[NeedAttention]
src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABBkAAAIpCAIAAABot3cyAApHzklEQVR4nOz9B5SlSXYeiIX5/fP50pf3XbZ9T5vxxAxAgAsSBEEQFLlcguRySVEras/ZQwlHe1Ykd3V2tVhRhuBKwJFIAgRoBBJ2MBiMwTi0m55pb6qry2ZmVdrn3+8jQvdG/O/lK9ddNZye6ZrO6Jo3mS+f+U3Eje+75ruWUorsjJ3xfRqSyFw/MgITTzFC4UlLMfw/+E1R+JsSRMDf4GWUUEu/gsNflaKKwSMT+Axh+i9K4ufA2xnTHy/JaDoLJfEfJZxzpf+q8N/2bNefAr+z7+Pp33uDvs+fI+/yc253t35QVuxuZ8/dnu8HbdzuOr/rPNneYxSu2O3B8I30+k+49Sft7FI/HONu7cm9ct9vd156hsP8x7+L7dOBjY5YuAtSRnIi9b4nBe5flqc/Tu9ukgoKf2LwP6HfKfXXjD4EfpMuyfG9hR2yJh5vHnJ0RDtjZ3zvx+2m3c7YGe/ToGjOkDxQbRqp1AiD0m1IAdhfEUEpMAhi2AYxxhjMKrwMaYjK4ghIAmOMAk/QVEEKkee547pgkdE4cwvsNPwhIyRFY061CaaCmM8rBv/+nvw9N75XO88tMYHU++tdDfs2z3+vOM/dDkGKnfxOHsk9Pt/ehQjdcp5I/Q/W3sTdpzdwie0/6H/vjoN2xr0+7sqe3EM3/XaHajYdXpAKXP58vKnhTiaElLA8YCcjFs79PE6phe4vvduh80yiew3fJc3OuG3pjIOMjX/WGykjE5vpztgZ37exwyV2xvdzsPFmovTPAPLHaBLMJVXGzlJjm7VNpCPrqRSVxjsjqLIDgyqZQKgigVQwi1uM9wdDy7Yt1wGeAiwiMVyC0m5CckB+mr8IZCqFs1RlYLHv4gTkh8xK39XF+S4QPeyhd4cY7hZffF+O/865hHy/8dH76sjV1+eGM2Dv8r0YFdRLRkOj934kGJR8l9jHPQQud8Ytx93ZEz3uCZNr38bJMUyJ75KyTRxkAsSRxKfEB+JAlEUooxbllgLCAP9ykgvhuCXY9Mw2h8F1jF3grIetkCNPgL2OImEAu4MeOKY3TEq2GYWO8CtyM5swMfmdqMTOeJ/GDpfYGd/XITGuiyFeZXzS+gemww4mWYkqsm30jFcHPS2YzCSBTCDYAFJBEk0FlIZmnFpMfwjQBlIp9YE8CKQm8LDRE+cvX7myur6yupEzeAkXioMJljpwTKRyrOu8pu8+1L2wq70fg+K+dWePRN4SJTIdF7oVekSsADfmTh63j+fmz9HJmrfAqNqT9x9//LdHv9+b4/+ePd7t+d7l4+3I3G2/V4Of90SQ49co/R138+076OjeG3cz3+6NIW/lJJAUtjsZDYc2Jft3zd9//L5je6Y4bE+Y10tdSnQ+E9pGTjG+bltM6ORebc4E02m/xOT3juPzkhSbpUK+ICgTxeJilG57Q26If04m9+6MnfF+jB0usTO+r0NkEqym5LpiQltNqvGDpW7yeRYFDanSfhZ4G3CJnHD4Z/wuaB15wUlMBtSQkjVJeoJsdeTy8vLlpSudTodS6jjO0ROn0IlsyMn4kUpuwzffnZ39EDpH79Dv/i6PFIP1t3hemX3yzrAFKUJVt/gc2Iz/I4/wu3s0+XR3fvyM6cy9O+MeUif0/UDO63aP7zFDgO1ff/xSivG5mzGZgDGu1pu4Puxd5tvO+OEY//Hz7YM2bsklCJb1cVgF/X5/ZWXl13/vDzzbObx/36H9+w7vmS9ZpMSJpxmFQ4it05Uy2YftkaE9A0Nh6WVEYQ0xpqGaWS5FzZHQWVJMjfKbJpnXDUdTrK3v6SnvjJ0xOXa4xM74/g7OTLkl17ZQu08oJ9uQwkQniCmrxigu0alN+EIwr0y/JSek1c+Ja1kOvhI+J1akP8g6qfjyC69fa/W73a7neXv37nnwvvsrVbDYyrW4iX5wpSveVMFd0jy7q8O/JwLu99K429TeD5hWBL3LDVrdbYEIvYcAldZPmPwNmMXE/WW3utdqglHo3z9Y93dn7Iw7GZZ1ayiFHAO2rYVdJ48eD+NofX19eXn5y9987otpujg3e/zgwQN7d8/XaWD2vkw17DInmdJROkFojnSCSK63RVNraNxmUofvqaDMKpbcRPRP+yBu8Mvp3Kf38QLsjA/72OESO+P7NwBHCT3jLE0JbLR2xtssJcXwrkTywLk03hiiE64dqT2WdPTPvKdesWJC1jOy0o4urW9eurZ6eXW13eqeOXLi9KFDCwtzpZKT5yRNM5WlYOizCF4umckCIUUeBSPSVpiFceenwHa4xHc1blcOKO7m4hOMP9wau/+g9OjkXW3QivG7rb6m8h7xz5pK0BsPFXPBr6dDkzEKk7pBJ86Q3zRPRq+/HWe7Jy7OzvghHznuLzcPBlyCUQv2NIvzBrPqM4tHphdyqlauXm31u996860/+tbzVuDt3b/v8H3HDjbsTqKatuuOgvamVhvWRE4xBo+7FTJ0/dkoczgKtesxXjncBPtHv18fsdgZO+N9GTtcYmd8X4cceUewYFpgQin+wiizMAqBuq/AKLQVpLpIWldWFDUUUkckhC6nfvXC+tVW552V1eVWO+dOfW7h9INPzjTqTYuSNJFZEncTxphtDGocW2P/8TgJV2GKN7KYuzl+uuPd+S7HrS8bJzdmxbxXvcGtP+cHtVua47/joUbE9c4rIO4lrExvrB6RxEhajigB+gjM6h5FJMzV26boo5fdSZXFztgZH5DhMueWz8OCxyFy1BkkuKth7TRRhw4d2EtIL47Wut3VVmel1X79j75GwuGP3H9m31RjYb5e8ZBFGKebVejXUaa5N4YqmN5ITfLvmG9flz1YuOJQU5bwe8mI7Ix7c+xwiZ3xfRomMx7rnXWiB1hUy6KcFKIVJBWcYQlapmSmdZa4jR7cfPQPXjUk5Mp6+NaFS5dW1ta22qVytTkz9+DeY7Vaw3UdboRe4i4jooj7KmaCG5hSCpYcflWF0sU4GYPdDQo1uGfHyUNuHwdgplWIUjc8mkFHg0xEKnQp/kTcSel7I9GvRlF/3USQrquXuHnkeT754eODpHcdx1A3fIv5eTIfevxFOiVP3TLQYD5/8niK4vBCPoxhwGHiUeQoyoIrAKE3Pprn4bwm6dP4q4W4XbLUra/P+y0TOb6eVLOE0SNlFh9NAsxVRMEabQn0+eGJcM7MD4Y8ySzXH1d8wrsdv1nCO/KXO+MDMG6Zu4ieA+ASiPthR8PZLLUvC7UEk0gIMB10f3Pu0Px8lpFWq9/p9p5//dwz4p3AtQ8szJ08dPDAotvghQNuFMGjGdNiZ1ybTSnQYBhPmcqNTpzm4WgyaUHHJSOmqntnseyM92vscImd8X0aCCyAPyipcQEqvKA0E+qzSiyshmfA3HJOrULcqUNIIkmujWQnIm+9c/HVN89udvqV2tT0/MJHjj/gWHbgep5rORTbRsgUPikbRx2Mfh7TShhovZXOINXy2/rvBTRUd6POZCzznfvRf4gfbxNPQLx4y1faDGsQ4a+4pQkpSPFKi96o/8P0IzxvPkFo3ClHvmqVi8lvBxhqnvdsZ/z529/OcJLd5fET8znjR/PX8fHI0REiMqa3ze+fIBAFljZoe+Rrl6OYQ/HoYL619tRLRNwyl4aIUe3INEfLjYiLRLJ1+3jOXcR5vovHWy6KydcUdFsZ5ESzJEWGRIAzcJgDzIL/IXUAjgQXJMeeMAKHkrn2pJZdv7hE+vG6u3nzMYyypz4IK2LncefxxsdiikrDH4jWOpPau5ElOaY/wWrNlWVZHuFzrlNrTu8/vKvVE6tXly9euvjaa2/NVoMThw8d2bvrwG4/13AN6yhyAdTb4cwlzEEWIXOBq4kDY+CmKRPRAT9GxgFAXbtU7Is7Y2e8D2OHS+yM92Vol/CN0ANMpyMZERkgJcB5xLI5d0wCOdi7NCdxrlLAGRYJCekT0ZPk1TdXLy+tX11eAkO5d9fup04/XK1UGNHoRHeWIHEGthUsssrxPzdwC9eyro6go0ZZozYG+ehYCv/Nd1EBUdTA7Tze6lGLckl9lSg1vUKo0TDMDDrk6IvWr+fGUSbH771eN9a0Nzdef+NkK95lXjl+vXmUIjUub6kxu9qOL3Ad6yA3PBYRj5uOH93kSHK105tihoI5fqYDLtga0XgHzfPqtjz0xsk/prh0FBa7Pi5BsdJy8hlVoGhqrkbh0NcYXSnUdWHb12TyUbso38f7e/OZFs8rc0fM8RuHKP7JobpiAo45g2UKgyKyIr7vw3MWCtYQamOOo4lOiCQtAofK6LQRrb8wvl8Tpe507AqWH4SZv/O483jzozKRAowi4PrATclEZcEKYV4vLIdUxCHGIjmteu7m1e50pb7v2D5xbN9We7iysvTalaVn3njNt/nh/XtOn7hv/4wXoPeMRDrX1yECdlDOMRIvCKwwgUE/Td2JWUh6LZFR2vDO2Bnv09jhEjvj/Rq3pBMqScHOWbZNdP5RkpMok7GUTmBJ7N9DsaI6J+eXL795/tyllc0oL88t7H/siU/ONaseJzKVJM84UAhsGLqt5so4tv2xqGsysAskUyDKsed4nKZiiiR0IXbh2mR3pY2p4c3O4y0fkb3pOz/KMNI/i1zqroPMxHUwRKX/Cs+bn5EXagxtftaVM1iKf8MjZ5Z+Jd46IfUnSB3R0ALtgGKZjm6Y74X7anKBbnWc/JbHL4tJo7+RbB9/LoQ+TjaOoUitdItndCv91yzLi2MYHY955e1KzaVMb34Slw8zaVLMaBjrK4OwWk/w7WtVPJKiMPN9ur83xCX0Khv/lZKiER+QgoluH7hiTJ435jth5FFDHJnnBWXQ6SFitJIttp0yVsR0qAnQGFphVu72Srz+GHYedx4/QI8S3Sqs0PvQK4apIpKp4b6OLioqpBIiA6Mmc7lvbnoYZcN2l1rWVNmrH7/vwIF9wyi8enV5ebPz1u9/sVLyjx7cd/jQwZkGdwkJCD7yAsnZYB4NpBNEmIVGjeMFLBe7teXZGTvjezJ2uMTO+D4OMG6+BySAZEKg25VRm3CfAbFYJ6STk8vrW6+fffvSpUtgYvft2v3UQ08uzO3NM5KnSg0BzukQMUU0ZcObuBxl1gNOFQhhiNISr/oVGs9QVeRdyOvUKkdpFNR0wja4hOw8/sc/6oteeKaLrBz9s8IwkjB+d11vq3N4JHADxPTj7PiR90yxwq8G7xTjR3hlRrZ9+eZz9O3Gn4tKA+P1U0KnKivGbne09Jb/tIbj6PiRAZhHqfvL6rSBcfSAFj2vMTim0cPko1cq4zGYhoiKbkdQ5K3rHGx9nNitYpQNhb9SkqSZ0rEMuE5wJPidGBxR+DHXRzau12N9/+7ydk7gqJxah5+UwUx41LrgVBougatSKDrST9B0Z+QCwLPBhCdlqKX2Aoi8uD74RsrM1yGZMku9+Gpdzq2/93qVp53HnccP1qPE8CvTMxdWCDzmRqJJCTRZUuf7WcyGf0r7S7rdrsCW2LCh5VacU4v7FpuqluaCI7kim53O+aWlr7949k/euLznwIHDuxcePBB4Cquxba0DYeE/RHWu/vZxhGRn7Iz3e+xwiZ3xvoxbRCS05zSnNGNcMMFshEgxIashWR2mr166eHl97drWVhAEJ08/um9h0aco5BptdWxu+bZLLfQ8Iw7RZW4G86F3GFGdgWAS+1Bwm0ymLRnn5xgATSASUwg+Qidy5/GuHm/TxlpfTTpuLCfNozIRIJP1RLU7Dsvs8cW8gJcjkabih8kt2TiqjaViun6ATzxvhpVl2WjSmSAGfi+l43l443GOAgQ3PmJuQJEPoDdjWjQ24Q5XxdChAX1sCKOlDokow2W2H4HUYoN2TGSWpj7E8FftqL9FbGKsT8/0gMNAFsQtbtnC4GxTRyF1fYUwPd3oOFhBxrB63Lnqzs73bh+1z/X6YSIho9CCCRToy67vOF6psf4MNWX08AvWlEujhkBNFxlNPozmpY4F6c/RMSemIzvj+OFIFPM6qdkf/IrYedx5vOkRdyxCBFN6t9INWrXrQdo2F0LhKqBYQMSQBeCSTknGWJH+KfJcpjpcCXzD9QizZ2dnpxcXT+dkrd0+f3n5c1/+6rfLzoHFueNHDu+a90smG1MQjFRo66j9NKRYUpqk07uUpN4ZO+MOxw6X2Bnfj2FQGECggciFxXOHDwlZC7Pz19bfvri0srqpiL2wsOvTjz/crJU4oKdUgnH1XdspqSSNkqRvfMw6XQbFbVzX5URDU8LBMhuAo9+XK5pve0xJkXVCiHYN0eJRkaI8zlL5XQnmyQ+Zk4fdRu7o1rpABZwd/TrhYp8chb6T/sGwwNFr1dgrn6bpttDTSA1JZxXzsQzUpEqS66Amo66WwCgAwxJfHGlyN70IqTJlEaZkWh9LMTkwEUFKUylsogfmGGSKFTjMAIeJx2G/nwPdlTITQkdJlI6YYN3ALdvPjU8Kc59Hg3K7VK5KQrdLt0cDIyW3HLdJovqe9N+QI9G1kSYNDhP3MxyLGo44ui/IEPKUabhkMWbrH0yxk1Mu5ZjTIbD8Gn7QWWpwfzOh5Ha1OhX6FpjQhBonfJtZZnjrXfYn2Rk/2HE7e3K7cU/bW4YEWyc64VIgo3ZzXCmbckcvGLQmJgZnpnXZD8D0ZVkGb7Nt1+LoSoDX9OOEWZIKiwlRYmxfvbRYOpgc3ffOpaWzVzdfevuPZmrV+48fPnl4z4yHXx2bXtqmQ4UygXpcPrezA7fTebvb1++MD+3Y4RI741bjekczuU6e8box9hbSyReNogHmBVI7KuFfSkhiWcAilrf6L7199tV3Lg2zfH5x7+mHHpyfWrAVswBoxZivRIQGGTKLWGLZFFVudJY8wDkL7Kvtop5PkUKBnAGJBlarSs6loIoVYQg5PhipM2AkJkShTTeMgpj8JiyxvdP/blQdes/H7/L63+W33OHjTXszG2PD2xwtvS5CPk5fJ7rPx02zQpFRTtF4ExLmZ0DGAkV78lSPTA8MLskCKJvknjFMzzHOUEQtGKGTdAIRucU0YcBvY+iDo8y2sLBX/5lz23Ec4KHwpUHJu+UFvm3vvDxRoyMxY/wrHLw5bKNBZD4kT9JbfpCpF5lkHUozYXQP3gr+itEXjV+vz41vbW0RbHaFuMJ3A7/kOXYAPydRisosik0+kuKGavF5SgTDXxlO/WI1S1r8g7toKLRJO9Lvwobw8KfrqbVZ1sU91dnebFSPhDfCRA0wOiNzTpRGSdSmjFOi0y1UwC2RJvEwDsOwNxjAYxzHcA2TJMHsDstyXbdUKVcqlXK5bHmuZbs5rnSaEdSGzpTK4CJjopklMd4otRgOM6o4hXUZ5zmZYNgoV240JclosRd/ZdvT+LpbV9ir7aDl6NOoPufvybr+Xo33yT58V+d153Bfz8MbXn278KYJZRbpQXeunnQXqnzXH9idfD6Ou7lEMJG5MjmTuAHRol0SrshBmDKLo8vDtiZF3mCBoKWzOFcMdrhMZegxY9R20VcC25+IE0GkzS3P4VXHmzpzMpOk0+5cuPDOH//Jt55+9oXjRw4eO7zv4K46vME3jAJl6BDqsVFcdFy/cdtD3z5LOnHShdbE5DWmN7x+h2J8WMcOl/hhH5Omj974xNi5SLaNgrYv6EhVI9uHOQiYdKAFbowh0R4OrHzE7HgpuBAutzDtWUgdZwU7qAhHUhCmMsXCaPSUdHLy/GuXLyxfu3r1quO69x05tW/fPsB8Ik5VHHFdncsKy8V0QRmgRBeAZaGFgSouJs2JEF2jSXV1piBF5pNOxEZnqJzIxCj2GAMjCu+PNF5d/SIAXii/fYePN2fGv/vjd+mHu+lzTAEIuemR3uZ7tcaV0f4RFN3BBLU+GEvTxDi/4WdAugCMsaOfZVFsG7gNkeExkwIIG1fwR3yjkJkpbYabCa9kKKnDMpkBMchlQRgAZOvEX/wBwKJGjclE0UKRnaLDSdQQgTzBit0UOIbMJSp7aRrgOGoY5SnASBY4LpwNfBrceMCdgEhxb8S6RY5ZAFlGUxlneSZy5jiCWlkKbNOtlKq5DdMGcGlFF0HIMT0wO7dhBUBvbNv2PA8uiOE5AGrN8UdRBPs6vN7VYxTuYK7NbU4NL4IHixc5WjfEVUZxhvGCU6ZDhevamCBteEURmZGGaxm6Yn6Gb/R9H45tGMXDKErCyLaDeqXMHR4NBp1O3Kw34eICi7ZcuHdkGEcyk3CrmMDpDjdVcJrZeJvLueUqhl0eLB4SkRIpGKY8OZJ4rhvBpYjSMuWWzTsKeLvtMx4PQ245OqmKwF/gO5BiSElMLQMmbuG0sWw4EZhpKRAwhwqHyArnVYu7Mo1a7a2Vq+31jfallXQwXNvaHKaxWwpgqiUyJ5zBCcL1p7nEkposl2kGP9ieu+fgwan5+V0HDlTnZlPbbot8AEfrBCkcC7NEjmpvwCssx4XJEacR3DeG05JbKAWFcx57ggldS4HqDhibzLVnOMe7IT0MDhkyVcQtR2bCwgxMbVEEpmIWTfVYnlrIA3mxpnA14cQ1UwheAvdIr6MM+JPvuJxTmLdEJ8sZygQ/BEEwjrOZmWPuMqBJx/EwLKPjXWalmDHZz+S6UYRjblzvAqvf0RpoKS02ebS3tkvc0lEybTgpFq0AAWRwJCLTM5qY48HgGKWTU9rM2OJXmFY4l4iZz2ZNwfnCzTVrbfL64DWGL81HHviRX+BWUb3RI1ry67WT3+uR3JyDdydWVx/Mez6OXnunA4xuXpg+OnowAgbSsjWwh4svilKt4u+WthvI8YuuO+Y124Mzs3GJVHAZeSTxKS/7wfwDD/dPnrnWbl1cXnruj55uNuqH9u8+fWjvrgoJdIDC1f+oTGwUT7ONEp3eZYnIsHADN3Qt+GTyo9Dlgb9zsO7U1DjBZqYdBriapNAi73g0XLFRvHLicWd8yMYOl/gQDHWL5T2OJ9zq9Uonpks1LodFBVfcqbUcy0hfBRM/wPAIm0pmLCPaJ6Y3G7A4NJQkAyPjsoiQCxuDF19//ezFpZyVm7O7Hn3iU7MzDZ+jMraKYpZnVuEfNUyGaX82JUVb3JvL2kZnMT6v6/JGbvOaCafS9Vmjxr7f0eNNR/Kej3ebg8Gu/6F4LIoLyC0fb/G9uE9g128YOvlHD8wNsx3YBgxQMF+jfxaADLlOoUFNESSEyoZnPNtSHAsFkVtibk8OkIUzAEwbrVaWJyLLEa9gGEkYaB4Nh7bmA4aBWEwLEpKixEXqWJMSJlKFhKBenaLogbMynAuY7qKyBBlIlpc8F6hpr9cCiFytVplkg2GvVPLhNVGapFEsAWQ6VqUcINanxC9VXCdQmJwP0xFYUx6G/dXVVaKyMcofBwrgIOFqIMqxrCyJAQAZkBeHQzKCTUyn78Nf4R8ZxQqKRLvRR+kangIaFYU52ypGhNyUVwDfMpK4uo5LGGBqKiVM+4XhEI8k0b3bbAefjZMwH+b9fh+vdpKYjzKYFZ5EukWoT2yhaGpx4Vmk7Ff9imVVfGAD3B4kceoQq+IB6YfThNcjwHWQt9Acbx/gmDROZSJsOArXwjCF0FlewD/xjuGh2twJ8N76Odym4YDKvOLb1aBE0liG/e768rmL55cvvtPd2ARoGVA2V6rNTzcPHd1XbtaDetUKPGAUlVo1zlL0UsOpp3kGfKnd7W62er3e2xfPnzv3ev8LUXlq+sDx+/Yeva8+v8tiXqR4xkUCZkWJJIN5COjH8tBJ4QqVohwmgBssS6cOdwDjoAnSUQw5jlrgWmBYZkWZYfhyYrEpnPRFbQfV68q0OnG9QOapmSpc3x89k2H+WHDl9YzGawTTCZYMXE+cUUlsYLSZUWYtwOWF6wwvMzly5t7Br/1waCYVfsJoPsC72C1ldxS9nX2wrJEvqJBEpnqicq1jdgv7MDFF2SgCB8tEYOUuHqZ9w6SFgctZL2r4kzkLuJbA6pIsNRRi/Ff0KViWORczsWnR8BEuLLuJSNzaghFiWjHI0Yvv5JGN42Z3GmfYvrZ38FiMOzXpcmy0bwGvR8mTt3/3rf86cSQwwbGKS69SmLe+4yzMzpeqMwfS5OzZs6+fvXL2jXfmmuWTB/Yd2zc35aIVdpkHiyORIo6xH5PvBg639bu1o04zCIFVHDhFgUW4rk8Ns8HcRKpVD1jRw8JEjFXhLzHiCmSnHuPDOna4xIdg3MpcsYn/3/a5aAeDKtI/irJY7acjJItRWw6dXog5tRMMcVLW6zu+R2yeEzXEflMAEC2hXzVg5FpG3rnWevnsuaWrqyW/vHjo1J7dBxD6OehtGfT6eZZ6jHmOBfiSjfZ9I9JyT2fK/sCH6QM99n8XGFpIL+AKHbcCdn4E0DbXmUFKCwzh1QewZjsWOjphpGkYR2mcAN4TlCVCDgFw2JbjuvsOHQh7vf5WO+n18jCG2+nZjlcu2VMNAKlJFKdxLBGyWwhMLBYPQ3RzKuUx+GZAVzprh7I0jIBAwm7mGLajeShWFaCEUgaI1vYrANFawy10rDv2MOz7jj/l133fpy6XDhXaz9ZrdxRGQpI80zCSW6kUWRoDtuGYArddb1DkUI3ylAzcMb+anw3QN4wIXgDPGKcyVkcghDWtHYq8q1vmE9+QQDX5MuPTnXyXeQYd25pIjG+WwXewccNhGNgKUDsMwyiKAKgNBgPjNjYHSXTHBtf2GKw9x3HLriz71PeAQtDMynKah5FV9nnN6oQD2erXPL82NwOXudtp+ZatWRFt+KUsyUWcuZa71Q9hWWLCNgEUn3GmbM48y+p1ugCtAU9UPbdS8qw0jze3knbnwhuvt9fXN7fWciqaCzOPfvRjC/t316ca5XIVUbLFgSumIh/kaVuJqzDNXN9CHSykqDatuXt3TRM6nWfHLSvsD1avrl54851Lb77zxnOvTJUa0zMLh8+c8eZnant2iVrQiZJuv8cVoN6gl0nuup5lY6F7muCdVDncZge4kCaPBB2pBHvRUAEXMyc803paFJ/E2vmRxhRGaziKziqLjqJXlGnQjDzEwZgDQnOTpqVyUalUPLBclmHsFJO4+l14E8wWQxXMAoTVAp8DJHzQ7pgwhYk4xWnWGwy7/QFmeQFF1k9qp70wvRzvar2rUdGRoT1mAo8L+m/3+smiIz3d4JuFISEwIeE0DeE0q8OsCBjmkzkOlicpBnlNRQtWDxsJZB3KwY9FLwRsG0BB8UtzMT6tCddM8cRtjpTdbeKVyei7k8fJt9xpDhW54bB/kAMYZ8gI2Ewhc5IqmNyBbVddTvzg2Ece7A+SlZXLV5bOf+nS+ZdmqvcdP3Jk797dJc+WzAUeHrgmQBRL5Towe2OLUxsdiFrfGfiC5RepyzqylxsXI6GOlrnVezw1VEKx0SW5lddyZ3xIxg6X2Bm3GmpsHUxmkImIjjLgpRb2xzJL5TgBGJkkyYdghBywURiF6BPSjsi3Xjv7/Jtv9uN8fmHP/Q89uTgzU/ZhOyEiIfEglnnmcFJyHY5dfjM+zrEy5Q3sBo3LnXF3Y+zmNL8abze3lcgyKjILG3LoBH7YhlBLB9CXlaYxejEBHHGAXXQ47A8HPZKmSRhlUlDbiUQ2iBNJmRv4zakG4PzpxlQMqN0OSS5QdjfLZNT3maoCCg0q8KVwb4GKyGF0cKqJvSQyvNcKFUwUzVKYW37gSsB/aSYAgOF2xZTFMsuSDl/a2tiMQqda8soVgLFYp8tZo7nocbdquTDVcqoGadjud8Mkhu0tViEgGyAUWKLtOpYDtIh5zCZqG9xPovzJ0u1xChOAJJNwYp40z7zn1R5f5xsSQsgEaCMjr7PhJJPvhWFYhPFkTx6eRmzofARUB+8CeAd/8jzPpMGoUSMPwKPwJND1kluBO5gHdu5ZscVEBpcE0LUou/ZQxL2ICpkBaPU5H/a6nc21uVpZdluxkIo7AEI5EBHuMepMNYJBFiVh6JA8gGf1Iof37yk3POZRo
urrence of inversions at high altitudes
You might also like to view...
Which of the following is not required for a demographic transition to occur?
A. Improved social status of women B. Improved standard of living C. Increased military strength D. Increased availability and use of birth control E. Increased confidence that children will survive to maturity
Command and control approaches to environmental regulation concentrate on enforcing cleanup instead of pollution prevention.
Answer the following statement true (T) or false (F)
In which of the following locations is a rainshadow desert normally found?
A. in the centre of a large surface anticyclone B. in polar regions where the air is cold and dry C. on the back (western) side of a large thunderstorm D. on the downwind side of a mountain range
Frost forms when the dew point temperature is at or below freezing
a. True b. False