiRThJFqtFL4mEbSRmbqBN8pq5T/H1rmyWNaJ73k0inZFs8+gzzaBQPUukkfacaA+ARNao60qyer+8SD29pEwupwZk+9yeFYiC6ckqxOKY4W5TQAAVBb1SK2xCqxmDVSlouhLz7NrWJZ6kd9WNdweM5P8l0DGk/51Tni6+PKxBjqA1BYMigNoTbqcJ24gW03Dbi0Vs0QN2ypkksovbDSz+a5x0sqtCcJAY/DnZgAEKH9wNqUCdX5IrMQejodMBghUHqjxtbeYoJqvKuOL7fnhBHCng0izRZDErDhUcD1Krebu4RN61pFguoQ2zs3y527or9+4Wxe8bBiirq4A4hDfZC4s/xpdnW7SHGBtKg7trQKp5v6BSrOweIX3LeTyI53z+M4R0vJCEOU3XfHl8oTqvM5em7ocarTd0sSLxF7Whzb/+Qtx9LcxoGKE4fKU4ZkyvOIAnimJLsYdHhuYFB6nVi4KNb28VTtZ08v/tJwu7Cow9ae8S/tnWIf9V08FTGJwWYaTijKl/8z5g8sV/+6GHHH2INT/M9V98pHqE2BD7tGBa9z+ChgAYl8Ohz5TniWGpDhdSmhhPAD0zJ/ru2g3m0orPfvjP4CG/CDY1cg09PLMsVN00vFXvnZPDiH1KHK/DUWIxf3dUv7ljfIh7a0kYp/t9vT6Cn0qD0k73Bo/RhzyOgh1pZTd928avVjdTIOkTfHr5Cf+64fPHLqWViTObgTH0nAgxSEOyerusU16yoF/V9fmseew49vjRHXD+tVMwpyByWgp0TmPar69sh/ryplWcj+oeg/USuOUkMQhxKLBb6MB8O1Xa4M0sFrHv8mzSo66gDXEHSBhodI47fYzjGwZIp2RniZ9SgzqjMG5S1pGQDkuBLjV3iqmX1JBH2c6NL1u8TwhDFwY+DCzPFdcSfE6jj2x0BI5efrGwQT5CW28SGLYQk/T4hDGEcl9PzMsTlk4rFdycUWom7GWDN/IOl9eLtlh7LQCyB34NhGB8SzSl31EhxemWuuGRiEZuv7u5YQ1rU3RtbxcNb2kVDP6aRzH6H4Uxh2PD1sQXivPEFYmbeaErbvQFrzD9tamNNd3MPeGT2OwxXCuOGa/YqEV8hoQFbKnZnQMt9saGLtNwmMb+th1LMf4fhTGF9h/ZzAQ1KsIzcDWW7ENppUPrHtnbSoprE+u7BaT+DvuaEOdbbZ5aL06hR5SXJjBWABLa+u18shsUWASpp2IxViDIYWuRYjRid7djMUUlt1Fjr+E99l7hiaV1EvbsjsLZ09/4V4pQxeUnVaIeaR33EozeausUFi2tDe0F2R+C3eXBOpZidn5kUE2OJ90kybiTtBWsO6IwknyRKiT/TcjJEEdGpRDE9lSxTdHRCkMqvXdHAhkeYldidgXf5z7PGiM+X57LlXTKB/UvYp4m9gDvZvC4SRxRnc50wRU9mH4tZCPDorI+2soVsqmFrTgT8jRy4LCqR4H38RNPox7p9ZgWbHccDFNmzY6doGdjJGsorjd3iw7ZeMY+Y5GnqLeFOJ1pBnR+mRbApFObqMOOExpA1Mv41FWhRFy2pE6/Ts/U5XxxF/RGVDIP7o+iFnkE8evzAarEXdT7xAMV68ggDkU/9queDeTrzqDBLnEA8wsbDRHlU27ddnLugRrze3M1CBcOj/hCGwf1MGomOL8kRd+xbzuuz8QAdDCwZt/Ru570ur9FgvaC9j6ellZvPJdzpNq0k/hxK7edAGqiwx21SVoaozhoVt1DTRe/OX0jDvZG0qDqehbDhUX8Iw+Q++rkD6H29fUYFDRL6zeZewCBQR4LC1t4BsaCtT7xFfFpBfQt4htUf0+dDn7YPtemDqf0cTs8zjtpPdWZ6QvsPWwZ2iBuIP/duamUhhuFRfwhx3B8UzQn7Kr5QkStumF4qZsQ5RYRO/x3q4F6jzg7MwmZMSMLJAnbGQ/WeUzBaHFuaLQ6gxhbvdBY0hJtJ/b1nYwtPWewOQGdyVnW+uH56GQ8A8QA8gvcAaJCp4BEAbQE8Oowa2uHUKcbLI2gId6xrptDCHeJwByTgyyYViav2KuG9SvEAJsLYEgErOVhhYY9YMtmTTQIDBFAIOJ8mQQJtvoQ0iFiBdUFYxV60uE6sHEJrsVgBbeVsakM37lPGg0I8wPTzs3Vd4tWmLmpPA/z9sWcsGUCfPzYrnbXe2dSGYNUJwS8ezQ6DJ/auXbmsPmUWsdGak0QS41+iH+GufStEJXV6zo+YAMy6fX2LeLq2gyTeHeGOJInPx3DEseegJH2k+MKYXHH1lOK4ppbAvPs2t4nLl9ZZCUl8PkaS4xdPLOKBCdM0zo+ZgHlEnfzTdR3srYGlqSQ/nzueRQ2qjDoAdIB4dkiHsQKNHlL6ZeBRkp8v2fHbZ5SLi2lwinUDLWQjdHQ/XdEoPmrv5ekyFJ3o8+jiaOnFo0eI74wrFD+iAdXLHZIfMH111kfb2GNLsp8vFfGLiD+/oYEJg3SsgOcGrOc8QH0G9uxxN5fk53PG4cYqnTRxtJtfTSvj/YqxAkW+QwLP2Qu2iU2YFUni8yGeUs0J0vh5EwrFnTQwxQJITnAl9Pct7eKWtc1DLtl+j77DFTRITaRBKlYp404aWH+6oiGs/g4zQAq/lBrVDTQwxQJ0elg/ghHIcODReeMLufPGPHusPPo9eLSygXfLDzdg/e8nU0vEFZOL7RQz4H3DpuR7NrSIFxq6hnQNZ1J2uriEeIMOcFJ2RkzrZIvb+8TXqPPD5vfhCuxdOqsqX9xO/Vws05mYVcHswmPbOsT9m1t5xmUoAH4cW5LDPMLm7Vi1vudIg/reolqeKk4mRoqzLr4uNGIlkYJJF9KXxaiMKTNTQAr/w4ZWcfWyBvEkSeL9aFQ+9QwGnU8SJ6aq4DhxPA1Q8JBgiv3zM3ltCx1Fr1yDMqw31RT7lX66d4n44ZSSmMzE0Yj+vLFVXEWD7uPUsPpZ7CFo6kslhXT9YmOXqKUGgs4wFh7NKsgU5RmjxJvN3dY0pEF9g0HxHX41vZQ6jeLQLRPAoOGa5Q3iRrikoU49NORq6ksVbaWBEu0Hpsg7qA2gTZhqgFhzxFojvtN66hsYmvoGk0K4++nUUvHzaaUxDUyYYfjF6kZx3cpG8VxDJztkNakvFRSOIGCY9FR9h1jQ2sfvHdrQCEMeTSWB8JCiLPF2a4+1HcCjnlhpyjSnL1fliftmVRpbi0ASR+fw/aX1LC3xfpRhBjQoMOJG0jJOIinQVALEAPsn6swvXWJP8Q0TQFK6KcZpCFgI4XuAR8leT0oG0D9Mzx0dM49gGHHvMOPRbTPLxeWkMRl+Bcb9m9rEeYtqkrqWlEzgu2C9EEY3phI6vgocyp7+4dZhp0FhVuUO0phiEcDRz31x3lbROkw9zOCbQFO/ld4/U4BHmOI7c/7WpGlQSdecwKMTynPE3+dUGQ9McOAJtfZi6hhgdbfTp/yhpHgumHBCo4NKPpskbpOOfSQNapAsIJG82dQjBoZY04BV3gUTisTv96sw1pgw5fXXLW3i/IW1Yg1JWRAmTOvzoxjws+g9gSySDL6jnAZq9E/WEI+oh4YBhQmP8BzgUVH6SPF6S7fgWViD+lJBs0aliV9PL+cN6vKWDpgG//6yejbECXUNmnqGim6mzgv8gcNTmKajffgBd9F2jijJ5v1QLXKK3KP8waAQejAzdNtM86k8zDj8dm2zuHRpnTWFrCh3uFAIoZiJwDQsZot0XxG38TkYxMBHH9bc/co3oTQ4XXSdFZO9TfwUbkGPLskS98+uFOWGUhEaFabwblzTKLq5x9PXM9QUj/kWST84GgDMgASoaV8M+DvDYucHLb22ZuhfTyoo9XviS5V54pYZ5cYaE/Noeb24lRpW+3ZIe/p6/GjmiBE8VfPlqnzxRdJuvkJaNizvYIKLaRKcEZTo74PpI1inYU5/GmlSpjzC+WDwpjO/tYeeASn+9SSbjkjbJS6eWMwbbE0FB5iDf5e0pRfqu4bsvYqVwhz5NRLUWuh9OooGHZNpPkzxwWz95YZuW+vQ15MKiumur1bni9+RxoQtDSaAdeT3FteK/yUBr2s36ee2Ujt8ramLtzDIM6R0wMzSPnkZ4j8Nnbalsr4eL2ppTgwkJEbRAfxx/0pu4CYdATq9i4lhcDJo+VACdh8K/3o4DwUm6Jij1QGdDebbsT7Ce34Y5vUlg2IwBY9ggSjv+CHMo04aWJHiX76OTiFJGcLLZZOKxUnlubwXZBb9JtiDcVxJDm9axLTPvNZe3itlWq4Xxdk1sfAIxhTQiD9q67N5ZFZPsuhhxdnEnzFGm1vBjldIuv3qRzViFX1PZo9hPSYU2gE6YoyRkprkM6UQRrEWC5PpY0qzWViSd71QlZnO/cyLNEDxerRP+amiOPTvD/uNMZqWxBMu7+gTp364ld5DCKVWukk9w4FiVuv/SOjBtPeRJERAy5Wf8AJcnmHQfrmx2zG97F+PiqaJp5dRdiRIRsdHs0YK8bc51ez5QQc88MquPnHyvC08l2xS/nCmOSNHiscPqhbHE/NMpF1sAj3y7Y22lwLzehKlhemjxD8OqDLaBG3xqJ94tDlpzzkuK0M8d/BY1iB1wJrWSfR+bO5JzvuRQz3t4weNjYNHg/d+TqRG/Qz9PhDudICGBK/RP1pWz1ssTMqPlS4/bgrRSPxuXTN7cDDJb0ox8J1O/QaseqEd6YApo+tWNZAm30Ix83qSQXHUxb8OrBafMvRlCOHh/EV1NABjrcy8nuFGR5OsdBFp9DDQMZlxgWZ7yZI6PmfNpHwVdaw58R811dzHGsaVU0p4gV0HdHrYTPvNj2tsd+z68of7fciskBIwP4sNbro5dExdTc0ZzfPnPJWpKT8Z9+HP8Dczytldvw5RPOKiFOVKanAfHRDOf4KhjO73AbD2g42ymPu2jpVxlOemBvehhMXKIxhWIA+OH9eVn+j9POLP3+ZUGR1hD7Pwuze0ih/QwNQcWrtQlCtpnPfv2q+CXRY5A1wcvUHaTsTnPfKHqOY++IspcmirJ5bn8G/vB2i3mGaCJoJTkXXlJ+s+6r2btFrs2zTBk7Ud4ryFtWJjr0YDt8u3MDzvo5vCqdMwdvhMea52GjaTBjCs4b5AGi7WgHXlq9LpLaBa6b/1xyOAuNMc4QRSybFXxgTQmC5cXCOWtPdSzC4DRF6rAog7zRlA3GnOAOJOcwYQd5ozgLjTnIH+19ALeNnSWvFKUzel6QEvFN8eX8BrQFyMszx3AHGnOQOIO80Z6P/JFTk0MJk1qigeoRhZliqAuNOcgf5jE+aRxVnGe5DwOXyeN2+iGGd57gDiTnMGEPoTK49wZhWOorC2jrvKdAYQd5ozgLjTHAEbIs+fUCiOo/p0QA4cNfGTlfWig9f/KAWJdlnKAOJOcwYQd5qV6AHX5/ijrjRnAHGnOQP9h4+4lxs7xTkfbWPPFbjjBwgvD82pJE1rpFWMLEsVQNxpzgDiTnMG+k9DKK8zmQh3yPUqCTWYDt+GgQkJ/McjgLjTnAHEneYMIO40ZwBxpzkDiDvNGUDoT+/OneL+Ta3iIvpe2NfIyT6ozhwl/jG3SuSxpuUozx1A3GkUKJdzxPIKgCo9jaSpUawxmcy/wlrlOyRJLG7HzhhnOYAz7g6AKl0GQJUuA6BKlwFQpcsAqNJlANKo89shTvtgK7+Y0D78AAsfHBUylaRzC6pyZQBU6TIAqnQrwIoGmq3JwWZqHgGRZUYGQJUug+A5aLyssQCfDy84q8qVAVClywBY17HwCObBsGrEAm9kee4AqNJlAFTpVsCa23foXTCZbsQazdXLG0QnL17IMoBwedEBUKXLAHilq6D6nDvNGQBVugyAdQ1Lrx8taxC9vJjuD/iI+wG915YZt18AVOkyAKp0GYTYK2c0b/I2MRnHbAMMiLbRuybzR5fpDIAqXQYgHMcyAmYA5hZkiQM4ZNrUChOyMkRxOkQqdf7oAKjSZQDCcThH+OWqJm37AbAp/qKJRSRsoh07y3QGIDpdiqUEUBkAszjWmLCQrQP8L3174TbxTrOUWtXl7e7xrh072GURjgrXAc5Vr5taYsfU5SUjDqkcR0LrEOYRpm28y7MQWzyd3rcCg8HRCXwe+SxElpdIHFLf5aRBmfAIhiPX80ZyxNTlWYg//sO9io0cuX5Mz3vW/K3sw9CZ30Iq4n5QfT7xODSoR7e1ix8u0+83g8HGOWPz2Tu6V3nJil84kdqQwVop1ipP/WCLmNfqbENAZHmxxvNHpYmv03f9G2mL/zl0nHjqoLG89vWYIjx98Fjx/KHW/Z9R/4LBKz2J7y+MI+5a3yx+s6aJ7/gBAhdmiCZnQzBVl2chOu6y1pMB0McrRqeLJw+q1u5nwpeBg80HacQNC0TR5e0pcWgf6Ojh6Vy3eIj1D8ybW5sL1eVZiC8OqfzeWWN4DtgP4NHNa5rF34hHWGHxKi/eOLS2b4wr4OkYU8Ba78HN7Wwx5C4v0XgsPIIQgR30H4d4BESWF2/8hLJc8dsZ5VrrVjzvt6DRdshNqOrykhnHIYZuQOMMrzlFfj5ZcfQRH7T2sudsaAd+ygrWp3KIf0/WdlJ3pi7PQvxxSP8Pz63idVM/QOjBGtObSfp90knbgMs0vB9/nVMlvlKVz9a+mAmB4QjakirgHrTKfUggPa40hw85PGdsAdsG4CwmtPXINg5E1+8Xh+Uu1mMPKszk9uH302CP2mjiERzaepWnilu7HzFaxUgh0V4/vZR/DB1ea+wSd6xtso76NSx/d6b492xth/jjxhbHYKwGJIvLJxeRGo4OMrKcRGkmFXnHzAoj65pXGrrEPRuaxXY+jlldXiIU5fLGvBiAz6fqeXYRfbauQ9xC0p+OR5DQ4aKmKhPrG5HlJELR+f52HzOfhrevaxLvtnQry0kFLbFE7ShAELXWSdX5kklvpT4D2wB0gDf9k8oxe6MuJxFaQF8WWx9McN+mVvGfuk66ii4nFjoybRd7C4cT2bePnMDT/xiAEwG2UWCQe4fKQ789m7RA1GPyPH4U1qI4KVcHHFx6aBFpuIblgo6whjwKIEqKC2fcotiX8sUK/QI7piCuXNYg2qXFk6uceOsPU1w4426KC2fcTXHhjLspLpxxN8WFMx6m169qYqeIOmBKBwf78RyxI79FceGMuykunPEw/Wx5HrvG1wE8wq719pB/L2c5uHDG3RQXzrib4iJNdNIgs7Yb01HmwOc7eWLbWZ6b4sIZd1NcOOOR9I71LUY8wrlFp1fmC546jygHF864m+LCGQ9TlAfpVgcM0lhrCm/7cpaDC2fcTXHhjLspLtJEPg1Gp9Lz3LlfhXjpsPHipcPH4wNRgPb75hETxD8PrKZOrlwcT5onrwtGlSspLpxxN8WFMx6mkPKvW9WIBC1uoGeBxWN0Obhwxt0UF854JP089XEm03loQ1iH6WJhylkOLpxxN8VFOJ5BkhBMth89oJpdV5ms5ZsCVWCQwjodpv+umFzC3lmc9UdTXDjjkRRnTN2+rhkRX2Ct7sZ9yvn7RZbjjofpSHHmRZYpud0HmNDRVMHFk4pZZeSyPQD1Eb7KsMvYpNw9je6gP3BYiWMd/NZboD1lUa/3PHZVywHCp1wTmk8dxtV7l4gDCrM42Qvg0bcW1oj3MRXhU16itJ/UE0xHHGtv5NMB5tIPbm4Tr5JGZ1J+vHQH1bOIeIS9X5h+8AJ4hCmkZ2u7ePrGtHwvCkez8DZustYEy8UzSDvAFLA832c7Bm2DevwopnnK6Tv/bFqpeHB2lTiXBh6Y/07OtryeqIDfAGcC4Ryto4mXGKy+O6GIeYtjH+DAFF5QTOo3oeuo88PszMF4j5HuAWh0GCAWtZEU71NeLLSQfptrqQ1hKs0P4McJ72zi729SrheF26pfTitjLR1m+6kCsZ3fdUxpTyC+vUL9cx+mDzTPp6JgNdZC8RvpBC2c7bWQPoujUEzKV2hO+jh2aeMwMXxJL6AObED7bwMMICLzf5LiyzsHeK3Nz5EtPgq3LLDASVb9k6gj+1x5rpXsAfRvj9d0sL8/d/5kx7GXBZtG4R1DN42G+/gcPr8rSfX7xWFdBS/rlscBb2Bvzf68+B6ZP544NNpDDF3CAJiaxUDw4dET2aHy2WML2FI23vpLR48Ul5KAOf+YSeyV3m9g1gFHksOS7W3SqP4yu5I09lwWYJ31ueuPJf7jFY0kQPgbr0B7Q5+Uy0JgZP5449jnBmHKDxCifreuRSzptNcj46yvjPhxy4wKPvsqFieyiQJrUY8dMJZdh1kzN9bz4L9FzeJwnwVvMn6AYHPymDx2X+bOr4pHak4SMu6mNr45vkB8jb6UH5r7d7DJ62JYRMVY/p50H9ZHOGoZA4XfqaDwX4Xjxx/b1h5T+V73f0QdznGl/g0Lx6hfs6w+LMlIGJQfz32cMYTNvQCkb5UhDYwU/raljc/A4mnAGMoPIcb7uMRRGzBO8PNQgI2HFTQgPLy1LbJcTfmq+7+ljghHdcQKaHBwnwPfhPCRiD0kS6ljjDC91tSPo1L+cUA1t+NEBiU3YHQD7x/YpIkFeWyg7oWWqfj+fs/nTocmhu/32QrvzZ9IhTYKV2g4hj6W8r3u/2p6GQuNflhFgs3PVjawwUoIhuVLCn7csE85n0lmMquQbEAohsb8FP12IYetMTw/KGZ80JrxXnoZjiAVh7jiUFKMD1HlSNjxkeJs2/ErElAoqIy7qX3//tlVLC354anaTnEbSRTWVq3I/KG4m+6h97GLvzhjhDhW4/IEfuf+sqlVsGNIRTmm9cOK8sE5ldoNr9jM+fsNxCOoNY78/EdFk3AfAyIclWIQfr+1l6d8MSD9dXMrH1z4q1UNbHlV0wff2tH5I+JumsB9OCDFz37yGP8TQTENgt+tDh2guxzD+jHzcC9pP4kA0jWcK0NbwB4paOZbqYPERskdkp+yXkmpfkjo/z54HHciGOhSASzeH0ydHTr2B6X7Grv+iOdxU5/7OCcI04gQarwAYWcdCTTvttgCsSM/0xjqh8f0P80ao21Dt61rFk/Q++rOr6SK+0g6l/iH6byhGJgAVIvvi6m5p+s72PGx+zmZar4fvMVjW5GfgAerXeyhxKnM7vzu8kdYIxb9MaT/U5GnPRIbqu7Nq5uI2nPzjvyfRArrvVvWNJMGFTrMQAlszIX05M4fK4UnCJ0LGMyT4/TXAZa4I/OnmvZQ3eu6BsQjpIHcRQLMeQtrmCKOdNxX5Us1vXdTCzvp9AM6dOytUeU3pZcZelMxBdYnbp1ZId44fLy4lTSyz5Rli0zu6CLrhfXm9yeXGLlIShTQKG5a3RhRfyJ0S8+AeKKmAxFfnDsu8faDPyYWcvBkgfOzVPlN6dHF2WxFNxwAQeeOmXA6TO+Ox/P60dVdfax96QCNXZXfTV2OX70Qvv/QnCrtlN7T9ICnfLDFjgHm5bsBwQWaQBa9JzAq6IJ5MUmJ8LsWPvo8/vItWPcxZVBJEgTM5Mto9G9g6V3QoLKDpAlZlwpm5V+9VwlbrPjhg9Yecfy7m1xm12blAxjg/nPoeJYy/fAH0pjgXsWCeflqRN+HV21IYpiuTFb5mNpZRBJX9JH3ySkfuHBiEXuc9gOMXI57ZyOfZmrBvHxI9x8cNYm9w6cKzQM7xHzSSiHVv1APS0Sr/rkFmeJFejf8ppeTAdR/9vyt4r+NXbYXAfPfRw3rPmZr1n5qL+V0sATqO/LtDTylGEZs9aP894+ayJ7s/QAvEDg/K97vBwHy+UPGiSNpgIoXOHoEXt1xNAyMZLDnCKEqRm8sEjjm4vtL68SfNrY4ntj8+8EacB3xyA/ov6e9staxRqUuP008RYOT+55HHNNOLx42Xkz2OXoA1l/HvL1RzHO+HIblS2C97OCCLHE2SahYNEZjgsoLqRXn9OAFxCms60mFhxnw8w1dYi1JaiHEUB8GpCNKstjTBTwNY2EVtzFtIk967aGBCZLgi/VdbEDAUzqG5TPsOCyzXibpFl4HvABpDCd+vuX0/2ZYPnBgYaZ46uBxvi8nDjoDj2A5w4ihfIYmPoee4a59x9D7kp7UqQrwHseUnL+oVixznoia4PM647A6+79Dx7E1mhfqiUdfIR69LnkUQ/lYB3zswLEpHyAkIOygA323uYddWH1/SrF9Rw90Iu30rvQTBSD4wDDDb6oL7+85C7aJl6ithBDD78Pwif+eBAcYX/jhrvUt4pKQ4EWIsT4c2YI25Ld0AcFkwn9XW2cWxVi+jJ9elc8b5E3ciknAaAdWif/Y2s5T4yHHzK7y55JgeBH9TljrxjSbD8uisIyEr8+/t9myPgQ8nj8EV/yhuXoF5tekVV+7vMGKeJTnoTmp46dSBw5LIb8f82WSls6cv81alAzBrHyo0XBF8pOppUbHOkhgiurvxKw71zeL5R391KiQ6l9fLqmuUKkvnVwcU10dJLXfu6lV/JE0DyzYW+OX2feDNnHf7Ere3+IFDO4/WFpPmo1z74BZ+QDWH3AImt/G22dpQP86dSCQuiyYl2/BO453A2bJX9Ss3SSCx7Z1iO8s3OajOccfxzsIz9NoXEhVAdPWP17RIG5ZK923mJWPv1eR9oz1Bb/1HnR8WDiOpUPxA94pGCbBRNxkUISp/H9ocIH2AYmcT20loLPGzAK8jmAKyH0+FgxrLltSx4cemvweYZjHoXHOP3qS75QbvK0c+uZ6/t4WYqvv8skl4uZ9ynwH4Xuo/V+ypJbXKWMtH3Ec4fLAHP++wA3MFt22rkk8srVDbICxUAje9WE/6k/3LmOz8VjeJ/Sl4KUF/fdxxjFj8iFpnn7vOISmo0lAtnikLs9ac4JkxFSG6DjcCM6hSnmjmwfAKEhorZjucOXXxWFpc8P0MvYZFctgAaAjRqf8HEk7PyDJsAy7213lO+PTSKLH3Dw2osVaF1T+79OA9iQ9J04szUUjMfh+oB3UyGG2HW400YB0ik1/vGbgyq+LIw/Mnf0GJnSs2HXfhoHJlT8ZcViPpXLKCsDvU4D3UFF/onFMG7/W2M0CjxfQ6PYjzSoHKr4rv18cHSoarl+jxcI/pP4z52+1fRwmDrxTeC9MBiZMJ1+1rF6cS8LLraRxPVfbyVo8Ao5Wv5u0kkvp+Q5/c4P4Jn2mxl5HhaBwCWm0L2Ia0fD3iCe+vmuApyz9AE/lvH9MkV8Xz0L7y8vwHZjwG8GNE78irvymcXjbP7HMXIDD7/vDpXXiN6ubxAZpXesozyv+DvU3Fy6q4cEgFmDv2kxMa7rKM4mvJM0Le5/8gNmjMI8i88u4NYcl+SCvFQGd8tzCTMFLCB5o275DvEc/wnaU7MrPcKfZAaaUWMu6YGJRQqat+MI/J6n01zPKecd7RD0A0SnUcT5BA8s3xxX4duI6YNrn1yRdYRe3taeD4KzPHQgwooJDSOuIaW/gqOM8j+f3DATkQV4/tNJLDomYu15X/oi4OwCqdBkAomjTfp1vMoDyuQpnANxpzgCo0mUA7GucW9NqawteiOIRIK9VgYA1Bt1pvFt6rZN7H6tpF8e/u1Gc/dFWtm6ENmVJ6akFTP3v39wqOqjnxfvqfH553UedR23/dvHAljZx1Dsb2VHrqfO2iBexxuT4XEQAVOkyAKp0GQCi6Fsi15OiASFgBqZlFfk9A0AU69q6zaQwbIL5viq/ZwAc8bPG5huddizxt81t4n/pd+aew1FOKACqdArrewbE1z7axtPRpoBA80PS8tkjCsoBXOVGBMC+HiAehaa8PQCnA5MxOCnyy2BrThQAea0I2dQBj830b1gNfTvEPEh7ivwMRTo0pscPJG2pPEdrtmkC/KjQoq4nLWy0U/sgwInik1QXXtxkdKBoBNdOLaWBrtDqLB3fKyoARLFWErEnQoEp1IFZGhlFXPk9AwF5kNcPeEE/RONW5I9KcwZAlS4D4LxONZx1yzrdac4AqNJlAOxrWOxh7cQPWHcF/1X5lYEAaZk7TR9gbROm9ciDXfuPbGkXn3l3kziHNCl4guZ7KQT2n7CXEuezIwDuNApY6/3WghqezlfdDwVAlS4DoEqXASAKu6QPSXPy02whdLIQoMjvGQCi0PzhicMPWItZh7UeRX7PADjiJudCSUCYxRoNW9Y6yogIgCrdDlirvXxJHc+cmAJbASZn2doN4CgvKgD2NXi0sK3Pd4YoZ1Sa9Tsr8ssQ1pw0oUSqyj7AAjufeqjIrwpw14Ed0brNovHgPFJLvzWhMFRXLkm51+xdyh6GkwkMhr+YViqOgnWc47t5BfgYfDN0bIga0AArYNCgyO8XkMfP2AKA1Ml+DhX5kxYGA6p6kxSgGWDNxQ/YYzQuKzYeYY+OTlqGR2t2/+PIB4MEaCU/Wl4vZr++jq3EwpaCyQWmZCfm0DvkqF8XutEbKdJTFWAIVecj4GEiY1ruaO5fVPn9wnga1Io0szcftvaIXhePYgnl1E7hbd0UOBZ/G4QlRVmxhOfqO8VbMUwV4/0+tJieU1GWLmA9Xlo7qwBDNBhM8ayTK68MlldyHqn8Kc4DyvKb0yNAojEtD3Razmj256XTmLAgC+sUjPzf+XgbW3l83OY/p4lB47JJxZYmQfXNzR/N+1N0GhM0CxymhXq+83GNuJEkFljH+AEd1c37lLM/O5PvjXU5Haaig/DI70V1Eh+AhmVaXtx0MGDyHAlQ9gCuwb7QggzLA52hMU0GPm7z5g/8E6LBYw/htJfXsBcNtAP29ZckwCDp46Mni9/Q+wyLrzy0eY/nGSqKdS72MOAD+AzMTDNrj046gwZn/x5CiLfg7suwPBU9vDDLd3nECShLj2Ajs0G5Ooq1sv/QAOXnSs0JaKDo9/kkaJ9yVXQTBicNj2BFiL13XuXQLaqYfyh/eqCBH7CXoNq78nlRuLj48d4l2kXaRe194pQPNouvfrRV/G59s7hvU5v49ZpGcfhbG8SVS+ui5lHxvaAGY1H70iW1Ym3XADu4/PHeZb5rTHgJXmzoEse9s0l8dcFWrue+za3ixzQQ7k/S6i9WNoasliSgtaJ++IA7f2Gtj+f1SIp1OR2OKs6JyqejrL1p8F4zDeoe+ZNGBwWKepNI58HLgAZYg3Xn86MmHuIxHeLOp6I46+p6Epw+995m8S0SoiC8JWuQKkgfwesNLxw2XvxpVpX4OgmQuUqP30NDMTuD9W0/wBNGJjQnRX4/OtvApdQ8CBCufH4U6+jYHHzFlGIKJeIb2IRqCJiOn1KZx/mQvxJLKx716CjeDqxnwurPFJjai+d3bOzfqdiPGAmcdJ090vu9snpr9Oj4o6TWpW4hFx23tfdEnd+djuk1OAH0AzQWnPz5Og008FHnzA8vAneuaxHXkvQo5zbxDI9SI/3mghpqtBt5XxJwBP3AWNPyw5tNXTyvvwwOJh31AJiDv35Vg/glBQnU9QANXtjv8o0F28TCdlviDeUL53enY55etziJs3688kdS6xJ/IC36Ac8c/ZzWZTjuptZldLqk1mVE+qBA1mddhuNual1Gp0tqXbrT6/oGtDyqGm23CUX+MLUu8cdv7xSAta52dLoe+VUUJ6/+k975c0mgOuiNDeKf8M2YJMB0/MzqfPHnWZVi3lETxTnV6FQj62dExN3UuoxOl9S6jE6X1Lp0pmPtBUKrH8oyRllrzoArfyS1LmVcxyMYQzTxlKI6fzS1hGWY4GN2BcHkqCEJbGL/2dRSzodN1C2hPZbh8iPjbmpdyjjcO7XEMDjBOCSDf0dZnptal+50OC1YjXU5HzCPMJOlyI8/1uBkj1Rqal3CY4IfVnX18Vy9V353+knEIEy9+eHnKxt4Q5gqP/5spy/wAGk4/67p4LWUz76/iTSYGvHvug4asKyPAqdV+b8M6LSvIg2J18sc5cv8oFgjhlcFSKjwgHHCuxv5OBBYpfAaQVQ+Sa1LdzpOVvUD/978eYIjXzS1LvHHhEfhfNH51dS6jE6X1LqMSB8UyPqsy3DcTa3L6HRJrcvodJwa6s8jtggFPPJb1LrEHz/PBoC16dE7v5pal/CHhj1JZ5CwNPnlNbwPh70G8LsZP1AFOhB0Un+bWyUWHDNZXEYSPDx2Y0Yi9KHQ87ipdRmdLql1GZ0uqXXpTtdZvEL7Cy0XOPJFU+tSxnU8WiGt9OzPMyLibipYY7lxdRMJt42s3Wq6vQjgo1ifwXrRNdRHhfu1cPmRcTe1LmV8c89222+lGeAaCxvTw+W5qXUZnZ7GgpMfsEzEjnxd+SQlTtDLy++vP9VpTpg+U+VTURzAqNNkNlDHYO3ziM7vpNt37eQpv+Pe3iDeo8+7JU/0H/D84If5pKavQ8ftyKeisJ7CWtQp87bw2g32xKg+Z0IXayQ/7KNR5fOjnMcHzCNFvqTTQYGi3iRTHY8sH3XR+byozqAIG8hV+WKl2At02ZJaNu++ggSot5q7Ex6kJDDt9VuS4h8/aKz4/b4V4qiSLGtNQvEcqaQ458kPOAMq3VfiV1Mdj1ZAWFbkM6Hw1IE1bN10lxtYA794UQ37F1SVGyuF/8pYAI1NVY6O6oQ7rDmNhizgkZ9uhUcqC+q47kTGsC84dX5nHGfJwLuzH9AxQKNR5XfH8Sn2pMuIvA938NhH5Qeuy3IrQYjM745HeAxnRN43j/sj7LjVK390XOfs1eKRd34LSYgPCnzqT2pcB/fnveM6Y5woDZwRXxxNB65t4MoH66gnv7+Fz8hKBvA9YBJ//sQi8fJhE2igqhaHFMn1TvXzpC6ug/vz/nEdjxJp/zDjvmVts7gt5FlEDyxTnL+4hv17WvAu34I+Do06Flib6r3L84rzgZhaeOen3owK4DJkQV5xf4T3hXjlD8exl4DVOR9s7Om3F3ij88cSr6SBELu+vYB3Deone1BnROZPVVy3jyYMdX7vuDesOt2fT0F8UOBTf5LiZsfKe+e34I57A6fcRn8+8Tg6iRfqO8QRb24grX8zn3kEqRbvfiJAq0Jn/sUxeXx0O3wSfqUqT0zITBcjMD3CiH6eZMRX8hS1CdT5veP+2AztxTe/fxxr5zCu+smKeof7MDXApx8uqxOdLKSry4snHqvmZhmSeZfnFQ/55vOFd36qNTxSWXDEI6g/wiqcO5+DMtLEZBqJdVI+LEosh5PR+UNxN2VEpqePGMGWgV6AYYV1lIX8jJVPSRmKdEkZinRJGVZcp/IyZD5JGY64m2pg1anIJylDkS4pQ5EuKUPSVMNRr6QMRbqkDEW6pIxw3GwvkXf+KKqBZUWlyCcpQ5EuKUORblMYDj1d28leJ+Ae6RerGqzONgnAIAUnow/MqRaPHlgtrptWLiZjO4TzORiOuJsyFOmSMqx4xOGKHqjCPjSP/EpqgE091Fe480nKUKRLyrDiv13TLG5a08S+OlV4eEubuHBxLa8RqfIrKUORLilDUnNYe0Md+WV5bsoIx1s1FpUAzjbzym9rTmC0I8h4BNXB/qxnfkcwKo/gm19Bve7roMufqvs66PJH3dfB9fmo/K54vPc5pBJ2HfE+X0z3dXB8XpnfQbVwfT4qvyse5/0e6hDntXSLX61sEOP/u5r96CXL8wQWuXGq6k+nlvLxFnfsW0GaFAYJxzNons/svh7VvBQhP+8IvuXr4Pi8Mr8j7nO/f+dO8ZvVjcopvn9taxcXLKoRNaE1puj8Smp6n4M54B0oIq+u/FA6EQ1gTu6V39KcjIIOqjx+wQSqfPEEHVR5BiPooMrjF3RQ5UlVSCVU9aUq6KDK4xX8YU2fqPKlNjy4uY3P18GmcxwWBw0O3UMycNnkYvHBMZPFPftX8jH4xRm2NpNg0C0LAB+wg9jovP7BH5aRRfLCdSutoyPkFB+m8r6/tF508hq4Ok9yQixQ5TcJevjxyNKcjII/LGs+Vb7oAEubsAGFGvDjl8XbdtRlmAasJfEeKQ/g/KaxrP5H501lwCZBPdR5vYM/YuFR4iGVUNWX/JB8HvnDmj5R5Ut96Ny+Q9y3qUV8/aOt4tQPNovfrWu2DZISB/ZLfW9ikXj0gGrxDwo4CbWIzfDVz2ISJmqshy2o8/oHf0zPSz6Pbl3bKH61qpHN/y9YWCM299hrjykN5rCOP1KV4R8S5VHSNCfr3HhVvujQs3OXwMFxfqimASMLu4cV+WMJNX07uD4vQGOdmJ0hMkPudwcnTKE69VDn9Q7+iIVHiYdUQlVf8kPyeeQPCErqfIMX2klix7EuMEGfTtrUH9a3sJcCnyZkDHhKwDlQ98+uEiuOnyK+M6GIPQSkuZ7BJOTwb6WDOq9/8Ec+Hxmkyhd/gKXx7WubxYWLakUtb/BVfy5ZwfoO5rAMddRl+QU+1kYLdV4E4rA9UoXmCV3UDjpNxzJwcORz5XemY/c9zq3xw+z8TFEoy3Tlj6AUYCs/Jx++/xCNvA8nkdZ+JG/sx+cDmT1/zog0MacA/qaA6Pu6/OF0E8jPOvL5lK/jEcMnv5LGej8UUgl3XRRMny+m+yZQ5XNQx32d2xjeXuGTX0lTeL+W2unFi2vErNfWiZ+vqBdvN3fzQJUMwB/lvbMqxcfHThLXTSsVhxRm2nteXM8hgyu9WG6A9gBOqLUE4Mh8uvJ1PLK8sIQ/HwqG5Q+H+zgPLRbwhucYypc0j90eeYOFHp/8NoepEC5HQRlpYjE2n/nAOkfIO78zfeeuNPZj5we4+/jW+EI7Fpk/ghJm5GWKpw4ZJ548aLw4pjSbz2SR97G3wJrX9AY2U36KNwU7ypWUEY4fW5Yt3jlqknj20HHimJIc3onuvB9FGdHpMzUviHVmjXf+EGVYcR2PMAiH8knKcMTdlKFIl5ShiKcU7nqI8qWCMhTpkjIU6fTfjEdAZL4IyrDiEJT8wPtJZD5JGY64mzIU6ZIyFOmSMhTpkhKwX+rGNY3sfeIL729iX5JeVmaxApter51aJh49aKx47MBx4rMVudYshqP+iOex6TjNlBGmovpCA2l0/hBlhOM6Hlm+97zzR1GGIl1ShiJdUoYiXVKGIl1SRjiePhLewE1mBMJYhU27sjw3ZSjS6f94zcwDrGHh2MCdT1J7cMJIZVNGNPVzfw5gUx5LPgxFOXwZjj9Ro/cBdvGkYhoAsLkvOr+kmM++bWY5HxUBrxPPHzpB/HV2lTijGod58TcVjxvU9YtpZfQd5I8ZXQ/+4/4d+45ht0ufKc+lusZTXdVUV57lkVyVT1K+DMfHsgWTN6zf2zt/FKX/Oh6FvXyo8yvTJY3rfqrgrocoXyrSJY3jvo5H7aF9Kur8EZT+o5P3Azo+a0ueOr8yXdIU38eWw629A+K/JFSePX+LuGOd+UZSHTC1Dq3x5DFWm3rliAnsHR0zIVYLjn4+nCjsB8wihL1iROePovb9LTDd9oHFI+/8Fobv/UrSWEsgvBsC4/vrjTjdGDFHeW6quK87ngjtx9p4rs5vDyf0CvBbYL0KKqrbl4MOGxqMBUU5fBmO4+wn3Zk50Erun1PFDmJ5SchZHmFOQZZ45MCx4ijSYCRgyvqlyjzxp/2rxHP0omPQhANY3REbe5E08cgBY9kLr7se7JOCRob7+JyEs66nqa4pOVLSjszPlC+teMXodO25S9aBhOr8Skr/dYcYYiplFjdqdX5luqRx3U8V3PUQ5UtFuqQx3sf6nI5HYfPr6PxRlP6b7CkaXP7Ef/+3a5q0U/PxAjMZHx0zWbxAguZFJKBOxVEjjvrzRo3ktueHLcSb7tBeKPqsI7+S2vdNvCfMyFX0c3Z+Cwpq34fwcWplPhuIfG9icZhOcsVtevbYAhL6qfOz81tQUMP7s2hwHaMRupzAIYUDOBLZzm9BQV334aNQd+IE1tewz1SVH7BOwnWOXB6UzwHSgP3leeR3Uzhk+PXqBt8TLYHJpBr+kwagZw4eLy6bXCS+Pb6QQgEPFK8ePoH95qneUwxsKHsLDarwkHvT6kbtfDnmYtEgHjmgOlQPzoSChdELh03wnKtFXfB7tQVWNq7vqaIHF/lLfcBCHkwj8+nom83+gz3AZxC58iWTbqTfe8pLq0XaU8tE2tMUbGpyhpUKyOcsBxTlox5V/cmiJmcv8TlfHvlVdKlm2hWwBqfIfMORdgzs5I4rlTi6JFvcOrNCPHXwWHH3fpVib/uMs/FZo9ijtR8a+zCtR32L67l1dKnGnyKANWd3PlO6ix7pIhqIYFp/z/5jtPR2+v48A+RRXiwUxeCEBjNDBQtLO3rpd8SaE2KR5fnR8ZnpWh7BY401rRedH/+tk3BDI5d1GU3T2EU9Fhn9wFqHR35VOnx9YSe07uhgaGWfr8jlKbW/zK7iAFf+1nqPGug4rl5WHzpj6b+NXXzQlqYqLhNly3ru2G+M+HJVPj+DF/A9cDopz3Ervif/ccQth6H+WCIlOEX+aGrdxxHfOhwrneAq8jOUNIn3Y4U7v5Im//6nNY6JgfkQIDzyR1LrPrR3nQPWI4qzQ1kYjvwMJY3tPi6xtvMSCXeTqMNnaznH/WgafR/bfbxbX/IAz+LwgH4BdeirPrWXeJgExSNp0PKTyvELb+odsARfj+ePpOH7H7freXQ0Zmo88qtp+D6UEN1xH05gtgMzLepyJaU/BvfRt51YnmtPHeuB7uxtEg7ZrV9EeW5Kf1zp1VnpWh5thIs6CBCK/KAuzcm6jKa7+AyQTZppCZyFgv1JDFf+yLhFMS9825qmpEtgOIfn4kW1YgE6D7v+ZlIh4a4lFnfxJoA0/K0F21hDYyi+J/9xxE8o8+/4MP2zUf4mivzR1LoPSUQ3dXRYcZZ1VLgiP0NJk3g/VrjzK2ny7+t4hHcsWnOyLqOpdR9GBDoBYhZJ5eiQVPkZSmp+H90F1mMfmlPNsw6vHD5RfGNcgSiS0rQmv6QYMA42ELLQ0ePUWo1ca4yvji0QfyStAkc5eAFC4oauAUsQ5Xrpj6xfScP3oRHqeLRv/ujwuo0rv5pG3n+zSX/KshOn48ifiPLclP4Y3IeBGdbyTIG+cl5LD2W18jOUNPo+TuWGZ3gvMI+oz+SxSZEf1ENzio53khSyVjOIFNPDoHGp8nvFV1KZX5y3hc9t0mlQJkDnjB3W/8UiHuCob35rLw8kGGSTUBUfDnfRohqxEJKQ/X2c9TFc8Wl5GfZ+I2+sI6bh92a48vvFMdjreAQDEqzVqfIzUh2PFe78gxCfRh2vjkdoWLxFQZHfK47BSSeIwddYeI2F4MjPSCAOiRlrGHfuVxnaYIyNknftP0Y8dECVY+bD+jxDEYeXh59OK7UT/FHbu12c/uEWcc3yOq2ZdrIAvqyQv7Pi+f3iHdTu9DwaJfaWi/2u/CZxGJXEAhiGFcsN4YryTOJYa/rp1DJOMgWEL2s5J7o8v/iotBHi8BL/o+iZRxACFPll3NKcoMYylSE6DoliMam8fp06TLgPLcq29gC58vvF13b2iVPnbRZ/3dSqXYPyAga25+s6xdc+2ir+d3OrNSKH6qA/9vWL9Z3ic+9uYjct8e7ZQCfz9y1t4qv2Kb267+eMz6WBwU+iADDA8J4lRX6/uInUlw8BgiQ/Njhy5U95PB4484dCauM4v0bHI3hc7g7xKDK/VxzWSVjT8Hvt4GvsIEi3obwI9CfBOPh9YmmuuG3fMSygOJEzcoT4QkWeePeoSeI9Ct+gAWxiVroop0GokDQq7DeEZjWG4seW5Ij/HDpOnMWn4uqBKe9XqTP+7eomMeHF1eIHS+u404u3nZsA7XMp9VV+v4dXHDyCoIyoFzA4HVRIA7mdJ5byETqoDvQ/psD02M9oYOETaRXl6eKTskaJP82q1B6k6ATe0XvWN1sOdmOsL5OqwTYbP0TyKDK/jFuak0HYTp/GfiEU6gWMlMeWZlujvCu/LkCDunJZnfjce5t4bSgWQFvC4WpfX0CDBVRmRfnOsIwGw29/vI0/r7PicwNnP8HFy/mkMS3Aj6so3yuMph8I0qmfR3Z4jkaDZq8WijL8Qi8x9YO2Ht+Gj7UzTFkVoINSlJHSEA9U5aQwmPDI2jvXw1K2qgyvAK7MQz6fNgScNCZXZKAxufLHG7DL4axxBaQdVftOhwFw2vrA3Cqx/FN7iZePmCD+dfBYDo9TePOoieJVSjsQHbMh7qIOTj5HN0mMt65tEge8vk5cvLiWt3gYbRyPER9RG2CP8o7fwDTgaTBV77dxH379vpAgj/60oSWmAyC/Tvy7cq8S6/RhV1l+YTxpxnfTwMSDaQzAhusnMYAqytSF/6nM4wHcD/iNdTyy15wIoDIAijhOgeSTZn2AF5ctwhT5dXGcW/IGaSJfeH+zOPbtDeL365p5zhOaBKZRMAgh4HoRDQx/2dgqvkQaFzwr37O+RTTClNqnfGcca2iPbmkXB72+PlQXJCaYzKN8mAm76zrsjfVi/1fXsnNGPmPFp3xVHNOeoQVvD7SRVMWWeor8JvGPW/tEK57NB1jQtbwRUMSVP6XxeOBXXgriFaQdHE+Dty+PqONa2EbStSK/Lv5+cw/l929DR9I7crBTMgfkdYxxaEzQcu6YGa0x+QFCDNox1qUQjqPg3EZhgse2tZPWZK+vyGejgPOE/krt6VsfbROHUJtCR22d3ZYcPFlDnaqjPkYM8XeoYwaP/YA2NA7r64r8DE0cp3ajbzMFNPlrp5aK/zt0vLXHy1WeO47Tib9I2vDLh08QJ5aZG0EA4M8lJDz0s9ZkJ7rK94tftbd+yvexre2e+RlE08RTS2VUC0gMTxw0lvcd+eFp6rxxqFkygB8V8/9ZI0bw3gY8LFRNbAgM7wBPDvD94JkCnoeLMkawdWIy6zqtMp/N1P1O24REfvw7G+OWKNGp/OewCWyG64c/kEQL6XWwAK8aJlaKbsALw+FvrrdjqQfWZB6YXeXLI0h9x5FAY3beUzT+d2411+OHZ6gNfemDzQkbEqDt/PvgcTzYxdJBJQI8MgRKCI5L6LcyAda+rt27TJxYnsOnbsNKLx5gkKt4YVXCg91zh4xnC2E/JMIjfDusJf12ZoUYHeN3xewKjCqwtADBGZo4+icUg7IOK8oW544vJEE4i/u0WABtDn7+cBhiPMseGBuepvfND6Y8Is2JHgDPYEBxoibOGtEBh46dCGsnj3JioTupzpqe7WJdVx/P1y8jZsCreR++mOLziVB8v83d/Vz+fOoUl1F9qJdt8Q3y6+jPppX6dnrA0yT1WVpZdH4T2ku/y+MGPPomvbzQEkzLTQqNByblJpFetVeJlkdY22RvHIr8JhQev3VAI8f6jkl5frShb0BcvaxOvNEU2yJ8IsBvc+3yerGioz/qebzoBmpz5328jQf9a5bVi1cau+LqHCGR85ScYb1e9G5MR2pg8YiEQEV+Hd1F9N/U1pdgaSBGQACFA92/zqkS84+ZLBYcO1m8fsRE8faRk8TiY6dwOjzrxDowAR+29vJ374+jf80hBeKsqnyK+MPikT3L5VPeCB7D+TuY0Yc2t/F0lx/QuK8h1S4Tc7Ku/J9Uet6EYq3LFUhE8Fumyh8LvW9Tq/a4A5wddPt+FcQr6xVw5k8ZjQuKclJEz5tYpOUR1pt4Ll6R35R+2NYjXqXOV4crppRYHqQ9yjGh8GP5BknZX/5gi7h+VWPSZxvcgDT81Y+2soCEdWr38+jouq4Bcfu6JvEVet4T391oGRwZAoMZ3n1VubFSeK8x2TR9yeQSkcVu0iLzm9DNvQPi8iV1iCSEHGrL0DyxzqMTrPwA3n1t/laxgfv36OfV0blFmeF9lB4Aj/7BwnN0fje1Vn35fbVHrChqXTrTofbpAB9UJ1fkWfW48kdS6zI6XVLrMjpdUusyOl1S6zI6XVLrMjpdUusyOl1S6zI6XVLB/qywiVAHTBOsJU3NnT8y7qbWpTMdkuPdG/Q8wlrC4aT6u/NHUusyOl1S6zI6XVLrMhyJAxHlual1GZ0uqXUZnS6pdVmZOVJcQIOTDlgofof3qUTmD8fd1Lp0psOS9C8bW7RbJzAtgwP63PkjqXUZnS4pEaJwhArP4ie9t5G9bsDTdDLHKbihwSB4yOvrxEvUsbNHcFk+Uxl3U+vSmY6sTfS8GJiwHoy1Xp1ADLzf0iPWYPN6RHnWZTjuptalO337rp3MI92UHQxIji5GhxyZP0yty+h0i75Fv9kVS2pTar2oAx4Hv+9J720Sa+Lsf7DgAq86WBbxA/aeLmEjtMj84XiYhq318IevbRqK2yEUTxP/rm3XShUwK//mhMKw5Z4jf2TcDqG4TUNxO4TiNg3F7RCK2zQUt0MobtNQ3A6huE1DcTuE4jYNxe0QitvUjkMxOWtsAfv48wO0pj9uaInKHwqhuE1DcTuE4hZ92EDDLc0YRRpdkchnTxuR+cNxO4TiNg3F7RCK2zQUt4P1J3Y48/O1TUNxO4TiNg3F7RCK2zQUt3lUXajlEfCbNU1R+SPjNg3F7RCKWxRnJunWYwqpDV25V7HIZsvByPzhuB1CcZuG4nagP+j+XqYO/0QaoHDq7Z+p84VJfCKAJoZ9O1curRNnfLhFLHXvXXHUb13bNBS3Qyhu01DcsjjT+WmDRP5sXYeop0HXnT8ybtNQ3A6huE3pDwwr4L7HD1gf+8FeJfTp6PxW3A6huE1DcSHu3djK52bpPPCkCjW9ltOCt0jwiuf5ET5dnseedPyA9azn6ztFDR9eGJk/HLcp/QmvOckRyyCOjXVvNHb5Sl4oH2tPZ+CBXfk/SfFJWem8q1236PlmU5dtpReZP944/PzB9Qjf8gAe6TTiz1HFDs/vSapfGY8HyazfIz4pK0N8dZwJj7rFfGxKdOWPJ761t581ZZ05MfYN/nqfcrqKzJ9IHGuaj29rE1csrmVNB/v+YPINKzVTYAM6nL8e9eZ6cfq8zeKPlB/9QjKezxmHZ3i4EbOOsPcGLMyeqe3kNWpn/kTqh3CHdSEdj2DJeMWU4qj8pnHMdECrhaY22MD6OjSmZ+va2fN8PM8Pr0D/PLBayyNYEf9ra1ukVwif8qk0apDcJs0p9uA8uq2dpwp0+Pm0MnEopo4U5ezpFHtmfj6tnDd1+gES07PUsFrYxDi6nHgoTjR9lF4EmKb7AYur8B/IHuUV5SSVxgVFOUmk8Pj88+llRjz6Vw3eeZdkHifFWtADm1vFpm5/zQXj5WWTi8UpY/LDnvkd5SRCsS+urm+HeKGhU1xCkvMRb21gx7oT/rtazH1tHT4UBVh5Zj67XMx4Za340bI63vsI/5W7FOUnSgsyRvCmYZPNow/Rb2l5FI8uJ16KPvSRLe38G/kBS+u30nOeUI4tCNHlmFC8X5cuqWU+YBsL988pBL/P1Id/6p2N7E8Q76PquXQUJxlfR+2Hz9DTANaFS2EkoyhHRYnr4ZEqFgop62nqUHWAn7A7qfNjdymKcvZket74InYiq8Pqrj56UVwSRRLoC3Wd4gWDDc3Yv3LHfhX2PpjocpJG44KinCTSy0niPdPAwqimd4CkvnZqxJH5E6HruwbELWvNzkX65T5lYjofyRJdTrIpBswFbeo9ONCO/DxJJ5N+tbqAz03TAfsTb1jVEJU/GXRFZ6/4M6bbDfCr6eXUluTep8hyTOk9G5rFOfO3iicMLG7jBTb5X76kRpy/sEZswOGKiucwpTjL7rRK/61FALYW3Liqka4i8/vRuDQn/IcxGGzhWzSSOQCXPT/eu4w1CXc5eyLFtCkWsuF/TGc9g0VxGJhsg+tfVzmJUkjGN61u0lruATgT68JJxaxJuMtJGo0LinKSQCHhfmFMnvjBXnoeoS/+FTWsbTAft/Mni967oVW8bGC5ty9ptr+ZWUFXkflTSr3g/lwK6GHF2bwHiJ0U+wBrTdcsrxfN/fSOK8pJBr1pTaNYAv+ZGmAv2fX7EI88yjGheNdebepiN2wnv79ZrNS4I4sFcAwNzewz727k966Z++7I+mOhM/JH0zs5htdGdfjlygZR61xrMqAjxZkXXofLeIC5Ulj9fKosx7eB4xYcnsKTM1yL7OnYLz9T3E7aIhyI6vBETQcxrt6ybkoB8ELC2MI698qbR9gTAYMAbCxdwM4ek4tvTyjUHt6nAs7Jui8Fc/EwGb993wojrwf/begU1y6vSwmPMCG2qrOPB0o/l0lg3dTcDDYMwKwFn1WUYlxHmoAbMIFP5Z4pvKPHlWSLZw4Zz4cK+gHcwHT4H9Y3CevQutQAfF9LGsYplfm+65LgEY72x2fmtXTHtU9LAutceC9gtALDGVirs8JKQF/r15YBGKrg8FGsKb1G/MLgAKMHWJsmahmImtFXYLO/7uBCPDLc0d2yponHi1iQJv5t7iFCBbjVuG9OFZ8IqwMk+EsX1/BeqT0VOSNHiGcOHceOD33eYwYcYJ5C0hGmJVIJ+FN7aG61+JxmxzsAHn3lwy3sIDeZYA8RvPYYG2D2nGwPEVNoQHrmkHEsPOh4hEVxSLBsrJIioDP72bQy8aO9S7QbJ9Hf/W5dE3U2jSwYphK7TplhX4XxU9JSsF8qVYCge/f+lez1W8Ma3pfzhfc2i9cMNM9EAcEBBx9+e0IRrzH5ATz66Yp6Pg4IgmEygPcCVouTKWBAmJSdIQromfBc2N+EU38hyAE4dQFaEaZn4X4NHm7kwJYM4MgQOJKFdqvjEQZC7LH7v7rY+xManJYk/NiwVnn4gLFaZ38AtKdvkMr6IkmjSeLbsAFs/P86p9ponhwv7S/oBYZEobMGSgY+S8/0IA1QfFaQBqngkTU4+btUUuFdkvSSNTihIe1LGtOjB44V+xiYjUP6BI9glZZqHmH66i36jaB164BnwXtzzbLEN3D6YdcpM+2rMKzBqcGOJReQxt84cpIoJmFK1+kBly2uFb+ngXqwuhGYjb9/zGQxXjMDgOdBp3wpaSr3b0qNBR6EKkxN43fCYIk65QCUqlkYAO/pu0dP5vZjwqNb1jSKq+g9jacfsdecUI1P0Nx/k6TbW6mxmACd4x37VYoTy6Bp2WUkWP9wuD+RJJnf0fc6XrNDWgKqLnazbwfTBuH5XmroFvcYLuxG8ShpzxcPnPk9guF9DEyQyk2mW4HXSSJ/gLR8yybVVaYzJOH5YF155odb7ePn/QEp+uq9S8WNMypEYToJG0moPyqNQlP/jqjA3vLdn02w/pHU036qLJcHJkxbItUPGJz/ubVd3LmumTpl+nSKvn8o2Pdr+3bwiQQNGus9fBozKH8g7QKaVh6vyTjKc4c4ng/WdRiM0H/0UcCSG+LWAOX6fBK+P/6h/WBgghCBO37AawI3Xz9cWi92ynK8gkf9IxNZc5KABRPWksaRygnPEDpgmgkOHiGhL4zDt9RwA6aJnjpkHHuTNnEfguk8WORA3R4sYG0DO+jHktQXC4/gWFJ3gKEJhnrNCTx64uBxfNCiAYuYR2fN38JTJIOFhv7tXN8xJOD4rT9JYIsGrGDh3VrnRDMewMQYx1o4A9a7TIygYsEZVQXilplj+N3UsQZ97zskDF+yuCbpz2ECCA/QqI8qydY6p4UQAR94cFiNo1IGY50wVcA7+cdZVWyYw2OJBos7esWFi2q4j48X9uAka4ufQpXEpk9Y5kGL0H2BHGp8x5fm8tzo0vZ+e9pEX89woliU/HxFnvj7AWPFdJImdIuUAAwUzvu4xtrMaVhPsiikrPeoc8HGTu4I5G0PgEdfHJPHRhJYF9uBvRCM2GlCg9MmuUZpXp+kkkdPHzLe6L0ELB5tYyeYFvT1JIuu6e7ndVysz43QPCzuY7A9mPj5BA0cfaG+T1+PCV3bNcCCiZNaA4JZfhP6/Skl4h7q9EppkJWpfoCRwbkLttlrgPryU0E/ausTE0gQn1OYFbrjBQir8BI+JSdd/GubPGDQv/zhRr9MwsPfD6jm9mMi2GHw/jbxCEKEBf/yvWhSNCcJWMzgJT6SpAq4xtEBjmHhKLCEXkxYpOjOihpOwNzrdycWixtmlDPTTADX9lgohQTKsyNDAEjYME8159EIPnwPJ+hCi4rX0qeaBiYYF0BTjiXgCJHX47QOg6HBBZMsHuH4cxNE8mjwmYT3Ap4oJtA7hYVn3QCF23D6CUsyDOSQ7AdjDTNRTCZN9oZ9ysWP9i7lA/T8v6UFSOFnfriFPZYPJfBeQIPE+mDouHYfgEcz6bM4ggOeNeAuaHfQoXDcytVTS8Ut+45hQdWER80kyP5waa14FA6sE4RtEIFq8UInTuEA8DjSiDDNZTI1AWCeFB3RRQtrxHstcKFiXt9Q0Ck5o3ljMU791bnscAJHAdyxtlH08ptpXl+yKbh0HD37U6RNmPII+7Gwee+ChdvEApIcTepxUkxtWK+32eclxXSk5XPM/3NuOjZrlLhr/0qeVomFR7AmxR6QXp6CMa8v2bQgfYS4aUaF+A5pnDoLPgC5oPHhOILrVjZQJ2HvKdHUM9gUbhy/RAPpD/cqEbOowzaZBgfw3X60tI49QZjUMxi0kgSee2dXipNIMzcBcsKCDl424C4qnvd6sCj6h2umlvG5cDq3XhI4g+66lfXi1jVwOm1Wjx9NE0/S4GT22Zjop8tyxQNzq9mCDckmgKudm1Y3sqFAI1x4+JQ/FBRObD9NA+/1JInHciooNMp7N7TwUfIm9QwW/XR57DyC9gPrm+drO0WrPJNFU89gUpwpc1hJlrh5xhgxt1C/tibBPNpIPFpEPDKoZzAoHPL+ZXa1OL06n5NMAQ3qOwu2sbVlaLZ8GFB8n5sx4E4sMhpwJbBkcAEJruCPST2DSeFX7h8HjRWHG5hVO/FRa68448PNYo10lGtYX6op3JldNqVEXDet3D7yyAzQ+G8lwfvHS+uto1I8yo+FjhRn2WtOSACUNPb7WNjd2I3poxwj31gAppDgWQHn3ePdRRkh6yBX+ZE0tfczqcP7QiUNSvtUiCtI4jMxx5bANBiOgIc0y5vylPXQH2W6pKm5Hw+P4EPrpDF5vNkQe6I29g7Qi6kuP0xTfz+dGhK8XGAaAg1rUgzCQwSP5JSYq/zIuJum5j7m7jGFhSmwabmY75c3/YEp2FOr8sW4rAyBI+Gb+neKAeX3kpT+KNMljf8+HnlyzmjxZRpgsd0EApHp9wBgNASLLx6YAGU99EeZLmnq7sPhLK+1kyCkMzF3AgLhV6oLmFdoR00kmMuujhFB6Y8yXdLE71dmjWIN8O5ZleKb40l4MNSWAFhx4oienyyv93jP6E9E3E3V91OmOYHiC2IPFKykTKePABSB3cSru/rFnWubxCNb2yx/Xob1JpPi/P1rqMODhRs6ZtyKBZcuqhH3kybIu6N96hkqCp3puLL4eIT5ZWzWvXlNo1gI4wGD+lJBK6ihw7QaR59jHS2GdsXAVN79G4hHmMozqG+wKTSOG0gwgsYByTYWYH0DXgEe3twqnsIhiQb1JYvuRQMqTlyGQcrMvNHGU3gSaP/fX1zLR2GY1DeUFBrUr2eU8/E4sWiFANbp0Y5uo75usDWpYurToJmfM7ZQHEADbCxT4ADWAXHS8t82YcsFFaqpLxbqWnOSSG4cVnl3zxoj9iYJKtaOAyr9vJZecTupjO+29Fh7LUJztRKJPZ8znkXMgbUUDnrDSaQHF2UZWeE5gZLQKWCz4j3rMf8a//NYSH38+NJslpri4RE2FOP4B2y4g7uU1oFdAoe1hZH48znjkLyLqMOGxSHOo0IHGGujQmlhHkEqj/95BiOOtRocnXHZZP0x8l6AtwA4SH1sWztri9uJb1YtiT8f4mgn6XSJxX+sKWFtSWdurQJKRqeHoxzCVq2JP18YqYlDeL13dpU4jb53nCwST1M7wp5RGAJhpsXaUBvf84QRjuMKp1/nj0oTl9K7dOnkYn7uWIHS8Hxnf7iFXbDF+zwW1PFIzUlCxt1UIsb76NsxJ/uL6eXsniRewJwZptCvNXWL5e19YklHr+h1alQSrvp19zG3ik4Z2hGMHGAiOsdgL5AXcBDj1Uvr2CM4OgBd/cPhfhrRw0sS4xF4ASn93ZZu4lMPG7lswaZSg/pN7peNHiX2yx/NniaOoWeF4BBPwwLwLsFf3rM1xCMUblB/CEN0Hx3918YVsiaPfVvxAubgbzR2izebu8TKjn6xoadfNPTu4AGBH8Oj/hDseB6NmGWkqWJ/I84tQ5s5oTyXN2nGC6z94UA6aEx8EKJP/brnG4r74NG108rEd0lo0vmd8wKMj9B24LoLe9jWdROPSOjDlg4+PdmnfoYrHXwaT5odprphAXo8tW/syYQgHg8wKMFa8Wcr6sWbOEZfU3+895PivsgEqK+UOhd4Gv4GNbBEAKsQzPWiMcG9DRgJ89tVpBKbmNFCqoFvqhOISTAHPZAGo2p6keBdN5apLRUeJ6n08iW1Yis1rEH5YZOIZPEI0h7m0XkPmy1Q4LTU1Z3YLuDUqPwBc/29c6kxleYQjzLFLOr8MA0BPsWrPQDwzoGjsVfS86Ct727ABlB4I0lEgJKAfz44CMXaFHi2iQaqlv6dvG1A9dNgUCykzg7bJ0qID7AqxFQqNgPHOp2lAlwy4dA9PjdrNwb2B8KDRyIDNYBZiQbq59DXtVHbWdTWK2roGlo/LBj5gEcHIGjDAwqsYyeQwAAtFnwCf2AabuJBXIc/bmgWN69uZE08lUjpmpOKjqYX+CJSJS+fUhLXpkwdMK0EpmEe1+l0EXP1aFgYfEz8l8UKvDxYW7p+RcOwXbswpTja5KJJxeLKvUqN/CXGAnhewGFqm0ga9HKKCUtINCITTxaxAFPC8DYBD83DdQ3QlGaPGCHum1slTqFOEIZEuLW7AsIM9t7Bn+OHpCn4fe/diU7ISRcPzx3LGn4805vDCWiqOFwWVpPY8G3y/ROlg6Y5OQEJCwzD2ftwSBqvejkcADX7JdIK7lzXxHR32ABpAvAIEjrOO8Keh92dR3AfgzUxHMDoNSjubkB/d3pVAZ+Ui2nz3RHQAP65rY3XWbBNYU8D2tEFk4rEdycU85Ta7gjMVGFAAo+gUQ8WSHNazGOU0VCWZFqUDnPKfJ6jTYUWlWpg7v7aZXW88dE6st7se+9OtDRjhDiNOsAbZ1awocjuBnh8wKB034YWsZWnQMy+9+5Csel9bFaGOHNsPi9ww0hkdwDWLZ6kDu+W1Y3sHaZ3B6Z7zb/37kRHpmEadJS4iPgDR7C6AxSHC6DRYm0JJ9i+3dTFzolNvm+y6JBoTm5gLvSqvUvFGdUFdD0yZuu4wQQYBmkPFk+Yd8UU4icB4NHt+45hY4l4zLUHE3ihsaH7raZuPq05lWcxDSdgOvRmEiKwRpc/auSw4xH4AitBuPC5amndkLshGgpgqvoOakdzC7N4iWG4NSPwCIID1iJxLAvWl6A5DQWsNScGiDViRVKJ1N4fkbZLzCnIFmeTBPgZe1/EcAMW958iae/RLe0k7fVYm09D8P9+e8J9mKAeXpzFQgRObh2O2i6mht6mQenRrW1sLcnWnAz999tT7mNT9WlV+WyVhRN/hwMg0MGS89EtreLp2k7qAKWmJGH+/Xb3+xnUjj5TniNOHpPPm5LhG3E4ALMMMDB7rq5TPLa1lXjmNEox/37Juj8sNCcn4McJTjr/pzJPYA+LyaFwqQYkPfjCera2gxfz95R1pXiB9SdYAp1Rnc97weI1504moCndvaGFN5vCfU8sVoF7ImDNCGMWeMQ+f2IRO/pNhjVdrIABzP0bW8QzdR0kOGxnPgWwACMtCHgQImCANDMvc0i0XQxKD1K7QdtZ1z0gGvvsLQVDDNeak0TkCDaU90+tyhPnji9idRhztXkpnq6QZtBQayHpPbSplQ0d4n3+Pf1+zsg0cebYQvH18QVir5zRbGYc64bYeIDpoVbi05quPvH4tg5x34Zmx5lG5s//Sbk/OSed1zvg8xIdIqaUYG6crCl01AKedFNH10J8ebWxUzxAbQfbCEyeL7i/i/fvnTOukKfOsb5r8Sh5U3+oCVN24BOEBPj3w7rfk9R+unY4hQb184UxOPcH3ZQ8Hgo3SNNyMsT0/NHsdw+m4DgfBb6skmFFho1/cJWyurNfLG7v5XN8VpC2tLa73+j5AmpJgTgpE56m5xRm8rQsTPeTNfUHizvs74B7Fxxktritj/e3LaHA1nea5wuoRcEn7B2bQWEStSHsiYGvSLQl+FeEzzed2TMEOJwGC8e/W0gbwj4ctJ3V1F5WUbtZgf1sNECZPE9Aoyk2zU4nvsC6D/zB2VHgDzahjyX+mPZ5GIgw04NDLLcSnzb29Iu1xKdV1NdhYEK6yfMMFR1Sa7146Ci6hLNESOzFGZbHAGyixe7nsoyRPHD5baTFpjVMNdT0DvCm3aXU0X3U2ic6qaF17thFKu52ey3J7HkCGk1Hwz0KNbDckSNFReZIMZU0qqNKs7kTBI8gIfoBC7AQErAjHvvHsAt9ZWevqKMOEXxq276LBiu5ZmH+XAGNptCe4Ng4hxpWetoIQezio02qskaJ6sxIwQLWjtuog4M0i1NdcTR4N0ncOOQQfDGpL6CxUWIPD0bo79CusolP8PAJwcLrPDbk/LClm49Hh+ANB8LQlrqo3VhuxfT1DgcaXnOSaRJBPIgH8TCCeBAP4mEMQtzWnAIECBAgQIDhg8g1J4kgHsSDeBhBPIgH8TAGKR5oTgECBAgQYNhht7DWC2hAAxrQgH6yaKA5BQgQIECAYQfb5hpDVUADGtCABjSgw4MGmlOAAAECBBh2CDSngAY0oAEN6DCjQvw/BqjzhtAA2s0AAAAASUVORK5CYII=[/img]
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