Are these two triangles identical? Explain how you know.[br][br][img]data:image/png;base64,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[/img]

Are these triangles identical? Explain your reasoning.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATwAAACbCAYAAAD/ayfkAAAgAElEQVR4Ae3dCdh1U9kHcONrjlIqQhnKGM2GEBJRFCEypIiilDTSJ5IIDYRUKlJJRFJJiiQqEZoTFZXmeZ72d/1Wraf17vdM+zx773POc9a6rn2d8zznnL3Xvtfa/3UP//teCxW5ZQlkCWQJTIkEFpqS+8y3OWES+OMf/1hccsklxeMf//ji4Q9/eHHCCScUd911V/Hvf/97wu4kd3ecJJABb5xGI/clSODnP/958ba3va1Yc801i4UXXjgcyyyzTPGEJzyheP/731/87ne/y5LKEhhKAhnwhhJb/lETEvjXv/5V3HnnncWrX/3q4n73u1+xxBJLFPe6172KxRZbrFhooYWKRRddtFhppZWKfffdt7jhhhuKv//97010I59zDksgA94cHtxJurV//OMfxc0331zsv//+AeQA3gEHHFC88Y1vLFZfffVi2WWXLdZee+3ivve9bwDChz3sYcUxxxwTADKbuZM00qPtawa80co/X70oir/85S/Fpz71qWL77bcvmK4PechDiuOOO674yU9+Utxyyy3FzjvvXKy44orFwQcfXLzvfe8rtt1222LppZcOwLjlllsW73nPe4rf/OY3WZZZAn0lkAGvr4jyF5qUAKA677zzikc96lHFUkstVWy88cbFu971rgBgNLdf/OIXxYknnhjAbaeddiq+853vFN/97neLk046qVhnnXWKefPmFfe///2Lvffeu/jc5z5X/O1vf2uyu/ncEy6BDHgTPoCT2n1g9qMf/SiYrIITTNYnPvGJxeWXX16I0EYzlZ/uE5/4RDBn11133eLSSy8t+PoELq677rriec97XgA8YAkAjzrqqOJ73/te+M6kyib3uzkJZMBrTrb5zF0k8M9//rP4+te/Xhx++OHFAx/4wGCuPutZzyq++MUvFn/9618X+NW3v/3tYq+99grfe+lLXxq+AxCB4T333FNcdNFFxZOf/ORgDi+//PLFFltsEbTEX/7ylwucK/9juiWQAW+6x7/1uwdSX/jCF4pnPvOZxb3vfe/iQQ96UAHEmKndoq6//vWvize/+c3FCiusUDzpSU8qbr/99pl+A74///nPwdQ95ZRTig022KBYcsklA5DuueeexWc+85ngI5z5QX4z1RLIgDfVw9/uzf/hD38oPvKRjxTbbLNNsdxyyxVMVCDFtKX1dWsiuJ/97GeL9ddfv1hrrbUCF6/8Xb/nD7z++uuLQw89tFh55ZVDYIOZ+8pXvrKgJTKFc5tuCWTAm+7xb+3uf/aznxVnnnlmCEoAu80226w4//zzi1/96lcDARG/3LOf/eygFb7whS8s/vSnP3XsOy1RdFeWxlOe8pQQ7KBJbr755uH6SM25Ta8EMuBN79i3cue0qjvuuKN47WtfG7QzZimaCRrK73//+5ngRL/O/Pa3vy3e/va3Bz8eKso3vvGNrj+JZi6tjim80UYbBTOX1rf77ruHa6PC5DZ9EsiAN31j3todRzLxIYccEnxqD3jAA4qDDjqouPHGG4PfrUpHmKyf//zng4aIp3fOOef0BUtgG81cARL+Qjw/Zi6/ocBJL1O6Sv/ydydDAhnwJmOcJq6XkUz89Kc/PWhlqCevec1rgi+tW3Ci303+4Ac/CP45kdgDDzxw4Jxa1/vxj38czNynPe1pM2Yus/r0008vfvrTn/a7dP58jkggA94cGchxug1alSR/yf5MWGTi0047rW9wot89MIFlVUgv22STTYqvfvWr/X4y8zkzl9+Pmasvkei8yiqrFM94xjMC/y+buTPimrNvMuDN2aFt/8aAiojrm970pgBywA6Z+MILLwwZE7ONkjI/v/SlLxWbbrppME8Bl2tWafqA5oIaw6yVp8vMFTF+yUteEkA0m7lVJDpZ382AN1njNba9BSTf/OY3i1e84hWhrJPkf2Thq666qlJwot8NAtQjjjgimKX77LNPAK9+v+n0eTRzZW7Q8JjJ97nPfUI09y1veUswgTv9Lv9vsiWQAW+yx28seg88aEzPec5zAv9t1VVXLVBHvvKVr1QOTvS7IWbpBRdcEIIgj3zkIwPvrt9vun0eo7nf+ta3Qv29xz72sSGfV3Bj1113LS677LICdzC3uSOBDHhzZyxHcicA4aMf/WigmvCtiYC+7nWvC5kPTSTy0yT57vgHpaUpHzVbUzmauUjLzFo8Qbm5iM4vetGLQlR52EDLSAYlX7SrBDLgdRVN/qCfBFQyUdlEGXbkXlHPd77znbMOTvS7rvxZRQIUB2WOIjXX0QC08lPrrbdeIC27J4f7O/XUU4sf/vCHswbXOvqZzzG8BDLgDS+7qf0lU/D73/9+8YY3vCHsN6FWndJNF198cSFhv2ogoaog5c7KpGB6brjhhiHtrOo5yt/XZ9WWEZNpjV/72teKM844IwRIBDVcy2fuUdCj6Xss9y//XY8EMuDVI8epOYsIJpOS6bfGGmsUyMRSvq655ppagxO9BApskIZ32GGHUPJdsVAk52Gb80lxe9nLXlY897nPLe6+++4AaOg1fJOvetWrQnkqpq7iBPyT/p9pLMNKfHS/y4A3OtlP3JWVbpLEb08J/jM17BTe5Ptq++FnTr/+9a8PZq2cWcTiYZv6e1LQmMcCLalPEMBH0rISVvyUorlKUDFz5fjOBmyH7XP+3XASyIA3nNym7lcKbuLT7bjjjmGDHVsn0rDsQaFAZ9uAB3w/+clPFg9+8INDoEQfhmmCLvyOMkI+/vGPdwUv94d2IzNjq622CkC72mqrFXvssUdtPMNh+p9/U00CGfCqyWsqv636iEonCL/8dSKk7373u0NuKy2LiffpT3+6VdBjhir3jj5C41ICqmpUGNgJutDsUF26VWCJg+6azFyVlu2shqwscAL8RXOvvfba+ao1x9/l1/GRQAa88RmLsesJ0w6oHHvsscF3hUy82267BX4anxdTTqpWBL0rrrgiPPBt3Yg+qKeHNCyjQ67tIA1wCTy84x3vCIEIaXDS1gZtzFwEaLX9kJ9j1WYLwcknn1zg9WUay6DSbPd7GfDalffEXA2YSeNSTJPZKEpp/wgVS1Iyrocf6Ils+i6zFxC10Wh0fIoPfehDQ3aHUu/9GhC/6667Qn/5Ij/4wQ9WArv0/MxqwRObhgNcFBapaiotf+ADHwjl51N/YPrb/H40EsiANxq5j/VV0T5oa1LDaC/2gD366KOLW2+9teOeE0BPzTtm7/Of//xA5+DM9/8mG03NdQVO5O2++MUv7ti/2AcApTTVy1/+8rDl48c+9rH5wDt+r8prNHMtBLiBaDL6wsxVkgog83/6Xm6jl0AGvNGPwVj1gHamErG9I0QkH/OYxxRyS3HUekUjaTJ8fTQ8lBUPv/0kPOxNNoVB8eVoVyKn9sYoN31TAsp9qcfH/8YPV2egxTVEc/H0BHJoxOTHzLWlJE0Q4OY2WglkwBut/Mfm6jQQph5wA3KCE9ttt13IPJDZMIhp5hwAjvNeetlhhx0WzL3bbrutVnBJhQaEceLw40RNgVpssT/2q6WhRu2TX7Ip7TOauaK5Fg1yZObatEjfcPyauna87/zaXQIZ8LrLZmo+8QDSQGhlcmFtbO0BRfUQlaxqjnHYM2k94Mi8ND7RUNdgLtfdADXNTfDi4IMPDj65SBq2ifcLXvCCUGL+yiuvHLq6StU+0zyjmfuIRzwiaKAxmiuiPYxcq/Yhf39BCWTAW1AmU/Ufjn/mHaCgIdFGaGY33HBDX5pGL0FF7erLX/5y8O2pPXfkkUeGfSkQlRGHe5nIvc5d/kwQ5b3vfW+gpwAVvLoTTjghUEWYrwIT/Uzy8jnr+DuauYIpslHINjVz+UTrNKvr6PNcP0cGvLk+wj3uD1AogYRqstJKK4XqIDbbsUFOVU5bt8t46FFAACgaCC0S8DF5JerbfBvFQ7bDIGZzeh2A6dwIwSKl7kH6l025pZt96EMfChHkUfvOyJJ2y8yN6XDRzD3vvPMCnaYu8E/lk98vKIEMeAvKZCr+Y7tC5dI51RF3lUzn/FcRpAkfEzDj35OUT+PBV6N9KRh6zDHHhCrJ+nP55ZcHnxyAEIGlmcXDBtzyeK+++upwDruYKWAg15VWqqqJTbjdE9CuwoWjkTIzXctrp+YeyM259QPvj4bWyeQnQ75P/kuBFDw/Zi7/JtBXYp7cRXWRlu3iJmBUFfQ79TP/r7sEMuB1l82c/MQD5aEGOHxLTCzpYjINmJmdHt66BQGIAMfNN98cyLvoLIDr//7v/wIYAARBBoeNf+Lhb58BSu8RohGPZX2gmNCgkKPd10033VSp2wBJPu1+++0XKrGUf0xL4wNEaeHfVDnFRkK0VtHZFKiAHf+d+8FNlIniHvkaaXKi2UD/gAMOCAUY9Hnrrbcu+BvJRMZHG+NQvsdp+DsD3jSM8n/v0YN4yy23hIfWLmI4dsi3sQz7KEQBKJiztCEZCiKuclqZo+eee+58hyAIoAA8kvwBN60IGDkPbUpNPkGXt771rQODBgBWxFQdPIU/mcNpAz5ktO222xaqIgMqIPbUpz61UHUZ7SQti0UTVXVFsETU+/jjjw8pcHyLTHBNn2mKTHGltVSd4UNFWuaPpN1W0VDT/ub33SWQAa+7bObUJ0wvJZyUYQd09nZF1AUcc8VxrhAoDYwfjwYWwaXXQAJK5jPQoWXxA5YBj4kLiCwSZ599dgHQaHXA2XViTT4gpklVozUzX2lr+sFnSXtEiUm1N5pljOZGOhCKDTNXcQRad6o99rqX/Fl/CWTA6y+jif8G35G8TxoJXpgHVP4r39JccpYDbpoabYm2JhrcqwEegII6A2zOOuus8Nsy4Ik0O6fFgkYZAcsrbVTqHTObnDXaJSCkpcXvCtDYE5cWGv8X++ZvGi7t1TXWXnvtYJqrysLMtSgJMJV/F3+fXweXQAa8wWU1kd/0IDGlNt9885lsBFoKP1JVzYEGI6gh8NDrwMFLMyw8qDQZ0VSpVnhoTOsUPKJwfdfDTetiRoruypIYpK++wyzeZpttArAzNXsFYHACAdFGG20UgiY0LYGEMuDx0y299NKBV1g2M8lXFRm5tHx0+o+/uP322wdND+gBOSawQ6Xobs259V/wSI0/mngsQSWgQ7OMWmS3c+T/95ZABrze8pnYTz38HhB8NJvRCE7Q8JRGH5b0CniiY595Vj74A+W1irzKWdUAACDwwPJreZCZj6qM0IQUHkjBjC+MNioPVbECfjD73NJGnatfA6KoNYqTupbgSKdGs0WJAY58chYAmlwnwLMtpP/jK5YBFACppccMBWw+d02BFtw7ZasAneKhtEH+yn7Nd5jLAjOPe9zjAnjTWJ0HmDLdy/3od878+X8kkAFvDs4EmgIzSIYDDWHllVcOD58Uq34133qJA+CJhAKuTsfOO+9c2KKRL4y/UOO/oiGhjHD64+Ax/9SgoxmJtNKSNP32OwCEqCxIAewAqerCg/Qd507hA7msTEMUlnIDsLh/Us223HLLUBUGgHQDPFFZ50MUTsE5nleWB/8eQIwaIMrKOeecE4BP0EKghdY7CGg7r+uQN/AnawUcRHP1l5mrr7TmQc8X+zrtrxnw5tgMAArMRhqFB8SDyEdF+5itOUQrokEBi/LhAQdsNBKaSDTvmKQ0ICafh5cGx9fl/zQgD7DNsD3g/s/cpiUyaT3MtKXTTjstVG5xzn7Nb5iRggaqluD4lf2UgIK/Dn0FKPnc9bsBHrKwIA+TvBPgWVgAIlM9lTHwc0/DkKrjfeqbQAdaCw19lVVWCdeyYKDj0HxHTayOfZ2E1wx4kzBKA/aRNvXhD384+I887BtvvHGo+9YUmTjtFi2NKatiiVpwHnwPohzaRz/60QF4olPf73wm5QtA+h0Q0n80DRod0NL8xjmUUkdDGaQx2dXnY9YCWuZqbECI1kfjFAl1Ta0X4DHBBSbQSDoBHoDvBHjxmnW8WsgsEkxlJHEuCnnP0cylDWYzt7+kM+D1l9HYf4NWgyYh8wC4KJVEc8LnaoNMDAQEGGhCoowc7xptjh8Kdw1Vo2x+8aHxs4loAjNRVtoeE5JGwyyXeeGhRjeJ4NRvQIAt0xhIOeJ+F/rpOgBVpgMzExg6yM/3yI5G7H+0Wc33aVYCLWXAc098mXZwS03afn0c5nPXovHywzJzAR7gA96I2zTUKmbzMH2Y9N9kwJvwEbSqc/yLLDJf0U7ihjRt+XgAkevTPJi1sSIKEzT6yZh75cZU468TOJAZ4YFmGsueYJILWHiwaWIiqGWwKZ8v/u08tFr7Xdhzgt+QZkerpAELQCAM+z8gdQA5wIZ4DED8zwLimkCbxgxEy1qUe2U+Cwzx8ZU/j32q85WZSwPWP35TYMxP636ZueQ6V7iVdcrNuTLg1S3RFs9HkxENlb4ku8CkBxBKs7fl1wEu+G78SzS1NKWLfwmIqKvHHCs3gCgaCygVC9UADPNYUQMRYdFdFJiyH658rvLfwF6ABQkZgLkWEOBHVKeufOgj83rxxRcPC4fPASIAU9SUeQzMUx+dawJo2mJKSyn3pam/ga2xTs1cwQ15xbRVcmwDgJu6vybOmwGvCam2cE6OcFoTkGGGiUhKom+bTIwzJ4LKbKWZpX46QKV/qpdEmkoqGmYjzUrwAMDV2QAkk5lcLASADpjSRpnc5YN/DrCpqceE9jktEaDTmOxQpqoM4IyaJvBjqtOwUuJxnffR71z6x3WAcC1arJ+0fBFwlCSAaEx8L7es4U3kHOBb8nDy09FgAIacTY7r+DC2dWOqhggocOxLpUofLFFN/ji+Pf6lchPpFeGkIfHV1dn0A6AyjWlntJ5eWi+5dYvSAjaLCT8dXxkgFfXWZ5od89i9R0pKnfcx6LkAPFIzLZS2LYiCuLzLLrtkMzcRYtbwEmGM+1sPpRLhIpl8RvxTSiGpdDIKZzUTEb1DWhb6R5nky9yjdfDR4QCWG2K0iiOyQPjo6m60YD4tctJHGSDdGtkCbzug0VTLTV+Z5xYXKWKI0/pNsxVgGRctCqgL9hiPGM3l2+VLjWZuVfdAWRaT/HcGvAkZPb4YwQn+Gqt3DE7g3I3KQa0/QADoepjK/iIaJ5NVBRORxXIDMMxEaVgc/nU3DzafosVBUQB0mVQDTa/n/zROOcadyMo+B5iI0EBaZFbxBabyKBabtO/l9/rKdKeB6qtorvkCnN0fM3fYbJvytSbt7wx4EzBiMThh8vLX8Ukdcsghwawa1WrNfFOt10PELOXbKjcalvQx30EeTh3+wFFGhIACAjLzs4lG66RlyoV1nRhBHvZa+g1MnNe5ugHosOev83f6alzwGKOZC/i5HxCu+XtHtVjWeZ9VzpUBr4q0RvBdQQEcN5OUL4oTXmFJ2kjb/rr09jn07YPBOY7q0cl/BQxw3UQ80U9kT/ieB1H/pVwxERUjberBA0oIzoIRigTwK05bY+bSpuUYM3NpezJH5CrTzC02o1o42x6LDHhtS3zA6wEL0TcPKzIxDQU48JnRMEapWQAsphxTldYpitmteZg8aLQ85i3w5q9jGsrKYNJ2Cmh0O1/V/+urCCzZ4d+pHDNK2VXtf53f52ekVdN40VfIQ8BIrT5j4PNRLqJ13mu3c2XA6yaZEf4/BidEXq3EIrH8ZKgbgyTQN911PiupWzQ35ZV6mYkxGIA8DPRoGJz9HjQEaXSK1NRtou+i2qgmSMUiykztaW3GQ1aJLJyYmytbgx81mrm9xnPS5ZYBb8xGkEZCY1JWyETks5MoztE8LmYHwJN1YB8JUeN+LQI4Ko2sBVkMNFWpWk2Dnb4x6QArWYrCuu60N3LHk5QhYyGi7amsQ2NXaRlpeVzmW51jlQGvTmnO8lz8WKKKuGNMWMEJ6VXSiIBGbsNJgOw46GVSoKgIoGR5/keWMlJkufDHMnOl0NnblxtiLpq5GfCGe4Zq/RWfkonHwY+zNm/evEByxZRvI/m/1psZ05PxTyEP28ZR/iktNbf/SAD4oxBxT8RKyzQ+9QtFeNFxmgoqtT0GGfDalnjpejE4IUVJVdslllgiRBP5WOayL6Ukhsb/ZMLZ+5WbgF+UiyC3+SUggo5baaFl5kYK1P777x+CHUBx0s3cDHjzj3mrf0V6Bma/NKBlllkmVAtmYkz6xGpVkANczMKCkyb4g96janA2azsLTlBHqpzsDDQobgA5uvyvsjjGjWjd+S46/zcDXme5NP7fuJpi64vCWk1FEPHEppU20bTQcRpx/5i1zDX0ntw6S8Ac5E5Bi1JJhk/ZPJW/jdojb5eZO2lzNQNe5/Fu9L9MVSaV+mVMWFsAAr6msg0avZkJOrlFhuZC3iqceD8uDXDon4hyr4NpXtZM/e03/MAOQMR66NR81+e+h+LUz5LwHZuioxHFoIZSZAJrOH0yTvqdo1M/RvW/DHgtSt6kZg4I++OjCU5I7GbSTjM3rK0hIH90C/xBnLyjjjpqAfBoqy/l61gERUVlPtjdrNuBDmTXstiAJGoQ/6SCoApLqBrdKW0sulAAFS0NkMl+6eUrllGjQoz0QddQdUbVmJj1oyzWzTffHLbWLANx7OM4vWbAa2k0TAYmguod/CLMKmWFZCyYtLm1IwEaiywPmrU8XmMyDo1/UfodLcoiWD5WX331EHBBrYnVowEYsJFXjV8oGON3AIl7RFYLzU8D9sxQu8TxYyIa212OpqYARSeNkDYJHFFWaMPOwQ1gziIt2ySKmWvxVpYKOMbrjYNMO/UhA14nqdT8P5PJZJDCI4/R6sgvYu/RSVgVaxbHSE/H/KJJqTgjYosKNA6Nhi/l7uKLLw65yfKT04OWhR+nvp3AgSYfWQYJkJTJArgUWrUBucUUmKlCA6gAkci/+oQI4IALAdvvHDTfcpORIc/ZJkspjSfOZ5aJtEegZ14r9koLlNnSCUDL5x/F3xnwGpa6VVL1XAx2jl/BCSWV1FfLbTQSoNXh4tGylZgf14czSocFcMYZZwQ/GpABKECM6Uq7KuczK/0kOAOM/I7Pzv9EpvmKLb4aUxbPzrYATNu0WYgBsEitjJpOzdymYZKhzZLMb5qoPYWBKW1aP8epZcBraDQMtAlFi1PinAklc0LKmAmb2+gkAAA86MZEUQGazDg3puhee+0VrAI+PGBEY1PbjibHnHRPaWOKbrXVVmG/E/cnQq1UF/NUNo/f8wUCUFVTygswjc5+Inx2veRjnvuu2ntIyxZ0wCfIIX3Qb8fJZZMBL50lNb2Pk0DRS3vDCk7w23EqlydmTZfMp6kgARodU49WomyUPNtxbcBNBgRgU8UY+VejpQIjFWs6aWA0NjnYTGClocxJYGmTc1obc1kBCEwBqXblwIV8bmXIbKQ0iAasn1gGNk7SV6BHtjRpQTqZLoOcp+lxyIBXs4QNvFC9st/8RLQI5cVF3cZhwGu+3Yk9nQeQ1mQxEiwY17EBcPb6VXfQHIoUEEEOrhF7agCycvM5U1WqYvycVofULnNCJoW9RszTcuDGHFb1WR53p+rP5Wulf9PmFCU44ogjZuY/y4bZax8QfQC+o2oZ8GqUvIfGPg6cvJKwZU4o3MnPMcpBrvEW58yp+J/OP//8sCBJ6Yt+rXG6QXOG9mnB5Hszt2KT36q8lvllU6FyE4QQjFBzMN0gyTn51gCpwAVwKzefK4fv9wIjwzRBGAEhGp6ghoVlgw02CLQZ1x7VApMBb5jR7PAbK5sVjNbAGS75mm9kkPJJHU6X/9WwBDzouGroHMwvD/i4NYEGZisTkQlKO4pN35mr/MO9AA+NBY2kSgNIajHaP2U2Lhgy5ic8++yzg68U6FECaJbMXKDYtiKQAa/KTOjyXZPCrlycxIsttlgITnAop6H8Lj/N/x6hBDjymYvGDF0jmosj7NJ8l2Z+MmXtxSGpP20CGXvuuWex4447ho3Q08+8p5nh5+EaIjNXaVgF/HeAqo5Gm6ORqoPIvF100UUDjUUAha+xTW0vA94sRxSo0Q5woTw4dojiZE5X41leIv+8IQnQypmMsi6QdmlN49IEEUT07biGrF7OxBEg4KNDIo5E5LTvAAYPr9sWmel3y++vv/764IPrdN7yd6v8HRUDmimtGvDRsAVG+BHb0PYy4FUZseS7Bofqj+QptzAy9zmI21yxki7ltxUlYAz5xYAKN4QS5+PS5FpL1OcD4wMuN7mwAJHJytwt++L8nrkrUlvm2JXPlf5NJigthx56aAg+pJ/V8d750bKQoFGCgB7ZA27R5qYVhQx4Q4yiyWUF5dTlkHVgmdssxoDmNjkSoEkJCHjwBABm47Oq664FVGTlKMmE5sGXV27mGf4dcrEsjPQ75qf6irhwSMBp7m35POW/AY5sj3KQpPy92f7NfXDnnXeGklPM3EUWWSRw+ETMRXnLAD7b68XfZ8CLkhjwlRkktcfu80wh+3wKwSNYZrAbUIhj9DUPnnQoznQ0IovWqJsSYbQzJax6pR8CBjw61BTmp7lpDvLB8fsBPMBXxTfJdOaiwTSoApTDyExfLTjXXXdd0ESZudxCa621VuAIlukyw1yj/JsMeGWJ9PjbZKB2MyOYsJK0RbNwujLY9RDcGH9k3LgmaEqLL7548CeNsrvcIYob8G3R8vStW6MJ2gxd3xHc8eZshck85JNU0r4qrYSpzAfNXLZNaBvNPcctSfEDjQNlYpiAS7/+ZsDrJ6H/VpowIErqCE7wOUSqwChC6wN0OX+lggSYcUpFMatoS3hoo2r8WzbQQQ6m+fTTzkSa5dSKMm+44YbBDFYFRSAAt7DqQoybZ56jpDh3W00/ATgzV/TWWND2aLl1tgx4faTJl2DiSOvha1DphLkhsbppB2ufruWPa5IADQOtCFlcyaNYjaSm01c6jQcf4AKbfmDnxL7PlGX+SQdjDnOvMBWH8YNFwENLaRv4jQNOIS1v4YUXDmNRdyApA16P6WjC8ZMI/0uKVk7Ie5NqkO8AOkMAAB97SURBVMnY49T5ozGSANCgwdsgnFbBlJy05h4AnMP7YRv3jKIBbRe5oN1Jndtoo41mCuMqUFqm4wx7X/F3GfCiJEqvVkj1xVSAEIVdddVVg5ovR9FKlNvckoAHzm5dTCm+Iw/+NDaapUAHwJMT3kYDaueee24osMF/x10kCNNExDwDXocRNdltXkK1Fr3D01LphBYwjJnQ4RL5X2MmAeOqMCiTVpUP/rNpbEAGrw+dpWrAo6q8aKKxTp89RgQCld83DhagJloGvESqBgCDncNXcIJmJ+J12WWXhU1PZmMqJJfJb8dUAhY6QQtaHg1nGhc3rhpMBMRjPsGmGtkCVHtlWGT4xmWGoNQ06S7KgPffEWWmGmBhfauN5H9kYjwo5m1uc18CHjSb4AA8ZlVbJt24SVYAB6m+KS3XsyY3eJ999gm+cf7xWIm5aXdRBryiCOrzDTfcEAZAYEI01oBLyWlKtR63SZ7785+Ip9LkcVN0fqRp1OrJwG5kggZ1NxFlkVibALGgbJkpU4Rl1YZGPfWAx0lLhbeLE1oCwqcBEJxoUrWueyLl89UjAQ50WTRoEYi80zgHzH3VkB11ghD/oEisoBAT1rOGdsI33tbCMtWAh7tE4IITHNVeheSl1NQ50PU8ivksbUiASWVOyK1VsJKfqa2HsY37G+QafJn2/BC4AEazbeSnqpCsELQTgUBpb+r0+X+b8p1KwANm6ompWSc4wV+nrpjKsAa7zQGY7WTKv69XAsaeL9d+F9KbPJTTtvgxOz0L9r5g3s6mkSfFQgqmZ41mF3N/6+bYDdLPqQM8JopBtJ+nZHHJ/xKt1QBrm1k+yADl77QvAaaXytXMWgVCpy2jBkjZ+EcBAZy8YRUACwXz+Oijjw7bN7KipMChnTTBsRtkpkwV4EUyMaEDOqu4KqwqZOTgxCDTZTq+4wHnsMcLs9ucUmDDPvSTKjFFC2zrqADBMJW7KRYyklRdFgQSDER18azRIEfVpgbwmKoIldttt10wYe3iHhOsmw6Fj2pw83WHl4D8aU51oEfLmbY5QgGIZm3V3GK/FYmlWKy44oqB5qUYwR133DFyOc55wLMyC3njVymjw19n7wklcAQnpm3lHh4CpuuXtBCbMOHk2TuijsohLAzcPtpTr0OJpjLAcreozowqpRS9DIVuvkW+MVVHkHjN8WEizZ4Lv1dFhmIwqAWkn+oLKrCBX2fR4L8T/OnW3zZn1pwGPJPGoFldOEyp1bvtttvMxsAZ7NqcapN3LftdiChyfTDFZvvA4vUBUXOw1yFKHItfuqYCFscee2wAEbUYZf8wD23ykzr+zefbb789bDuANG8bRyalTXyGIc8DXtqt4EV5E6HyaLo2K0rxUEUY+OtsL0mxcC/j8qzNWcCzIqnrb7Ak/gtQGHyqdg5OlKdr/ruTBFgGaBTMWrnUs/U9XXvttSGT58ADDyw6Hfaw4O86/vjjZwp/AhrzVuaH1Cu18pDicdkA2lVXXTXTL7X0FA9VJp1FIx/8yCOPDM+ArImqoANsBfhkH5111lkz1ynLynlpkmeccUbYpwLY2TxISiYQHKc2JwHPqmffSxuY2GCHdqeeHSfqoKr5OA1S7stoJMBCUL4fJ89mOum+EcP0yMPP1GSSlo+bbrqp2HvvvQu+Zb5mGpm5KnAA7PTjxhtvDECIUgVcNttsswBocYPuW2+9NYDbySefHADIcwBkAabvDxNt1mdaGs20E0UFKPJ3KqkVKV6016uvvnosFYs5B3jUZ6VmrDAcptRqq51BKftFhpm0+TfTJQFmKL+v/GrO+9matd2kx/Jgqqp0bGGmNSnkSavzf36xqGH6DHDS5AThYgocQKQ52twnfte5ULBkTQxj1rpf5xCtVT4rjdjGSCwwZvZTLgAj2skw4NpNNnX+f84AnoGx0p166qmBxQ3spItdcMEFOThR54yZsnNZQPnN5s2bV5xyyimNWAjAgRlrXwoZDhFU4laNgK1cucRvAJBAnJLseG0WddkRUuKYsLRIpuh+++0XtMZhF3wuIOmXBx10UDBTncf19U/fmOHcRnh7fJ3DBEnamlZzAvAI+LbbbgsCFxWSkGxltPK1nbrS1sDl67QjAQ+3cucKU6rVJspa1RfWr6eCEhZnpqA9aKMWyQdm71baFX9i2vTBBt0AT8aQ0uxAiCYI8FBC9t1330CgFiVFAB62RW1TtNa5aZKeLf1V2skzJ/8c7ST2fdhrNf27iQc8g8xPofS6VcZuTUrNUKuHUeGbFng+/+RJwP4liOoO5cKG1ZQ63TnTEyDZgAegpLmrNqvm0zvxxBPD5tXl319yySXFJptsEmr3CRpoIqs0L3mrTFuaWR3uHEoFH576dXzj0sNYUfyLAjqTsk3pRAMeh6pBV93CZJTszTQQ2Yo+jPIkyX9nCVSVAO2JT5hZyzlf50LKF2f+8sUxQ1NzkDlqTjOl9aHcEIOZ24cffngAnPg5QBawYN1QCOrQSJ1DX5nM+HUOvkUuoxSkYx/G9XUiAY/w77nnnuC7QCLGr8P9sdJYzcZdrR7XyZD71VkC5tNJJ50UtudEHamrggpgYpbS4vDsymYrDY3m1w3wmLwq/LBoaFhNNffvuRL40B9BnF122SVkYtAoJ6lNHOARPnIlhy0nL80OZeDiiy8eK4LjJE2C3Nf+EuC34jJhxuG+pZpY/193/gaAQ0Vhll555ZULBETw6PAAWS2RiJyeCclXmSXFOqNJm35ex3v3KUrrGmgnIrEiyaoi16np1tHXQc4xUYDHTMVXEgZfa621AlVApRO7i03aSjPI4OTvjI8EzC872DFrRSPTDIdheslKwbcDaDS0yKVLzyWTggZnvpeDDn6PW+f3fHyz5Qim143vmcOAXqBitdVWC4e+egYn1WU0MYBngokMCbHjRKligQFO+KMqNRMnRn6d+xIAMKeddlpINQNCAGo2rhNZEWgerBQ19zppS3zRO+20U7HHHnssQPoFwKK3oriCG3UT6lFRkIexHdBORGKR96Vq1hm0aXvmTATgmRycowZfGNwg8yfgGdVhWrQt9Hy9yZQA6tOaa64ZtgLgP5sNyDBhUUoixw6glpugg/Jlm266aYi6RisG0IrE2hfCMyGK3On35fMN8rfz0BYvvfTS4CryvAFlEWQZHrMB+UGu3/R3xhrwCP/uu+8uzjzzzBCUIPytt946lODmpJ104Tc9uPn89UqA1iMpn1krnzUShKteBXAxU9ddd92QFRSBrHwe8xsw4ugBN6Rk4IZqcvDBBwf/Hf6byit1NM8bX6BMJc+ZYOAWW2wRAiuuUReo1tHXYc8xtoBHbeYsFb0SmkcmRnRUwYLGNxeEP+yg5d+NTgIqmdzrXvcKvjPZD8Msuko8oaIIWNAae50D9YrJyn8IhAAfCgsgov35fR0mpj7wEzLbpWMCO9seCAY24R8c1QiOJeBxlto2UQ6gHD0OUzl6CMazdRaPStD5unNDAkCOZgb0VEU2V6s2fLbzzz8/+Mi6aXfpOS3wND1FAWwQzpcmoV9f6ggecAs5F44h5UIkVqaGrI259ryNHeCZAOp32VOAs3SdddYJIXGVIGbjM0knUH6fJTCsBAQXMAOUjJKoD4x6NZoTUBRYc9DGAIz/eT+opeK7ng2pbTGNbNDf9uqffkhnQyjmn0S9UV3FHi/DgHmva43DZ2MFeAZTwUE5i/x1omGcpVbEOtT2cRB47sPkSwA/DvnWYiwP1twEZuYvjiiwsP+q79n28+yzz545EI1pZzKE0KmYpIjMwKztOc4nyScIuNWLxHygQVIu5mowcCwAzyoozC+nkP8A2AE9av9ccZZO/mOe7yBKwAIscmnLQVkQIpqyImRjKNBply6l0b06jjvuuEAeRiBWiCB+jszrvf/znTGR5YDLImramhFwYUmhvPCPy/YQALFhUS+fYpTBpL6OHPCsJFa5WIad8O0hYDA4bOtsBpLPw9HPHIjfncuDX6ds2zqX8QAGg2hDvlOHjyu9N9dGh9p2221DBRWZDsqtAzhUKZFUlBVFBnDWgCMNTlYFZoGFnRaIP8ovZ1EHdoJzghC4dYjEtENbJXoG6pyD5r2sDTSvHXbYISgXaC+YEHWlzKXyGrf3IwU8/hAqtRA734EAhckjYNGJiNlNeCZFNCNMsHIzSa1ckq2ZFMLuWOydqC0eEHwj0WDmiN/MlmRa7s+0/m1xI1uyV5G62yF1KyW4ekiZfHxNtCCg4oGVBeD/5cZU813uERFOaVDDUkjiufmz1HpzTuCkvLrAhUOBWSDoGoMAcTynV/fGHGbJAEH3R9NCqgd+gEiwDkhVPXd6He8BJ1CTc65askgsS0qK2iQVACjfV5W/RwZ4Jgc+0a677hryYddff/1gDpjoVfwHwMxKqWSN6g3SddJmMgFQvCersu+ofCG8Lx8Xmz1qeyaUv9UX22+//YJvw0bM/lbrK7fZSQAQySqgwaM8lA87XRkbtAvuDSBjbAQGLrzwwhDIkrzvOw6RRBpSagkYbxkCHO+CC/xTSof5ns+qNnPC2Pu9lDKVSZiugElppKWXXjqkeNUVzQRKghLAD7DzqZm7p59+eiAbe27ifK1yL+7Doq/vMQfds+cZrGNHtip9GeV3Wwc8g2U1o2UBH6uM5GmrJJJxFfXdd6268vvWWGON4ETGk4rNtXD5aI0mJ02SA9m1AJrr8p/ESBu+EQ3QRFBPTNlt58OXstLOdoWN/ZrWVwBm8UGvoCWVD1qNOWEsbUZD2wZSFjQgyPTyG2NECwKQAJAWbi4Yb1U9DjvssAByNEkll9AtgKu5UKUBHq4VfjYAqt+0SgChbyKbdjWj7bEWhgGiXv2JlgmwJRuHeUmb9NmgzXcFV5jdCgBIzZThcc011wy1CAx63XH8XquAZ1JaZTh6OUmBnUlrtaRSV50wWOEmIRKngoQCHingeVgAq//bvcxE0QeTlXN4n332CVqfgdeYrnyJ+H9xxTaRgSItYZpWwiYmq/GlvXNXlA/aHzCxuNDEuSg0JhgthwXAFIsaDlP2oosuCpF8Dy9wsiDZdwI48qNpxpvVAEh9f5DmPHhpNtAx7uYE4NTHtOGpAQ88UZ+bV00052V5uH9zUxDEnLVA93tmyNkiowDA6quvHhaTWACgiiXVxH2N4pytAZ5BE+7mmFWVWJkdJolVeBggAWZY4MDOOa1+NLYU8ES7PCyKJAJVkz82D4wJxOkMgPUP01yUzWoOgH2fT1Bkzf8iCMZz5Nf6JABM+MeMlTFjpnqYARjnukyDsn+WNkdrp70DS0DF0W8R5fQ3pg7mIcATTe3XaKH8yuYUsHOebosxS8V5l1pqqTCHOvkT+12vyufmH38kAAZa/JgWhHRep+fzXPGHxgIACNPmtwWg22/S38/F960AnslsoOKGHzQ7ZW1wkaoEJ+IAGCyTmH9NbS6rHdDysKSAx9ylMXhgPDhpcw7mCjPJ6me1NGE5cPkDRc5wqazy9gZgSkzrJEnl1sR7wCZyaRykTF1xxRUB7ICVMQBoPivPFWPG18cEZvZpoqHAivZOoxN8Qv9Av2Bd9GoAgmYI6CygSpr30oIArKyH5ZZbLswxANxP4+p1/UE+MwdZIlwsrBYlosgu7ac+cNN4vtSKRPOysOO0ttHHQe5jVN9pHPCYGiadqg60OhVTqeW0O4M1DM+OmWmiGUyam8E1mGXAYxbx3XCSdwo6+Fxitr5E/6EooofIqsjPx/Htb/3MrRkJ0Ko8nDaXBmyxmGXU+qQ70WrKYOJzGpjaiHx6Gn+VxU1yfxxDgQvO+RQU0jtxXvOUxiTDBy1k0PEWQcUukBXEWqniW0v7UPW9/grQ8Veiw/BPuj+AyLIRnaZ9Ui5UBcc4QIye9tYY4JlEVlsaFyBSA18ZdpEnariom/xY1ITyyt1rUKj1mOpMHJPc4DJvOwGeCSiaR7MEaOWGusDh7Fxx9TdhTCY+PhogUymNApbPkf+evQRoHTQq8wToRE2axm0LQv47vtpyM+40MhkPfh+bB98cM/7mF39cL7CLwSoLo6BWFdPUYsuCYNYKqLQ5V9y/gA4FAuNAYMI8tkDT6ICduS0yzveZW1E0AngmLDUbIPEbEDxNi6YXfTNAhfNVBMyELK/enQbHpEXotArz3fAJulY3wGMaMZGYKB6AcmOyADxObn6N3NqXALOV818lEK4DGnZsHlJWAEATtS03mqEIrcgj865qM+eAGy1RZJ5Z7JxVmnOY5yussEKIGAOcCNhVzjPsd2mUgJ2mF2kznjkEfs+JorlVFIph+zEpv6sd8AxA3M5Nft7KK68c/GyACjCljelBy+M367eqmlh8F1ZyIGWiR/OhG+D10/BcHx+Pk1sEN7f2JUBD50inkUjPSjWxqOGtt956wWwr9864C0TIAbV9YNXm90xdPtvZVA1WjFNFYPur8DlWBc2q/S5/n5zw9DAf+BOR+C0A+mVBye1/EqgV8GIUycpCq+NMBlDRv/C/y/7nnYkhKOA7/eqCWaWYxygmTFSmDCqAQxI2n40HAzsdfw44+gygMVWiyZr2QTSOycuhXd4zIP1eft+MBDj9BbOYhBYxQaa0GXMmrge5kw8vujdE/VGHqjRAABD4b0899dRZaUE0Uf1n1tKy2sxa4Mc0jwXvaHX8mZ4BsiTf3OaXQG2Ax0TlK8ChWn755cMk5UyNwYD5L/u/vxRDRPlgVvSip3BkY5wDUUxxjth4MFuVtpHmw7wRIKEt8L+ZCDQ479NmMliNVWShZbY5SdN+TPN7MjdHROy9li0A2h5z1xjRWDzcaTPnmLqCBsjIgzYmJ9MZIf3II4+cdYFL1oeovqAcalQbtA/XBLR8lMxxCoaAIDla7H2e24ISmDXgEazgBIABRHwZghP8IRy6/QTPLEUpwXXrZVby/YlK8fnhaaWHSQtomc98hUwk/jvOcNFceYPM5tRciv4h2oPUsWgeLyii/J8mJAB0BIZoRvI5kWM7Ne4RXEuLWDo/zCugxT/rQecyGaT5nbnEsuim+Q9ynvJ3WCiCK8pGocM06TdzD7EAAMI9oBXwEXAZNLpc7v+0/D0rwKMlCU5I3YlkYlQRjtLyatxLoCYrLc9qNYzPoZsPD4iZfDRB52daM4OAnWuiLUTeV6/+5c/ql4AxwCWzSFrE/N2peYAtSL4ngIFaYW55Fenn+8O1HJRyYU7IteXqoD32W5A79anT/1gn+iG3lnslUms6fXc2/7NQoGUhzXPvAFigRxaizbn1lsDQgMf/htUOSBAb8ZAQgRGCq2pLTBO+D47XQSduelvdAM93aAF8GiYHjhdKC18gfh1CKw0wm7OpNJt/D2RE2AEE7h3g6dZo5bQ/O93T1EVEcS+ZsjRD/5NxMwhwAQsuFuaxca87uGBeCVww0d1f3T4055NtgoIS2Q/MWfKromB0k/U0/H8owKMlyW5gavCb8athsxuMYQbZZBUlY6aaKFWbiQvIaGwIrGnTH+YG9r2sChoBoPOgmfSdghnp7/P7+iUAxPDHBIu4MvppQ+abh9r3bdFpe0PjyH1h3gxqPsYgCG4ay6Tuxnenf9w6XDr6XVdj+bBQzGM+SwEKi7bFYBirqK5+Tdp5KgEeYOKXs6ICDyFwLHjVR/gUBllluwmItkgDE0hIfW3dvp/+38pNM+Tj0b9yi/2WWSE4Qv3PhOKylNr72yJkvDzA/L/Gr18zJ0TSuT0sbjidxntQa8I1aPuyZ5iDs5mr3frK0uBTVEHFK9Ozjua85quNu1lSihUI4An4DaNg1NGnST3HwIBnwuBMATeRUJod/xcfWa/o6qCCAZjK7TAL2mSrD9q//L3JlgDtzkInSGIeN9UUQBA8Y3IKylRdvMv9oiXyOeIKCk7gHKLgsKYGWSjK55v2vwcCPIMmF1U9LVu4SRNjznL81+UHcQ3+GSlEndLApn2g8v0PLwHaHG2LhoQ+0oR2F3sHiKL1UzVNLZ7Dqz5a+BGrZQIxk/kGBW4AdpP3kPZjrr3vC3gADTUAnw2/jlNWWpf6XHWr08xNoMrnlluWQF0SYPbyOeNjNuG7S/vpWvh93D0I+MzwquDk+ywetRzRTTx3qF6oVTkSm0q7+vuegCfyQ50W9uaXUEBQgjSqQNVBHKRrNEa+CRUocssSqEsCNCWlzZVnn62JOUif+Bf52ZDhZUFUCSpE15FiGMximh2g5rvMkdhBpN/7Ox0BD5iZJHwe1GgpM0iV/Gvy9poAO91UREDlB3mydWuPvcWQP52rEjBXmZm77757AI027pNLBveTksCEHtQnDYwFVlg5lAs+O6lvFIFBgzNt3N8kX2MBwLPC0OCUmOF8RaRE4ZC5IFrUZDNRZE0IhDR9rSbvI597fCQAKFgpMjXaypcGXOgjtDNEfP7vfkoCLVD+K6YCygnXkfdxo+/xkehk92Q+wKNVycOj+hssfgjRIXXj2tC4UBVw8XCY6oj8TvbQ5N7XIQEWibRHNJE2zNnYZzxD/FSmrao9vTQ0fnKFDKS6yZxQ7QQ/MUdiozTre50BPCuMYAGAW2KJJQLYiWoRugHxeTxMnPQAhjTD8lG1mzIuZEUgk3ZLNap6zvz96ZaARZRfWBpbm42VpJo2sxb7oBM/VH/QZaRiisRSMNBO5PnmSGwzozUDeMr0qPSwyCKLFAsttFDwQYgSWakMSDxEu6xGOEbxoAHyv4mAxYMab9BEm+IhhQuopYeoE3CzEpskNDwpZsxbTtr0YOYC3/SwckYgjq8RjAFxepQBmZnRz9RoRuz5rG1IwNjyiUm/ajsQ5toyeWhswKxc5Nbn5jw/uWowgFGWhr1TPB+5NSOBGcDj45g3b16x2GKLzRyCFTh36SFvlspNVY+HwgFq0QlsxEMFCwOJkyTf0WEPUTmRUoSo7w6he7mNVmGmtO+rj8ZxK1JltXNw/qrLr2KKMlTxEOCwM5OaePEQGcNMl9cbD9orZj6NNR6qqUhrSgHYe05mIJweJicSaHoAYyBcPoBwegDiCMLpawrG8T1Q9jCkRzNDP/fPStbGnx8trbTS1p0DWSR92REyiKJf2tha6GV8iMTykwty2FIgR2KbHZ0ZwJOMrcSSjT/iAbBUqRCpjYdy23L5RJHiIbjB54cvFA+ZGFT0ZZdddr7D4JaPJZdcMpjRTOl4AN/FF198viMF4/geKLtmGZRVW46A7JU/xeSSChcPpaHcYwTkCMrAX3QsHnJ0FUlQqDQeih2g6NBG4yELxZ4d8nkRRuMBlDnOacfxAMrS6XAc4yGPmGbMjxoPoMwcAsLpAYD5OdMDGKcasfdMprJm3Ekr7gTKKQh3047HGZjdZ8xSYGW03SyewNZ855NjXpOjRdbcoTh4PmR/yInV39yalcAM4BkID1H6UDFJRbY8dPGQbC+HT/QoHh5cearC5/GgddHGkInjwUSmteFExUPpH5FZZM14IDbT/kwWZXwcEr7xAaWzxUP0WBUUwBVBzKty20AO6MVDhggQTgGYGVEGX38DUSCcHoAYCKcHQI7Am74uuuiiRXr4rQUhBWWUAxM+LhpeLSQ05fReaMpcDYin6UFTBsg05HjQlAEyMI6HyhoAGUM/HnykQFl583jgeQFjQBwPD6GxjePsVSSRhszlEA9ZDEA5BV/vewFwqhVzUaQacQTkVBuO7yMIp69lMPY3IAb4OHEoKYC/7aYPdkBjFZmzrAwmtvJRorDmowpDOSe2vZGZAbz2LjnclUweDwkzM4Iys8BqWQZlfsQyKPMzAuVYFt6r6BkKjPzHeAADJjRHczzU+wPKtLx4qJIMaFTsiAeCKFBONUYmuuoetMv0AMo0Y+ZOPIAyEAa46dFNA07BN9WIU/D1PgXf+J6vNj383gOYgrIquhaMFJS5L9wHII4H7Z+mbAGKBxPNQqUEFA3ZYa9Y8gPGglMOVXbkhtKOmXjx4L4AVsy8eKiYAoyNYzz4kwGJQgTxULUEsNCWpXfF/FnzBfClR1n7jf7hMgD7O4Ju+poCb3yfAjA/NzcPWVrc9YVFYsFDXdFP38+tHQlMDOC1I47ZXQUoezAiIHv1kDGnookaX2lJNCYPazyYtjTkqGF5ZZKp/4aqEw+Obfsw0N48RPHgBwUowDgeou6AmF80HlwWgFjaUjyUzKJd8jnFgxsAKAPieHhQgXJ0PcTXQcF3UABOwTi+p1EDZdpyPAQFVllllflAmabM9QJoALbvRlCO1oFXPmWLFSBOD/vY8iGnhx32gDGKSzyAMncFjmo8BPmMoX1VgDGQppmTE7m5f/3lQrJYmzO5tSeBDHjtyXpsrkSLoSkD43jwL9GUIyB7je4LvsV4RE2ZQz4egkVKhinbFA9gwH1BO44Hv5WKOOhOQMXBpOO+QOEQzXTQkmmItEbacTz4k2nGNqqJB40TGNOg4gEEAcwgmi6NNwJqv9eFF1646Hc4H7dJBGSv+hJ/h3ZCRhbD3NqXQAa89mWer9hHAlFTLoMyTRkoMwPjwWzlvoiA7BUoc1mgWsUDKPMp8yPHg/tCRhEgjof9UGz5aGe89OAHtMOd/XPjQUukGaOTxIOZTzOmZcaDP5kfj6tDtDZHYvtMgAY/zoDXoHDzqbMEsgTGSwIZ8MZrPHJvsgSyBBqUQAa8BoWbT50lkCUwXhLIgDde45F7kyWQJdCgBDLgNSjcfOosgSyB8ZJABrzxGo/cmyyBLIEGJZABr0Hh5lNnCWQJjJcEMuCN13jk3mQJZAk0KIEMeA0KN586SyBLYLwkkAFvvMYj9yZLIEugQQn8Py5qUIKb7aFJAAAAAElFTkSuQmCC[/img]

Tyler claims that if two triangles each have a side length of 11 units and a side length of 8 units, and also an angle measuring [math]100^\circ[/math], they must be identical to each other. Do you agree? Explain your reasoning.

A passenger on a ship dropped his camera into the ocean. If it is descending at a rate of -4.2 meters per second, how long until it hits the bottom of the ocean, which is at -1,875 meters? 

How much do [math]3\frac{1}{4}[/math] pounds of apples cost?[br]

How much do [math]x[/math] pounds of apples cost?

Clare spent $5.17 on apples. How many pounds of apples did Clare buy?

Diego has a glue stick with a diameter of 0.7 inches. He sets it down 3.5 inches away from the edge of the table, but it rolls onto the floor. How many rotations did the glue stick make before it fell off of the table?