The dot plots show the amounts of time that ten U.S. students and ten Australian students took to get to school.[br][br][img]data:image/png;base64,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[/img][br][br]Which statement is true about the MAD of the Australian data set?

[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAaIAAACuCAYAAAB0vgmgAAAgAElEQVR4Ae3dB5g0RbU3cBETKiBIRlByliQgOUvOSSXnIElAogRRJGck55wVUUlKlpxBRSQqBkQQuPd6vbG+51fPV3t7++3Zd3e6Z2Z3p+p5Znu2p7vq1KnT53/OqVPVHwq5ZA5kDmQOZA5kDvSQAx/qYdu56cyBzIHMgcyBzIGQgSgLQS0OvPXWW+Gaa64JX/va18KGG24Yjj322PDqq6+G//qv/6pVr5v/9V//NTz66KNhjz32COuss07YZ599wsMPPxzef//92nWr4MUXXwwnnHBCWG+99cK2224bbrjhhlj3//zP/zRSf64kcyBzYHgcyEA0PD7lq0oc+N///d8IFFdccUWYd955w2c+85kwxRRThBlmmCF885vfDH/6059Kd4z83wcffDCsssoqse7JJ588TDPNNGG11VYLjz32WPjv//7vkVf4/+8Akm+++Wakc8YZZwyf/vSnYxvzzDNPuPzyyxsDurYJzDdmDvQZBzIQ9dmAN9VdXsOf//znsNZaa4UPfehDA59JJpkkzDrrrOGWW26p3dRee+0VPvWpTwV1asPxIx/5SPRi/v3f/z0Aw3bKP/7xj3DHHXcEwFOkfbLJJgtrrLFG+NWvftVOtfmezIHMgTY5kIGoTcb1+22A6PXXXw8LLLDAIGUOLKaddtpw9tln12bRBhtsEIGnCBa+77333tFraReIhPyuv/76wBsq1v2JT3wiLLXUUuGRRx6pTXuuIHMgc2D4HMhANHxe5SsLHAAC5oc22WSTMOmkkw7yWmafffZw1113Fa5u7+uBBx4YppxyyoG6tcNDOuOMMwKvpl0g4k3dc889YaGFFgof/vCHB8BI3cDvpZdeao/gfFfmQOZAWxzIQNQW2/JNQIBCN8EvFGee5ZOf/GQEjkMPPTT85S9/qc2kJ554Iqy88soDdZuHWmmllcJTTz3VNgghyvzS22+/HZMfpppqqkg3EJplllmip9RUMkRtBuQKMgf6hAMZiPpkoDvRTeG5Dz74INx7773hgAMOCLvvvnu48soro5L/z//8z9pNAjrhv+9///th5513Dt/73vfCyy+/HAGwTuVAFBjx6CQnoPvggw8ODz30UPi3f/u3WokQdejK92YO9CsHMhD168g31G9g9M9//jO8++674Z133omZdE2kbifyANrf//738Le//S289957ESTaDcmlOtMRnYAn1V0nASLVmY+ZA5kDI+dABqKR8yzfkTmQOZA5kDnQIAcyEDXIzFxV5kDmQOZA5sDIOZCBaOQ8y3dkDmQOZA5kDjTIgQxEDTKzH6syX2OeyFyOjySApuZw8LNYtzmdJutWF3r/4z/+Y4D2fhzDqj7jdRpTYzBWijFNtHdKXop8aVIexwqPy3Sm56jIl/I1E/s/A9HEOJR/H5IDhE+Swm9+85u4I8Ef/vCH2lltqUEC/i//8i9xXc/zzz8fM+YkFzSlGK1FshXRc889F37729/GbD/A1M8lKfLf//734YUXXohjanzHAl/IhcXKv/vd7yLtjk3Li62hyCJ5wRdg18+FvDDkPPf4Qg9I/hnpM5qBqJ+lqGbfgZDtcGxG+sUvfjHuObfpppvG7XMASN1iCyGLV5dffvkw55xzhhVWWCH+Dzw8AO0WDwkFdeuttwb0zj333GGxxRaLe895kGTP9WuxhurHP/7xAF8WWWSR8K1vfSsq9jo87wY/gecpp5wS5cWYWnN21lln1d73kLyQ55/85Cdho402irK4+OKLh/333z+88sorURF3o3+jrQ3y4Dn60Y9+FDbbbLMw11xzhUUXXTQcdNBBEZDoh+GWDETD5VS+bhAHCCGlZfeDj33sYwO7H9ipYLnllmtkv7YLL7wwzDTTTAN122fOpqo333xzLUvUA8Lat4FqcWcFG6sC1SYW4w5i1hj6h2Gx5JJLBvvupe2P8GWHHXaIobrRCkbA4oILLojyYQcOtJMXi5RtzFuHbl6P9WuALe17qH48AkaWLvRjwXPr/BihH//4xwfk5bOf/Ww06ninwy0ZiIbLqXzdIA4QQhYopVV8OH0HFkCkbtliiy0GCbi6KZlDDjkkLqRtV7mw4n74wx9GJZWUraO95oDo448/Xpf0MXm/8Nvtt98eeV4EaDxfeOGFwxtvvDEqQ3RkkVH0jW98I4JPkkfHj370o3GxdZ01YkJPdhBhFBXlRd3zzTdf324JJbR93XXXxV33i/KCL7PNNtuIdrHPQDQmVUbvifbwiwsDouLD6eG3megll1xSm0jvOCpaWuom8ICItVUHiIQTbE1UpJ2FKwz45JNP1qZ9LFZgTO1KjudFxeI7IDI/MhrnisiB0Nmee+45wb6HlCKvpS4Q3XjjjZVAtOCCC/YtEOEpIOIxJ/D3POG5UPpItsrKQDQWNcYooNnDb7LWu4eE5oRBWM6+f+lLXwpPP/10bSrPOeecuJM3wU51c/sJ/0jiz2VC7ARhvzqhllQ3+u1lZyshCrdfi8QNoAOU8dzHPoJbbbVVLWXeaX4CyB/84AfxnVVkMMkLo+jiiy9u22hBt9CcUO6yyy47SF7sT7jbbruFv/71r53u3qisH89tEGw+jvGC5+k58jLLHJoblcM2/ogCBib3v/rVr4YvfOEL4XOf+1xYYoklws9//vMRCWErzsi++c53vhPs5j3zzDNHgfe/OZx2vSFtsfyBEStXkoKQC/rtvP3aa6/F31rRNN7P8yzMwfF0jSe+G198wbfRWsgDueAtzzHHHJF2R/sTkqM6Rd1pUp6RhSdCT1//+tdjIoTQXT+WxBdJP1/+8pcjX0QZtttuu5jEMZKMwuwR9aMENdhncWITloRRHJ1FTZnVAYpEHqDjdd13333h2muvDffff3+cGG7qwRc6MDnPw7rtttvinJc2m6A99WGsHVm5lO6zzz4bdyI3rn/84x/HRCYhubAvITkxpg888EDcn7CO95zGj0zY4JcnTRbJizkzBk0/F/LieScv+CKzUMjeWIzkOZoAiNzM8tEARPPxfTRYQ+gw8I4j6WQrQUl9dWxVn/OpXTFR7RPsofiR7nFNq3pb0ZTPZw5kDmQO9BsHJgAiShbyi5Nzx32s22A9NgUA7TL5mWeeCTKpvHagCStHDJMFpb+t6gM+LH4xTxlVK664Yjj++OOHTPEFVtYXsJhYlxmM2h3xfF/mQOZAP3BgEBBRyA8++GBckCRevsoqq4RVV101LlY6+uijw4svvlhr/cZwGUp5A8JyCObuu++OqcHcbgBRt9x5551h4403DieffHIMAVXVB0xM1FrYt+2228bXVFskB8BaFa6qVFKxUnHrobynVnXk85kDmQOZA/3CgUFA5I2Ya6yxRpy83XXXXQPwOeqoo6IiXm+99QLFbU6gXFj86VP+baT/q0fG1RFHHBG3XCnebxLcGzWvvvrqgVdFt9Oue4QcZUjJwpINo03ny8WE9rzzzhvBmWcIVPCgDC6JDkfe43e/+93YB/fwJIuleG1Vm64dzjXFOvP3zIHMgcyBscqBQUAkI2mhhRaK6Y48EiuGfbzJ0quVhbLKClhIy3neVFLQZeXqHoq/fN7/fqOoHf3Pm5C2yxsTFkxzVH4rApE2eUWu50GNJGwodGZyzWuogdA000wTbrrppgk8MG3aMsTWFVZtp72lnNdeahONaMEDXhye4BevSVuuLxbXoNv17kv1pGvwItXnurJnmK4b6bHVOIy0nqrrEz+qfqt7rsjvunWV71e38cObpou61Ys3nai/k+Op7vQpy28TfMITfO9ESXQ7dqIkndR03UnO0d0JnquzU7KO5iTn7dA+CIh22WWXsMwyy4Rf/OIXlZ5PYryGKNhf//rXMVNCiiQQo7R/+tOfxrz6pDwRSOlbaQ88igVwyWzhdQhhUfS+r7766lH5q++qq66K9ACbBERCY1aAn3nmmbFdr5KWsZGyNYptVH33ps+zzz47phoLy5n72WuvvSJ4JCZqT7bWlltuGRdo2vrl/PPPj/Rh+GOPPRZfMy10h19oOPLII+OqfCBy1113xQ+wwQMfdfI6rWtwrc+pp546MOcFwBgAMk/0jUfqc9lll8UNBRNPq/o0sXNoNl7y/lvNh02sjla/49mrr74aX7Xd6pp2z+MbHv7yl7+MxzQ+7dZXvg8vZEKhv+nioTe/+Oijj0bDoun6PS8yxKqiFHXbIsOiBOjvBGDYNBRfjG+TRX0MQLQ7dqJ+c9SM5KYLWTT9YUlEnWe9FV3khLyQm6YL3XbPPfdEp4WuGWkZBEQAhUdkYdhQyQkYJu11/fXXjzn7JvBtHmlNhhW1lCcvitLAUMreAjlhqmKxEEwSgAV0hFLqr3kV60amnnrqCEg20wNyrgVEFh0KH1rnYEGiOR5rV3g1Ntsbzr5PwEO97rWK/tvf/nYE4IcffjiiOhoBo/CkfZQsXNPeOuusE3bccceoyA8//PA4X3XMMcfE9vXd3mVAxEBbeyGxQlseZMBNCKzcl2sP/L7yla/ETQLT4i9Affnll8f1MvLy3c8z/PznPx/bTqHBIg+H8z2Ng7k1OwoQmiaLh92KfGDcdME7BgbZdGxaseD5ueeeGw2bpmn34JvXJP/DkcuRts+oYMzUXSdT1S56GV4TM0qr7h3OOXJ40kknNW4UkReJQmh3bBpE6b5DDz006qLh9HMk15BFkZnrr78+Gl0juXc415IT8kJumi7088EHHxydjnZAdBAQ2WNLcoKFbLbFYClSquXBtK6AQra9BdCy5xglCUh23333MM8880QPCDIOF4gAAivM5oI2WLRwjPdgB2Y0EIAERICKl0AxocW9FpcBNF7MUEVfeDP2Q+NZCaGZ+1p66aXjBp6pr+gGpkAKEFx66aVRsF1PGQIi80vaxAMWEnqE0qqAyJb0gEq/zHEBKN4P3ukDXmnbOfT5HU9ZpBbp2bzR/mjtWL8ZiFpLRAaiat5kIKrmSwaiar40CkRCILaA5+nIEhOms4ULK59iNAiUGiuJQt18882jIk2kJXeexb/NNttEhezccDwirjQFT4nvvffesW1KuFhSaE4WG+WdiodGiAswTmyzTe46L8ZKev3g+QGDddddN9jaHRDoZypStQErvhQ9CUA07bTTRg8OCBUt9SogsgOwrTD222+/lqnfeAuQeE8UJNrQe9FFF0UvEXA6N9KSgag1xzIQVfMmA1E1XzIQVfOlUSDSBKucYr7yyiuj18Mb4CEBJOf9LnzEQjfPUlaMlDUAW2utteKchAe9aSBSH9BMxXfKGhCZVxqqmCcRHvNuGy6wcJyP1GyeljkpXk0qQwFR2mK+eL37qoBIuNLWILZPKQJaascRmPHEzFeYa5MgwduS3WccAChgqiruTV6VMSp+PDza5Ilp35gVf6/7Hc0/+9nPYvisbl3l+xkygF54lmGirfI1df5P84X4XaeeqnvJpbnCE044IYaWq66pc44s89iFkevUU3Uvz1/SkGiBflRdU+ecEBS+8PDr1FO+l7yYf0K7o//L19T5H72mAISi69RTdS9ZpJOuueaa+JxXXVPnHDkhL+SmTj1V94pceW+V6BRdU3WNc3RUVRkUmnMB69kNlKvKhcfMd8w///zh9NNPj5a6+Ov0008fFVtZCSPC9eZxhOo6AUS8i6IyHwkQ6YONENHP0zEH5AMkpptuurD99tsP8vKGAiKeHy+tHC6rAqLDDjsspsU/9NBDLSeuAT1B4W0utdRScV7IPJG5MDQPBUQSQvbdd99gx2qeavljDo+BIEvQ3Fj59zr/m28D7PhYp56qe9XNW1W3o/+rrmv3HF7whM1ztltHq/s22WSTOHZeFrbhhhs2Xj9jb4EFFoh75LWiod3z6DX3Svb0o916Wt1HDkVdyGWra9o5r76111470u7Yifrpwk7IC1n0jPp4AV87/R/qHmtDyQu5Geq6dn4TRcMXer8Vz0XJvOiyqkwAROWLKFmLXAkOAqG2+RneAEAqekRADDCZYE8eEcBIHpFwmmtSAXQ77bRTVDIjCc2x7Fk6qQwHiCAxb8IDJh2bwrfWJ32sW1pzzTVjsoZMvoTcQwERL0UGTZEWNFUBkUlCYMfyLoKo6/GE1wIkeWXm32Sg8ACECnlFQolDARGDQcgS7z0k5Q8vkMdIWIxl+fc6/wMhdeNrnXqq7lW3xA1hTYrR/1XXtXsOL9Btrq/dOlrdJyGFsmXwmINsdV275/GDXHSibnWSFXxJO4q0S2fVfeRFYhO5rPq93XPqwxe0O3aifs8ow6hdGlvdRxYBhYQxYNTqunbPG1Pygi/t1tHqPoazTWYZ0a14DqTosKoyCIiEdyjF4kcoRIYcYIHSlLkN/wyExATuXrqe8jZhb2daliugoaQTEHGVXZOul6YIpQllKyBybSppjqgdIAKolDtGCXUloEl166d+TTHFFFHxo1vbTQGR+R18UZ/4e+KBI1rwFQDJFhSKSnwyJkKgwqNDAREDQEKEsbJlffmDv8ZBWjjQKv9e53/vqmeU8Mjq1FN1L0/PXJ55Qxlo2qq6rt1zEnQYIeedd16j9aJHmEKqvpAFT7hdGlvdx6jxDEptb3VNu+fRazG7kLd+tFtPq/tYxvhi265W17RznrxY2oF2R/+3U0+re9BLf+BLq2vaPU8WzXV7TiUstVtPq/vICXkhN62uafc8453+Evqna6rqoe/hQ1UZBETSi1nhJp54PhSmGzGHhcF7oPCEkKyvASDW7/AAeCXuldqY5jNSTFDGmbRrDOYVCddpI801sXYRTynzsGTs8bgMuv+BCMVcB4jEvCkcACruTcEXi/+le7L+eH7odK4pICJkQJClI74slRKPHdEGiKSL49MjjzwSeep34U1eHICSwuy6qoJW/OZZAdXyx7iZ/xKbV0f59zr/S64g3ObB6tRTda+xN2dGsQBoBkLVde2ewwsep4ScdutodR/ZJWtkSAZmq+vaPc/o4Nkz+Nqto9V96GUAkVX9aHVdu+etF8QX0YF266i6T33W4qDdsRP1H3jggRHkqtqvc46+tcTCc0qn1qmr6l5yQl7ITdXvdc7J8D3ggAOikUvXVNVFN9FRVWUQEEmBFlf1pkOgY4JYXA8IAR7AQOkYXOE68WOumrCTgadIKVv1FHPVobs1M0CAFWTdBlBwzvXcf5YuIFK/RAkupDZdC+w8DMJgPAMTeq5LRceFC9XF86gqQIZrqD+Ypq1yMfiUKdeVFQ78JD+gm6KlFFPBH1v/sASKtPidcrMeauutt46hteTxsKLSeiP95+FYKIvP6tZXdYq3apcBYI7IAl+vJDa5iw8jLfpKMPI6ogk5l7PmJuSJMzlrrpovlGleRzQhbxrNmhNG4LoBI9vfWFMEVHgyULSovCEbgKFQTSK7XpKCa81rFD0OShZwUbpCfNbTyFLzOmnvsLEQirWbCi9MPTwB8zbW0bDQeAfWGKmLYk1F/cI2EJllWy7oFhbUJkApA0e63nl9Qg9gAyC33HJLDDkJZxXvo9RtbIovhLNYAKP5ntNOOy16O4kXANxCPvcBRTwDVkKN6gaQQlzCmngvbHncccfFzCvAJ4Wc4hxpKQKR/qCjyaJ/LOdjjz22yWpjXeSMPADtslw10Rh+Csuhv+lCLoWDyTLF3nQZ6wta8aX87NTlEXnp9IJWiUcM1aYLWUwLWumQpksnF7SK6tDTQqFF3TzcPgzyiISCuG9CIRaWGlBKgIVfVMIqp9yESXQOiLjetR44wlUELQrdtcDEteqlVLQnpKcOv6eiI7wTa5dcbx7KOQ+2+wxYUu7uUb9zULmVx+Be9Bng4r2pTUfnXYep2tcH9aHb+eJ9aEcXvhTPq8fDoE94ge7EC3Rqv8hj/dGGOvANP4Q+8UioUx1+R4971dFOQRNlWwbxduoq36N/Qo88vqYLvuA/gMaLxMum2jF+jAMp/E0XY48vQtBNgz9ayQ6+kJmmC3qFzxhg+tF0sfBc5KNdeW5Fj/oYdGh37ET9oi740nQhiwwX4dyiPmyqHXJCXshN00XdDG/z1HTNSMsgIBrpzfn6scMBCpygA+ymH051U1zAuumiboLtwfRpGojwwkOEN00XdVPi6G7a8keruhkp7Tz4E+srevHEp2l50TaekMWmx1N9+IJux07Uj270N13w2TOE7k7wnJyQF/U3XdSJdnJTNsyH01YGouFwKV+TOZA5kDmQOdAxDmQg6hhrR1fFLCzWik/TVmK3e1rsSzvWVyfoxVO8ZRmyPKt47JzfXNfqmk7QNrE68TB5EK0scdck+Wl1zcTa6eTveIvGKnkYjfIyXF6MRnlJtKOtldyk54HM4H/V85DqccxAVOTGOPxOMZrLsru5uLmteCRYcNFHYzEPZr7R2pUyjYTa/J3NePXF3I7JUXOYExP0TvWV4jN3Zd2E7XxkeDpKjtGXVIRyzHmaG5H1aSmCfnZi7ii1OdQR3WTDPKTlAtZ/oMsconnZYujJONgWRqKPa8hSShkfqo1u/UYhmv/F2+IcBQVIXsiSJAB9lPBkvHoJpuQVD30kR/mQ6eLcDf4bB0tqyJT5Xf/3Sl7SWOI1ubYmyHyWZDPrL83jpkJePA90jd/10+/krVXJQNSKM+PkPOGWHm4bG1l4XmUh5d5D2Svl3Yq1lIOsR3TakcADWiweYBPF6PfGYB8ZmDa69YB0u+CfuLgkDUsZ0hZEdn+QHSqTMxUPpvd92SXCwnA7YNgKxcLRXhRKgUFiNw4r4S0TsJWP1feWOEiWScWu75Za4DXaXW9dV3Hj4XRtL44UI3qsa7RQ1hyOQmlbBiE7lawYH1m4kiQ6MZ853L5T4JanWFNIbnxkKstaTgWgGge/GRc8N1YAq5fPLZCxzok8kAXvcZPODuwVBg55sR7TMyDz2a4LlsUMJS8ZiNLIj8MjoZCu7V1KrBYWOEtGejqlyBrmZYyGIgvRg0g5S4+1dqsIREBKurKHV+aPvvh4BxJg8uAOZXF1qo8AkCXOC0Ifq9XibAoPn4EnhWiNGKUiO09WKss89dXDbay6WbTHW2Bpo4UsoIshYK0bZYJuno9lGeSF7AAoOxZQjFKYey0/Ek30AdhYEpGAKAGtbXOsxyMrZOTEE0+MSyP0qxfGizHGNwYJQ8WiWx+0GQ8FkNoEQH9cm+QFIFnjiee9ACMyw7PEU0tOyDs+8nbICn6So9122y1uks3QwXdZgJ5bUYxWcp6BqJtPfxfbIqiEw9oeCk86uXMeUNaLRbMEpJeWYZEd6EMrRWiRcBmI0ClEwZOwsDo9iEJzrHjrvoqhsGLdnf7uARQrTzShww7NtjzhkbIEKRAAC3AVoReWpV08eEu9UOjoBfBJOfgf2ABMu1cDUYrQmjahxHSdPrHWjRcgSP3uNJ+L9SfagSgPmkHCY0hAhC7gD6DISCo8UB5ru+/2SvW0e8RDwMmjAOqJ/4mHjhS7bYQYMpakKM7bAUR/3NdtEEWnJSTWQFprSjbIPDoS7WRaKNF4OPrfb661HtWa01bPaAaidiVqlN9HcAi013d4d1JSgATHXAVFIqTlgR0NhcBSxh5UlpTdNooekYdA+KW8O7q1InbgsJgOmI2G4mGzma+99ygS8yu8CkCawkYMAp6T0MVoMQjIBuAR4uJBm0sRdhTW4uklheM8xc9LYhEngOom77VJJsg2xUhmvOk4ARG+W0BPztGYCtnnWQgVub/bhYyTA8o6zQt5NhMP8ZgHJKwlQlB8PnnejIReyAvQYcAynBiL5p15RGhNoEi2vcIC6DBoknHleSAvxgf/q0oGoiqujINzhMPCWFa5hWbCPwqAorxZ6HZtSOdHQ5eToqsCIqBKkG1+6nsqFI4dNYQDigon/d7tIy8UwAi9UOI8OR6ceLrJfr8rHlIPq100zNclgOo2vdql2MylAE7hIFt28eIAjt0PKBaylMaHzPCYgKskgaREu0k7PvIojTt+A0rWegIisuCVKF5EmbwK9FGgvA2yVDzfLdqNux1lbNkFbIC86AQjSxgLj8kLz18YrCgXQnjC0ICslWfRqX6QY3JinpA+IROMKB88Bkrkwo4yjLAyQAFVO9swyqpKBqIqroyDc4BIvNbgm+BPlhUg8jCaZOQqJ09pNHW5CojQDFQpyxRLR7PvwmA8JUqxV4UC4eVQFmjxMOJ/8nxYwLyMIhC5lnVuu6iiwulmH7TLWrWfoRAnpUjRAB68ZazwOIXjikBknk6fWLjdBiIhH1mJJvjxjmyjA7hQhJQ0IPV+HxuUFuWFEQO8PBdFg6ZbPPf8UdqA3JwJ+m1Ean9LdHkezSMCIvO7RbkAVMKK5o/S89wtusmtLcYkIZAVtAuLylw1/2MDWwauY5p/LnpKQucMA/dUlQxEVVwZB+cIPMVsI1pWbfJ8nPeQEhZKZqwAEesVCPHkgFIqlAlLWD976RElfguFCl+w0J0DRB4+gHPrrbcOAiKAy6LspUeEjwAGmOArBUOxeF0I8KHYZdQVPSIy43fenPPdBiIK2XjbQBkgCbHxLnk6NgbWD7IPbHjQRc+HjAjX9cojKvIb33wobJtGC7uZWxECMy8n9bkIROa6AFEvPCJAZF6NRyR8m+Z/ACJQxVP0kQv7gZY9Iv1zTfaIkubqkyMBF1ox4em1GiYMFULvQaZEejnBP9QwVHlEgBSgsqqKqcUUjvAG764XMX/9ED9P4U6KD/Ck5AX89lB6CIUnUkgFQFm/I51e9pQHu9cFrYwU8mL3eHSL+csAZMUnj4iHIWXX3AxDIJ3vFv3mKIQ+hal4ZZJx8NFbAqT980YpS54GOQeoqeiHNG6JFumZSL/16uhZJQuAiNcMXHlzkhOKhqLQLiCS/t1teRGakxmKn+a2yK8CKAEmQ0uIVDiR4eIZSNcAK3qIwVgciyK/s0dU5MY4+k45UIYsEQ8ehc2qIRQUnwe3FwI9HBZXAZG+yNySNeQFX/ri4WBBev1HMRFgOG00cQ0ei/lT2K3gOFkAACAASURBVEKd+CysgsfoQ7OHURKFjDmT56x1v1GCrEfAWpzYbYKu4dTBW6PMEh/RiZ/CibxOypzSsGkrILKQldJxvVRjyp9hoK/dBiIhTWuBJNtccMEFcfd0admUtMw5v5Eh3h2wkoWpb2iXsSb9mFJ3rtsF2Ce+kw/f8ZD8CnnJ6mPUUNxkiseJTgaMHeh5JMZIPd0s5ANPhWkZJ+QXXYwSoVxeEJC3eBVY8f6BKJ4zboR8vUGg6OEV6c9AVOTGOPzuIfQwelApbcocCIlHEyIKabSVKiBCIzBFu7i/DCJ9Y7kDJ8Le7b5oj0dgstZ7pFiwHkDrbHwAvd+BFaVoPRevCJAKc/jfYmPKqNvKXJt2UUAXXnofGCVIqciaM6FOiVCWFKIkBn1Cu8QGa428H4w13+2CV9r1MQaUJIVdnCNyHuijG7CSffSSe+d64cmhG+jYcYCc8Czs4s2jIMPC5X7XH94HA8srShg3PA1AKzu023JufNFOZryc0zwRmtFFfgA7/QJkgA+jSyIGefGMkhdzYPrcqmQgasWZcXKeYLD+WIrmI4QyPLAycwh0txXgcNhqfkVGFk+hWChGSlNIKGXsmCvwQFD23e4L/rFOWYPCKuaGWIx47WPOQoiC9UrxUe5CLjLojAMQEmbsNt14StlREniJFqEVPEW3mL+5lCQfQkXSpNHto58WNPYqFFqUCd8BEqOKkuS5AU/FEdgKCaFb/8i+flOq3S5JmZMDHiWe+whlnXTSSTHRJQEsL5rHh9dkBu3mdHnfvZAXvNKuZxPo4GeSZZ5OWhNFZjy3AJNcoVsfANdQyysyEHVbGrvcHuHxQAqziOFaPEmBpIe1y+QMqzlKQngC8BSLvlDqLF1AyqI0Ea0vvXg4KQ00AhkPaPlDmZvb8nD6uBZwsYIpd0YCAO1FQU/iswlkChto8iyFXPyeChrNN5IdE+lkyb36PxqKsUcjbwKdiXbnAa7xISvk33fneiEveEV+hbXM05oXslaOEk9ykvipD8ZBFMA1xoi8dDskl+hJR+3js/AsugAj2otyjL/6CJDwXUajvgwlLxmIEofH+TFZWo69egiHy2L0DUVn6ouHtdd90X6iN9FVPBbpK19X/G24vGnyuiI9eJnorqKreK3rqq5pkrZ26kJTFV1F2qt+b6etOvckevA88b2KrnTdUONSh4527x0OXcO5pth+BqIiN/L3zIHMgcyBzIGucyADUddZnhvMHMgcyBzIHChyIANRkRv5e+ZA5kDmQOZA1zmQgajrLM8NZg5kDmQOZA4UOZCBqMiN/D1zIHMgcyBzoOscyEDUdZbnBjMHMgcyBzIHihzIQFTkRv6eOZA5kDmQOdB1DmQg6jrLc4OZA5kDmQOZA0UOZCAqciN/zxzIHMgcyBzoOgcyEHWd5bnBfuGA1eVWztsWxer4XDIHMgeqOZCBqJov+WzmQNscAED2YrOnn/3N7GptDze7EwOmXDIHMgcGcyAD0WB+5P8yB2pzwAaQNge1q/KUU04ZPvWpT4WllloqvselvJFr7cZyBZkD44ADGYjGwSDmLowuDniJmddUTzXVVGGSSSaJn09+8pNh8cUXjzt093oH5dHFrUxN5kAIGYiyFGQONMgBYTmvqZhhhhnCpJNOGj70oQ8NfD796U/Hl4PZJj+XzIHMgf/jQAai/+NF/pY5UJsDgMg7b2aZZZbw4Q9/eACEANLkk08e7rzzzvg+nNoN5QoyB8YRBzIQjaPBzF0ZHRyQlHDAAQeEaaaZZiA0B4RWXXXVnrzSfHRwJVOROdCaAxmIWvMm/5I50BYHJCt4g6XXcM8000xhuummC2ussUa455574psq26o035Q5MI45kIFoHA9u7lpvOCA8JyFB0gJA8optr07u5Suqe8OJ3GrmwPA4kIFoeHzKV2UOjJgDAKn4OugRV5BvyBzoEw5kIOqTgc7dzBzIHMgcGK0cyEA0Wkcm05U5kDmQOdAnHMhA1CcDnbuZOZA5kDkwWjmQgWi0jkymq+MckN1my533338/fPDBBzGjranNSc0N2W9OverXjgQG80a5ZA5kDgzmQAaiwfzI//URB1555ZVw/vnnh1122SWu+/npT38agaMuWACz9957L/zsZz8L++67b9htt93CpZdeGt58880IRn3E4tzVzIFhcSAD0bDYlC8aTxzgmdgNe//994/rfKaYYoow9dRThwUWWCBcdtll0YOp01+eEOBZZJFFwmc+85m48ekXvvCFsN9++0WAqgt0dWjL92YOjEYOZCAajaOSaeooBwDFz3/+8zDffPMN2oLHxqRrrbVW+M1vflOrfaE4IPTxj398oH7b/dhp4fHHH89eUS3u5pvHIwcyEI3HUc19GpIDtuC5/vrrw4wzzjgAFPaC+8QnPhFf1/DII48Mef9QPwrL/f73vw/TTjtt3N6nvOnpDTfcEOeOhqoj/5Y50G8cyEDUbyOe+xuBwHY7Cy200CCw8N6g9ddfP7z00kttc0nYzS4K3j802WSTDQDdRz/60Qh8TzzxRJAkkUvmQObA/3EgA9H/8SJ/6xMOyGj761//GvbYY484hwOAvKLhc5/7XLjyyitrzxH94x//iHNNc8wxR3wpnvrtN7f33ntHkMpzRH0iaLmbw+ZABqJhsypfOF44AAiA0Z///Odw7rnnhu222y5mt919990xzdpvdYrwnLTt2267LW58qv6LL744vqcovxSvDmfzveOVAxmIxuvI5n5NlANCZOaLeEfvvvtuBKGm1hEBO2uH/va3v4W33347boCq7uwNTXRY8gV9yIEMRH046LnLmQOZA5kDo4kDGYhG02hkWjIHMgcyB/qQAxmI+nDQc5czBzIHMgdGEwcyEI2m0RiDtJjzMPdhvsWn1X5qrvObl8O5rtVcjGv87rpW1zTFJjRJTEg01U1SKNOlvtQX35ucH8KbxE/HTvOq3Ld+/L8sL3je5Jj2I09TnzMQJU7kY1scoARN9P/6178Ozz//fPjDH/4Q/vnPfw6qywMrpfnll18Ozz77bPjtb38bJ++LF3mg1WUx6HPPPRfreueddzqqYO2wYKufZ555Jrz44osxsaApha4eiQq/+tWvYp+1o39NKC51ePurvfKeeuqp8Oqrr07AzyJv8/dmOEBe7BdIhu2+QT6NaS71OZCBqD4P+7YG1j4Asofal7/85bDooouGLbbYItx1110DipHS/Mtf/hLOPPPMsMYaa4QvfvGLYdVVVw3nnHNOzFZLzJPubJPQLbfcMm6PY0HogQceGB/4psAhtZWA0San6F144YXDsssuGzc+BZJlIE33DfeILwAI/fii/m222SbcfvvtEZCHW0/VdRSfLLxTTz01fOUrX4mLch0TP7NirOJavXNkWHaldPyivHzrW98Kr7/+evSo67WQ785AlGWgLQ54OIHHYYcdFvdUm2SSSeIuAvZUW3755Qf2a6OUb7311rig8yMf+cjATgOzzTZbuOKKKwY8BLsZLLfccsF+b2lbnCmnnDLstNNOMbylvaZKAlDAOOmkkw60Z/NTG6FK565TKK1dd901bqSa+mKXBeAKlOsAq7qvuuqqMPPMMw/sCoH3c889d/jhD38YU8br0J7vnZADwP21114LK6+88iCeW6h80EEHxUXKE96Vz4yEAxmIRsKtfO0AByhTYbSll1564OGkdCnFGWaYIS7gdLHXIXhYKfwEVq4DOF//+tcjEJk/+cUvfhH3egNkSXm7x47Yb7zxRpzLGWi85hfreyjtWWeddRBNwAIY2oan3QIwheQARRF49Quw8vrqeFyAbOedd451JT45TjXVVNGj03YuzXLAHOJNN90Ud2ov8ty2TTbO/d3vftdsg31YWwaiPhz0JroMiMwHfelLXxoADg8psLGZ6CWXXBKbsRP1AQccMEjhu64IROqyq4FNR4tA5Pv8888fAa/JRAJA9KMf/SjMMsssg2jXfhNAZMcGdReBCF94XICIYmu3qJu3BdSKShEQCZEK2+XSLAeM14033lgJRAylOnsTNkvp2K0tA9HYHbueUp4sf/uned0BpevzsY99LM7xSABQWP92uqY4/cbLcd30008fX0qnHp8XXnghzh/xSlJd9n8Tk5fo4JqmCpoee+yxGEIs0uTdQbbjAbB1ikSCr33taxF49EWfgRxQrevdAfbzzjsvgj2LXN2Os88+e3wHknBpLs1yQCiXfJrvw+uifO6+++61Q7nNUjs2a8tANDbHbVRQ7QGV4bbRRhsFL37jBfCQfvKTn8TJXUTydljxhx9+eJh33nljyIrSPOqoo2LWUeoI5X3dddfFeRSbj/psuOGGHUtWkAF1+eWXxwSLmWaaKdJvzqipZAVZVZtttlkM/wnTSYa45ZZbaoOq+Qq7e++zzz5hnnnmiWFQ80OHHHJIzF7MyQpJopo7MoJ40eRz8cUXjzJsjpPcMyzqeLjNUTm2a8pANLbHr+fUp7RsMXQ7V3vxG6scAKXiQZUAIJvOm0vvvPPO+D8gS0XozUS8+Rn1eG+PCeKmvaHUnqP5K+1Jmrj55ptje2it6325H9BJrxbS0R9p1vjSRIgRb/HTy/3wE1/9X5fuIm/y98EcwFvy4l1VDBhzjJYjGOdc6nNg1AGRAfegFRVZ/W72vgZKl9Dqlz76sF4pJt9zyRzIHMgc6FcOjCogopBZxRZINmU9jpaBNXn/1a9+NYZ+ABDL2xoEYSsAlcFotIxUpiNzIHOg2xwYVUDEO7Dob9ttt43hkm5NvAIBoQ0rpTsFCEceeWT4/Oc/H5588skIQgDXGpnddtst/OlPf2okZNNt4cntZQ5kDmQONMGBUQNEAMB8gAnAaaaZJqy11loxe6kpYFBPMSyWmOc8j+S4446LqbUTi+G7Pn1SHY7pXDoWf/Pdwk+T4uZQeENA1vqagw8+OG4bUm431ZOO5fry/81xAI/HahnLtI9Vno9lukervIwaIJJSy1uQl28bGOm9JgYp7WLByDS3UjzvO6Ch0H2KDHde/VJfZb8U63ReqvF6660XLrjggghK6nePkurz3XmgxZvxPRXXmgNSt9/9VmzfdWUgco3Fh2hCT/F6351TH3AutpXabOeoL1W0tVNX+R71NkVnuW78KI5D+fc6/6vb2KXxrlNX+V51qxftnag/yZ12mi6JbrR3ov4ki03Trb5Eeyd4rn5yjv6mCz6rt1M8V3+nZB2v8cWxHXkZNUAkLMYrAUJSfZdYYonoLRRXiuuk1FVZThYGlosQl+1PHn744QgImC7kJtxnby7hse9+97vx9dD33XdfXPwHhOwJNtdcc8WV/j/4wQ9iJpKNJDFUO9dee21cVGkRpPtPPvnkmBGlfrsLuOass84Kxx9/fPzIZLLXGBBJpQxEAEt9aOMd6Zv6bKr44x//OKBDfXgiS8c6hiKApnqHeyTc6rC5p3aaLPgkg+j+++9vstpYF74Aa+Pl2I6QD0UUnvJSO7E6Hp/J0S9/+ctBsjAUPSP5zbORXm8+kvuGcy35lFGI/qblRfvS2/HF+DZZ1GeOGe2OnahftqKMyKYLWaQ36j7rrehi2JKXok5tde1Iz6tb9qadP9oB6VEDRJi/zjrrhE022SQ89NBDwUIxC8gIVCoeCKuYF1poobhgMJ13pKB4UIssskhco0IIgda5554bwQ3ACfutssoqcVsOm2taA+N391j1bl3GSiutFGmgVDFUgsGCCy4YjjnmmHidLW3QaEEkzwgoLrbYYvGz/vrrhyWXXDKu7TDP5WFLpQxE6NPfrbfeOoIZa0J9QMy2IWhad9114/oTa3SsqXnrrbfaerDwhpBbBwH8CE2TxcN+xx13hO9///tNVhvrwhcLTL/3ve/FY9OKBc/JAIOg6cIQ8eAzXIx308WzwLjqhGJB7/nnnx+3XioaVE31gRyedNJJjYMceQESaHf0f5OFDjr00ENj6nyT9aqLLFoGYQF4J+bHyQl56cROEAx+0wx2Jm/HYB4VQETh2xjTIkbWP1Q1GBQyjyBZwSMFIgwHPJS9hYqYpW5eh/8NvC1RLrzwwghuFAavykNIWWvXosTJJ588rsK3IFGWm3tSCI6wWyPiPvVb+/LNb34zLmSk+FMZDhB5aCyQe/DBB2N9gAetBhhveErtKIUMRGkUJjxmIJqQJ85kIKrmSwaiar6MeSBi4fJcrAy3QpxryhoQErBKf4MNNojgQUm3C0Q213z00UfjgjRorU3gR0GnFf08GVunlN3KTTfdNO6ifOKJJ0bLM4Gi4fAdTeaZAIS6gAfvwF5qLO1UhgNE6tO++gAhPlhEByjtRuBVCsJTIy3qzR5RNdcyEFXzJQNRNV8yEFXzZcwDEcULfGw2CXTMBQjTmbuxX5d33JiDoZhHCkSYYysZACfM5Z0tvCSKfiRAZOsaNGq/WACac7wY8VHzU0IC3lNi/zXtpTIcIFIfwPASNSEdK/IvvvjisMsuu8QtaIQHgXZVSbS4v/zRXyCpPiv91VG+ps7/vEPv9jn66KMbrRdNxp3XaRx5m9qqQ2v5XgrX/J5ticq/1f2fEcEo4dUzUOrWV76fTJIr3nj5t7r/o9c8pZClftStr3y/nTPMgTIEyr/V+V995kHR7tiJ+s0p40sdOqvuJYvmo+kRc+ZV19Q5R07IC7mpU0/VvXSWzY1NpdA1Vdc4V9ahSZf1PDSHMCExrw6Yeuqpo8KVODDnnHOGz372szF7TmhKOMy1gGS4c0SuN6AU8Oqrrx5DfTaeBBQmp5MXI4Q2lEdk/Y8QWdFbovjVbe7Ce2YAJjCVdu59PDbTHCkQaYMyN5+lvmWWWSaYdzIHJYtwKCB6+umnwx577BE23njjCOhAPX3UIStQAoh+mptKvzVxVL/5PBmPTdRXrAPdXvxm3Iyhtoq/1/2OF15cZ+6vbl3l+9VtjznyuuaaazZevxcMmtfsRN3kOMlg0/KCT+TQ3KvxLfOtzv/qwxe0O3aifjz3bNahs+pefPaM+qy99tqN109O0I4vVe3XOWefRnV7ZxOjv6ouGxjT9VWlp0BEsQMYD6vJeYgKdITpHP2/4oorxoFJm1ECIgLMWyoW4SfelIee9cy6SEWIizVt/kmSgmuE61jaxdCcUFoRbNwvNCdZgDVR/I2lxXIRMttxxx3j/mnATUiRFTwSj4hHBRRPP/30WN/2228fLXSZaCbqWexoGAqIzFPtsMMOEQgp7uKHAk8PJ5Azb1b8ve539XvwbWpat67y/auttlpYYYUVohFBTrRVvqbO/x4cc5E2s6xTT9W9+EypAFFyXHVNnXOU4RxzzNGRutHrOREeb1pe9NnzTl6Mbx0elO9VXwJ/x07Uz0juhLyQRUaRZ8n3ct/q/m9MyQu5qVtX+X7GNwdC3XRN+Xf/MyJ5wVWlp0Ak7CKkYydb7m5R0SNWSOmiiy6KGW02pQQalD3Lm+XPKwFAaW5FGAsqJyByvniNOnkdRxxxRLDlv5exARSJERSGORhzUe5LpRUQSXrYfPPNo7cCABMd+oRWrzMYrkdkqx8ZLXZa4BUCoEQHnqhHeHAoINIPIAiwhSSKH9l7zz//fExhF7LgPRV/r/vd68LNY0nSqFtX+X5h2nvvvTfuNo3P2ipfU+d/AE5e0F+nnqp7hZdlQZJtc5RV19Q5Jzz0jW98I2aL1qmn6l5Zod/5znci/fpRdU2dc4wrfDG+deop36s+YXK0O3aifu+DsmVXue26/5PFM844Iz6n1lTWra98v6xi8kJuyr/V/V+msxc2Suiia6rq40QI4VWVngIRZe59NoCF0JQLEME8VhlPRicobBaDcBiFavI+JTdwPe1ekIAIKPA2eEe+i1ECIg/BtNNOG+65557oiXgXvfCXQVKfeYgUy2wFRDw5qd2saXNYgMDHIEgB996SkQARGg0kgNQvcXnAK54rc8+Lz4QBh5ojSgkdaC9+9BttPDjpoeou/l73O4OBQWGNVd26yvfzFAGsMeXVaqt8TZ3/8RM4myOqU0/VvWTJTuOsQHMuVdfUOUc2vv3tb8dMzjr1VN1rfvXss8+O3r1+VF1T55y5SnzxXNapp3wveaEE0e7o//I1df5Hrx1RKPM69VTdSxZNE1x99dVRZ1VdU+ecjF/yQm7q1FN1r4hRmiOia6qucY6Oqio9BSKoz3XeZpttYmZcFYHAB1gBowceeCB2hEcjPAcIgIpPCksBhmOPPTYqW2Et8yYYRNmwTik0LrvQHoTGHEcxTSGUE044IVx22WUxWYKXs9VWW0WwAZqAMRUgQbFLhBD7tCsDOgAm4ACIPLRUWGjcYlaPNoGB9UjCesCRggVc6nM+9Qtv8EgYA22UwkiLfgCjvI5oQs55aPI6ogn5wjDK64gm5ItnN68jmpAvYzZrjnIUrgAUPBNeSFVh0fidG28RnPsobi6syT0JAibKWCmuA0LeFULBYA4AAhSuE780kQaMeC6UvwJgWMTWGwEpC19ZssJi2hFyYq0UgQgdHlbzOhabJjq0b1GXeS4hpVRkCe21117RumcVoM+CPkqQl6fuNB+ExlSf5AUel3p5He4baUlAJATJdWbVNVnQjl9obLrgFb4ISxr34hg00RZ+Sts3r9d0SbJ7yimnDJqzbKodBhRZJj9NF/LOuJK9qR9NF88yvlDsTRbyYu4X7Y6tLPB220SvzDNh/aYLWRSxoCsYuk0XckJeyE3TRYSIzhuTC1opRCELgt5KwQADv8tQE4JTWPc8AwrK/IptdjDC784bRPclz4NX5TqhHfek1Mhim4SA6+o6bqa6KHAPpLrV5/9iIeR+pyATHcBJXe4pKnz1OYd29agPHehVj3PoLfcrXcODUp/72inaABa2VUFDkwXttskpeoBN1W+MyAjFgtflMajbDmMEONsWquliPKWz2n2jKAtNtUPu8CU9F03Vqx70Uoro14+mi/k+EYV25bkVPerzHKPdsRP1M26LO760omWk58kiY9o0RTKSR1rHUNeTE/JCbpoudC6j3Bx+O+Df09Bc08zI9bXmAAUOgIBk0w+nVimuTljO6EYvj9nD2TQQqdtD1DQ44wkQVW9xzrH1CI38F3VTLu08+BNrDfjgt0/RYJvYfcP9HU/IYtPjmeQc3fjTifrR3SqCM9z+V11HFj1D6O7EM0pOyIv6my7qRDu5aUdeMhA1PSK5vsyBzIHMgcyBEXEgA9GI2DV2L2YZslR8mrYSu82V0dqXxN+hLMIi7d3mW6v20MQCH0o2inT7PpbKWKY9ydRo5DnahpKbkdCegWgsPVFt0MpllrQhDV5Chviz9M1OzCu0Qd4Etwh7mGQ252RerFiEFky4Sm+XuCHt3g7qruvVg+phM3eFDskp5pvE+dOmuol+oRxzmTa0tcGva/WzE3NHqc2hjugmG+Y2zY/hJbqsB3GuGHoiK9aimWN0jTVG5u06EeIZiuZWv5EL88CSn8wDp1AlJZnkhexL+pGkZLw6EfpqRV/5vHlkfCYL5mx90E4+UsF/4+A3MiU5wv+dCH+nNodzxFvPqPV8spg9h2S5mDBDXqzf8roMfKd70vx4qzYyELXizDg5b8LWeg1bqlhnZWcCRwLUK+VdxdpktXrgpNbLGpTeXywSOSxwLq70txWNdRdJ+RSv7/R3NFMYkhGsHJe9aUsZ2ZlS8D2oqQCmffbZJ65/s32L3SJkaXZi0ju1OdRRLJ8ysYgaLVa9o8tWTV7BQqGnAqT87rpEO5kiW6OhmOOTsWnXEFmuFKVCacuILO7GISNVIkMvFbpXzFg7aacDSzN8yI3lJangv4xiOxagWTavpR4UfC+fW7y1Bgy9ZIL87LffftE4QTvaAL7nwXPq+fQ8kBdLYFqVDEStODMOzrN6vTrCGizAY8cGi/woRKvDWWC9UOBVrAUysqikzhNsW8CwvFNhwfIg7AlnvZW++N/6LA+0Ra+dyO5K7bc64h9PwQJHGUMUiJ0IbHNivYl+UXrW5FAmvA90s8w9zF4CSZEaq24W7fFqpFHzkNGNhyxYvE9p/rxphoH3a5EdtAMmyoXn12v5wTsZeGQA4CQg4q0Bf/Ji53zyYnxsQEvx63uvvCIp8WQB3WjywfvkVVD29sekyBlmfpMWba3jvvvuG3neCzDSJrlAO9BEN08UwPDsyYINBGwMAEQZOuTFs8HAseNMK7ozEHXz6e9iWwacAmSJUO5cY+c8oBQ8oSbkxRBMF8mboCkPobVC1jp5QFm3RSDSF5aYPbgsCk4C7TshB2KUUrdL4in6Epigw8a6LFgPquUAFmXbPzGloOO7vQ+tcfPAdhtE0Y1eyiOBiXNCcJS69W1CnsIuQJUycb1rpP9auE3B66tz3S7aBCRA1AJyi9zRlIBIeEiqsl1OyIjiHuEw3rYQozHrdsFDa9aAJoBBU5l/QHK33XaLMuS7392nb+RfiC6NWbfox2shRXJs8wDf6ZIimJNp/KVbGCn+RzuZt/mANUzJWy3TnYGozJFx8j8BIcS8C5Z5mm8hwATZjhHCXKNlrojAEtykXGz+WAQigm9xL8uc1ZUKJU/ILTJMFmX6rVdHypki4XkaA0CDRiHE9CB6iClIi6HN2/VCKRb5g/94L5xo1xLhFTy3NszCcZataxRr22znxKsu7zhSrLOT3ylmMk25AXweJis8ARFPzkJ0ck5GUiH7DDP061+3C4ODsWWvTAtLecxkIfHWkXcqpGX/w+LzSbkD1l7IS5JX+2uKsuA9IwufjYVCtr3GgqwXjSvPA34bn+KzW+R9BqIiN8bRd0rF4l0x3NNOOy0KvO4578Hcc889294yqFNsSg8jK7cMRASey293Cso9Fedt4WReY6gYdLq+00eA4iG0F6L5Cf8Lq1A8wqMpOYFC4n14sO0Eks53mr5y/dplxTJKhAnF9nluvB6K2u4HdqoXxk3jQwkJjwrZkbGkiMp1d/J/dNuBgHybS+RdkI8EROaveEgMgYJObAAAF21JREFUMTKSChmxpyP5L55Pv3f6aNzx2lZePM00r2iXlcRjiS/CcuaykuGCLqFR3qqtuij3bhZyLATNkyPXZIKB4sPQBZ5A08bRxsR4JK9NHxg02223XZT5KrozEFVxZRycS54PD8K+dcmyAkQeRi6299cnT2k0dbkKiNDM8hUjF2ZMxXfbOwkXUIq9KpQ0JcPK5Sl46HgRLElZfsIV5lYS4LiWYpHUQLEUFU43+4AeITbzVZQcwLRhKF7irTkVCh0wJSBixZvz0icWbreBiOeMz7xJFjilTIkXgYixhbe2BivKCyOGt+q5KBo03eK555L3hq88HnzkuTFcHPHWPCIgMh9TlAvzXBJGzM90G4jICU9I8gTwBKbCtmgxZ3TqqafG5BVTAV7kWQwf6oMwNMMFyFaVDERVXBkH5wg8ZUIovIyqCERcaudlGo0VIGK9Ak+WbNHzoUyco/x7mcWVAN7ckNCPiXLnAFHyiCQCFIGI50SZli3fboofcEGTOL7JZwqDUuTxkBMKxjwWWUpARGZYvuZmAEC3gYiSY5AIxwJIsu5YBCKyICtReLTo+ZAdGwkLE/UCiKrGlpyIWjAEpGvLpARE5kSLQESJA6JrrrmmJ0AksQVdDCo7Vyj0Ci8UT8m5bX4YhWWPiDy5hpFZVTIQVXFlHJyjHMTyeQusQopG8dCy1IWEvFOl25bVcFhb5RFRfsIXrHNhgFQoSMrc9vb624sCbCg7YSDWNg8oTdQmfnsI7eqe+O0ec2BCG9Zb9HKOCMCQFzRR6Pvvv3/wckbKxLyWlG3WeAIic3HCeIwZyjyd7xbvJRpYjiBJxVIE3pyQkXeRmd/i7QgjASogClBTAbau90qVXswRJTqKR7znBZn/oeQZMYyZlDCSrpUwAoh6IS8pNMf4IN9kRQGUQqRel2POE3iaI+L1pWuAlbEQPve8VpUMRFVcGQfnKAdWi7CcfH8KhjBRhCY9KcDRlDVXZHkVEFHsso1YZB5afdE/8xvS03uRNYfHgAYwAnw8tUbEg4c+D6KP0JCdiYVeAJa+ANa0M3xxYrfIh05+Z4WjI/FRP/CTh2MeThiU0rDQkrKnYFzrnmTICOnpa7eBiGeAdwwTNAgHMUSkagvHCS1KoZcUQLnzMlJfTfSnrLnknXaSz+W6E5+L8uGZFJ6VVo5WwMl4FAEwBmhHqwiGa/BfaLebhRwDF3NDZIH8ootRwiMSihYu9WwCJfOhaemCMClj0VKLZIiVac9AVObIOPtfHFcMl8tsUpegs7ZMKLJmKaTRVqqACI3mI0yms66EL1hgrHJxawq0233RHpAxuW+Boklc4A6MfKwo96BSGuYyhLx4GEIYrFtrcXgWHuhuK3Ntpt028BKYoksIhVch9Zm1S2Hy8iyqlFHnGiBgrRHLvNthuSSr+JU+lDuFXQzNoYtClxDAUyUrduug3BkzlGO3ea49PAWG5ITnY55QyJZcU+YUPKUva9HryM3BAACeElDlrXZbzvEc7WTGvLIQIprRBXB4aea8gAwvk1HG+LUMA9/Ji75IymlVMhC14sw4OS8kRwBYJIRDmEXsHCh5gLv9MA6HrSw+dFpFXiysQg+w0IvwCuUoPZdXRNl3uy8UgvAVC1CWH2XCK0KXj/CnBxFt5iZY6vplHHgZ5pOKIa9iXzv9nbKzsBL/8FLiAbrIiXkhSjzJh+w+3py+uUbfhHWFQrvN8yq+AB1GFa/TQlCeHbocKUNhRn30oewZZ5RqtwuatEsOEs8T33kLQElffBg4ohl+9yE31kqRt17xXLueTSnz0svR5cgQE/L0PPh4bnnVSdbJjXEpJo2UeZ+BqMyRcfY/oSb8BJgFS2mn8NBo7SornIVbnKhFq75QoLwfgOSTQo69eDjRg0YT4wCl/EEbC5dC92ExCsMJMfJCWI/604tCYQB2fOa9ydACTBIB0IneVNBIifCmzb1QOu5Vx2goxh7YCwUBx0R7kn3yQvbJi/4CKL/1oqATjeX9EhmMfkslyQsjgDckROq+4jXp2m4etY9W9KOLh1yWY/wVCRCm4/0J2U1MXjIQdXMUe9iWh7X46SEpw2p6KGAp9mOo64bVUAMXlekp/19sYqjfitd163uih2JO36vaTr+lY9U1o+Ec+sol0ZyO5d+7/X+io3ysomM411Td18lzZZr8Xy7la8q/l//PQFTmSP4/cyBzIHMgc6CrHMhA1FV258YyBzIHMgcyB8ocyEBU5kj+P3MgcyBzIHOgqxzIQNRVdufGMgcyBzIHMgfKHMhAVOZI/j9zIHMgcyBzoKscyEDUVXbnxjIHMgcyBzIHyhzIQFTmSP4/cyBzIHMgc6CrHMhA1FV258YyBzIHMgcyB8ocyEBU5kj+P3MgcyBzIHOgqxzIQNRVdufGMgcyBzIHMgfKHMhAVOZI/j9zIHMgcyBzoKscyEDUVXbnxjIHMgcyBzIHyhzIQFTmSP4/cyBzIHMgc6CrHMhA1FV258YyBzIHMgcyB8ocyEBU5kj+P3MgcyBzIHOgqxzIQNRVdufG+oEDXgzm9chnnHFGfGneSF8g510uXrbnRXRevNerl7hVjZWX4nlJm5fljRa60OHlj1466PXbvX55XBXf8rmhOZCBaGj+5F97zAFKmSKnaHyqXsLVYxInaN4bTjfbbLOw8cYbx9c/D6UYKXTXF8FKH6+77rqwyCKLhGeeeWbQbxM01uUTXgHtlejp1dBdbr6yObzz5tVdd9017LTTTsEbfjtdtGnsGB3pjbCdbnM815+BaDyP7jjomwfeq815F16bPFqs8KFYO1wgAji8nnPPPXfQa9Gd/9nPfhY22mijCGRFkBqq3W78duyxx4Ydd9wxKv7RQhc6eJBHHXVUOPLII7sCRF597fXjF154YXwdfDd4P57byEA0nkd3HPTNA++992uttVa4//77wwcffDBghQIl3gbLlPJmCb///vvxmqIXkryOd999N/6ePCv3UGLaKF5fZJt71ZsAMN0jZPb3v/89tuWaYhkOEKnP/ccdd1zYdtttoyLVDgvbb8D3qaeeit6S/7WrHXT6rg/6qg7fE31+1/4777wTwa1Vv1K/33vvvViPulMdxb6Uv7/++uvhhRdeGAjNuUf7vAJ1JrrUqz/OTaygUb/1y9EY61fxftfguTHUP/S6Xkk0vPrqq+GVV14ZGEvn1ede392PLp9yf/3uOufLNCe60j3+B3z77rtv2GGHHcLvf//7ARlSTyrqQ6u+OOJRojldoy00prF0TO2ka/rhmIGoH0Z5jPbRgyvksvfee4d55503HH300TFk9dOf/jQ+2BTLfffdFx5//PGoeO++++5wzDHHhAsuuCAqCg85pfb000/Hc6zlk046Kd6THniK7frrr4/zC0VFQWH4/8knnww33nhjVBT+B1qvvfZauOKKKyI9p512WrxGfUmBUTpDhebUTWH/4he/CKuuumpYbrnlwiWXXBJ+9KMfRVopMKGvq6++OvbL9ep++OGHwz333BP+9re/hQcffDCceOKJ4fvf/3647bbbInDpq/vOO++86B04UswUXVFB6sMf//jH2K/vfe97sR58xAttD1W0++Mf/zjyIyl3fH/uuefCW2+9FXw/4YQTwne/+91w8803x3HQflkBF9twr2u1/8QTT4RTTz01oMu5P/3pT7EtIHPZZZeF73znO+Gss84Kv/rVr+JY4As69J2hcu+998Y+aM+5W265JV4LOK655pooH/jmOgDh/jQejz32WLj99tvj+SJ9ruG54pE68e/WW28NSyyxRFhllVWibN10001x7ICI+sjASy+9FC666KJI89lnnx2effbZAUBSv2vffvvtaGihKfXNHJz7+6lkIOqn0R5jfWW5futb3woLLrhgmHbaacNSSy0V1llnnbDNNttEBfXmm2+Gr371q3Fe4MADDwwrrLBC/H3//fcPFJeHmVJbdtllw2qrrRbnbJZffvnwhS98IRx++OGxDopgySWXDO7xPSnsBILbb799WHHFFaMyBDaUMAW0zDLLhA033DD+9qUvfSmcfPLJUUlh8cSAiAJ66KGHIq2zzjprmGmmmSJ9m266aTjnnHOioqN0p5pqqoE5IvfsvvvusY+77LJLvH799dcPa6yxRphlllnC1ltvHYAiWnmPaJtvvvli3ylQ3oVCSQLA9dZbL85BOZrzmWOOOSJ4AaihynbbbRcWW2yxCHh4ZAyEEJ3/+te/HlZaaaWwwQYbhLXXXjvMPvvsYcsttwwvv/zyAEhX1c0r/NznPhcOO+ywSLv79YHxseaaa8bwl/74ri3tzznnnBGo8BodAFf75AFYAA/tzjXXXPGc+hJfgD++H3rooRHUXQvcv/nNb0b+CQEXC6PB3NMWW2wR+80gWHfddcN0000XZQkYoRnYoAfwXnrppWHppZeORobfjIvxYMCQa+PwxhtvBHNuzuOXvqHty1/+cgTNIg3j/XsGovE+wmO4fx5omVAHHXRQVJQ8BFYlBQMUKEEKAVBttdVWUTE9//zz8XdWK+Vtst98C8+Gt/DAAw9EpQlIfKcUKCRApe7kESSPBXDxotTH4l555ZUDcKLMWbysaB7bwgsvHC1mCn9iQETxsf4BhHYpIcqNAgQEaGBJTzbZZDE8R9HihbmZ2WabLey2227xXhli+uU8xayua6+9NuDBiy++GC6//PIImgcffHAEWfVSfpIoKGWelOvUwYNZfPHFozKlJFsVwLLAAgsMZKcJSzEOKFOhKh4TuvDdfJI6zzzzzAG+VtWr7emnnz5ssskm4Sc/+Um8Xx8OOeSQCBh4DmSND57fcMMN0SgBDEKF+mVskxeavFPXMmC++MUvxn7pp3N4DVgYLjwdvBUKBQrkQuixWIwp4wfftONaHhEDRt/JEQ/tL3/5S5RLPABCO++8c6xfm8baOKmf7DB4eOKu4w3x2l3HIzQuZLufSgaifhrtMdhXQHHKKadE690DTokryRrnEcwwwwwxpAIAysUDT1EBFmBCiVAArHUhN0rmzjvvjEpJynXyHCgzk98sVMrBeWG/GWecMXozLGihQW0KqQFDCh/ATAyIEv2U6Oabbx6+9rWvxRBckfZWQCSTThgo9RUf7rjjjmj577nnnjE8ph79FtYCmixtAIRe2XhoBQ7q8BGiAoI8O2CmzlZg1AqIeImMhjQ+jABgYnx4Kv5vVQDRzDPPHMEG/1IRhpx//vkjUAOAVCh8feVlCGO1AiKAyKtkpAB4/VLIgkQDnhXjBl+GC0SMIO2Zv+MJmd9DTyrm5hg2vDmAo+5UPzmZZ555opwYH0kqgEnIUPvocr4V71Mb4/GYgWg8juo46tPEgEi4ZqGFForhGA9xsXigWbuUB6vV3BIQMlckFOR7AjQKlmLRnnrMdwgFspIpCcAjPVgYTdiFQmeZ+5gT4RGwyM1FdBKIAKM5Mf1S0M9TY/ULQ6Jf0Xc0H3DAATGkZV6LkjziiCMiCAuH6T/6HXlSc889dwQjfU+AEisr/GkFRClcmsYAXeb3hKWEEBO9haoGvgIioTLgkAwBPzI8gMUee+wxALDO64d7hFyN61BANPXUU0dgQE9S8GjhyfKIZL0Zr6aAiKyRA+Nhji7JCLBhUDFkADNagCve8DDNiekLIG7F+wGGjcMvGYjG4aCOpy5NDIiERlZfffUJFB3FY85HeMj8CavY3IoPD8G8CgVMIbDWjz/++KiIzd1QBpQixcwzYakCGPUIIQkJmRNJHx4N5SOEmDKkUphI6IuiLBf0teMRCePxPJKHoR4KjKckxb0IRBS2OTZeCSBiuQufCeOpJ9GfjuZhzEMBogQoZbpbARHALs+x8UIAkXmoiQGRebsiwGpX2IyXxvsBFKkYH4qbNzEUEAl1GS8JHcWCFl4uj0piy3CAyNiTm4l5RMJ6wp6MI/xMvOU5kUH8YAyQOx66cKEkBSFmc3WMHaFkctRPJQNRP432GOwrxcrSp2irQnMsSg93Usypi5SL+0zCS0xI8wPCNaxTFjggSkUWFaUnM48Co7BNvFOOLFSKUKquUJH5DwrJBHn6UPQUOCXXSY+IwtKHBG4jASJAIalDeEg4L9FePKY5quQ9JP6kYysg2m+//QYy/FyLrpECkXmS4jg2AUQ8EEZGsQwFROZshBSLBWAweMhZEYh4p+XQHMODTApxmosq8jZ9JyepkC3ywrgQGjanRtZ5Uv1UMhD102iPwb4CotNPPz0suuii0fpNYQuKzoRuKyCiBIXaKG7pwRQc5c1LkP5bBiLKwWQyhXPllVfGsA9vgvKmlCkvStx8lPqEkNBQ/PAiXDtcIDJvI8vLB13F0mqOqA4QmffSd6EgWXlF2tN3/G0FQugbr0BknBkf5rrMO6ViTHlgPBxeZAIioAlshCSLc0TkTjKJ5BX1JL4Wj0mGi22QTXJDtsi6xI1+KhmI+mm0x2BfPZyUpgdbzJ3Cds4E8FBARDkIdQi/8KQoE3MmspdYsmmOKLGE1WsNidg+y9ecj7mXNGdBOUtuoJCEoVjN6gSUlJj5EPUnC3dioTnXJfATYqLg1KVffusEEAFTk+zmVoSNeIloFwbCV+FHWXBDlfEKREDaHI5wLLBOfDGuwnfTTDNNNFISEPFKherIFw/Z/WTFGJo/5DlLB3c93uIx+SCzvGvy5HuSG79rU2ageTFJLP1UMhD102iPwb6anxGi8cALnVEW1mvwJjzILEdKvxjS0U0KwZyJuQeTw+4RdpPcIA4vZGfBZCoUAwUhXRtImXdSR9E7oKjF84W2KCG0WPcjzRgNQA4dwMR8gLkkYb4URkttOarXdRIdZIyZu1KXzCp1AF8T7RQTYHLO/E1KIU51+k0IiCWvj9bQpPopN7TxGvFLm+o5//zzo6I0lyETULt4g09+G6rIwqMoTbSz8nkAaOItAubEL3TJ2rM2yke7rYrECTwtps+79pFHHonpzRQ6JZ6KcXGP0Kk5PXQIe6HffB1DRftAQLq7cSoWtCSPRuKJcQDS2meAWMcjYxJfpOaTCfJH1qxP0x568FZ2nPCcawGQutDHWAFGgFvqubCbrEoAQ07wSao6uZFl536ygFeyGnnl/VQyEPXTaI/BvgqNUBzmcygCAGHimJJhQVIYlCjlUCwUEYVgfoD1b8LeQ28HAwBGUVBixcKiZf0CEVlklFOxaIOiR4tJaKCmXorYYkzKXrvuoyhldlHUzlUVfaNA3SvswxOjtNBhWyNgZ+7JddoGrCa6i3X6jXUuHESxAW6FouPlyQpzD16l85Sl1GjrXLSrDxIKzPMUw1LxhtIfa160lWhg7QNnAKa9BEToSr/5vTw+xWopcMqcki/ySr8kKqSFouke7Ui7Rq+0c/cwEoCqxISUBg0IAYF092JBi7YsYsZn44VuR8kPjAJj6+O7ayxEVT9PW3sMAXKkDjz0sd4Mb/1O9q666qoIjvib5IRMSFLRnnkhfUiJCuowD2kdETDtp5KBqJ9Gewz3FQAIG7FkhTM88BSKkAjLn+IrF7+z0oGW8Amlrx6KipJMYbd0n+spEPeot6pOSoaSoOTE89VLqbGQKScKxjVo0lY6l9ooHyk/tFgQSTHxytyjf5ReUpJoQRu60JkUviPFrC10+S0V39Wj/qJHoi591wft6gPPDViVeZLqSsfEn0QDWtWfxiNdl/gw1Pika9GN52VeGSf3q9tvqWgbnXjsGm35HQ/Ug//pnD6VlXrqv/M+rlecx0t8F3rlIQE47WvLtanf6vfduAND2XKuSXQmOSGr6vEhJ64xpoo+uB/gGgNjAeDRgJZ+KhmI+mm0c18zBzIHMgdGIQcyEI3CQckkZQ5kDmQO9BMHMhD102jnvmYOZA5kDoxCDmQgGoWDkknKHMgcyBzoJw5kIOqn0c59zRzIHMgcGIUcyEA0Cgclk5Q5kDmQOdBPHMhA1E+jnfuaOZA5kDkwCjmQgWgUDkomKXMgcyBzoJ84kIGon0Y79zVzIHMgc2AUciAD0SgclExS5kDmQOZAP3Hg/wEh7mnWSitg2QAAAABJRU5ErkJggg==[/img][br][br]Which data set has the smaller mean? Explain your reasoning.

Which data set has the smaller MAD? Explain your reasoning.

What does a smaller mean tell us in this context?

What does a smaller MAD tell us in this context?

Two high school basketball teams have identical records of 15 wins and 2 losses. Sunnyside High School's mean score is 50 points and its MAD is 4 points. Shadyside High School's mean score is 60 points and its MAD is 15 points.[br][br]Lin read the records of each team’s score. She likes the team that had nearly the same score for every game it played. Which team do you think Lin likes? Explain your reasoning.

Jada thinks the perimeter of this rectangle can be represented with the expression [math]a+a+b+b[/math]. Andre thinks it can be represented with [math]2a+2b[/math]. Do you agree with either of them? Explain your reasoning.[br][br][img]data:image/png;base64,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[/img]

Use the numbers you plotted and the symbols < and > to write three inequality statements.

Adult elephant seals generally weigh about 5,500 pounds. If you weighed 5 elephant seals, would you expect each seal to weigh exactly 5,500 pounds? Explain your reasoning.