xây dựng website ôn thi đại học

... ốa. polime thi n nhiên: Là nh ng polime có s n trong t nhiên nhữ ẵ ự ư poli saccarit :+)tinh b t(amiloz ,amilopectin) +)xenlulozo→ ộ ơ protein: +t t m +.lông c u(len)→ ơ ằ ừ cao su thi n nhiên ... trúc.ạ ấa. polime không phân nhánhPE, cao su buna→ xenlulozo→ amiloz→ ơ h t→ ọ ơb. polime phân nhánh. amilopectin→ glicozen(tinh b t ng v t)→ ộ độ ậc. polime m ng không gian.ạ cao su ... i u hoà: các m t xích lk v i nhau theo m t tr t t nh t nh→ đ ề ắ ớ ộ ậ ự ấ đị polime không i u hoà: không theo tr t t x ch u- uôi ch uôi- u→ đ ề ậ ự đ ỗ đ ầ đ ỗ đ đầ.4. phân lo i theo tính...

... 2007 CHƯƠNG 1: GIỚI THI U CÁC KHÁI NIỆM VỀ SHAREPOINT 1.1 Giới thi u chung về SharePoint Máy tính là công cụ không thể thi u trong kinh doanh, thông tin là phần không thể thi u được tạo ra và ... hành chính hàng năm; xây dựng hệ thống thông tin kinh doanh tiếp thị phục vụ việc thu thập, xử lý thông tin nội bộ, thông tin thị trường, đối thủ cạnh tranh, báo cáo thông kê, giúp lãnh đạo ... nó. SharePoint là công cụ giúp chúng ta xây dựng các ứng dụng trong kinh doanh để lưu trữ, chia sẻ quản lý và bảo vệ thông tin. SharePoint là công nghệ trong “gia đình” công nghệ của Microsoft....

... vật chính - Nhân vật chính diện- Dòng văn học - Dòng ý thứcB. Kiến thức văn học sử và các tác phẩm văn học I. Phần văn học tr ớc cách mạng 1. Văn học lÃng mạn a) Thơ lÃng mạn - Xuân Diệu ... bao gồm các mặt triết học, mĩ học, tâm lí xà hội, thị hiếu, phong cách, ngôn ngữ nghệ thuật ctst là biểu hiện rực rỡ của các phạm trù cái chủ quan, cái cá biệt, cái không lặp lại của tài năng ... với 2 nội dung cơ bản (dạng nghị luận xà hội và nghị luận văn học) - Dạng bài hành chính công vụ (đơn từ, biên bản)* Khi kiểm tra thi cử ngoài hình thức vấn đáp, phần lớn sử dụng hình thức viết...

... chất vào ddA thu được kết tủa B và dd C . Tách kết tủa B khỏi dd C. Nung B ngoài không khí đén khối lượng không đổi. tính khối lượng chất rắn thu được:A 5,4 gam B 6,4 gam C 9,6 gam D kết quả ... nước cứng vĩnh cữu, nước cứng toàn phần( cả nước cứng vĩnh cửu và tạm thời). Những điều kiện cần thi t có đủ và dùng thêm những hóa chất nào sau đây:A dd xà phòng, Na2CO3B ddNa2CO3, BaCl2C ... (đktc) . Cho B tác dụng với 200 ml dd HCl được kết tủa D . Nung D ở nhiệt độ cao đến khối lượng không đổi thu được 3,57 gam rắn. Nồng độ của dd HCl trong dd thu được là:A 0,2M hoặc 0,5M B 0,5M...

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... Hữu khi nhớ về Việt Bắc cũng từng viết về đêm liên hoan: “Nhớ sao lớp học i tờ/ Đồng khuya đuốc sáng những ÔN THI ĐẠI HỌC BÀI TÂY TIẾN - QUANG DŨNG (Phân tích bài thơ Tây Tiến) Phân tích ... Quang Dũng một hình ảnh khó phai nhoà Thi n nhiên Tây Bắc vốn nổi tiếng với con sông Mã, một dòng sông đã chứa trong nó biết bao dữ dội. Nhưng ở đây, dòng sông Mã đã hiện lên với sự nhẹ nhàng ... Chính trang phục truyền thống đậm đà bản sắc văn hóa của các thi u nữ Tây Bắc càng tôn vinh lên vẻ đẹp của họ. Quang Dũng không khỏi không thán phục đến ngạc nhiên tr*ước vẻ đẹp ấy. Em trở thành...

... kỳ, đồ thị (Cm) luôn luôn có điểm cực đại, điểm cực tiểu và khoảng cách giữa hai điểm đó bằng 20 Baøi 9: Cho haøm soá mxmxxy+++=12. Tìm m sao cho hàm số đạt cực đại tại x = -1 Bài ... mxmm=− + + − + − Vieát phöông trình đường thẳng đi qua hai điểm cực trị của đồ thò haøm soá . Baøi 16: Cho haøm soá 21xmxyx+=− Tìm m để hàm số có cực đại ,cực tiểu . Với giá trị ... )12(2)142(2)1(23+−+−+−+= mxmmxmxy cực đại, cực tiểu tại hai điểm x1, x2 thỏa mãn điều kiện )21(212111xxxx+=+ Bài 3: Cho hàm số 122−−+=mxmxxy . Xác định m để hàm số có cực đại, cực tiểu ...

... ABC.Kẻ PH,PK lần lượt vuông góc với AB,AC ;kẻ QM,QN lần lượt vuông góc với AB,AC.Giả sử HK cắt MN ở S.Khi đó AS có vuông góc với PQ hay không? Thật tuyệt vời là chúng vẫn vuông góc với nhau!!! ... qua B,C tương ứng vuông góc với d1,d2 cắt nhau tại D. Đường thẳng qua B vuông góc với AB cắt d1 tại E.Đường thẳng qua C vuông góc với AC cắt d2 tại F. Chứng minh rằng AD vuông góc với EF (Bài ... M,N .Đường thẳng qua M vuông góc với BM cắt đường thẳng qua N vuông góc với CN tại S. Chứng minh rằng SO vuông góc với EF. Giải: IV/MỘT SỐ CÁCH XÁC ĐỊNH CỰC THÔNG DỤNG Điều này dành...

... đề ôn thi đại học Truonghocso.com Page 1 DẠNG : KIM LOẠI TÁC DỤNG VỚI CÁC DUNG DỊCH MUỐI I. Phương pháp giải chung - Với loại bài toán này thì đều có thể vận dụng cả 2 phương pháp đại ... đề ôn thi đại học Truonghocso.com Page 3 Câu 5: Nhúng một lá sắt nặng 8gam vào 500 ml dung dịch CuSO4 2M. Sau một thời gian lấy lá sắt ra cân lại nặng 8,8gam xem thể tích dung dịch không ... tủa. Biết B không tác dụng được HCl. Nồng đọ mol các chất trong dung dịch muối là? A. AgNO3 =0,02M và Cu(NO3)2=0,01M B. AgNO3=0,2M và Cu(NO3)2=0,1M Chuyên đề ôn thi đại học Truonghocso.com...

... học sinh giải được Tỷ lệ học sinh lúng túng Tỷ lệ học sinh không giải được60% 15% 20%C/ KẾT LUẬN: Thông qua việc giảng dạy ở lớp 12A 1 năm 2012 - 2013 và trong quá trình ôn luyện đại học ... TÀIHƯỚNG DẪN HỌC SINH GIẢI TOÁN PHẦN KIM LOẠI TÁC DỤNG VỚI NƯỚC VÀ DUNG DỊCH BAZƠ TRONG ÔN THI ĐẠI HỌCNgười thực hiện: Lê Văn HùngChức vụ: TTCMSKKN thuộc lĩnh mực (môn): Hoá học THANH HOÁ ... KHẢO1. HƯỚNG DẪN GIẢI NHANH BÀI TẬP HOÁ HỌC - TẬP III Cao Cự Giác Nhà xuất bản Đại học Quốc gia Hà nội 2. Tuyển tập bài giảng HOÁ HỌC VÔ CƠ Cao Cự Giác NXB ĐẠI HỌC SƯ PHẠM3. Chuyên đề cơ bản HOÁ...

... phân đơn giản có công thửực trong baỷng nguyeõn haứm cụ baỷn ã Caựch phaõn tích : Dùng biến đổi đại số như mũ, lũy thừa, các hằng đẳng thức và biến đổi lượng giác bằng các công thức lượng giác ... hiện: Bước 1: Đặt )()(')(')(xvvdxxududxxvdvxuu==⇒== Bước 2: Thay vào công thức tích phân từng từng phần : []∫∫−=bababavduvuudv . Bước 3: Tính [ và ]bavu.∫bavdu ... F(x) là một nguyên hàm của hàm số f(x) thì: []() () () ()bbaafxdx Fx Fb Fa==−∫ ( Công thức NewTon - Leiptnitz) 2. Các tính chất cuỷa tớch phaõn: ã Tớnh chaỏt 1: Neỏu haứm soỏ...

... điểm I thuộc (C) sao cho tam giác IAB vuông tại I. Chuyên đề LTĐH Huỳnh Chí Hào – boxmath.vn 133 CÁC BÀI TOÁN THI ĐẠI HỌC Bài 1: (B-2013) Bài 2: (A-2012) ... ?→−∞= và xlim y ?→+∞= (Chỉ nêu kết quả không cần giải thích chi tit) ã d) Bng bin thi n: x - ? +∞ y' ? y ? (Bảng biến thi n phải đầy đủ mọi chi tiết) 3) Đồ thị: ... – boxmath.vn 132 Chuyên đề LTĐH Huỳnh Chí Hào – boxmath.vn 162 LUYỆN GIẢI ĐỀ THI ĐẠI HỌC Bài 1: (A-2013) Bài 2: (B-2013) Bài 3: (D-2013) Bài 4: Bài 5: Bài 6: Bài...

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Fhbr0jICe+rsNunpqaeeuqpdDodlrKYk6aWVRJ948aN888tynzRgiNHjizrbTpz5kwQeSTtyJEj5Sx+CABQwpBTWB/S19cXTk5bUk9PT09PT5Qnp7GxsfmP+OHQwYJztApTZaKUeO7p6VnwOfvo0aMLPhyn0+nowzJHjhwJTyZKRBkaGhocHFzBxixRHm2PHj0axq0oyzCy2ezU1NSCzS6Y2Y4ePdrR0bHcEbnjx48XeRqempqKnuvCpFokL81/0w8ePLiaj0r4ikW29RwYGAhD1+Tk5NGjRwvVHeaMLh49ejSc0rbg7b1YVy92z0dJ1GEaXLCRBdP+wMDAxYsXg2gLrgYGBlpbW0talxwAoHwhJwiC/v7+cGZOV1fXqVOnij8gHj58+JFHHomy9Xs44DN/GUORh9rCI+Ocx8Rr167NOfLYsWMLfo++YDpa8rl2jlOnThUqUIVPusUfPcO18ivo+SXXeBw9enRwcHDBVe/zH4uz2WxPT8+CFYSPHDky/7XC61pu3YLjx48XmYSWzWaPHTv29NNPRw8t0ceRDh8+3NXVFb2i9IKKbzZ66tSpycnJwiK07u7u559/fv6uROHXAQt2XW9v7/wccvz48fb29gXPvFAaYXYUmX8bDw0NdXd3L3ibHT16dP6bOzQ0NDk5WahvUfzOWXFKBwCo3pCTSqVOnjzZ3d0dPhUt+Ew/NjZ25MiRcCHNYl+lh5GjMPUofNidnUOmpqaeeeaZrq6uxb4w3r9/fzg7rre3N3zOy2azR44cCX84u2zAI488kkqlCo2HLxp+1f3kk0+GPw+j0djYWF9fX/TH7qGhoZGRkSeffLK7uztsp7u7O5xEl81m5wx2hQlnfmGGIvmtiNkDTVNTU4cPHw6rhIVx69ixY0eOHMlms9ls9plnnin0RriYKtxGM3x8n9Mt4QS2OScQvssRg19hvdbLL7/c2toaPtw/9thjYZuFPhkYGOjt7Y040hJeYE9PTyqVKrKypXCZR44c6ezsLBLJlmwkjOi9vb3h7Rf26smTJwv1xI4ePToyMvLEE09s3749HBuZnJz82c9+Nqe1F154obW1Ney6Off8kSNHuru7w/exkMzD9T+LnXkh8Hd2dh4+fHhgYODll1+eMzITvrmzJ7aFQzSF+FSIVeG1hINRTzzxRPjz3t7ewp3zp3/6p4XbLHxbjx071t/fH/0DAgBQPrEUok6n09///vebmprCbWrCb9m/973vdXd39/b2Lrm/yuzvv3t6eq5duzYzM1P4Frmrq+v5559f8hwK23QGQRDW1Z2cnLx48WIhb4SldQvHh4+q4aLwwlY84YPjrl27enp6Zu8V09vbO3ufnILwi/D29vbe3t7CjiJhh4Ttb9y4sfCr8Nx6enpGRkbmb5wyx7Vr11pbW9vb2+f0XvigOWeznXBLk/B598CBA7N3Furr6yvsy1nYUCWcSRW2P3+rlqamprBbwk1+Zm8jM6dbFlPo9vb29u7u7q6urpGRkTk7ySQSifBVurq6CidcmK42uzNn3wzd3d0vvfRS4X0Mz23OljvpdDqs+dbd3d3X17fk7Vd40F/wFXt6evr6+uZshRR2YHh13d3dc/aNCatrhDdMeEvPvrELx4Rd9L3vfa+npydsP51OFzb56e3tXXD/pTndWIigYWcWbrOOjo7Ozs5nn3129k3S2tqaSCQ6Ozt7enoK5xzuJdXZ2RlWOS8cP3tiYXt7+1tvvVW4zcI7Z/52UgAAVSJReCqKxdjYWOHL6WVVsw3/cE5RgXDmzIKVBhZUqNw1+6XDHy5WrmBycnLOeYZlkecUDQtnbc2/orDx2SWDiwjDRkdHx6FDh5YctTh16lRdXd2cZsONXDo7OxfbsmbBM7l06dKZM2fmTBVb7OD5wmGTMDP82Z/9WVtb27Lei8XevgXP6vjx4+EGmou9WbNbC2fZtbe3f+c735kzoWvBxhcbf+vr6+vo6FhwO6Z0Ot3W1ja/hEaUm3NqaipcDbXYaYRdNKf9BT8IxYXT1Qo3Z3ibdXV1FYae5hw853yK9FV4Miu+cwAAKiXmkEORh/7wS/eenp7nnntuDZ15IeS4VdbGRzqRWIu3GQBAjG7SBYVH+SAInn322VUuT1/Qyy+/PDIyUpg2toYcO3bszJkza/HMK+6v//qvt2/fvmA5hzKEHACA9exLuiAIgiNHjoTriP7xH/8x3pYvXbr01FNPffWrX/3Rj34UThBcK30Srrb/5je/2dbWtrbOvEruqL/92789dOhQlJrm8fJmAQAYyQmCWRWZlyzNvCxjY2N/8Rd/8U//9E9rbheRgYGB/v7+v/mbvymMay24ywrF76iwFIfeAAAQcirgscceC+slRNziPYqhoaHOzs7/+I//mJNwlrXVfUWEu4i+8sora+u0q+2O+u1vf7tlyxa7ZAIACDkVE2O8CRNOR0dHb2/v/Fpk8Q4WlSLh9Pb2zt/2scpPuwpFLEMHAICQswZks9nOzs6Ojo7ZO2aGmy02NTUtq7J2mQ0MDHR1dQ0ODs4efwgDT7jtDwAACDnrUXd3dzqdnjMYEm4aU+VRoaurq7Ozc84WKOFOKfZFAQBAyFmnxsbG+vr62tvb58x/6+/vD4Ig3HCmOp04cSKdTs85w3A7yL6+Pu/smnD06NH29vYwrOoNAEDIIR5hHpjziJnNZvv6+np6euJd+ROvt956KwiCOdXA+vv758y7o5o9+eST3iwAACEnZmEVssnJydk/7O3t7ezsrPId6C9durRgZptfhAAAAKqZzUBjFo7h9PX1hZUGgiA4evRoOp2eU5G5CoUVEWbPTHvhhRf6+voUQQYAYG1J2Bw9didOnPjhD3947dq1gwcP3n777b//+79fzRXVZnvhhRdeeumlrVu3PvLIIy0tLR0dHQ8//LA3FAAAIQcAAKBiTFcDAACEHAAAACEHAABAyAEAABByAAAAIQcAAEDIAQAAqDo3LfaLRCKhdwAAgOpUZMNPm4ECAAA1xXQ1AABAyAEAABByAAAAhBwAAAAhBwAAEHIAAACEHAAAACEHAABAyAEAABByAAAAIQcAAEDIAQAAEHIAAACEHAAAACEHAAAQcgAAAIQcAAAAIQcAAEDIAQAAEHIAAAAhBwAAQMgBAAAQcgAAAIQcAAAAIQcAABByAAAAhBwAAAAhBwAAQMgBAAAQcgAAACEHAABAyAEAABByAAAAhBwAAAAhBwAAEHIAAACEHAAAACEHAABAyAEAAIQcAAAAIQcAAEDIAQAAEHIAAACEHAAAQMgBAAAQcgAAAIQcAAAAIQcAAEDIAQAAhBwAAAAhBwAAQMgBAAAQcgAAAIQcAABAyAEAABByAAAAhBwAAAAhBwAAQMgBAACEHAAAACEHAABAyAEAABByAAAAhBwAAEDIAQAAEHIAAACEHAAAACEHAABAyAEAAIQcAAAAIQcAAEDIAQAAEHIAAACEHAAAQMgBAAAQcgAAAIQcAAAAIQcAABByAAAAhBwAAAAhBwAAQMgBAAAQcgAAACEHAABAyAEAABByAAAAhBwAAAAhBwAAEHIAAACEHAAAACEHAABAyAEAABByAAAAIQcAAEDIAQAAEHIAAACEHAAAACEHAAAQcgAAAIQcAAAAIQcAAEDIAQAAEHIAAAAhBwAAQMgBAAAQcgAAAIQcAAAAIQcAABByAAAAhBwAAAAhBwAAQMgBAACEHAAAACEHAABAyAEAABByAAAAhBwAAEDIAQAAEHIAAACEHAAAACEHAABAyAEAAIQcAAAAIQcAAEDIAQAAEHIAAACEHAAAQMgBAAAQcgAAAIQcAAAAIQcAAEDIAQAAhBwAAAAhBwAAQMgBAAAQcgAAAIQcAABAyAEAABByAAAAhBwAAAAhBwAAQMgBAACEHAAAACEHAABAyAEAABByAAAAhBwAAEDIAQAAEHIAAACEHAAAACEHAAAQcgAAAIQcAAAAIQcAAEDIAQAAEHIAAAAhBwAAQMgBAAAQcgAAAIQcAAAAIQcAABByAAAAhBwAAAAhBwAAQMgBAAAQcgAAACEHAABAyAEAABByAAAAhBwAAAAhBwAAEHIAAACEHAAAACEHAABAyAEAABByAAAAIQcAAEDIAQAAEHIAAACEHAAAACEHAAAQcgAAAIQcAAAAIQcAAEDIAQAAhBxdAAAACDkAAABCDgAAgJADAAAg5AAAAEIOAACAkAMAACDkAAAACDkAAABCDgAAIOQAAAAIOQAAAEIOAACAkAMAACDkAAAAQg4AAICQAwAAIOQAAAAIOQAAAEIOAAAg5AAAAAg5AAAAQg4AAICQAwAAIOQAAABCDgAAgJADAAAg5AAAAAg5AAAAQg4AACDkAAAACDkAAABCDgAAgJADAAAg5AAAAEIOAACAkAMAACDkAAAACDkAAICQAwAAIOQAAAAIOQAAAEIOAACAkAMAAAg5AAAAQg4AAICQAwAAIOQAAAAIOQAAgJADAAAg5AAAAAg5AAAAQg4AAICQAwAACDkAAABCDgAAgJADAAAg5AAAAAg5AACAkAMAACDkAAAACDkAAABCDgAAgJADAAAIOQAAAEIOAACAkAMAACDkAAAACDkAAEAtukkXrMDPf/5znbCg7373uzoB8G+7f3IBKstIDgAAIOQAAAAIOQAAAEIOAACAkAMAAAg5AAAAQg4AAICQAwAAIOQAAAAIOQAAgJADAAAg5AAAAAg5AAAAQg4AAICQAwAACDkAAABCDgAAgJADAAAg5AAAAAg5AACAkAMAACDkAAAACDkAAABCDgAAgJADAAAIOQAAAEIOAACAkAMAACDkAAAACDkAAECtSszMzOgFAACgZhjJAQAAhBwAAAAhBwAAQMgBAAAQcgAAACEHAABAyAEAABByAAAAhBwAAAAhBwAAEHIAAACEHAAAACEHAABAyAEAABByAAAAIQcAAEDIAQAAEHIAAACEHAAAACEHAAAQcgAAAIQcAAAAIQcAAEDIAQAAEHIAAAAhBwAAQMgBAAAQcgAAAIQcAAAAIQcAABByAAAAhBwAAAAhBwAAQMgBAAAQcgAAACEHAABAyAEAABByAAAAhBwAAEDIAQAAEHIAAACEHAAAACEHAABAyAEAAIQcAAAAIQcAAEDIAQAAEHIAAACEHAAAQMgBAAAQcgAAAIQcAAAAIQcAAEDIAQAAhBwAAAAhBwAAQMgBAAAQcgAAAIQcAABAyAEAABByAAAAhBwAAAAhBwAAQMgBAACEHAAAACEHAABAyAEAABByAAAAhBwAAEDIAQAAEHIAAACEHAAAACEHAABAyAEAAIQcAAAAIQcAAEDIAQAAEHIAAAAhBwAAoEbcpAsAYMXy+fwXX3yRzWYLP6mvr0+lUnoGQMgBgLVhZmYml8vlcrkrV65kMpkFj2loaNi9e3djY6PuAqiIxMzMjF4AgCWDTTab/eijjyYmJiL+VXNz8/33359MJnUggJADAFXhxo0bk5OTH3/88fj4+MpaaGho+MpXvqInAcrMdDUA+P+ZmZm5evXq+Pj4YrPRogvHfyzRARByAKAybty48cEHH4yNjeXz+bja/Pzzz3UsgJADABWINxcuXEin0/E2m0wmb7/9dt0LIOQAQFldvnx5eHi4FC0/8MADiURCDwMIOQBQJjMzM8PDw6tfezNfMpnctWuX1TjrxI0bNz777LMgCD799NPp6enwh1evXg1/GATB5s2bgyBIpVL19fW6C8pAdTUA1qnp6elTp07FuPymYNOmTQ8++GBdXZ1Orkn5fP7atWvXrl27fv16uGlS9L9taGhoa2u77bbbDPGBkAMA8T+nvv7666VoubW1dfv27R5ha082m42l5l4QBMlk8sCBA/ZQAiEHAOL03nvvlWKWWnNz8549e3SvG0bOgcr6ki4AYL25cuVKKRJOEAQ7duzQvbVneno69hsmn88PDQ35rhmEHACIwY0bN0ZGRkrR8rZt2ywrr0kl2uwol8udPXtW90IpVFd1NTOYAaDG1MBgRekmlY2Pj2/durWxsdF9AvEykgMAUJmQEwTB8AzppJkAACAASURBVPCwSWsg5AAAlFtra2uJWs7lciVaIQZCDgAAi2ppaSld48PDwzdu3NDJIOQAAJRPMplsbm4uXfslKoYBQg4AAIu65557Std4JpOZnp7WySDkAACUT2Njo8EcEHIAAGpKSTd7nZiYyGazOhmEHACA8qmvry9dmbUgCM6cOaOTQcgBACiru+++u3Tb5uRyucuXL+tkEHIAAMqnrq7uvvvuK137586dszcoCDkAAGXV3Nzc0NBQosbz+by9QUHIAQAoq0Qi0dbWVrr27Q0Kq3eTLgAAasaNGzc+++yzTz/9tLDtzCeffHL9+vWIf55KpW666f89HTU0NNx0000bNmyoq6ubc9imTZsmJiZKdBUXLlwoaYUDqHmJqpr3mUgkvCUAUEtK/aSRz+evXbt27dq1bDZbutSRTCZ37dq1efPmwk+mp6ffeOON0l3Xo48+Wl9f7/4BIQcAWC8h58aNGx988MHFixdzuVzZrmXbtm07d+4s/O97771XuvUzzc3Ne/bscf/AyliTAwCssdR0+fLl//mf/xkdHS1nwgmCYHx8vDALLijx3qCZTGZqasrbDUIOAFD7zp49Ozw8XKlXP3/+fOG/6+vrm5ubS/daFbxMEHIAAMrk8uXL4+PjFTyBycnJ2f9b0sGcXC535coVbzoIOQBAzZqenq744MacnUBLPZgzMjJib1AQcgCAmnX69OnKnkAymZwfaUo6mGNvUBByAICaNT09XeYyA/MTzgMPPDC/EmwZVubYGxSEHACgBn3wwQcVfPXW1tavfe1rqVRqwd+WdDAnCIILFy64AWBZbtIFAED1u3jxYvlfNJlMbt++/c4770wmk0UOCwdzSjevLJ1O33XXXfYGBSEHAKgd2Ww2n8+X8xWbm5vvueeexsbGiMfv2LGjpItnzp8/b29QEHIAgNoxewvOMsSbHTt2LHfYpNSDOZlMZtu2bYvNlwPmsCYHAKh25dkupqGh4dFHH92zZ8/KJoaVemXOmTNn3Akg5AAANaIMddV27tx54MCB1ax7KXWZtVwud/nyZTcDCDkAgJCztIceemjbtm3zy0Mv1z333FPS8zx37py9QUHIAQBYOuHEtdalsbGxoaGhdKeaz+fHxsa8ZSDkAABrW0mrDsSYcEJtbW0l7Y10Om1vUFhSdVVXMwILQEVks9m33367yp+eiV1ra2vs71EqlWpoaCjp/LqRkRHlpKE4IzkA8H8fTONtM51O69hq1tDQ0NraWoqWSz2Yk8lkyllTG4QcAFirYl8yPjExUeb9K6mSKJJKpZLJZElP/vTp095BEHIAYAnNzc2xP5hevHhRx1anhoaGkk4m3L59e0nPP5fLlWfvIBByAGANSyQSLS0tsYccy01XbzV71yym1Bt33nXXXaXulpGREXcXCDkAsIS777473gbz+fzVq1d1bBVqamoqaft1dXXbtm0r6Uvk83lDhSDkAMDSD6axr0Q/c+aMjq02DQ0NdXV1pX6VrVu3lvolRkdHlZMGIQcAlhD7LKNcLqcQVhWGnDK8Sqk3Bg2NjIx4Q0HIAYBi6uvrm5ub423zwoULOnaVNm3aFGNrZdu/KPZVXvMpJw1CDgAsLfYl6ePj4+YUrdKGDRtibO2mm8q0GXoZyg8EykmDkAMAS6qvr499lpHBnPWprq4u3jGoBSknDUIOACwt9m0i1ZJepXhHcsrpy1/+chleRTlpEHIAYAmpVCrewZx8Pp/JZHTsit12221r9Mxvv/32MrxKPp8fGxtzn4CQAwDFxD6Y8/777+vVdSiRSJR6w5xQOp3O5/M6HIQcAFhU7IM5uVwum83q2JUpT9HnEom9Xt9izp4961YBIQcAiol9MMfGoCtWtnpopVC2uXaZTEaQBiEHAJZ4Nk0mkzE2aDBnfSrbjLUwSKtAAEIOABR7Nr3vvvvibXN8fFzHrkB9ff2aPv+yzVjL5XJKXICQAwBLPJvGO5hjf/r1qZzV4YaHh20+C0IOACyqFIM558+f17ErsKZrD5Rzxpp7DIQcAFiCwRwhJxbl2TAnND4+7h5DyAEAFlWKwZwLFy7o2OXasGFDXE198skn5T//pqamcr7c6dOn3TMIOQDAomIfzBkfH7dqYrliXNZy/fr18p9/XV3dpk2byvZyuVzu8uXLbhuEHABgYQZzqsGa3iondNddd5Xz5c6dOydLI+QAAIuKfTAnnU57AF2Wtb4mJwiCco7kBEGQz+dVIEDIAQAWZTCn8o8sX4rtoaVSO8kkk8kyRzUVCBByAIBiDOZUVrydXyl33nlnmV9RBQKEHABgUQZzainnzMzMVOQS7rjjjohHxjXmowIBQg4AUMyWLVvinW5kMGdZYqzC/Omnn1bkEhobG6OHnLhCnQoECDkAQDFtbW3xNmgwJ7pbb721Bq5i27ZtUQ7LZDLbt2+P5RVVIEDIAQCKSaVSBnMq5ZZbbomrqVwuV6mruP322yMeWV9fH9fNpgJB7Uksh5ADACzBYE6lxBgvP//880pdRfRJdx9//HGMN5sKBAg5AMCiDOZUSoz7gV69erVSV1FXVxfx/vnwww9TqVRcu+uoQFBjZpZDyAEAlmYwpyLq6+vjauqzzz6r4IVELCSdz+enpqZ27doV1+uqQICQAwAsKpVKNTc3x9igwZyI4io4Njk5WcGriF5IOpvN1tfXx3Wz5fP5kZERdxFCDgCwsB07dsTboPpXUcRVRTqfz1fwKqJPd7x48WIQBDEO5mQymampqZX9bTabfe+9915//XXT3hByAKA2xfj9ekj9qyhSqVRcTVWwtxOJRMSbJ5fL5fP5urq6nTt3xvXqw8PDK1ikkc1m33777Uwmk8/nh4eHf/3rX6/PlR4IOQBQ4wzmVCRbxtVUpfYDDW3evDnikdeuXQuCoKWlJa6perlcLhwgWpYzZ87MaWR4eNgNiZADADX4wB3vYE4mkzGYU1yMde0q29XRh6TCuWGJRCLGSWujo6PLmrCXzWbn7yyUyWSy2ax7EiEHAGpNjM+dIYM5xd18881xNVXBKtJhQo44MpPJZMKJYZs3b44x4y1rHGZ8fHxZPwchBwDWsLq6utbW1hgbNJhTXCKRiGvW1vXr1yt7LRELSQdBUBhF2bt3b1yvPjExceXKldXfrqoCIuQAQA26++67421Qkd/i4iqwNjExUdkLuf322yMeWZgVFu8MyZGRkdVHlA8++MA9iZADALWmrq5u9+7dMTY4MTFhqUMR0ZfsL6myhaQ3btwY8cjZdQJinCGZz+cjTo8s0ucfffSRexIhBwBqUHNzc1xzqEJzKlkxW4wF1j755JMKXkgymYx42+RyucKQS7yhenx8PMq2OUX6fGJiwow1hBwAqEGJROK+++6LscFcLmcwZzG33HJLXE1VfPlT9GU5s6NIc3NzjBUI3nnnnSV3vCle72HFu4uCkAMAVS3e587AYM7iYhw0W/3K+9XfNhGPzGQys0N1W1tbXOeQz+dXsG3OYucGQg4A1I54nzuDIMjlcuEGKdUgm82Ojo6+/vrrQ0NDly9frvj0pE2bNsXSzuTkZGUvpLGxMeKRH3744ez/TaVSMVYgGB0dLT6oVXyK4Pj4+JJjQSDkAMCalEql4h3MOXfuXMWfHWdmZkZHR99+++3x8fF8Pj8xMTE8PPyrX/2qsrPpou+kWVw+n69sYKurq4t4z+Tz+TllEu6///4Yz+T06dPFb7biA2jztwoFIQcAakSM25iEz7WVnQg0MzPzzjvvzN/wMZ/Pv/322+l0ulIZLHpdsiVVtvZAsJxlOdeuXZuTOnbu3BnXaeRyueKT1opX7lZjDSEHAGpWvNuYBEFw7ty5Cg41DA8PF9lMJp1Oj42NVeTEYhwxq/gQRPSpdx9//PGcn7S0tMS4Qml0dLRITe3ilbtXuaoHhBwAqGo7duyIsbV8Pn/hwoWKXMj4+PiS40jpdLoi89ZirCJd8doD0ZflzB9SSyQS+/btizfWrqzP8/m8GmsIOQBQs+rr61tbW2NsMJ1Ol38wJ6w0EOXISlWBq5naA9GX5QQL1bxubGyMcfBwYmJisXIXxatIB2asIeQAQG27++67420w4rb0cQmX3EQ8ePY+leV0xx13xHWxFS8WF31ZzoLjZrt27YrxZIaHhxectLbk6JkZawg5AFDL4t2TPgiC8fHxsm1beePGjTfffHNZf/LZZ5+Vv5Ojz/JaUsXnWUUflbp69WoZ7rfFJq0VP08z1hByAKDGNTc3x7giPCjXYM7MzMxvfvObIqvPq8ctt9xSMyEn+rXM2S2nYMuWLTEWY1hs0tqGDRuK/6EZawg5AFDLEonEfffdF2ODmUymDM/ixcupLSiZTMZYBmBZrxtXjKz4o3n0a5m/W05BvOXLF5y0VrzAWmDGGkIOANS8eL9cD4pWvopFOp1ewbY8LS0tlerh4ju3RDcxMVHxTVdXvFtOQewVL+bfb0umWTPWEHIAoPa1tbXF2FoulytdveYrV66k0+kV/GHsVRaiW3JgIbpPP/20srfK7bffHvHI+bvlFGzfvj3GSZLzJ60tWWAtCIJLly754CPkAEAtS6VS8e4N+u6775ZizCGbzZ4+fXoFf/jQQw/V1dVVsHtj7IHK3iobN26MeORiy3KCIEgkEg888ECMZzVn0lqUkDM+Pl7xYTEQcgCgtGLfG3QFM8qKm56ejl4werbW1tYYY8YK1NKWoLEsyylFrh4aGiqElkQiEeVPFiwBB0IOANSO2FdKnDt3LsZvyvP5/KlTp1bwh5s2bdq+fXvFuzeuLUFjj44rEH1ZzieffFLkt7t27Ypx0loul5tdTiBKghofH/fBR8gBgBoX76qVfD4/NjYWV1NvvvnmCgpGJ5PJBx98MOL3+iUV15agQRCUbSeixURfllO8Al5dXV28lf1GR0cLnbNkFekwMVZ8f1UQcgCgtGLfqzGdTq/+IXJmZmZlCScIggMHDlRwKc5stbQsJ3otviLLckJbtmyJa4wrdPr06XD88LbbbotyvA1zEHIAoPbFvjfoyMjIKhPOO++8s7KE89BDD8V7LeUJBkuq+LKc6EuMcrncklMW483VuVzu7NmzQRDcdNNNUY5///33feoRcgCgxsVe9iqTyax4elWYcJa76Weo4sUG5ndsLS3LiV4zIJfLFT8gmUzu3LkzxnMbHx/PZrMRU2Uul7NhDkIOANS+VCoV796gKxvMWU3CaW5ujreIQixqaVlO9J1/lgw5QRC0tLTEe8u9++670TcUMmMNIQcA1oW9e/fG2NrExMRyl5GsJuE0NDTEOwMqxvQYV1MVX5YT/VqiTK5LJBLx3nL5fP7dd9+NeHA6nbZhDkIOANS++vr6ePcwOXPmTPTnyNUknGQyuX///moop7Zg+oqrqYovy4my22Yo4uS6+vr6eCetLWsd18cff+xTj5ADALVv165dMbaWy+UiPuzm8/kVJ5wgCPbt21c9xQbmiHdZTmUHH5Z1LRHzRuyT1qI7f/68jzxCDgDUvrq6uni/WT937tyS5aTD/XBWnHB2797d2NhYzb0a47KcKGtdquRaim8JOjs4xTtpbVmdqfwAQg4ArAstLS0xjork8/kLFy4UOWB6enrF++EEQdDa2rply5Yq79Lo6/WXVPFlOdHzZPTUGvukteguXbrkI4+QAwC1L5FIxDtpLZ1OL1YWLJvNvvHGGytOOJs2bdq+fXv1d2n0HWaWdPHixbUScpaVxyo1aW18fHz1G9eCkAMAa8DmzZvLUE56fHz87bffXnGbyWRy37591VlsYL5t27bF0k4ul6vsQ3ldXV3Egb5lzT+s4KS1Dz74wEceIQcA1oXYy0mPj48X/vfGjRtDQ0Ojo6OrSTgHDhxYKwknCILbb789rqYqvozkzjvvjHjksjb2qdSktbGxMbWkEXIAYF2IvZz06OjolStXpqenx8fHf/WrX624zEDogQceqNpyagvauHFjXE1FLFhXOrfddlvEI5e7gqgik9by+bxa0gg5ALBexLsyJwiC06dPv/HGG6OjoytehBPavXt3jDtslkcymYzr8f3DDz+s7LVE7/yrV68uq+VKTVpTSxohBwDWi9jLScdi27Zt1V9ObUHRZ3kVl8/nlzUNLHbRtwSdnJxcbuMVmbSWy+UqXrYOIQcAKJN4y0mv3qZNm+6///412pkx7pZz5cqVCl5I9C1Bc7ncCpa7VGTS2uw1YyDkAEAtSyQSDzzwQJWcTDKZfPDBB9dQsYE5Ynxwr3gh6egz1j799NMV3HXln7SWyWQqOz6GkAMAlPVxNuLX9qV24MCBurq6NZ0Ya6aQdPQ6CiubBlaRSWtW5iDkAMA6EnsFghV46KGH1lY5tQXFWEh6BctdYhR9VGq5tQcKtm3bVuZ0nclkVlkSA4QcAFgz6uvr4xqCWJmdO3euuXJqC2pqaoqrqcuXL1f2lihDGNu9e3eZr6vi8wARcgCA8tmxY0elBlK2bdtW2YgVo7q6urhGJzKZTGW3sCxp7YFQMpksc85Jp9OVnQeIkAMAlPXp/L777qvIk/TaLae2oBhrrK14JlgsSlp7oGDLli1lnrR24cIFn3eEHABYL5qbm8tc2Hetl1NbUFy75QRBMDExUcELiZ49VrkFzYMPPljOUUSDOQg5ALCOJBKJe+65p5yvuNbLqS2W3OLKipVdQHLLLbdEPHKVI051dXVlLn1hMAchBwDWkU8++aRsr1Ub5dQW1NLSEks7+Xx+amqqgmkt4pGrLwS3efPmcq7LSqfTyqwh5ADAerHKeUfR1Uw5tcUe2dfcO7Kg6LUHVv9a999/fzlD79mzZ33eEXIAYF0ozyKQWiqntqD6+vq4ntcrO2MtehCdnp5e5WslEol9+/aV7dIymczqzxmEHACoduWZwFN75dQWFNeMtVwuV8GJVRs3box+nqt/ucbGxp07d5bt6s6fP+9Tj5ADADXu2rVrpX6JcF+UGiuntqAYC0l/+OGHlbqK6BUU4rp5WlpaylZROpPJVHDJE0IOAFAOH3/8calf4uGHH67VYgNzNDY21sCMtfr6+ohHXr9+PZZXTCQS5dwedHh42AcfIQcAalmpRwz27t0b/aG5BtTGjLWI4yqZTCauV0wmk3v37i3P1eVyucqWdkDIAQBKKJ/Pl/pJ+vPPP19XXVobM9ZuvfXW6LdQXC+6efPm5ubm8lzgu+++OzMz418AhBwAqEFleIweHh5eVzvN18aMtdtuu638IScIgt27d5dnZmM+n69sCTuEHACgVMrznLfe6lnVwIy16FWkYymwVlDOitKjo6PrKn4j5ADAupDP5+N9Ql3M+Pj4utqcJK6QE1RuxtqGDRsiHnnlypV4X7qcFaVHRkb8O4CQAwA1pZzTddbV02QymYxehbl63qPZ6urqIk4bK0VOLltFaeWkEXIAoKbMzMyU8wF6YmJiXdWzqoEZa01NTRHPMPYV/GFF6fIszhkeHlaBACEHAGrE1atXy/z0vK7qWd15551xNVWpGWvRl+V8+umnsb96MpnctWtXGS4zl8vFWAgbhBwAqKQzZ86U+RXz+fz6eZpMJpNxTbiq1Iy16LsblWhl1+bNm7dt21aGK11vBQARcgCgNk1NTZWn5MB6fpr88pe/HEs7lZqxFn1Z0bVr10p0Dvfff39cq5uKU4EAIQcA1rz333+/Ui+9fspJR1zTEkVFZqzdfPPNEY+8fv16ic4hkUjs37+/DBebyWRiLxOHkAMAlM/09HQFp42tn3LSdXV1cc22GhsbK//5JxKJiKMoJb2dksnk3r17y3C9IyMjJq0h5ADAWvXBBx9U9gTWz9Sg5ubmWNrJ5/MVqXQcfapYSePB5s2b4+rJ4p283natRcgBgBpx48aNdDpd2XNYP+WkU6lUXHWQP/roo4qcf8QjP/vss5KeSXkqSo+Pj9s2ByEHANaeCxcuVMNprJ9y0nFtmHPx4sXy91j0AmulTq2JROLhhx8uwyW/8847Jq0h5ADAWjIzM1PxYZzQ+iknHVfIyefzV69eLfPJR5+uVoZzq6+v3717dxnuTJXWEHIAYC2pqlyxTspJJ5PJuIogj4+Pl/nkq6HA2mxbtmwpw+IcldYQcgBgzZiZmTl37lxVndI6+cp8x44dcT18lzkWJhKJiCthJiYmynNK5VmcMzIysk6mUyLkAMDalslkKrKnZPFTWg/lpGPcMKf85Qein3x57q7yLM7J5/MVKduNkAMALEMVDuOETp8+XfOdH+OGOeXfxfXWW2+tqpATlGtxTjqdXicbOiHkAMBaFdcwTnNzc1wrTEK5XG49rH/YunVrXN1V5ifvW265Jfq5le2syrM4RwUChBwAqF5xDePs3r17z549sW8/vx7WPzQ2NsYVDsu8l2v0rXLKXPytDItzJiYmDOYg5ABAlfr4449XOYyzadOm3/u939uyZUsQBPX19a2trTGe3jpZ/3DPPffE0k46nS5nJvzSl6I+s5WnwFpBeRbnlDlSIuQAAFF9/vnnq/nznTt37tu3b/a35tu3b4/3S/R0Ol1tRRFid8cdd8SYWst22tHf6LIVWCuor69/6KGHSvoSVbKvFEIOADDXiucRJZPJAwcObNu2LZFIzP55IpF44IEH4j3Js2fP1va7EGP5gfPnz5fzzDdt2hTxyPIn1VQqFe+44nzrYTcnhBwAWHs+++yzFfxVc3Pz1772tcbGxsUeLuNd+Z3JZLLZbG2/EWu0/MCGDRsiHvnFF1+Uv1dbW1tLWoRgZR8fhBwAoOrs3bt3z549cwZw5ti1a1e8L/ruu+/WdgWCNVp+YPPmzRGPrFRM3b17d/ThpmVJJpM333yzfxAQcgCg6ixrllRYYyDKc21dXV2825Xk8/lMJlPb78VaLD9w0003RTzyk08+qUivJhKJffv2lSLn7Nq1q3jUByEHACojlUpFfP6bX2OguC1btsS7bc7w8HBtL4GIcWJV2QJh9Le4zAXWSppzmpubH3300eijWCDkAEC5Pfjgg8WjS0NDw6OPPjq/xsCSSrFtTg2/EYlEIq6F8u+//36ZHtoiV5Gu7EBcmHNWU90hmUw2Nzfv3bv361//+p49e+rr6/3TwXLdpAsAoGzq6uoOHDjw5ptvLlj/aufOnS0tLSublhNumxNjpd1MJnPPPfcsVvCgBtx1112xdFcul5uamipDRy2rXPjMzEwF53clEomdO3du3br10qVLk5OTuVyu+HU1NTVt2LDhtttua2houOWWW+rq6vxbwWpvwprf2xgAqs2NGzd+85vfzN7PZNOmTbt27VrlN9YzMzP/+7//G2P54IaGhgMHDtTwWoihoaFYdpVpbm7es2dPGU7417/+dfHAUPDoo49WzwDIjRs3pqamCpXoGhoawvVFGzZskGcQcgCgpkxPT2ez2VQqdfPNN8cVJLLZ7Ntvvx3jSe7evXvLli21+hbE2F1f//rXy/C8/t5770WcirZ3717rWFjPrMkBgMqor6/fsmVLfX19jEMlsW+bU9sVCFKp1LLmgBVx4cKF8pxwxCM///xzHzGEHACgRsS+bU5tVyC47777YmmnPLWko1eRvnLlis8CQg4AUCNi3zYnk8lMTU3VanfdcccdMXZUqc82ehXpzz77zGcBIQcAqB1btmyJd0PG4eHhWl3EW1dXF1ct6XPnzpX6bKOP5MRSUAGEHACgisQ7aS2Xy1V265WSamlpiaWdfD6fzWZLeqo333xz9INreztXEHIAYN2pr6/fuXNnjA3WcAWCcOvJWJo6c+ZMSU91WTUqzFhDyAEAak1LS0tcpcNCNVyBYMeOHbG0k8vlSj2YE30iYsQddUDIAQDWjEQisW/fvhgbrOEKBPX19dHX9Bc3Pj5e0lPdsGFDxCNVkUbIAQBqUGNj47Zt22JssIYrELS1tcUVBaenp0t3ntG3ylFFGiEHAKhNO3bsiHHSWg1XIEilUnEN5pw/f7505xm9wJo1OaxnN+kCAFiufD7/ySefTE9Pf/LJJ9evXy/8fPPmzc3NzctaHV5qdXV1u3btOn36dFwNDg8Pb9q0Kd7VPtUTCGPpqEwms2PHjvr6+lKcZPRmVZFGyAEAipmZmQnXlGez2SJDGeGvtmzZUlUnv3nz5k2bNsX4yHv27Nk9e/bU3rt8++23J5PJfD6/+qbOnz9foi5aVhXpmZmZqorcUDamqwHAovL5/Pj4+NDQ0MDAwJtvvjk6OrrkZK2rV69W4YXs3r07xtYymUypa4hVRCKRuO++++LqohKtzPnSl5bx8Pbpp5/6FCPkAAD/N9uk0+lf//rXr7/++ujo6LLGQGbPXqseyWQy3pzz7rvv1mQFgubm5rhm4pVoZc6yTk+BNYQcACCYnp5+7733Xn/99XQ6vbJtRqp2IURzc3NcC+vDHDg2NlZ7N8CaGMyJzlY5CDkAsN5duXLljTfeWH31sBs3blTn4/vevXtjbDCdTlf8Ib5EabDKB3Oam5sjHmkkByEHANa1fD4fVwmyqi3dW19f39raGmODIyMjtXcn1NJgTk0unQIhBwCiOnv2bFxNffDBB1V7mdu3b4+x+vPExMTly5dr72ao8sGc6PuB2ioHIQcA1q/p6ekY97i8ePFi1S7KTyQS+/bti7HBc+fOVef0vFX2UoyDOVNTU/GeXvT9QG2Vg5ADAOtXvLN68vl8dRaSDjU2Nm7bti3Gi63JSWsxDuYMDw9XKuSAkAMA69eVK1fibXB8fLyar3fHjh0xTlorxWBFxcU4mBNuIxvjuS2rSl5NFocAIQcAljY5ORlvg5lMpponcdXV1e3atSvGBt95553a2zYnxsGcWt1WCIQcAKhS+Xw+n8/H3uyFCxeq+ao3b94cvRJxlD68ePFijd0YMQ7m5PP5GBd93XzzzdEPtlUOQg4ArEdffPFFKZqt5vIDoXgHc0ZHR2tvZlSMgzkxVmhIJBLRD7ZVDkIOABCbKi8/EARBXV3d7t27AKWopwAAIABJREFUY2yw9ioQJBKJBx54IK77oSKDe0IOQg4ArEf19fUlajmdTlf5tW/ZsmXTpk1xtVaT2+akUqllLfQvfj/ENdgVfaqh/UARcgCAOE1MTJRitU+84h3MGR4err1tc2Lsopostw1CDgBUoxiX4M9R/cvxk8nkzp07Y2yw9p7jGxsb47pDJiYmYq9XXlzslQNByAGAtSGVSpWo5XQ6Xf21g1taWuKakRUEQSaTKfNzfBns2LEjxhC4+lti8+bNEY+s/rFEEHIAYI2FnCAIPv744yq//EQisXfv3hgbjOU5vqrU19e3trbG0lQ+nx8bG/OhAyEHAErrlltuKV3j58+fXxMP8TFOWsvn82fPnq2xm+Tuu++Oq6kYKxBEfDt8xhFyAGDdqauri7HI2By5XG5qaqr6O6GlpSWuPWGCIBgfH18TV72smyTGCgSnT58u22BXiXaCAiEHAKrdXXfdVbrG33///ervgUQisW/fvhgbfOedd2ps0lpzc3Nci5dyuVz1F6UAIQcA1rbSjeQEQZDJZNZEYeXGxsZt27bF1Vo+n6+x5/hEIhHjYM7o6Gh5JpLZDxQhBwDWqWQyGWOFsfkqstv9Ctx///0xTlobHR0t5+KT8uTAGAuODw8Pl+Gcc7mcDzhCDgCsUy0tLaVrfE3Ukg5KMGmtnItPymPXrl1xNTUxMXH58mUfPRByAKBU7rzzzpK2n8lk1kQ/xDtprfYWn8RbgWB4eLjGBrtAyAGAKlLqGWtrovxAyKS14rZs2RLjrbKCwa7a224VhBwAKJUYN7afL5fLZbPZNdEPiUQixklZQRCMjIzU2K0S4/apKxjs+uyzz6IffPXqVR9thBwAWL+amppK2n46nV4rXbF58+YYV9jX3uKT+vr61tbWuFobHR2Nvq3QzMzMxMREiRIRCDkAUGvq6upiXI6y4LP+Gpq4tWvXrhgnrQ0PD5enYnLZbN++Pcb+eeeddyLWGTcyA0IOACzP1q1bS9r++fPn11Dki3fSWnkqJpdNvJXo8vn8b37zm4hR2ecUhBwAWIbGxsaSlh9YKxuDhkxaW/JuiXHoL2L/1Fi1OhByAPj/2Lu7piayvY/73Ta0cRKJMZKwkwFSQKSiA5RTTDlaZc0c3K/hej3X67lew30yZRU6NdSmhK2pELAaMWxowQDSGlsz3AeZG5GH0J38+yn5fo5ms8NKP2L/eq31X/DD2NiYp+1HZWHQFgattSdbia5cLrevTnFwcNBjBxAg5AAA4AfBvosLGYYRoc4cBq21J7586tLS0mVFCI6Pj1++fMkdChByAADo5LFVsHDWhXZ3dyN0QPpn0Fqj0djZ2Tk6OnK1cE0ikZC9YBYXFy/sz1lbW6MbByDkAADQoZGREU/bX19fd7v+Y7D6YdDaq1evnj9/Xi6XFxcXnz175moLx8fHZadyLS0t1Wq1k4vEtu1arVar1bg3ASfUaP2FBQDAz0de0zS9a79UKmWz2QgdkL29vZWVFanWUqnU7Oysqqoh2buDg4OlpaXTP9F1/eHDh5qmOWzBtu2FhQXZrdJ1fXh4eH9/37KsjhvJZDL37t3jjkZfoScHAICLebpgjqIo6+vr0Tog4oPWQlUlbHV19XxocVjT+SSQlEol2a1qdeB0k3AAQg4AAPgmmUx6Wkvatu32dbRCSHbQWrVaDcnSqEdHRxcGCbeLt2azWa+rVnSWTrmdQcgBAAD/mJiY8LT9870HISdeaW1lZSUMI+fbdJVsb2+7aqpUKgnmQACEHAAAhN2+fdvTB1bLsiLXmSM7aM2yrJAvbbm1teUqhqmq+vPPP3PvAIQcAABCSlXVyclJT78icp05igeD1i5bFiYMbNt2OyUmFovNzMyEZxc8HXUJEHIAAIieTCZDZ84Z4oPWlpeXw1zutYMTlE6nvS5c4dzAwAA3Mgg5AADgG1VVc7mcp18Rxc4c2UFrtm2vra2Fdmc7W7l1amoqlUqFYftjsRg3Mgg5AADgO6Ojo562b1lWSIqMuSI7aK1WqwXYo9W+r6Ner3cWj8NQhIAqCCDkAACAC2ia5nVd4NevX0fxsMgOWnv58mWz2QxkX66ctdJZCtV1PfAiBMPDw9zCIOQAAIALjI2Nedq+aZpR7MwRH7RWqVTCuacd9zLFYrEHDx4EuOVDQ0PcvyDkAACACyQSCa9LVEWxM0eRHrRmmubOzk4Id/Pw8LDj300mk8ViMagtTyaT3L8g5AAAgIt5vTBoRDtzxAetlctl27Z93osrp+a/e/eum/bz+XyhUAjkBFF1AIQcAABwqdu3b3v9FRHtzJEdtKYoyosXL8JWUdq27S7nCxUKBf9zTlDJCiDkAAAQDaqqer3ySUQ7cxTpQWuWZW1tbYVtHz99+tR95CiVSn5u88jICHcuCDkAAKCdf/3rX15/RUQ7czRNm52dFWywWq0eHR35uQtXhjTLsrr/lmw2++DBA3/KOsfjccaqgZADAACukEgkvH48jW5nTiKRkO3pWl5e9rOi9K1bt9p/YG9vT+SLksnkw4cPfVgndGZmhnsWhBwAAHC18fFxr78iop05iqJMTU0JhsCwVZQ2TVOqKU3T5ubmZmZmvMvMxWKRbhwQcgAAgCM+LK1ommbHq7IES1VV2UFrYasoLduzlE6nHz16VCqVZKOOruvz8/Nezx8DQm6AQwAAgKsnyHg8LjI9o43V1dVffvklisenNWitVqtJNVgul1OplA+TWAYHB6/8zKdPnxKJhGwszGazmUzm8PDQMIx6vd5xU/F4fHh4+M6dO7JbCESUGrYSjQAAhNze3t7KyorX3/LgwYOILuN4fHy8uLgomAPj8fj8/Lyqqp5u9s7OTrlcbv+ZUqmUzWY9PXSWZR0cHBwcHFiWdf4YnpTqTqfTJwdnYGCAkWkAIQcAgK40m82nT596/S3xeDyinTmKojQajefPnws2mM/ni8Vi4CEnk8ncu3ePWwAIP+bkAADgjqZpPpTGar3Rj+ghisVispmkVqtJFTfrxv7+Ptc/QMgBAKA3/fjjjz58y+rqanQPUS6Xi8fjgg2urKzYth3sTtm27WdVawCEHAAA/HPlmioiLMsKVW0xV1RVnZubk22zXC57N8ze4bSWL1++cP0DhBwAAHqQpmn+lOhdX1+P7uxZXddLpZJgg/V6fWNjw6OtvX79upOPRXcMIUDIAQAAVzipc+Up27YF16D0XzablZ2/ZBhGsDHj06dPXPwAIQcAgN40NDTkzxdFujNHUZSffvpJdpWbly9fBjg5h54cgJADAEDPUlXVnxFrtm17N0bLB5qmTU9Pyx6QFy9eBBX8ulmvEwAhBwCAsPNnxJqiKIZhRLqoVzqdlj1WlmWtra0FtTuBF3kDQMgBAIRRo9E4ODjYOSWKD/G+jVhTFOX169eRPuOlUkl20FqAK+cQcoDwG+AQAAD8eS788OHDhw8fDg4OLhvwUygUCoVChHaqNWKtVqv58F21Wm10dNRhmeNwHqvZ2dnFxUXBNldWVh4/fiyVnQYHBx1+0rKsRCLBTQ2EGT05AACvHB8fHxwcGIaxsLCwsLCwsrJiGEabKQ2GYUTuHblvI9aU6HfmJBIJ8RC7uLgoNTlH0zSHnzw8POTuBkKOnhwAgLxms7m5ubm1teU2tHz48CGdTkdoT/0csWaa5tjYWKT7EMbHx9+9e2dZllSDtm2Xy+V79+75uResBwqEHz05AABJtm2/evXq6dOnnXXL7OzsRGt/faux1lIulyN9eaiqOjc3J579/BkxePobudMBQg4AoF/s7e0tLCx08whommbk1oTxc8SaZVlBzbaXout6qVSSbbNarfq8fE2ki90BhBwAAFw8aK6srIg8x0drx/0csaYoSqVSifTaoIqiZLPZVCol26bPK4QyYg0g5AAAel+j0ZAaMrS7uxutffd5xJpt2z0wXOqnn36SrSjt8wqhkYviACEHAADXBAt/vXv3LnK7f/v2bT+/rlwuR324lKZp9+/fFw8evs1Z+vr1K3c9QMgBAPSyRqMh2LdgWVbkCknfunUruqkyKMlkUrwHzLciBFGfGQUQcgAAuIL4nO8PHz5E6whomiY+yaS9Wq3WaDSifuVMTU3F43HZNv0pQsCcHICQAwDoceJDd96+fRu5g/Djjz/6/I2VSiXqV46qqjMzM+LNdlaEwNWvtFnTFgAhBwDQC8RfnNfr9cjNOfF/xFq9Xve5brIXYrGYeEVp27YXFxfdFiH4+++/XX0+6jXuAEIOAADt/PDDD+Jt7u/vR+sg+D9iTVGUly9f9sCjdjabFV9ryLbt5eVlTw/O58+fufcBQg4AoGfduHFDvE1GrDl8lN/a2uqBS2h6elq2orSiKPV6fWNjw7ttpsAaQMgBAPSyWCwm3iYj1hyqVqtRLyetKIqmabOzs+LNGoaxs7Pj8MNue2ZYKgcg5AAAepkXPTlKBFcF1TRNvFaYEz1QgUBRlEQiUSgUxJstl8sOZy65rVZHTw5AyAEA9DJd18XHGimK8ubNm8gdilwu5/zDUonINM2jo6MeuJDGx8e9mNe0tLTkJMC4DS09UPUBIOQAANDO8PCweJuWZUXu2d3VcdB1XSrnlMvlHriKVFUVr7TW8u9///vKCtFuQwtL5QCEHABAj7t9+7YXzUZuxJqr3FKv18fGxqQCofPJJyE/gF6snNMqKt0+57idY8NSOQAhBwDQ427evOlFs4ZhRK5EsqsRawMDA1LVk9fX13ugAoGiKOl0Op/Pe5RzLusbbDabFBIACDkAAHxHcOTVGaZpRu4Z3fmH3759OzExIfUQ//r16964nKampry4nFo558JhaZ0NjHRbqwAAIQcAEDFeTMtRIlh+IBaLOS/DUK/XBwcHpaqK1Wq13njsVlV1bm7Oo8aXlpZqtdqZHsLV1VVuYYCQAwDAWXfu3PGiWcuyIlfGytWItf39/dHRUamvXllZ6Y3LSdd1j4oQKIpSrVafPXt2cHBg23az2axWq52NVXO7tA4AQg4AIGISiYQXhaQVRanVaj2c996+fatpmtQDfc9UIFAUJZvNSk1YOs+27aWlpYWFhadPn3Z8gTFcDSDkAAB6n6seDOdM07yy/m908169Xm82m5lMRioi9kwFAkVRSqWSR8kZAAAAAAAgMlRFUV5t/r8cCAAAAAA94N7o/8NwNQAAAAA9hZADAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAAIQcAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAABAyAEAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAgJADAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAIOQAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAEHIAAAAAEHIAAAAAgJADAAAAAIQcAAAAACDkAAAAAAAhBwAAAAAhBwAAAAAIOQAAAABAyAEAAAAAQg4AAAAAAAAAAEAPUo+Pj71ot9lsPn36NJz7rOv69PR0Op3m9AMdODg4WFpa8vQrisViPp93+OG9vb2VlRWHH56Zmem3e//Vq1emacq2+euvv8ZisTDvdaPReP78ece//vvvv3OnA0CkeTVcbX9/P4R7m8lkZmZmHj16RMIBOpZIJLz+imq12mw2HX741q1bzlt++/Ztv52v6elpXddl2/z3v/9t23YPH7RGo8GdDgCEnAt8/fo1JHuo63qhUHjw4MFvv/127969dDqtqionHuiYpmnxeNzrb9nc3HS+PalUyuGH6/W68/jUM+drenpatk3btsvlskcDAUR8/vy5m1+3LIs7HQAIORfY29sLPNsUi8XHjx8/fvy4UCgkk0myDSAll8t5/RWGYThPIz/++KPzlsPZz+ypdDqdyWRk26zX68vLy6Hd5S67Yj58+MBtDgCRNuBRuwG+BisUCnfu3PFhRA3Qt5LJpA/fsrm5WSgUnHzS7Yi1PhywWiqV9vf3ZceY1et1wzAcnqNo+fjxI7c5AESaVz05gYScQqHw5MmTQqFAwgE85cNwNUVRDMNw+D6eEWtXUlV1dnbWi3NkGEbvHS7xUg0AgB4JOeJDI9pLpVKtYWmapnFSAR+emP25x1+/fu3wk4xYu1IikfCi18UwjMDHJ5/X/Sb1dmUFACDkREChUJidnRUvHwSgDX9GfJmm6bAz5/bt286b7cMaay3j4+Ne9MKtrKwcHBz02LH6+++/uc0BgJATmHw+XygUKCoA+MzJtByRVw+VSsXJx1RVdb60Tn+OWGsdpbm5OS9aXlpaClXOYbwZABByIiwej09NTXEWAf85WQtSpHJxvV53+PTsagRdf45YayXPUqnU2zknzLWtAQCEnKvNzMzQhwME5cpQEY/HRQZHra6uOvnY0NCQ8zb7dsSaoijZbNajKVUhyTldLpIDACDkXOqHH37wetNTqZSTd8kAPHLltJyvX7/evXu3+y+yLMvJPHJGrDlXKpU8mscYhpzT/Qbous6/LwBAyLnAjRs3vN70nlycAYiQK6s2W5aVTCZFOnMqlYqTMUiMWHNIVdWff/7Zo8YDzzmHh4ddtjA8PMwNDgCEnADouu7PcoQA2tyG7XsDvn79qijKzMxM999l27aTqeRDQ0POOyj6ecSaoiixWMyjyTmtnLOzsxPUrr17967LFlwV6wMA9FHI8TqB8JoNCIP2d2LrdX4sFhOZAbK+vn7lADNVVXO5nMMG+3zEmuLl5BxFUcrlciDrhNq23eUSN7quE3IAgJBzSbvXvO0jcjXDGIBH2j8LWpbV+o+JiQmRh9fNzc0rP3bnzh3nbW5vb/f5GSyVSl6snNNiGIZhGD7XOuu+G2dycpKSNgBAyLmY10tzevevMgDnbt686STkxGIx5yUB2j80X9n3kkgknP/92dra6vMz2Fo5x7u/2IZhLC8v+5lzNjY2uvzHJZvNcmsDACEnmJzjQ2EDAE5u8/Z3+kkmEenMUZytDep8xJplWV0ObeqNk3j//n3v2q/X68+ePfPnOB8cHHT5Rd7NUwIA9EjIuXXrlneNa5rGyQPCoP2d/uXLl5N7VqQiommajUZDKuQoEqObekAymfT04d627cXFRR9KrnU5C6hQKCQSCa4HACDkXPGvJscX6HntV8s5GbGmKMro6KhIB++VnTm6rjsf0drl6Kaekc1mPa3Lb9v20tKSp1N0arVavV7v+Nfz+TwrEwAAIedqvA8D+kH71xmtKtItmqZNTk52/431ev3KPoGxsTHnD99HR0ecR0VRxsfHr1z7qEutKTpeDF1rNBrVarXjX0+lUlNTU1wDAEDIuRrTZoB+0H5h+L29vdP/M5PJiHTmrK6utv+Aqxpru7u7nEdFUVRVnZ2d9Trn1Ov1hYUF2VV0jo+PV1ZWOv51XddnZ2epqAYAhByn/2xErmUAHXC+1oqqqtPT091/o2VZ7Z+SNU1z/rDuf5njMOecUqnkw9/Ycrn84sWLK6dXOUw4y8vLpwdGupJKpR49ekTCAQBCjrt/PLxolmpIQKi0mZZjmub5D4uUgF9fX2+fTFzNrzg8POQ8tui6Pj8/70POqdfrz58/r1ar3SzJatv28vJyx1NxUqkUfTgAQMhxjdoDQD9oH1rOR5G7d+92/6W2bbevGeBqyeAuq3KRczpWq9WePn3qZAWk8xqNxuLiYscJp1gszs3NkXAAgJDjmtdjuwGEP+R8/vz5zE+SyaTzEW7tk0mbJ2NVVZ2vQFqv17vpTyDndH8qW1HHYRGIVpmB58+fd9ax39o7kQVqAQD9GHK8qz3AiDUgPFRVbfNG43zIUfxaG/Rf//qX86a2t7c5lQHmnFbUWVxcXFhYMAxjZ2en0Wic7gY8Pj5uNBoHBwd//fXX8+fPa7VaZ9+SyWQePnxI/U8A6G0DXv8bqeu6F4Hk77//5uQB4ZFMJi8bNdRoNM6PXI3FYvl8vuPn1BOmaU5MTFxW4S2RSDj/E7S1tcWr/QtzzuLiop/vlWzbPj16sJWyRDYgHo+XSiXiDQD0g2tef0H71dA7duG7YQBBadOTc9mcfqnOnPa1g8fHxx22Y1kWC+ZclnMCrGlp27ZIwikWi/Pz8yQcACDkyGi/GnrHRAqPApDSZmzqx48fL/y5pmnFYrH7r7Ys68xqPKcNDw87b+q///0vp/LCnPPo0aPozrEsFApPnjzJ5/PUGAAAQo4YjwqsUe8VCNtz8GUv+9sUv8rlciJdBJVK5bJy0rquO386r9VqLJhzodY6oa6qcocn3hQKBU3TOIkAQMiR1H419I5d9m4YQFDajE29bLiRqqqTk5Pdf7Vt21tbW5f9vz/++KPzpt6/f8+pvOxkFQqFUqkUldQ9Pz9PvAEAQo6HvJjL2/HCCAA80mZsaps5FdlsVmRt0DZrSt6+fdt5O69fv+ZUtpHNZh8/fixyyryTSqWYfgMAhBzPuXrCcI5pOUCotHnwtSyrzS9KdQ5cVk661QXhsBHLsvjb0t5JJ0k4Ny+fz8/OzgZYKQEA0C8h5+bNm1402/6xCYDP2tQeaD+JLpFIiKwNaprmZfnkzp07ztthwZwrtXLj/Px8qLp0WumrWCxSYAAA4EfI0XXdi38IP3z4wPkDwkPTtMten+/v77f/Xa/LSScSCed/hQzDoPyAE4lEYn5+vlQqhaHbJJ/PP3r0iCFqAICWAX++Znh4WLzj5d27d5Er9QM4dHx83FoM6uDgQFGUr1+/tv5DURTLsk7uplQqNTg4mEwmR0ZGwjDB+tatW6Zpnv+5ZVnHx8dt3q/HYrFCoXB6CcjOtMpJXzg7aGxsrFwuO2zn/fv3HpW/7zGqqmaz2Tt37mxubnZ/+jqTyWTaLAgLACDkeCiVSon/+2dZVrPZpHIOekOz2Tw6OqrX6x8/frwwJ1yoVYHDNM1qtZrJZPL5vEdF2x1Kp9OXbbxlWe3fso+Ojm5tbXW/7GOlUnn06NH5QOVqxNrr168JOc5pmlYoFEZHR32OOvF4vFQq0XsDAAgs5AwNDXnR7NHRUbCPdED39vb2KpVK9w/3pmmaplkoFALs4WwzJOzg4KD9w6imaZOTk847Wy7TKid9vqijpmmZTMZhgGyVH6BzoIOoMz4+bprmmzdvPJ02mclkxsbGiDcAgIBDjqqqzh8vnKvX64QcRFq1Wq3VaoINGoYxODjoRd12J9rUHjg4OLhyqzKZjMjDcbVaHR4ePj9RJJ/PO/8rtL29zYDYzv7aZ7PZbDbbaDS2t7dFeudOp+hcLheSwZkAAEKOoihKNpsVDzlMy0GkNZtN2YRz8oifTCYDecmtaVo8Hr8wpTiJLqqq3r17d2lpqfstWVtbu3fv3pkfJpNJXdcdPnMbhjE+Pk6dro615lkVCoVGo3FwcLC3t9fxPwGpVOrHH3+8efMmhaEBAKELOW1WQ+8Y03IQadeueVXecHl5+cJ5KT7I5XLVarWzkNPKISK9vqZpXjicaXx8/MLNu6yRbDbLhdp92onFYtls9t69e41G4/Pnz41G4/Dw8MuXL/v7+2cyZ6uWRutKSCQSN27cINgAAEIdctq84u3G/v4+84MRUaqqenFTKIpi2/ba2lqxWPR/p4aHh52niAtNTEyI9PqWy+VffvnlzA9HRkacb96bN28IOV4EnmQyyYEFAHjqmp9flsvlxNt8//49ZxHR5UUPZ0utVjs6OvJ/j3Rdv3DujfORpa1hTt1viWVZOzs7Z37YKj/gvIVAjiEAAIhSyBkeHvY3DMryAAAgAElEQVTiSY5l+xBdo6Oj3jVeLpcDuTumpqbODzFytaejo6Mig5TW19ebzeaZH7qqyvDmzRuuUgAACDnt6LrufNFx5zwtVAp4KhaLeXFTnNwa4tU+nFBV9eHDhye9MZlM5tdff3U1d65VTrr7LbFte3Nz88wPW+UHHLZgmub5mAQAAAg53/FixNru7i4nEtE1MTHhXeMXdmX4oLVkypMnTx4/fnzv3r0OFpzJZrMi8c8wjEajceaH4+Pjzls4H5MAAAAh5zteLGuztbXFiUR03b5927vOnAu7MvyMOt2MOiuVSiKbUalUzvxkZGTE1V8YxsQCAEDIaSeRSIjXA7Vtm8nBiK7W4jDetW8YhuBqjD7/uXBeJKCNer1+cHBwJn05b9m2bQqcAABAyLkCI9aAM5LJpHedOYqirK2tRfTITE9Pi7Tz8uXLM70xrsoPvH79mqsUAABCTjuuBoo4xIg1RN3MzIx3jZumeX5eSiRomiay2o9t22f+SrgqP0AtaQAACDlX8KKcFCPWEHWxWMxV34Jb5+elREUulxMZ41qtVs8M23NVwI1a0gAAEHKufmoRb5MRa4g6T8usnZ+XEhWqqt6/f1+kqTPD9u7cueP8d03TjOjUJgAACDk+8WJVUEasIeo0TZOqJ3ah1dXViFYJSyaTIhUITNM8nfQ0TXPVe8YfGQAACDnteLEqKCPW0AMymYx4+cETQa0NKkKqm+tMBYLR0VHnv2sYBguDAgAQCQNBffHY2Fi5XJZtc3d3N5FIcFIhrjVrv9UJsLe31/rhly9f6vW6wxZSqdTg4ODJ/0wmkwMDA7FY7Pr166cXylRVdXJyUvzWOLG+vp7JZFRVjdwpiMVihULBMIwu22lVIDjpwGlNEbQsy/kfmWw2yx0BAAAh52KuRsM7tLW1NT4+HsUHOITN8fHx4eFhax6L8yTTxplGTveopFKpUql00oGTzWbfvHnj/LG7m0f8aBkfH9/a2up+Yky1Wh0eHj454BMTEysrKz2fEgEA6CvXgvpiTdNSqZT4A9zh4SEnFd1oNBrVavWPP/5YWloyDEMk4VyZfxYWFk6Pg/J0bdBqtRrRMVeqqkotm3O6AsHt27edDxHkjwwAAIScKxQKBfE2ozvlAIE7Pj6u1WrPnz+v1Wr+f/vm5ubJf3u9Nmh0l7ZMp9MiL0dOVyBQVdVVvcfV1VVuFgAACDmXGhoaEm+zVqtFtH4UArexsVGtVoP69jOT2j3tzKnVahFdG1RRFKnOnNMVCFyVH7AsK6LFuAEAIOT4QVVVL+YGvH//nvMKt/b29rqf1C6IzpzLtCoQdN9Oa3pS6781TXNVojpUlwoAAAhXyFEU5V//+pd4m2/fvuW8wu3zrvOp5x4pFAqapp3+iaedOWdWjImW8fFxkULb1Wr1pIzB2NiY81+s1+vR7QoDAICQ47lEIiH+urper7OWBVzZ2NgIfBvOj5jyujMnunNLvKhA4PZvUXS7wgAAIOT4wdWUX4d2d3c5tXCo2WwGUmngRDwen5+fP9ON0+JpZ45lWTs7OxE9a4IVCE4WPnK13qhpmnTmAABAyLnUyMiIeJtv3rzh1MKh/f39AL+9WCzOz89ftoit15056+vr0S3UIdWZU6lUWgfBVS1pRVG2t7e5fQAAIORczO2UXycsy+IlKxwKZBJXKpWamZn57bff8vl8+5UlPe3MsW07DEP1OiNYgaB1ENzWkj5TEA8AABByvuNFjTVessLhA64Py32eVigUnjx5Mjc3l06n28ebFq87cyL9pC5VgcAwjNZrEVe1pJXvVzcCAACEnO8MDQ2JPKmcdlIcFmgfcnyON+erqF3J084cRVEqlUpET59gBYJWeb0OaknTmQMAACHn0icV8fIDtm2zYB+uZFmWD9+SSqV+/fXXDuJNi9edOZGeQ59Op0XGu56UYXBVfkChMwcAAEJOG17UWDNNkxOM9k4qa3mnVCrNzc3FYrFuGqEzp42pqSmRdsrlcrPZjMViriIlnTkAABByLqXrukhB2NNqtRoPHwjWgwcPstls9+14MaTztHq9Ht2eT13Xi8WiYNhzGynpzAEAgJBzKZFCSWewYA7a+/Lli6cJJ5lMijSlqurk5KSnh+Lly5fRLSedy+VEQmBr2ZxkMumqta2tregeOgAACDne8uJdNQvmoD3vSqvNzMxIJZyWTCbjaWeObdvRHeGpqurs7KxIU61lc1xFykgfOgAACDmeP6aIz8xhwRwEolAopNNp8RvE686c1qSUiB7zRCIhUoHAtu21tTW3TUV6WVUAAAg53nK7SIUTLJgDn+m6Pj4+7kXL4svmnvf69evoHnmpctK1Ws2yLFcDaOnMAQCAkHMpt4tUOMFwefhscnLSySqfHVBV1Yupa2ee76Pb+alpWqlUEmlqeXnZbccynTkAABByLpXP52UbtG378PCQMw1/6LouUk7tMl4UWz8j0uWks9msyJpCtm1vbGy4+nNEZw4AAIScS3mx7qFhGJxpXEi859DrEKLruteD1iJdTlpRlJmZGZF2arXaDz/84OpX6MwBAICQc6mxsTHxhzbbtjnZ8MGdO3e8/grx3s7zIl1OOhaLSQ3q29jYcLV+l23bW1tb3AUAABByfHpM5MkD/hDvhzzP64VBleiPvBofHxc5RLZtuy0yXq1WWYMYAABCzgU0TROfXU35AfjDo5IDZ77Ch5k5kS4nrarq/fv3g/r2zc1NbgQAAAg5FxgZGZFtkPIDuJD4ep3+bLYPIUeJeDnpZDLp2+k4wzAMOnMAACDkXCAWi7kaCu/wyYPzjTMGBgaiuNm6rvswLi7S5aQVuWVzOkBnDgAAhJyLiY9Yo/wAesnExIQP3xLpctKCy+a4RWcOAACEnIslk0nx2dWUH8AZsVgsolt+69YtH74l6uWkpZbN6QCdOQAAEHIuNjk5KR5yKD+A065fvx7RLdc0TXxI54UiXU5akVs2xy3DMCI92A8AAEKOV8RrSVN+AL1EfEjnZXdNpLtABZfNcSvSlRsAACDkeMWLWtKUH8Bp0e3JURRlaGjIny+K+tovUsvmuGWaJp05AAAQci4gXiq3Xq/z2IETPixr4+nG5/N5f74r0hUIVFWdnZ0N5KvpzAEAgJBzAV3XxRe72N7e5sSjN/i2FIxpmkdHR9E9UIlEIpBlc0zTjHTlBgAACDleGRsbk23QMAzKD8D/nOAF30asKYpSLpcjfaKnp6cDGbS2urrKXQYAACHnrEQiIV4E1jRNzj16gKqqvoU0y7J2dnaie6w0TQtkeVDLsvb29rhWAQAg5Jx19+5d2QbfvHnDuUdLMpmM9PZns1nfvmt9fT3SFQjS6bQ/dbfPqFQq9B4DAEDIOWtoaEh2nIllWZGeYABBAwMDkd5+f1YFbbFtO+oz6Uulkv9fats2vccAABByzlJVVXxhUDpz0BKLxaSa+vLli//b79uqoC21Wi3S9Ql1XQ8k55TL5Uh3ggEAQMjxhPjEA9M0eeaAIrpUTr1eD2QXRkZG/Py6lZWVSJ/xTCYjPs3Pic3NTW43AAAIOd9RVVV8YVCeOaAoyrVr16K+Cz7PM4l6BQJVVWdmZvz/XsMwWKQLAABCzlmjo6OyDW5tbTEbGIGUFRbfBZ+7JqJegSAWixWLRf+/l7VBAQAg5JylaZpsZ45t2+/fv+cigGBCCOpV/fDwsJ9fZ9t21DtCc7mc/4PWor6mKgAAhBxPiM894MUqZENOUO7cuePzN0Z98JWqqkFVIOCOAwCAkPOdWCwmW4GAWtJQFOWHH36Qaurr16+B7EIikfA/0UW9AkEikcjn8z5/adRnNAEAQMjxxMTEhGyD1JLGjRs3BB9hg9oLh8/rlmVJPdn3wPP61NSU/5Oy1tfXmQ0IAAAh5zuxWEx2cJFpmrZtcyn0M8GlcgJ0+/Zth58cGhoSfF6PdAUCVVVnZ2d9/lLbtjc2NrjvAAAg5Hzn7t27sg1ubW1xKfQzwaVy9vb2gtqLW7duOfzk4eGhVG0x27ajPrEtkUiIL8N1JcMweLcCAAAh5zvJZFK2M8cwDEaP9LPe6MnRNM3hffHu3btcLic1TKtWq0V9+Zfp6Wn/B62tra1x6wEAQMj5jnhnjmmaXA39TOoZd39/P8C9yOVyTj5m27ZlWZOTk1LfG/UKBJqmTU9P+/ylpmkeHBxw6wEAQMj5RrwzZ319nauhnzkf63Vlfgj2vnD4yd3d3Ww2K3UT9UAFgnQ67f+gtdXVVfqQAQAg5HxnbGxMsDXbtnmr2s8Eq0gHOHbLeWh59+6dItojWi6Xu6xAEPiYN/8HrVmWRR8yAACEnO9kMhnZJ5LV1VUuiL4lWEU6qKVyFEVRVdVhd4RlWbZtJ5NJwe6LSqXS2S/u7Oz89ddfz58/f/HiRYBRJ5BBa92HQwAA0FMhR1VVwUkFCguD9jfnA72cXEgB7kg6nXb4yQ8fPiiiC0+ZptnBHdRoNMrlcuug1ev158+fB1ihLpBBax2HQwAA0IMhR/GgM4eFQfvW4OCgVFOfPn0KcEdSqZTDT7Zm0cRisUKhIPXty8vLbieZnK9AXalUApzaFEgFAl6vAABAyPlGvDPHNM2oF8NFZzRNk2rq48ePAe6IrusOk79pmq1AMjo6KvWywLZtV6tONRqN85NSgl0rU9O0Uqnk85eWy2UqEAAAQMj5RrwzZ3t7m8uiP0mNUwp8Kvnw8LDDTx4eHrYe6wVfFlSrVedvCi6r9lGr1QKcqZLNZp13iImgAgEAAISc76iq6nBtEIcMw2AecH8SLLAW7CV0+/Zth5+s1+snAU+wJrvIJJPd3d0Aj6H/nTnr6+v85QEAgJDzzejoqGyDm5ubXBl9SLDA2pcvXwLcEedr/rQKSbdeFgg+1tfrdYfL5gwMDFz2fwXbp6rrus85x7Zt/vIAAEDI+UbTNMGZ04qibG1tMT6+DwkWWAt2zSVN0xx2y7QKSbf+O5FICBYWc9gv0WY76/V6sD0b/g9aMwyDOYEAABByvpHtzLFtm/Hxfej69etSTQVbYE1xMy2nVUi6ZWpqSvAmcjJorf0x39/fD/Yw+j9o7XytOQAA0L8hR7wzZ319nc6cfqOqqlQRi2B7chQ3haTfv39/8t+6rheLRaltME3zyuOgqqrDbQuE/4PWKCcNAAAh5zvinTmBP2DBf85ns7R3MqE/KIlEwuEna7Xa6f+Zy+UEyxW+fPnyypcFbb6uVqsF/q7B/0Fr5XKZOxEAAELOP8Q7cxg30ofS6bRUU8FOrnA+LefMpqqqev/+fcGXBWtra90ES8uyAr8qfO7MsSwr8J5AAAAIOSEi25nDo0YfEiyj/Pnz52D3xfm0nDPXeTKZFKxAUKvV2o+/al+5O9hC0i3+D1pbXV3lZgQAgJDzD/HOHB41+o1gFenAZ1Y4H2S1t7d35ieCFQgURVleXm4z6qz9Md/a2grDheHzoDXesAAAQMj5Dp056DIn90ztAefTcs7XEpStQGDbdpus0r5yt23bIZmIT2cOAACEnCAfUmU7c85My0bPk6o9EHgV8o6n5bTIViCoVquXTVIaHBxs/7thGLGm+D5ojTcsAAAQcr4j25ljmibL8/WVnqk9oHQxLUdRFFVVZ2dnBTdmZWXlwkFrV/aehWTEmqIo2WxWcLbSlejMAQCAkPPdMxNl1tAxwdoDgVcG62ZajqIoiURC8JnesqzL4kr73rPwjFhTFGV6elqwg+vKI0ZnDgAAhJxv6MxBGELOhw8fgt2XbqblnDzTC27PZYPW2k/LUUIzYk1RFE3TZI9Je4ZhcEsCAEDI+fYgQmcOOqOqqlTOeffuXeA3QjfTclotyE5EuXDQWiwWa/9b4RmxpihKOp32bdBavV7nDQsAAIScb+jMQcekag9YltVsNoPdl26m5bRks1nZIXznE8uV7YdqxJri76C17e1tbkkAAAg5/xDvzNnc3ORy6RO3b9+WaurTp0/B7kuX03JaZmZmBDfp/KC169evX/lb4Rmxpvg7aC1UvVgAABBygifbmVOr1QJ/Kw9/3Lx5U6qpSK+WcyIWi8m+MjgzaE1VVSfP+m1WFPWfb4PWwtaLBQAAISdgdOagM4IjkQLvf+h+Wk7L+Pi44GE5P2jtysBg2/bh4WGorpNSqeTPoLX//ve/3JUAABByvpHtzDEMg86cPiH1kr5erwfe/+B8Wk6bmtfiy+ZUq9XTHRRXLgmqhGB9Va+PyWX29/e5JQEAIOR8o2lasVgUbJDOnD4huCTo58+fg90X56Pv3r9/3+b/lV02R1GU5eXlkwQ4NDR05edDOGQ0kUjk83mvv8WyrFAN1QMAgJATvFwuJzikhM6cPnHlyi3OBT4tx3nIubLmtWxVMdu219bWWv99ZRXplhD2aUxNTfkwaO3vv//mrgQAgJDzjaqqk5OTgg3SmdMPHD5zO9Gmapk/dF13+BRu23b7DC9eVaxWq7VCoJMCa0ooV6xSVXV+ft7rM6hpGnclAACEnO9kMhk6c9DBZSPSThhmkjiflnNlIa90Ou28LLUTL1++bDab1645+ltkWZZt22G7VHRdl62yfYbUwk0AABByegqdOeiA4LScwEsAO1/5x8mmlkolwW2zbbtSqTh/DRHOdWPS6bRsLcfTYXtiYoL7EQAAQs7FDwp05sCVXpqW47yKtJOa17quy+Yc0zR3dnach5xwzsIvFAqCOSeVSs3MzDx58uTevXuCgycBACDk9BQ6c+CW4JNl4KvlON8XhzWvs9ms7KC1crns8JMhXDDndM7pctxaPp9vZZu5ubl0Os1UHAAACDlXoDMHHVwzIu2EYbUc5/visOa1bGeO27svtNdMOp1+/Pix864zRVFSqVSxWPz1119///33YrFItgEAgJDjgqqq9+/fF2yQzpyeJzgtp806m2HbF4eD68QHrbkKjSEsP3D6yMzPzxeLxTZvVeLxeKFQmJ+f/+233+bm5vL5PGPSAAAQNNBXe5tMJuPxuNTjpmEYo6OjvHM9z7btDx8+fPjw4ePHj1++fKnX66ef7eLxeKtClw+ri3R/wUg1tbu7m0gkAtwX530Lh4eH2WzWySczmcybN28CyW9bW1seTfQXoapqPp/P5/NHR0e7u7sfP34cHBxsLXgai8USiQR/NwAA8Pbf4n5bSPvg4GBpaUmqNdmpxuFxfHz8+fPnr1+/Xvj8GovFWquaXL9+XVXV1g+bzeb+/v779+9rtZrzx+6xsTGHz9NBWVhYEOk0iMfjv/zyS7Dn9I8//nDySV3XHz9+7LDZRqPx/PnzQPbot99+O7n8AAAAThvotx0W78wZGRnppXEmzWZzc3PT1ZyHeDyu6/rp7hqHLMsql8vb29s//fRTaF9sDw8PO49t7Xe22WwGuJuqqqZSKSenqbUkqMNNjcVixWKxWq36v0emaYY8IQMAgKBc68N9lp1IEMIl2Dt2fHz8n//8x+2sbsuyOkg4J+r1+p9//rm3txfOY+J8hZkr7e/vB57wHX7y06dPzpvN5XKu5tlLefPmDX/BAQAAIecfiURCqmqWoiimaTYajd44MqZpdhNXOmbb9srKSjhLZgkuNv/+/ftg9+XmzZvOg6vzZlVV7bJucmcsywp8ASIAAEDICRHZFcR7pjMn2FfjhmGEMOdomibVTSEy7M2fkOO2Y601aM3/PQr8kAIAAEJOiMRiMTpzzrBtO/Ayx+HMOblcTqqpo6OjAHfEeTk70zQ7OEqyy4P2z60HAAAIOWLozDkjkIFqF+acsI1BEiwkHfiuOc/2bmvKqaoayLI529vb/B0HAACEnH/EYjHB6s898Eb58PAwJFuytLQUqqUeBde32draikpgc1V7oCWQ5UENw2g2m/wpBwAAhJx/jI6OCra2srIS6aPx8ePH8GzM4uJiqFZwyufzIu20CklHIuR0NrIum836P2htc3OTP+UAAICQ8w9N0wQ7c6Je6ykkw9VabNsul8vh2Z6eKSR948YNh5/s+GKmMwcAABByAjY6Oup8NvaVVldXuaSkmKa5s7MTko0RLCQd7E5pmubwgu+g9kBLIIPWdnd3uWUAAAAh59sz3+TkpFRr0e3MCdXYsBPlcjkkk3M0TZMahWWaZrBH23lg6/jgZ7NZweqFTqyvr4fzGgYAAIScYGQyGcHOnJcvX0bxYevz58/h3LDwDFq7c+eOVFPB1nhIp9MOP9lB7YET09PTgreVkzzWcdcTAAAg5PQgVVUFO3N42JJVr9fdLkzpkeHhYammgr1CnK9t2s2qPpqmTU9P+7lfdOYAAABCzney2azUqvY8bImrVCphmFau67rURfLu3bsAd8SH2gMt6XRaqiod7xcAAAAhpxN3797lYSucbNuuVCph2JJcLie1R910knTJh9oDJ6ampvwctMb7BQAAQMj5TjKZFFzfo1wuU9NWkGmaAaaC0xeJVFPBVgNzXnugy8tYVdXZ2Vk/8zDvFwAAACHnO7JTCFigUNby8nLgL+kTiYRUv0SwI9b8qT1wctCKxaJvu8b7BQAAQMj5TiwWE6x7ywKFsmzb3traCnwzpEasWZYVYHVs55OLLMsSOWiCc954vwAAAAg57kxNTQm2FpKZJF7LZDKlUmlmZsbr2RfVajXwZXMEC0kH2JnjvPaASGk7VVXn5uZ82zveLwAAAELOd3RdLxQKUq2ZptloNCKx49evX+/sFwuFwr1797LZbDqdfvTokeC8pgutra0Fe6AER6wF2DHlvPaASE9O684qlUq+7eDr16/5awYAACEH34yOjvbhw5aqqt0frtYLe8GUeGFuDLwCQW+MWHNYe8CyLKmpUNlsVnA4aHu1Wi0q7xcAAAAhxw+apgm+cjZNs8vFRsJM13VN0878sFAoePosWy6Xg61AIDhirV6vB7UXzivFff78WepLp6enfasoTWcOAACEHHwnk8kIPoqtrq726oG6rDegVCp5N27NsqxgywQLjljb3t4OcC8cflIwpWua5ltF6d5+vwAAAAg5rqmqKlhO2rKsnZ2d8O91B7Hkst4AVVVLpZJ37+wDX/NRasRavV4Paoq881lY3VeRPhOuPB3QeOb9AmuDAgBAyME36XRasOhtJBZiHxwcdPsrAwMDl/1fuq7//PPPHm1q4OWkBUes7e/vB7ILsVjM4SfF+0PGx8f9qSgdeKcfAAAg5ISO4MyckKzx4v9j9MzMjEeNV6vVAMsEJxIJqcf0t2/fBrUXDvvuxCcO+VlRmrVBAQAg5ODsg6zgBPpgH8qdcD4T/USbnpyWdDqdz+c92uBg13zsgRFrP/zwg/OULvvVuq57F4DPoAIBAACEHHxnYmKifx62rkws5znpzZiamvKoCEGwaz4ODw9LNRVU+YGhoSGHn5SdlnMSgP2pKF2r1QIvOw4AAAg5IRKLxQQnSYd87Y4OQo4TnhYhCLAzR9d1qRFrQQ1ldN5359F162l1itMCLzsOAAAIOeHSP2uDejcXXNd1wWp1pwXbmTM2NibSTlCrgjovNbG3t+dRAPauOsWZI0wFAgAACDn4hrVBRXg3OSfA3ChYY+3du3eBXNvOQ4JH2xCLxQTvrzbK5XIgSRIAABByQkp8bdBwjpxxXlO4M1NTU16MTarVakF15miaJjWrJKgRaw6337Is7y7abDbr3dKxZ3IOf80AAOgTAxyCK7XWBl1ZWRFprTVyJpvN9uFhnJ2dXVxcFG95c3PTt/Ulz8jn8yLjoCzLajQaXufM85wXWPv8+bN3m/fTTz/9+eefXve01Ov1vb29dDrN37Sw+b//+79e2p3/+Z//CeHendmq3jvsCPNdAASCnhxH+mRtUK+rXSUSCS8GrQU4M8d5gbIrBVJj7caNG85jmHeboWna7OysD/tbqVRYNgcAAEIOvhFc1sO27Y2NjRDuo/OZ6C1fv351+xUeDVoLqsyaqqpSnUiBjFgLvMDa6QBcLBa93l/btiuVCn/NAAAg5OAfsVhMsKPDMIwQToN22y/Rwdt9VVXv378vvuVbW1tBdY5JlR+wbdv/ohTOY60P25bP532YnGOapkfF4gAAACEnkmTrIK+trYUwyPnwLclkUnxcnG3b79+/D+SgJRIJqaGM/pc5dl5gbX9/34ft+emnn3xYOadSqVBpDQAAQg6+PREKTnA3TTNsC7Ffv37dny+amJgQbzPAWtJSC+bUajX/+6McBk7btn3YNn8m59i2HcJXDAAAgJATmPHxccE3zWFbiN23kBOLxcTroVmWFdQaRIIL5vjfH+WqwJoP2+PP5BwGrQEAQMjBN6qqTk5OCj6Xh2ohdlVVXUW4T58+hSQuttRqtUCOm+CCOf73R4WkwNpp/kzOqVQq4SxyCAAACDkByGazsuWkQ1XT9tatW84//PHjx24CVS6Xk9140zSDOphSpbEty/J5uojzi/nDhw++bZUPk3NCW+QQAAAQcoJRKpUEn7SCKn98Iec1hbs3Ojoq3mYgq820jpvUQ7nPtaSdb3Y3mdYtfybnBLjCEgAAIOSETiKRkC0n7fUiJM4NDAw4/3CX45dkCzm0BPhufnx8XCrk+DmMynnI8XlopT+Tc4JKxQAAgJATRlNTU4KthWeBQlc9Od1P0hDvzLFtO6iadSMjI1K7cHh46OeWOx+x5vMkFh8m52xsbDAzBwAAQg7+oeu64Gvmer0eVGWwM3wrsNaiaZr4U2xQR1Kw/IDPFRSchxx/CqydNjs7KzgF7sJI6f9OAQAAQk545XI5wbnRL1++DMMbZbcF1rofaCc+Ys3nOS2nSZUf8LmCgvPuO98KrJ2+IOfm5jwtQkDIAQCAkIPvHr+mp6elWrNtO8Cn89NcFVjr3tDQkGyD/hcoO50WpB7H/SxH4XwiViCTx3Rd97QIQXhmxAEAAEJOKKTTacGxNNVqNain8zM75fzD3Y8NU1VVsIrDSWIM6uhFsfyA856coIYCJhKJBw8eeNS44FquAACAkNMjZmZmBD9oI/4AACAASURBVFtbW1sLfI9isZjzD3/9+tXnWOWE/6OqTkSx/MC1a07/Duzv7wd1YJPJpBc5Z2ZmRtM0/o4BAEDIwdlIIDUTQ1EU0zQDr0Bw48YN5x8W2Vo/F+fxmmD5AcMw/Nlm50PsbNsOcOaYYM7Rdb1QKDx58kQ8YAMAAEJOj5iYmBBsbXV1NdgKBK5mlYj0mbjqOwq/sbExkXbq9bpv00XCXGDtTM6Zn5/vbOKTruuZTKZUKs3Pzz9+/LhQKNCHAwBArxrgEHRP07RSqVQul0VasyzLNM1sNhvgHmUyGYcrP0oNDNN1XXAiTbCpKZFIxONxkSOzvb0tXn3uspDjcIM/f/4c+OF99OjR4eFhvV5/9+7dhZut63qrfkaroyaZTA4ODhJpAAAg5MB1Knjz5o3UE3+5XL5z506Az2TJZNL58va2bXdfUuzWrVvOv9HJc3Cw18PY2JhI6DUMY3R01IcrwfkZbzQagQ8vVFU1mUwmk8lCoXB8fHzSuUSSAQAALQxXE3vqunv3rmCDlUolwN1xFRI+ffoUqnNRLBYDf9IVrBe3u7vrwwY7ryK9t7cXtlsv9v8j4QAAAEKOsGQyKfhoa5rm0dFRUPviqvaAyLyRL1++iGx5oVDI5XJhePKWGma2vr7uwwY7n5MjdaYAAAAIOdEwNTUl2Fq5XA6qAoGr4Wcir/br9Xr32zw/P18oFFRVDcPFMDo6KtKObds+FNxz3pPT/ZkCAAAg5ESJruvFYlGqtVYFgqD2xXmvVPczkZrNZpeHvVQqPXr0KPCpOKcJ1pJeXV31emuvX7/u2/kCAAAg5ERMLpfrfhb+iXK5LFhzzBXnk8sty+qyx+natWsdFwVuxZtsNhuSDpzTpGpJW5bldS1pV0ePEWsAAICQ019UVZ2enhZscG1tLeQhR+l67RRVVScnJ139SiqVevDgwePHj8MZb1pataRFmnr9+rXXW+tn3x0AAAAhJ2LS6XQqlZJqzTRNH6ZknOeq9kD3W5jNZp0ctHg8XiwWnzx5Mjc3F3ghYyekau6ZpunbwqBX+vr1K7c5AAAg5PQd2c6cly9f+l+BQNM050PIRGoPzM3NlUql818aj8fz+XypVHr8+PEvv/ySz+cjVCk4mUxKDV/c3t72elP9PN0AAADeYTFQT8RisUKhYBiGSGu2bW9tbeXzeZ/3Ynh4uFarOfnk/v6+yDdms9lsNttsNk9mfcRisahfDJOTk5FYGNR5gTXm5AAAgJBTgypS3POOj4+fPXsmWDbg119/9fmJf2dnx/nT+ePHjwUrLnAlXKhQKEgtv3Pe0dHR4uKiww///vvvnFkAABBaDFfzLD5KVyCoVCo+74KrSS+fPn3ipF92JYyPj4s0ZRiGd+WbnffkKFSRBgAAhJy+JVuBoF6v+zwXwlXHEWtEtjEyMiLV1ObmpkcbOTg46PzDjFgDAACEnP4l3pnj8xt052WF3717x+m+jKZpUsPMvOvMcTXbp8ui4QAAAIScCIvFYoIFA2zb9mG9lNNcLQnKEKY2RkdHpZryrjPH+ao+4alnDQAAQMgJwMTEhOCM/FqtdnR0FMKQoyiKnxsWOZHozHEecpiCBQAACDn9/nQrO2itXC77VhPP+VOvoiimaXK624hEZ45DHz9+5IQCAABCTl+TrUBgWdbW1pY/W66qqvMtZ1rOlXFXauyiR5056XTa+UXICQUAAIScfifbmVOtVgVX4Gnvzp07Dj9p27ZvWxVRPdOZQ8gBAACEHCixWEx2GUfny3R2ydW0HApJX3kZhLkzx9XoROpMAAAAQg6U8fFxwQoEvi2b4+rBd3t7mxPd3sTEhFRT4qX2XK0HylI5AACAkANFVdUoLpvjalpOvV73rShCRAmWWavVarKlnK9dc/EH4evXr5xNAABAyIFwBQLfls1xPi1HUZTDw0NOdHuCM3NkLwBXPY1MywEAAIQc/EO2M8efZXNcTcuhkPSVBDtzTNNkeSIAAABCTsBisVixWBRscHl52esRYq6m5dRqNc7ylQQ7c2RLUDg/1/5MCQMAACDkREMulxOsQGDbttfL5rialqMoCn0LVxLszLEsa2dnJ5BACwAAQMjBt8xw//59wQar1arsBPTzXE3L2d3d5SxfSbDa3vr6uv/1HpiTAwAACDn4TjKZzGQygg2urKx4vcHOP+x1z1LPZN3JyUmRpmzb3tjY8PlEE3IAAAAhB2dNTU0JtiY7Zuk8V6OYbNtmxJoTmUxGqjPHMAyR3jxXS+UAAAAQcvAdXddLpZJgg+Vy2bZtj7bW7bQcRqw5PKqCAxcrlYrP2+/d9QYAAEDIiapMJiM7z1u20NYZIyMjzj/MiDWHksmk1DVQr9e7r3jmalzi33//zRkEAACEHHxHVVXZzhyRx1yRx1/btg8ODjjFTszMzEg1ValU/K9AAAAAQMjBdxKJRD6fF2ywUqk0m00vNjUWi7n6PKuCOj+wUlUobNteW1vzbcupPQAAAAg5uNjExITssjnezc1wlcdqtRq9Cg5NT09LNVWr1Xyr+vD161fOHQAAIOTgApqmCT7jKopimqZHg9Zu377t6vPv37/n/Dq8BgQHLpbLZeIlAAAg5CBg6XTaVe2yK3k0aO3mzZuuPv/27VtOrkOC5aQty/Kn8MOnT584cQAAgJCDS8l25ti2/fr1a/GN1HXdVSmwer1OlWGHZMtJV6tVkWVz2vv48SMnDgAAEHJwqVgsViwWBRv0aG7G8PCwq8+/e/eOk+tQMpmUqkCgKMrKygqD1gAAACEHAcvlcoIVCBRFWV5eFn/MvXPnjqvPb2xscGadE+zQsyyrg4P/+fNnzgIAACDkQIyqqrOzs4INelFQ2G3VYBbMcUW2AoFhGG5783wY5AYAAEDI6S+JREJwwJIiPWjt+Ph4fX3d7W+9fPlyZ2eHk+tQNpt1NfGpPbe9ea5qCezv73O+AAAAIQdXm56eDu2gtY2NjQ4KCdi2XS6X//rrL9/Wb4m6mZkZqaZaB9/5513NoaKqBAAAIOTAEfFlc6QGrTWbTcMwOv51y7IWFxdfvXrFk/GVZKtQmKbpsCfNtm23wxEBAAAIOXBEfNkckUFrm5ubIg/cCwsLhmFQ+Ku9XC4nOGitXC47yZb1ep0jDwAACDnwiuDs85YuB6112Y1zhmEYz549Y6JOG6qqCg5aUxTlxYsXV14A29vbHHkAAEDIgVd0XZddNqfLQWvij79M1LmS7KA1y7LaB91Go0FPDgAAIOTAW7IDlpTuBq15tNwNE3X8vAbq9fplQff4+HhlZYUDDgAACDnwlviAJaXTQWtHR0eehpCTiTrNZpPzfuYamJubkw26F45b29raouQAAAAg5MAPsVgsn88LNtjZoDV/VvM0DOPPP//c2dmhJsFpuq7LTtCq1+vPnj07OacHBwfVarVarXKoAQBAz1B5oAy54+PjZ8+eyXakzM/PJxIJ559/9eqVaZp+Ptbfv38/mUxy9k+8ePFCfMJMPB7/8uVLl5fW77//ztkBAABhQ09O6GOoqt6/f1+2TcHlQb1g2/bS0hI1CU776aefZJeIVRTFsqwuE474JgEAABBy+kUymcxkMrIpQmR5UE+d1CRoNBpcA5qmzc7Ohm2rbt26xakBAACEHHRoenpa9q25q0prfo5VO//Vz58/r1ar1CRIJBKyVcUBAAAIOQiSpmmTk5OybS4vLztMDoVCIdjdr9VqT58+pfxaPp9PpVLh2Z7BwUHuTQAAQMhB57LZrOwDrm3blUrFySdHR0fDcAQMw3j69Gmfl1/zYnJOx4aGhrgxAQAAIQddkS0lrCiKaZp7e3tXfkzTtPAMlCqXy8+ePevbqKNp2s8//xySjRkYGOCuBAAAhBx0RXzJFEVRKpWKkzFg+Xx+fn4+JH0Itm2fRJ0+vAxisZj4KrGdicfj3JUAAICQg25lMhnZJ0vng9YSicSjR48Cn59zJur89ddf/qxVGirpdDoMJ4I5OQAAgJADAaqqir/FN03TYZeIqqqFQuHXX38Nzyt8y7Jai+r0W9QpFArBFiGIx+OapnFLAgCAMD4z9/Mc7uiq1WrValW2zcePH7sajbazs7O+vt7lapLij913795NJpN9chkcHx8vLi5alhVUygpPtx4AAMBp9OREUi6XE58eUy6XXX0+m80+fPgwn8+H57D0W6+Oqqpzc3NBTZS6efMmdyIAACDkQPLpdnZ2VrbNer3udh5/q+paqHJOv0UdXdeDKghByAEAAIQcCEskEuLpolwuNxoNt7+VyWRCeHz6J+oEknNSqVR4lusBAAAg5PSOqakp8QfNlZUVt9O0wrwiZJ9EHV3XHz586GcdAmbjAAAAQg484cWgNcuyNjY23G5G2Eas9WHU0TRtdnbWnxOh63qYky0AAAAhJ9oSiYT4aDHDMI6Ojlz9SjhHrF0Wdfb29nqyqKCqqsVi8cGDB14PJJudnVVVlbsPAAAQcuCV6elp8Yfa5eVlVzEgQu/1LctaWVl59uzZzs5OT0adZDL58OFD74aTlUqlRCLh8MPNZnNnZ6fZbHKfAgAAP7FOTi/Y29tbWVmRbTOfzxeLReefr1artVotWsdN1/Xx8fGRkZGeXNTStu2trS3DMKQaTKVS09PTsVisg0uiVCplMhn6fwAAACEHLrx69co0Tdk2Z2Zm0um0ww8fHBwsLS1F9OgVCoXR0dGejDrHx8fv37/f2dnp7PJIpVI//PDD7du3b9265er4NJvNp0+fdhObAQAACDn9rtls/vnnn7ZtC7bpqjbx8fHxH3/8EeljmMlkJiYmnPdURE6j0Tg4OPj69ev5AgzJZHJgYEBRlFgsdv36dUVRBgcHu0l9hmGc70R68OBBMpnkbgUAAIQcOOXFoLVUKjU3N+fww1EcsXbhLhcKBZ7Fu7SwsHA+csfj8V9++YWDAwAAvEbhgd6RTqfFq5zV6/WdnR2HH45EjTUnu9wqwtarlQn8cWGnomVZbgv3AQAAEHL63fT0tHib5XK50Wg4+WQvrZ1iWVa5XH727JlhGBQHE0k4Lf/97385PgAAgJADFzRNK5VK4s2urKw46dMI/6qgHTysG4bx9OnTV69e0QUholar0T8GAAAIOXAnm82mUinZNi3LWltbc/LJ3hixdp5pmouLiz28kKis9sUqLMviEAEAAEIO3PGiM6dWq50vyXVeZyPWxFOZR1oLif7xxx+GYcgWsusru7u7HAQAAEDIgTu6rnuRc16+fHnl7JTORqyNjIw8efKkUChE5QgbhrGwsPDixYuDgwM6dtza2triIAAAAEIOXPNi0Jpt2//5z3+u/FgHI9b29vY0TSsUCtGKOq06bK3iBHTsnBGPx9tcSBwuAABAyEEnvOjMcVJRuoMRa6Zptv4jilGnVZxgYWGBGTsOQ07rQuIQAQAA72j/+7//y1HozVOraTdu3BCf/7C7uzsyMjIwMHDZB1RV/fLly4cPH1w1m8vlNE37J3lfu3br1q3R0dHr168fHR1FpYLzly9fTNPc2Nj48uXL9evX20++73nVarXNiWs2myMjI9ykAADAI/Tk9DIvBq0pDipKdzBi7Xwo0jQtn88/evSoVCpFKzDUarXFxcWFhYVardaf47KuHJBWr9fp8gIAAIQcdMiLQWtXVpTuYMTa+/fvL/y5qqrZbDaKUce27Wq1ejKMra9WFHXSj0chaQD/X3v389Nmmhhw3C8mxokdDOPEno0TjXcWL4KERKRQaalmdw+rrnranqiqXvbSa/+G+Q/ac289tAcu7d5aaQ/7ozvabaVJE0RQwkzk/GKCIXEMvBlixrgHSwjNJBlg/Npgfz6nSUh4/T6vyfDlfZ7nBYiO6Wq9foGjmbS2tbU1OjqaTCbfViZHnbH2+vXrK1euvO2jQRCk0+nLly8PDw+HYbi7u3uKLkFrGtujR49qtdqZM2eGhoYGBnr8hwvlcvlbGyaRSIyMjPgKBQCi4E5O74to0tq7d5Q+6oy1er1+mP2ps9ns7Ozs9PT0u9e1n0zVanVxcfH3v//97du3e/jezs7Ozv5OEu+wvr7uaxMAEDkcXxST1t69o/QxZqxtb28f8k9mMpnZ2dmZmZljLP5RO1F78ODBYf5YGIZ9NYUPAOikwPLfPrG2tra8vNz2T1sqld729M+VlZWnT58e/lMVi8Vj7By9s7Pz7Nmzcrl8qq9OKpW6dOnSxYsXT/uebEd6m01PT2cyGV+bHN5JmF/9zddg1vfJv2pAH3Inp19ENGltZWVlZ2fnjR866m2W1dXVY7yAZDK5/2id01sIYRi2din45JNPyuVyrVY7jT99qNVqRwppT8sBAEQO31VEG5R9+umnb/yO/Kgz1r513+F3aD1FtLUJ22lcrnNwEMrl8q1bt37729/evn17bW3tbQ150uzs7CwtLR01inxVAgBRGDQE/SORSIyPjy8uLrb9+/Ll5eXJycmv/X4QBIVC4Ugz1ra2trLZ7LFfSWu/6Xw+X6vVyuXyab9RUK1W908hl8tls9lMJvO2He2663iTIVtPywmCwNcmACByOL5sNpvL5Q6z+dWRVCqVfD7/zT7J5XJHipy1tbXvEjn7MpnMjRs3dnZ2Hj9+fKQXcGJVKpX9q5bL5TKZTCaTOXv2bDwe7+4LayXusXsyDMN0Ou0LEwAQOXwn4+PjL1++PPbEsLdZXFycm5v72nS4o85Yq1Qq37wjdGzJZLJUKn344YfPnj17+PBh20/5JARPKpUaGRkZHh5OpVIdbp5ms/nixYt79+59l4EVOQCAyKEN4vF4FJPWYrHY7du3Z2ZmDs4+OsaMte3t7fZ+1xuPxwuFwqVLlzY3N+/fv/+tD6k8XcIwDMNwf4RbT9g8d+7c2bNnM5nMwMBA21dhNZvNMAw3NjbasqPd8+fP8/m8r0oAQOTwXUU0aS0Mw88++6xUKh38zaPOWKvValH8aD8IgtbTdXpjy+m3qdfr37ysrfJpXfdYLJZMJoeGhlofGhoaetuSmGaz+fr16/2LEovFNjc3X7161d6VTi9fvvT1CACIHNojoklrT58+fe+99w6uqxkeHk4kEoc/0Orq6tsevNMWrS2nr1y5srGx8ejRox67sfPu8ml71rbltTUaja6vLAIAeowtpPtUa9JaFJ/5a4s0giC4dOnS4f96GIYdWDwTj8fz+fzs7OzMzMxRn+dDe+3u7hoEAEDk0B7ZbDaKeyat7bYOPjnnwoULR/oMW1tbHRuEdDo9OTn50UcflUql0/ss0VPN03IAAJFDO42NjUXxnX21Wn348OHBkDjSUZ48edLhcWhtTjA3Nzc9Pe3GTodtbm4aBABA5NA2QRBcv349is9cLpcP/oT+SDPWqtVqo9HoyoBkMpnWjZ2JiYlUKuUd0gGmqwEAIoc2S6fTES30X1pa2l9d8/777x/p73Z3062DK3Yi3QWB2IncDgEAEDmcehFNWju4OCeZTB7pxkjnZ6y9rQBLpdJPfvKTqakpN3aic3AFFwCAyKENgiC4efNmFJ/54OKc0zJj7Y3jk81mZ2dn5+bmisWi/Qnabv+BPAAAIoe2SSaTX3uIZ7vsL845XTPW3iiRSBSLxbm5OdPYAABEDqfApUuXIpqR1VqcE4/HR0dHD/+3TsiMtTc6OI3tSCfFG/XDI1kBAJFDFwRBMDU1FcVn3l+cUywWD/+3TtSMtbeNWDabvXHjht3YvqOvvvrKIAAAIodIJJPJiYmJKD5za3HO8PDwkf7WCZyx9kb7u7HNzc15qCgAgMjhZMnn8xHNvyqXy5ubm0e6mfPgwYPTNXqJRKL1UNGZmRlbFAAAiBxOiohu5sRisaWlpfPnzx/+z4dhuP+kndMlnU7vb1Ggdr7V5uamQQAARA4RSiQS0S3OefLkyZG+419fXz/Vg6l2DmN3d9cgAABtNGgI+KZsNpvL5aJ4FH21Wj3SN/oPHz7sjc2a0+l0K3i2t7c3NjZWV1dP6U2qiN5vBgEAEDlEbnx8/OXLl1F8I36kz1mv17e3t9PpdM8MrNoBABA5dEc8Hr969eqtW7e6/kq++OKLiB5UekJqp16vr6+vr66uelwMAIDIIVqZTKZQKDx9+rS7L+Pp06cffvhhPB7v1XFu7clWKBTq9frW1taTJ0+q1WpfvdM8YggAEDl0ztjY2Pr6etfnU21sbOTz+Z4f7UQikc1ms9lso9HY3t6uVCpdL8wO/TM06B8iAEDk0ClBENy8efOPf/xjd1/Go0eP+iFy9sXj8Uwmk8lkSqVSa+nO+vp6D09mGxoa8rUGAIgcOieZTJZKpZWVlS6+hjAMe2z7gcM7uHRna2trbW0til3vuiiVSgVB4AsNAGijoNlsGgXerdls3rlzp7sLRQqFQk9uP3C8yxGGYc/c3imVSr2xSzgAIHI4Zer1+ieffNLd1/DRRx/18PYDx74uW1tbL168OL2rd+bm5jwjFQAQOXTH2tra8vJyF1+AH/m/287OTq1We/bs2SnanG10dPTGjRuuHQAgcuiau3fvdnFBSCKR+NGPfmT9xrdqzWer1WobGxsnOXgSicTMzIzbOACAyKGbGo3Gn/70py7uKD09PZ3JZFyIowZPGIbPnz8/aTsWTE1NZbNZ1wgAEDl0Wa1Wu3XrVreOnkqlZmdn+2e0P/74466/hp/+9Kdf+53f/OY3fT4mAMAJN2AIOJJMJtPFhTGtvaRdBQAARA7tNDY2lkqlunX0R48euQQAAIgc2ikIgqmpqW4dvVKpdHFRUB+anp6emJgoFou5XG50dNSAAAAn36Ah4BiSyeTExES3dpReXV0tFouuQmdkMpmvbfbQ3TU5AADfyp0cjimfz3fr5/rlcrnRaLgEAACIHNpsYmKiWw85efz4sfEHAEDk0GaJRGJ8fLwrh3YzBwAAkUMkstlst3aU3tjYMP4AAIgc2m9sbKwrk9Y+//xzj7IFAEDk0H5BENy8ebPzx63X65VKxfgDACByaL9kMlkqlTp/XDdzAAAQOUSlUCh0fkdpN3MAABA5RKgrO0p//vnntlkDAEDkEIlEInH16tUOH7Rer3tmDgAAIoeoZDKZzu8o7Zk5AACIHCI0NjaWSqU6fFA3cwAAEDlEJQiCqampDh+0XC7v7OwYfAAARA6RSCaTExMTHT7ogwcPjDwAACKHqOTz+Q7vKF2pVNzMAQBA5BCha9eudXhH6cXFRcMOAIDIISrxePz69eudPGIYhrVazcgDAIgciEo6nS4Wi5084tLSUrPZNPIAACIHovLBBx90cnFOvV6vVCqGHQBA5EBUgiDo8E5ry8vLng0KACByIEKJRKLDT865d++eYQcAEDkQoWw2WygUOnY420kDAIgciNzY2Fgnd5S2nTQAgMiBaAVBcPPmzY4dLgzDtbU1ww4AIHIgQslkspObENiBAACgPwUeKkKH3b17t2O7POdyucnJSWMOANBX3Mmh08bHxzu2OKdSqWxvbxtzAACRAxGKx+PXr1/v2OHu3LnjdiUAgMiBaKXT6VKp1Jlj1ev1hw8fGnMAAJED0SoUCqOjo505Vrlc9tgcAACRA5G7du1axxbnLC4umrQGACByIFrxePzq1audOVYYhqurq8YcAEDkQLQymUyxWOzMsVZWVkxaAwAQORC5Dz74oGOLc0xaAwAQORC5IAgmJiY6szjHpDUAAJEDnZBIJMbHxztzrJWVlXq9bswBAEQORCubzRYKhc4ca3l52YADAIgciNzY2FgqlerAgarV6vPnzw04AIDIgWgFQTA1NdWZY927d88OBAAAIgcil0wmJyYmOnCger2+ublpwAEARA5ELp/P53K5Dhzo/v37RhsAQORAJ4yPj3dgR+kwDLe3t402AIDIgcjF4/Hr16934EBhGBptAACRA52QTqdLpVLUR7HHGgCAyIHOKRQKo6OjxgEAAJFD77h27Vqki3M69vhRAABEDsRiUS7OSSQSU1NTmUzGIAMA9J7AIxE54Wq12q1bt9r12UZHR4vF4vDwcBAExhYAQORAdzQajXv37lUqlWN/hlwul8/nz58/34HNqQEAEDlwKNvb23fu3KnX64cPm2w2m0qlUqmU+zYAACIHTqh6vV6tVjc3N3d3d7/2oUwmMzg4mEqlEomEOzYAACIHAACgF9hdDQAAEDkAAAAiBwAAQOQAAACIHAAAQOQAAACIHAAAAJEDAAAgcgAAAEQOAAAgcgAAAEQOAACAyAEAABA5AAAAIgcAABA5AAAAIgcAAEDkAAAAiBwAAACRAwAAiBwAAACRAwAAIHIAAABEDgAAgMgBAABEDgAAgMgBAAAQOQAAACIHAABA5AAAACIHAABA5AAAAIgcAACAYxs0BAAAdNLCwkL/nOz8/Hw/n/4xxqct3MkBAAB6isgBAABEDgAAgMgBAAAQOQAAACIHAAAQOQAAACIHAABA5AAAAIgcAAAAkQMAAIgcAAAAkQMAACByAAAARA4AAIDIAQAARA4AAIDIAQAAEDkAAAAiBwAAQOQAAAAiBwAAQOQAAACIHAAAAJEDAAAgcgAAAJEDAAAgcgAAAEQOAADAdxU0m02jAAAA9Ax3cgAAAJEDAAAgcgAAAEQOAACAyAEAAEQOAACAyAEAABA5AAAAIgcAAEDkAAAAIgcAAEDkAAAAiBwAAACRAwAAIHIAAACRAwAAIHIAAABEDgAAgMgBAAAQOQAAgMgBAAAQOQAAACIHAABA5AAAAIgcAABA5AAAAIgcAAAAkQMAACByAAAARA4AACByAAAARA4AAIDIAQAAEDkAAAAiBwAAEDkAAAAiBwAAQOQAAACIHAAAoM8NGgL60MLCwkl4GfPz8yfzhZ0Q3xwfb5sTOCwAvn/wf+ETyJ0cAACgp4gcAABA5AAAAIgcAAAAkQMAACByAAAAkQMAACByAAAARA4AAIDIAQAAEDkAAIDIAQAAEDkAAAAiBwAAQOQAAACIHAAAQOQAAACIHAAAwaPU4AAACDdJREFUAJEDAAAgcgAAAEQOAAAgcgAAAEQOAACAyAEAABA5AAAAIgcAABA5AAAAIgcAAEDkAAAAiBwAAIADgmazaRQAAICe4U4OAAAgcgAAAEQOAACAyAEAABA5AACAyAEAABA5AAAAIgcAAEDkAAAAiBwAAEDkAAAAiBwAAACRAwAAIHIAAABEDgAAIHIAAABEDgAAgMgBAAAQOQAAACIHAAAQOQAAACIHAABA5AAAAIgcAAAAkQMAAIgcAAAAkQMAACByAAAARA4AAIDIAQAARA4AAIDIAQAAEDkAAAAiBwAAQOQAAAAiBwAAQOQAAACIHAAAAJEDAACIHAAAAJEDAAAgcgAAAEQOAACAyAEAAEQOAACAyAEAABA5AAAAIgcAAEDkAAAAIgcAAEDkAAAAiBwAAACRAwAAIHIAAACRAwAAIHIAAABEDgAAgMgBAAB4s0FDANBvFhYW+udk5+fne3gMIzo7gNPOnRwAAEDkAAAAiBwAAACRAwAAIHIAAACRAwAAIHIAAABEDgAAgMgBAAAQOQAAgMgBAAAQOQAAACIHAABA5AAAAIgcAABA5AAAAIgcAAAAkQMAACByAAAARA4AACByAAAARA4AAIDIAQAAEDkAAAAiBwAAEDkAAAAiBwAAQOQAAACIHAAAAJEDAAD0qqDZbBoFOCE+/vjjk/kyFhYW3vHn5+fnXTvoH+/+B8G/EsBJ4E4OAAAgcgAAAEQOAACAyAEAABA5AACAyAEAABA5AAAAIgcAAEDkAAAAiBwAAEDkAAAAiBwAAACRAwAAIHIAAABEDgAAIHIAAABEDgAAgMgBAAAQOQAAACIHAAAQOQAAACIHAABA5AAAAIgcAAAAkQMAAIgcAAAAkQMAACByAAAARA4AAMABQbPZNAoA0BYLCwt9e+7z8/PeAMAJ4U4OAAAgcgAAAEQOAACAyAEAABA5AACAyAEAABA5AAAAIgcAAEDkAAAAiBwAAEDkAAAAiBwAAACRAwAAIHIAAABEDgAAIHIAAABEDgAAgMgBAAAQOQAAACIHAAAQOQAAACIHAABA5AAAAIgcAAAAkQMAAIgcAAAAkQMAACByAAAARA4AAIDIAQAAelXQbDaNAgAA0DPcyQEAAEQOAACAyAEAABA5AAAAIgcAABA5AAAAIgcAAEDkAAAAiBwAAACRAwAAiBwAAACRAwAAIHIAAABEDgAAgMgBAABEDgAAgMgBAAAQOQAAACIHAABA5AAAACIHAABA5AAAAIgcAAAAkQMAACByAAAAkQMAACByAAAARA4AAIDIAQAAEDkAAIDIAQAAEDkAAAAiBwAAQOQAAACIHAAAQOQAAACIHAAAAJEDAAAgcgAAAJEDAAAgcgAAAEQOAACAyAEAABA5AACAyAEAABA5AAAAIgcAAEDkAAAAiBwAAEDkAAAAiBwAAACRAwAAIHIAAABEDgAAIHIAAABEDgAAgMgBAAAQOQAAACIHAAAQOQAAACIHAABA5AAAAIgcAAAAkQMAAIgcAAAAkQMAACByAAAARA4AAIDIAQAARA4AAIDIAQAAEDkAAAAiBwAAQOQAAAAiBwAAQOQAAACIHAAAAJEDAACIHAAAAJEDAAAgcgAAACI1+LYPBEFgdAAAgJOp2Wy+tWXe8TEAes/e7qtmY7fnTzM+dD4WmK0A0KcGDQFAX2juhU8/fbnyX/1zxmdSuQvTfzdw5pyLD9Bv3MkB6H17u69eLP3762p5IJE6m5tMDF/q9fP9cmfj/utqORaLjU7+9bn8Ve8BAJEDQE/Z+L9/fV0tpy7PZn7ws2CgXyZx7W5XNm7/2149zP35359J5bwNAEQOAD3i1dpS9e5/pC7PjpT+8uDvv375uPG61mMnm7zww4F4Yv+XjXr47A//NJBIfW/uHyzRAegf1uQA9LjaZ78eSKQyP/hZ65d7jfrOxv3ayq/3dsOePN+zucnzH/zFmXQuFovFE6nRyV9U7/5q58WDZHbMmwFA5ABw6jUbu3v17bO5ydYstUY9rPzPP+/tvurhU/6ycvfLyt3zxR8Pf/+jWCyWGL4ci8V2t74QOQD9w717gF7W6pnkhVLrl+HTT3u7cPZtlX+316jHYrHBsyOxWGz31XNvBgCRA0DPBU+jvlX+Xf+c76svbrvoACIHgF62s3G/r853q/yH5t6e6w4gcgDo4chZ6avz3dsNG683XXcAkQMAACByAAAARA4AAIDIAQAAEDkAAIDIAQAAEDkAAAAiBwAAQOQAAACIHAAAQOQAAACIHAAAAJEDAAAgcgAAAEQOAAAgcgAAAEQOAACAyAEAABA5AAAAIgeg/wyeu9B3/5NLnHPdAUQOAD3r3PtTfXW+Z3OTA/GE6w4gcgDoWYNnRwZTF/vnfFOFGRcdQOQA0Ju+elVt/cfID/+qX4oudXFo5EosFttr1GOxWPyM...