A partir de un deslizador n, construye la secuencia de números triangulares.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfAAAAC6CAYAAABRGB9YAAAgAElEQVR4nO2dd3hU1fb3TxISQhq9RUJA6XCR3pEiEJReQktCF4GEtMlUVETFa69XsZfrVbGiiIqiInYFARH0ikoVkCLl0iFkvX98f+vdE5yEKeecmSHr8zznuV6SzKyzzz577b2qRoIgCIIghB1asAUQBEEQBMF3RIELgiAIQhgiClwQBEEQwhBR4IIgCIIQhogCFwRBEIQwRBS4IAiCIIQhosAFQRAEIQwRBS4IgiAIYYgocEEQBEEIQ0SBC4IgCEIYIgpcEARBEMIQUeCCIAiCEIaIAhcEQRCEMEQUuCAIgiCEIaLABUEQBCEMEQUuCIIgCGGIKHBBEARBCENEgQuCIAhCGCIKXBAEQRDCEFHggiAIghCGiAIXBEEQhDBEFLggCIIghCGiwAVBEEzi1CmikyeDLYVwqSAKXBAEwSDWriV64AGi3FyiMWOIBg0iGjiQaMQIoilTiBYuJHrrLaIjR4ItqRCOiAIXBEHQkaNHiZ59lqh/f6KaNYk0rfwrJoaoeXOivDyiDRuIzp8P9h0I4YIocEEQBB04f57o9deJOndWyjkhgahJE6I+fYhGjSKaNIkoI4No3Diia64h6tCBqE4d9ftxcUTZ2UTbtgX7boRwQBS4IAhCgOzfT5STQ1SpEhRxSgrR4MFEs2cTORy47HYimw2X3Y7L6SQqLCSaOJHoyiuJoqPx923aEK1YEey7EkIdUeCCIAgBsH070ZAhULxVqhANGABzuMsFZW2xlH8VFUGR2+04nV9+OT6renWiF14I9t0JoYwocEEQBD/Zs4coLQ0Kt149osmT1Wn7Yor7wstqhSLPyyPq0QOfmZgoSlwoG1HggiAIfnDyJNH48VC0DRoQzZkDBVxU5Lvydr/YzN63r9oYrF4d7LsVQhFR4IIgCH5w551QsLVqEV13HZR3IIr7wtO4zUbUtSu+o3NnogMHgn3HQqghClwQBMFH1qwhqlsXynXkSPi79VLefNntMKenpuJ77rwz2HcthBqiwAVBEHzg7Fmi/Hwo1SuvxEk5ULN5WZfLBTN9VBRRcjLR778H++6FUEIUuCAIgg9s3ozc7ehoomnT/AtY8/YqKoI5vVUrbBhcrmDfvRBKiAIXBEHwgcWLoUxbt1ZK1igFbrHAt56eju/s0oXo2LFgj4AQKogCFwRB8JKTJ4mGDYMyHT4cKWNGKm8OaMvLI0pKQmW3jz4K9igIoYIocEEQBC/Zv5/osstQv3zqVHMUeFER/Oxt2mDj8NBDwR4FIVQQBS4IguAlP/+MgLJ69YjmzvWu0poel82G5iiahv8vCESiwAVBELzmo4+gRJs0ISoogHnbLAU+YgS+Oysr2KMghAqiwAVBELzknXegRFu0QBMSMxX42LH47okTpeWoAESBC4IgeMnKlVCizZqZr8BHj8Z3T51KVFIS7JEQQgFR4IIgCF6ybp1qFzpvnrk+8MGD8d3z5gV7FIRQQRS4IAiCl+zZQ1S7NrqEzZxpbhR6ly5Q4LffHuxREEIFUeCCIAhecuwYUZ8+UKRjx+rbwKQ8BW6xIPK9UiWiJUuCPQpCqCAKXBAEwUvOnydasAAKvHt3Y+ug82W3w+8dGUnUtCnRzp3BHgUhVBAFLgiC4AOffYY66NWqoQe40X5wp5OoZ09JIRP+jihwQRAEHzhyRAWU9etnrB/c6SSaNYuoalWcwFesCPbdC6GEKHBBEAQf+c9/4I9OSCCaMcMYJW61lg5eGzCA6Ny5YN+5EEqIAhcEQfCRkyeJxoyBYm3ZUvmq9T59jxpFFBGBqPfVq4N910KoIQpcEATBDzZvRlAZt/m0WvVT4k4nUWYmOpBpGtGiRcG+WyEUEQUuCILgJytXEtWtCyXbuTOqs9nt/kemW61Q3hMmIEhO0+ADP3Ei2HcqhCKiwAVBEALg7bfRYlTTcCKfPh0+cbvdu1KrXKjF4UCDlAED0K5U04imTSM6ejTYdyiEKqLABUEQAuSTT4jatYPSjY0luuoqnJyLiohcLihnmw0KnYPT7Hb1s7w8FIa5/HJ8RlQUTvMnTwb7zoRQRhS4IAiCDmzbRjR7NgLONA0R6h07Eg0dSjR5MnLG8/KI8vOJcnJQinX8eKSiNWqEv+GguOefD/bdCOGAKHBBEAQd+eQT+LArV1ZKuXJlolq1YGpv0AB+cw5Q46tNGwSr/fprsO9ACBdEgQuCIOjMqVNE69cT3X8/0cCB6F6WkABFHhNDFBdHVKMGUdu2OJm/8w7Rrl3BlloIN0SBC4IgGMjZs2iCsmUL0TffEH39NVLQdu8WH7cQGKLABUEQBCEMEQUuCIIgCGGIKHBBEARBCENEgQuCIAhCGCIKXBAEwQQOHiT67Tekie3dS3TmTLAlUuzdiyC7rVuJDhwgKi4OtkSCN4gCFwRB0JmSEqI//kDb0SlTiLp2RZW15GSi+vWJUlOJWrUiGjaM6LbbiL7/HpHqZnD6NNEvvxA9+CCqv7VrB3nq10eeeuPG+LcJE4geeQSK/fRpc2QTfEMUuCB4wcaNRK++SnTffSiPmZ2NutULFhA98QSaWhw8GGwphVBg7VpUW6tXr3ShlsqVUaUtKQl54JGR6mdRUUT9+6MC2/79xsh19izm6YQJyEl3l61KFciWmIhSsO4/S0jA37z7rijyUEMUuCCUwYkTRM88QzRyJKpnuS9qF16xsUSdOhHl5iLPV6h47N9PNH8+CrSwUm7WjKhPH6L0dDQ5mTOHaO5c1EnPzCQaMoSoQwdUaeO51Ls30YoV+sq2eTNRVhZk0jSi+Hiif/wDRWYmTkRZ17lzcc2ciX8bOBDV4eLjlWwTJhBt2KCvbIL/iAIXhAs4examz06dSp+eLr8ci+uQIVDqI0ZgkevYkahOHfW7iYlY6H74Idh3IpjFunWoaa5pOFl37gyFWVgIpe50onmJzaYuhwM/czig2AcPVq1Jk5KI7r1XH9mWLiVq0kTNzb59iWbMQFMVls1dLrtdyWa1QqH37q1O7Y0a4TOF4CMKXBDc2LWLaOpUpYwbNiS69lqYzN0XOL743ywW+Dq7dVMnlssug3lduLT5/HOiFi3wzJOTsXmz2aAYvW0nykozOxv+cp5/TmdgwW7PPKNqrrdsqVqdOhze9SwvKlKtUWfMUPdZtSrRs8/qNoSCn4gCF4T/Y9Mmoh49sEBVq4aTtsWClo9WKxYzT4se/zu3h5w5U7WWjIoiuuUWovPng313ghGsXQszOTcjmTfPe+VYVl9wux3WHfZF33gj0blzvsv24otQtBERaG9qseCz/ZXNbsd/9+6t3pFXXtF/TAXvEQUuCET03/8SdemChalJE6LrrlOmRV8XO4cDCn/YMKJKlfCZCxYgMlm4dNi9W7lZ2rYtreQCuYqKMPfGjFHNT3xtL/rll8qvPmCAmpOByma14rP69sVn161LtGaNMeMrXBxR4EKF5+BBBBppGlHr1ogg9vcUxZfNhtP4+PE4SUVGEj32WLDvVNCL4mL0/tY0pF3l5emjvC9U4oMH4ztSUrxvM3rkCFHPnvi7Tp0wF/VQ3u5z22ZD7IemwfcvTVmCgyhwocKTn6/83bm5+i3ERUVQ4qNGwZResybyfYXw5733kApWuTKC1ZxO/RSku6IsKkK0uKbBP+4N//yn8sdnZ+u7seDLbsdnc9CdxHoEB1HgQoXmgw+QAxsXhyA0vRdiNqt264aFbvx4RLkL4cvx4whU0zT4lh0O/RUkX04n0bRpmJ/x8RdPUdy1CwViIiJggne5jJPN5YKvnl0Iu3ebM/6CQhS4UGE5eRKLHJsBjThFuZ9WatfGSVzvHF/BXL75Bpu+hASY0f2Jk/DlcjiQlqZpyB8vj0cfVdaksoIu9bqsVqTJNWiADcOTT5oz/oJCFLhQYfnsM5xskpIQPaynn9D9Yn9mWhoW1yFDgn3ngr+UlBAtWoTn2Lmzyk4wWoFnZUFJtm5NtG+fZ9nOnCEaPVrNMSNM555ku/ZafGdmpliXzEYUuFAhKSlBZLimEfXq5X96jbeX3Y7TWlIS0m+8DUgSQotjx2A21zRYb4yy2ly4ASwsRFR5TAzRm296lu3HH1HPPDqa6PrrjbcM8Ly+7jpkWzRsiGwOwTxEgQsVkkOHiLp3x0KckWGsH5MXYYcD/klNI3rooWCPgOAPe/ciGDEuDoVNjJ43PHfco77vvtuzbB9+iJ+npiIw0yiLkvtltSICPyUF3/3pp6Y+jgqPKHChQrJ1K3yY1aqh/rMZpxWnE6VXNQ3FXoTwY/16PL8GDYhycsyZNxYLvmfQIHx3To5n2Z55RqWOseI3Q4EXFhK1b4/v/ve/zX0eFR1R4EKF5KuvsOA0bWreacVuJxo3Dt87cKAUdglHVqxQ86aw0Jx5wwp81ChlMfI0d+64Q0XGm+Gb502C1aryzu+/3/xnUpERBS5USN58EwtOu3ZqETJjEeY66127mtf/WdCPd97B82vRwnwFPnYsvnvSJM+leTm4rl8/lUNuhgK32VRcgF4NWATvEAUuVEiWLMGC07GjeacVmw2mc01D2dYjR4I9CoKvrFqlTuAFBeYq8JEj8d3Tp3s+gd9/f/BP4FJt0FxEgQsVkuXLg3sC79UrsC5TQnDYtAnpXFzlzEwf+IABmDsFBZ5le+EF/LxDB6VcjZaLfeBXXonvluYm5iIKXKiQfPutalxipg88PR3fe801wR4BwR8OHEC6VGwsNmNmRqGzkrzvPs+yrV6NNLP69REZbmYUenIy6v1//rm5z6OiIwpcqJDs3ElUp46qpmVG0QuXi+jqq72rqCWEJidOoEiKpqGMqBl54FYrTt3Vq6MC3PLlnmXbsoXoiitgIZg507w88BkzUGHwiiuIfvvN3OdR0REFLlRIjh5VynTiRHPywO12oubNxVcYzpSUED34YGn3ixmV2CZOVN956JBn2YqLUQ1N05ByZoZ1wOFQ6W0zZkjfe7MRBS5UWLhrU9euxldiczhw6k5MRCGQ7duDffeCv6xbR1S1Kszo06cbe9LljV+7dpireXnly/bMMzgN16tnvGvIasV31K2LSmySA24+osCFCsvXX2Mhjo83tikFV2HjE/+YMcG+cyEQTp0imjxZFU0xcvPncqEOeuXKqP62fn35sh04oNqPXnut8d3IrrkG33XllUQHD5oz/oJCFLhQYTlzRgWVde9ubDey2bOJatTAd0k3svDnww9hTYmKQotYIxSlzYYI7xYtMG+mTPFOtnvvxe/Xro2a6EaY0h0OfHatWlLAJZiIAhcqNB99hJNNbCz8h3ovxFYrFDjXsR46FP2khfDHYsEzvewylOPVU1Gy1aZfP3xHo0ZEv/zinVzHj6uUszZtVBS7nhuLoiJ0RmN/uxQlCg6iwIUKj8OBhah+fX0X4qIibAg4arlOHaK1a4N9t4JeHDig3CJXXIGWtHrMHatVtemMjISLx9f86vXrofQ5xsNq1UeJ22z4rC5d1MZiwwZjxle4OKLAhQrP0aNEw4ZhQbr8chTocDoD82vabPiMkSNhZo2ORoCRcGnxyy/wg2saUePGymTtj7LkU7fVilr5ERGYO/fe61/d/Pfew6aUffV5eerz/d1U5OUpa1JyMtH77+s/poL3iAIXBEJUeP/+WJhSUlCkw+XyLz+clT+n10RGEt1zT7DvUDCKjRuJevTAs65RA/nhhYWYP94oclbcDgfyt7lgS3Q05k0gTW+WLYOJnzcYGRlQxi6Xd4qcf9dmw982bqysVW+/rd8YCv4hClwQ/o9t29RJPC4OCn3ePLWAcX1pTxefUBwORCi3bInPqVKF6IEHgn1ngtFs26ZytTWNqFkzZBvk5mL+OJ3YDNps6nI41NyaPp2od2+ipCTlV3/uOX1k+/JLBGlqGk707dtDGRcWEs2f/3fZ7Hb82/z5+J2MDJRnjY5WueirVukjmxAYosAFwY3Dh7GIVa6MxapWLSjymTOxmHFAEC94rNTz8rCAt2uHnFhNQ9EWqQ1dcTh1iujJJxE4xoq8fn0ozCFDoAhnzMBcmjIF3cX69oWyj4tTfzNqFNGaNfrKtns30YIFiMNgq1BqKlG3bnDzZGVBrpkz8d+jRsGq0KgRlL6m4Z3IzcVmRQgNRIELggdWr0bEOJ86eDHu3BmBS9dcQ5SWhs5Pbdogn5x/r149pI1t3RrsuxCCwR9/oEhQ69al5w8rzsjI0v/Gpvdx45BiaGSWwubNsCqlpPxdhrJkS0nB33z3nfSwDzVEgQtCOSxdisAk91OVp6tqVQQe3XILOlYJwokTSFO0WuEX79oVRVbatEFQWd++OIk/9hhOtWaWIf3rL6JXXyWaMweb0U6dIFfbtogwT0vDz155RQq0hDKiwEOM/fuJvviC6PXX4Tu9+WaiW29F/eWXX0a3nz//DLaUFY/t24lWrkTLxjvuILrxRqJFi4j+9S+i115DVbcTJ4ItpRDKnDmD93v//tCbK8ePE+3bB2V9+nSwpRG8RRR4iPDVVwhq6d69tD/swqtKFeyQ8/OxuxcEQRAqJqLAg8yPP8KMVr26UtLVqsHUdtVVMGWlpcHc1q4dyiPy7yUkIDjms8+CfReCIAiC2YgCDxLnzsH31aCBSlvq3BkRoPn5KjWJUzs42jk/Hwq/Rw8ocPa/LlwYemY5QRAEwThEgQeBEydQJIFP0h06oNUk52NeLN+Yq3zNno00EI4cnTpVAk4EQRAqCqLATeb0aZTqZBP4yJGqqIOvFb+4cMi4carT1aRJREeOBPsuL23OnUPQz5kzwZakNGfPQq6zZ4MtieDOoUNEO3ci0PHdd4mWL0ea4ubNCBw7dSo4cp07h3ruW7dCnmXLUBr1yy+JtmzBYaC4ODiynTyJYN2ff0asz7JlRB98QPTttwgoPXw4OHKFGqLATeamm5TZe/Jk70salleG0elEJSdu7ZeTY25KyqXO0aNEb71FdMMN6FiWlkbUpw86Po0YgXSbhx5CSU0z2bcPmQl2O1paDhwIuQYORCGOvDyixx8n+u03c+USkKa1YgXez44dlbvrwrzrxo3R0vapp8ybP9u2IYVs+nS0Ko2J+btslSsjj33WLGRZmFW8ZeNGoieeIBo9mqhhQ8956UlJCOR1ODDGf/1ljmyhiChwE1m6FG0rq1RB1S6XK7CGGe6Xy0U0bRo2BpGRRM8+G+y7DX9++QXWkebNVTWq8q4aNVC17YUXjHNlnD9PtG4dctNTUy8uE3dBGz4ctauPHjVGLgGcPImmNVxX3z0wNTUVc6lFC6ImTVAYyL3QS0oKNt96V2Fjdu8muvNOVWudr1q10MSnRQtcjRuXDpbVNPzNwoVEO3YYI9v69VjHOCZI01DRsH59jFXLlhi71FSMpbts/fsTLV5cMdv0igI3iR07UCRB03By07vvNCvx4cNVGU+jXrZLnf37cdpmi4amYWHp0gXjm5GBeIMpU+C+GDQIpxX3TIKOHbFh05OtWxH3EB+vFrjUVAQ0jhoF68DUqbDsjB2Lha1589KnvwEDiD79VF+5BLBmDar3uW+c+vQhmjABJ9ncXJTjtVgQjDp3Lp7X0KFErVqVrvh3zz365mMvXYqSrvwdjRrBkpSZiTmVl6fWkbw8/FtmJuY2tyXVNGTH6Fke+OxZWK+44YqmYSyGDcP7NXcuxspiwdjNm4exnDABY8ulYTWNaPBgpONWJESBm0BJCQqxaBr6BhcWBmY2L8+cbrOpRhoLF4op3Ve+/pqoZ0+MX3Q0MgMyMlRvb4fDc+MHpxOxDcOGwfTHf2+xEB07Frhc772HTQLHTvTsiQXOZitfLocDi/GgQUR16yr3zT33yNzQkyVL1OmxZk0o5XnzVMCpe+18vjj2heNfsrJKV/ybOjVw8/CZMygExbX9GzWCuyU/X80RDpx1v9x/VlCAxixs8YmOJrrttsBjQA4exD3y/bZti//P8T1Op+cxY9lsNozx4MEqBuiyy/AsKgqiwE3g4EHsXDUNO0d/AtZ8CWybPBmns4YNiX7/Pdh3Hz68/75Svo0b4wTCi4U3rg5Wpnl5qJfOi2ZWVmCBhc8/T5SYiM9q3RoNMVg5eyOX3Q65srNV20tNw9+eO6ff+FVUnn5adRFr1w4bJlYw3rrIWGlardgEcm394cOJ9u71T65Tp/B5mgYXUJ8+UNzcE9wb2dw77eXnozYFu5NsNv8D8PbsUdaKqlVxn+5j4MuBhTNy2MJZtWrFcSGKAjeB99/HxEpNxUvgTY/gQE7hRUXKJPfyy8G++/Bg1SrV4KFzZ7XQ+ROjwItKVpY6GWRm+ncSf+klpRz69VO9o/2Ry27HNXasqvZntUrUeiC8+qraXPXrp06Igby/LhdOovXqqU2/rxvAkhKUYeagr9GjMScDsfxZrfiMkSPV/LntNt/H7NAhzEF2TU2bFng8EFs4rrpK3fObb/ouW7ghCtwE5s5VwRbenuYCuRwOtbvNyJBT1sXYsgWBMppG1KuXWgwC3Ui5XETXXacCgpxO3+T68kv1t9dcE/gC7C5XRgZM8ZGRCAASfGfdOuW77ddPnbr1eIc5s6RmTXz+TTf5JttLL+GkXKkSotz1Cpjl+TN6tPr811/3TTa7HfdUu7aqf6HHmLFLok8f5S748UffZAs3RIEbTEkJTnSRkfA9GRG85kmBT5kCX1WTJvr4YC9Vzp1Tp4F//EP52fR6Fi4XXBpxcXgeK1Z4J9ehQ6iLr2kwe7PZU0+5xowhiohAsJ7ZKXDhztGj2FSx2ZxjD/R8j51OnL6joxG4+OWX3sn2229wAWkaUgr1PjRw6uqAASpg1tsGS++9h0ycmBhk4uilvN2VuM2mzOljxlzazVlEgRvMoUOIKk1IwGksEPOaL5N47lzscOPjpS91ebzwApRYjRrwo+kdn8Am74EDsaD07etdusuiRcrtkpen/7xhf2O3bvieyZMNH+pLiueew6a8enXMGyPea/Y99+qFZzRsmHfWtJwcpViNCpi1WvHZbLm68caLy3XmDFHv3vj9q67CmBlhjbTb8UyqVUPKrt7ZIKGEKHCD2bwZPrK6dVVUqtEK3GqFD7dRIywy3u7cKxqHDsH0yYuj3qcBvmw2PA8OkHv++fLl2rmTqGlTmCiNOKXw5XCgCE21ajgRffyxOeMe7hw8qObNkCHGB6XOmQNTemTkxZXRxo1Eyck4tU+ebNzcsVjw2ZMmQa6UFKJNm8qX7bXX8Lu8Fhp5mHE6kXnBqZOHDun3/EMJUeAGs24dTsHJyVjEjdgNX3i5744jIyXvtyzefRdKsm5dpMoYGZvAwT9sEi+vROW//oXfa9LEuFMKXy4XrAKahs2CcHFWrlSuBzM25S6X8uump5cvG1tuWrb0LQren4ujwJs3x3fefXfZcpWUoGohxwsY7Uq02WCJqFULz+pSXQNFgRvMzz8jIrJePRRyMOsEXlAAP1hUFNF33wV7FEKP4mJsqHiH7m9kty8Lyrx5WFDi4oi+/96zXKdPK0U/erSxpzuLBRuEmTNxYmvUCKd/oWyKizFubAY243222fCMKlXCMyqrNO7Ro0hf1DTEdZjhrrPb4WfWNATOluUe2rwZa2B0NFyJRo8bby7Y/XDDDZdm3QNR4Aazbx8W7apVUf7SLB94Tg5emNhYRFkLpdm/H0FrEREI+DNaUVosOIVzGcvbb/cs16ZNqC4VG4u8baMtNrzQpabCWvPii2Y+hfDjyBFV0WzCBGNN1O7PqKgIEe+RkYjb8MSaNXCHxMUhBsaszcWcOfA116xJ9MMPnmV76im8aw0bGm8ZcH/f0tPxrLp0uTRLrYoCN5jiYrQLrVQJqTtmvPAOB4p9VKmCPEvp3PN3tmxBoZXataEozVjsnE4VuZyV5Vmujz82vmKfp/nCJ5WFC819DuHGrl0ISK1a1bygVN5kccDhrbd6lu3dd/Hzpk1hgTPLXZefj/mqaUQffuhZthtvxM979jRns2yxKOtSUhKCDf0tiBPKiAI3gWnTMHkHDTInjczphPmV84dDre1lKLBqFcanRQvzFju7HX5m9gN68oM/+yx+3rWr99Wy9JBr2DB87/TpZj+J8OKbb1R2gFlBqRYLvoc3f9dd51m2xYvV3OFTu9Fy8XvTqRO++8knPcvGJVOHDjVn08NjlpOjLBeXoitRFLgJLFmiAkvcJ70RF5c+5BfqkUeCffehyWuvYXzatzdPUdpsUJC8yHrqDHbPPaWrepmlwMePV0FSl6KvUC/4lGtkilZZc4c35ZMmISjsQm6/XaUqmjV32DrA6WH33vt3uYqLlZ88Pd28TQ/HAl1+Ob575Urj54fZiAI3gZ07VWrHlCnG7kDtdvjaExJgOirLJ1XRefVV+v9dw8xU4DNnlq/A774bP7/6anMVOFsGxo0TBV4erMBbtDBfgXPBoYwMz8+IFbiZmz9W4FzC9L77/i7XuXNKgY8fb74CZ/P+Rx8ZPz/MRhS4CRQX42XXNAQxGflyOZ2qgldW1qVdhSgQVqxQHZD4ZTdjEZ48WUUweyrK8dhjpSOczVLgvMBOnWr+swgnPv9cxSiYlRbKc4dbBZdlQn/4YVUO2KxNKZvqec0py4SemYmfjxplrgLPy4O7IyJCTOhCAKxZg+jiyEgslkYEszmdeFFiYnACvxRNRnqxbh1e6kaN8JKb5QNnM+jw4Z7lWrpUbfR4gTRDLi56UVho7nMIN7ZsgSWtTh1EX5vpA+fiMXa7Z9nYqtS2LZ6jWT7wggLV6rasQjMFBcqyZKYPfPZsZAFVqXJpdmYUBW4i//wnJnHduvqX7XQ4kGfO1b7y8oJ9t6HN7t0Yq8qV0VDBjMhYl0uZGnNzPcu1di02XzVr4hmaoSAcDlU7+oEHzH0O4cahQzCfV6oEC5dZaWQ2G763vLiWr75C0agaNcyrOeFe3yAmBkF+nnjkEeV6MLrmAl/cEbBSJVhMAmnpG6qIAjeRY8eUH6thQ6Qv6bEA2O0w54AW5eUAACAASURBVHFFpD59kOcslM2JE6oy1NixxitwDi68/HKc/F96ybNce/fCL8/mbKMXYU4Dql4dJX8/+8zc5xBunD6NIDJNI7r2WnM2flYrlGR8PPK8y3pGO3eqOgNTppijwO125Rbq0AEbY098+inmV0ICNhdmpUcOHqzciZdi21xR4CazZw/aimoa6gfPmIGJ5s/L5t7MvmlTfGanTkT//W+w7zI8ePRRZXI02t/sdCKdMDYWufkHDpQtF8dL9Opl/AnP5VLFLrp1k5gJb/j3v1W+tRmBbC6Xqs7XuzfRqVNly5adreaOGZsLhwO53Rdzv5w8icBN9oMbnU7L5aR5XVyyRP95EAqIAg8C27dj965p2JUOHQofkcvlnSK3WtULMGqU6hndubNEnfvCjz+iU1x0NE67RvnmuPMXB/pcf335cn34IappVa0KP6uRclmtyjRbVnU4oTRbtsCCFhWF07iRPl3eHLAiuu228mV76y1sEpOSUI3N6IyXuXOxhsXFES1fXr5sN9+Me2jWrPS9GSXbpEl4Ro0aXZr+byJR4EFj/361W+bm88OHo/CA04mdrd2u+tva7fg3pxO+0dGj8SLw348YISVTfaWkBP5vPoUb1TjE4cDpm3uCXywatrhYtR/lU7gRcjmdSBvTNARl7dplzriHO+fPY/xYGbF7xAhF5HLhXY+IwDPasaN82U6dUnEWvXsb342MK/j163dx6822bThsGBnIyxuDoiK1Ptpsl25qpCjwIHL+PHbMbILSNPi4WrbEAp6ejqjyrCz8d1oaFE3Nmur3GzYkeughov/9L9h3E55s3Iia8ZGRMFPqbdpjiwqfoGbN8q4y3gcfIHK2ShXk/eotl90Ov2pysncnO6E0P/wAVwj7wo0wCdvt2OTzM1qwwDvZXnsNgVvx8cYF2nHGS1wcvuv1172T7YYbcC/JyTisGGHmd7mU77thQ1jaLlVEgYcAR48SPfEEds41aijlXNaVlAR/0r33Ev3xR7ClD3/YF56QoG8PZZuttI+wdWu4T7zF6TQma4EtDRzw1L+/56IyQvlw29ekJKUo9bKU8CmyXTt8R48e6EPuDSUlqmDQZZdhE6B3xkt2Nj6bN6XennD/+kvVdG/XTl/rRVERlHdWFsz6FaESpSjwEGPtWlQzmjcP0dGDB2OHn54O3+kdd6CYRHn9pAXfKC7GeGsa0mEmT8ZCEMhizC4Q7uNcu7bveflHj6qshUaN8Pz1kKuwUEW6N28ucRP+cuYMNlaaho331KmBPx/3DRYHfTVqVHZ6Vlns3avmXtOm6rQbiGxFRfiMnBz0queMF1+bhHz9NYqraBriQoqKAvfVW63YQE2ZgowKjjW51PtAiAIPcU6fvjTTH0KNo0dVnfKkJJjTOe7Al0WPTwHZ2UpJ1qxZdoGLi7Frlwp4rFtXtbD01V/PgY/XXaeC1ho1IvriC33HsaJx+LAqQ1utGjbaPG/8UUI8d/jkXbcu0Tvv+Cfbpk1oo8nPeto0zJ1AMl6mTcNnaRo++6ef/JNt2TL49LkfQXY27t2f0zhvlseOReAn14uvCF0YRYELwv9x7JhK4eLANs7FtttVUCGbN9n85x5kWFiIYETODEhN9X8BZvbtU7nHERFYOGfNUt9pt6uI8gvlcjhw5eWh2lpSkjJffvutLsNW4Tl4UHUcjIzEqZKtJbzR8rTZcn9WfHIfPVqZphs0IHrvvcBk27RJNRpJSsIcyM0lmj9fpU6WJ5vNht/NzUUMDs+f7t0D9y2//77aDCQn4955A+w+l8uSzW7H786eDXmiolTOt7fuhnBHFLgguHH+PNHTT6sORpGR8BWPHQulmZurTktcRjInBwt4WpoKbNI0tH9cs0YfuU6fhvuETy2xsUgbnDABC1henlIGRUWQKzsbJsX+/dWGQtMQFPfbb/rIJYATJ1BpkRVctWqI0J42TSnCsq5582DxYbM018L31WxeFrt3K5+4piF1ctAgbDLKk8tqxdxKS1OBdHy69SWWozw2bFBlfDUNYzBihGrVWtZVVASLWe/eGGtNQ9DeDTdUrIBeUeCC4IEdO7DDd1fIsbFEjRvjZN6xIypPtWyJBdE9yLBHD2QGnDypv1w//oiNhHuwY0ICFr527SBX+/bwbbsr7chI1KF+/nnPrSgFffjuO6TmxcQoi0nduthsDR6Mug2jR6P/et++cGfEx5dWrjffrP8J8uxZorffVmlfmgYZU1MRZDlkCOQaPRoum549Mdf5PjSNqFUromeeKb+QjD8cPoxgM/e02Lg4+O779sVYjR6NsUtLgwUqORljq2lIzezXr2L2fhAFLgjl8MMPWFxGjsRC7CkrIDoai1teHtGbbyLS1mi+/hq9wwcNUkE7F16xsVDoTidMsUZsKIS/U1KCtqOZmSreoLyrZk0Eg91+O8qhGsnJk0RPPQU3T0rKxWVLSYECfeop42uJ791LtGgRlLY32TgtWsCatHx5xY0TEgUeYuzbR7R6NdErr2CBvvFG7MjvvZfohRdQU3jPHpHLbE6cgNlw/Xr4tJcsQQ7/p58Sbd5M9OefwZHrf/9DgYw1ayDPkiUIEPrsM5TULa9kq2A827cTvfwy3B85OfDPZmWptMBHHsGzCkZWyQ8/4ER9yy0wp2dmwuWSnU10001wJQUjQ+H8eWTaPPoo/O8zZkBRT5sGF9aiRegloJcZP5wRBR4ifP45/DpduuDkVNaus3JlnKpyclDso6LKJQjhSElJ6LowQrlaWSjLFkxEgQeZDRuw8+X0B84pvfJKmJIGD0YwVL9+8LlyEBP7iQYPJlq1yhi5MjJCTy5BEAQBiAIPEufOwXzG0Z3x8TjlTp6M9o7uqUDukZcFBTAl9eqlqg0lJsLkdfy4fnJxYJYecp04EbhcgiAIQmlCRoEfPw5f3u+/w594Kbc1PHYMypBPrB07wgfFBTrccyAvvFh5ulzoVOWe/zh5cmA+T6PkmjJFfLGCIAh6EzQFfuAA2iYWFCCXr3FjRPnWro1CBs2aIZ1h0SKUF9XjdBkKnDoFBcfpP6NGqYIb/lQgcjiIxo9XDU4mTPCvAlGoyhVqnD+PYL3ff0eVtFCpIX72LOri//478n6PHQu2RODkSaTk/f47oowlEl4Q9MN0Bf7nn0QPP4xcVfcgqMREKPB69VCPOi5O/SwiAvl/L7wQ/gsAd+OpVg0nU3/LB7pXJXI6EanJeb9z5/oe1RqqcgWbkyeRe33nnSgw0bYtOhzVr48UmyZNkDM7ezbKpZoVjX7sGCqpLViAWIRWrSAPy8U5tPn52CibVZnq8GHEPthsRAMGIB+9QQO4iho2xMY8LQ3z6/PPL41NXXkcPozntGwZmp/ceiuivu+/H+vZqlXB61W9ezeeweuvo//CwoU4MD38MLJNvvzS9zrnevHrr0Qff0z0n/8Q3XUXMl7uuAOR6W+9hayLYBRsKS5GB8MVKxClf/vtGLe77yZ68klUl9u40bx1zlQF/vbbpRV3ixYIdsrKwukvPx8n8txcFKuYOBFVpNzzFa+9NnxLQL7xBqK14+JQzUiPxgd8uVzwQVerhg3PU0+Fv1zB5NQppIuNGIGxcS+IEh+P4L6kpNI/0zQoKaeTaN06Y+Q6dAgpNP36QRb+3kqVYDmpWhWbYfcCHJqGgjP//CdSy4zgjz+IHntM1X93z5FPTFRyRUeX/nnnzlBsl1ov8g0boKwHDFCVwjxdUVFEbdqgRv2SJfoXSfHEypXeZZbEx6tmI2YUSTlzBmMwcybmKxdqKSt3Pi0NY7xhg/Gy7dtHtHgxivRcLH8+JQU18R9+2Pi8flMU+Llz6DdcqRJusE0b1Ji2WLDYcYF9Lk9ptcLn6nTCFFtQgAbwXBWrfn3v+8+GCtu3E/3jH5B/4EBj+ge7XFA4moaTjjd5kqEqVzBZvx7zzT36vlMnVKviHN6cHOTLzpwJ90D//jhtslKtUwe7cz2LX6xaBcXNctWrh45VI0bgfZozB3LNnYsyk+npKBDCZWE1jeiKK9C6Vs/CF2+9VVpxp6TAKjFqFDZvc+dCrjlz8P9Hj8bP3RfC9u3D7532xK+/lu7hrWlQks2aoY1mv36oiNe7Nyrn1atXWpl364ZqeUac4D77DCWBudyrpmFj1bo1nkf//rh69MAa7b7xSErC/P/4Y/3lOn8em9I+fUpvSuvWxRhddRXGrF8/jE+zZqUttMnJsPT9/LP+sh07htM1r5FsEW7YEGtC376QrW9fbEYbN1Z6jte7G280zgJmuAI/exbKmXd0w4Yp36o3JloOkHI6cULnUoBJSTBBhQMlJTCZaRpMroWF+vXAvXCsbDaYUzUN5tXy8idDVa5g8uKLqplErVqw+MyZg/k6fz7+lzeb3MTE6cTPLBa4Hzp0UC/w8OEIzgyEkhKiBx5QKX0pKagMl5OD7+amGZ7kcrmwAZ40SY2/puHEd+hQYHKdPo375tN+06Y4oeTm4nvLksvlgmx5eVAovMGIjoYrJxxbQJ4/T/Tvf6t65lFRUIzp6VDoBQWla6Lze5aXh81Wv34qXkTTsFHcsUMf2Y4dg5mX5w9nlmRm4lnxe++eVVJYiHrkmZn43SpVVHzM/Pn6xVjs3Anly6ftWrWgDKdPx9hYLJ5ly87G2LZurZR+o0aw8Om1tnz7bek67Q0bYj24/nroIouldDaOxYLnfP31REOHQpnz33bvTvTRR/rI5Y7hCvyWW9SJJNB+udzSbtgw+v/5xsuWGX0HgXPgACaapsEt4E9gmLeXwwElEh2Nhb48/1qoyhUsHn1ULVQdO+Lk6EvrTqtVKfj0dOX779XL/+YhZ88iFY8Xgt69seiy1cobuXjDXFSEdychAZ81cqT/2QHHjmEToGlQ4IMGYWHl+/f2fWYL24ABaiMwe3Z4Ba2eOoVnxCevFi0w18vqYOcpe8PphMLs31/VRu/aNfBKaHv3IpiU3T9duqgqcO6bibLkYtmuuw4nTFa0EyYE7h/fsEH1PE9IwEk2L6/0Jrm8MePxzcyE9Ys3TgsWBJ7FtHSpshDVqYN3hfuheyMbr6WjRqmU3Lp1YWnQE0MV+BtvYMGOj1fKO1BFwK33hgxRJsFQ76z07rtqh5if718/Xl9Ou0VF6rRV3oQJVbmCwXPPYUMYHQ3fmvuu2p975b7OfLrs1cs/P+/tt2PRTEyE6dnffs787nBgIS8qY8b4Hkh26hQ2N5qGTUpmJj7XX+sNyzVpkqrrnpcXHifxM2cgv/tGxmLB/fh6UOE0zClT1Lxp1QpZOP6wZw8sQHyyHTtWKT1fnxH/3ZgxylIwYoT/Svy77+Dn1jTc69Sp/s1tDpYtLIQLkGMs7Hb/3URLlij3Qfv2mOv+HDzd14HOndVG5bnn/JPLE4Yp8O3bVSH/ESP09a3yQ+Pd28yZoWuSJVLpWf37+/di+3o5HDDhaBoWxXPnwksus/niC2VeHDJEvyA+7sPNZtVJk3xTSq++igUpJgYnHr3kcjpxCmMl7nD4Nl733ou/q1YNpk693m2nE7UM2Ef76KO+yRUMbrtNWQPT0wPbYLmPw7x5arPbpQvR1q2+yXX8OKxqmobYoZkzA3/HWSFNn65891lZvmcG/fqrcjO1bassSoHIxpaC0aNVYOmdd/omFxHKQPMGpW9fZVULdB2w2VT8SlISAmT1wBAFXlKCiFdNg/Ofi4DoqQzsdkzy2rWxwH3+uRF3EjglJdh9RUaqRVjPcShrwrC5ukkTz/6qUJXLbI4cQdCOpiGQx9vYDF/uefZstSh4u/veuhXWJU1DpoaemQEWCxa7KVMQYBUTQ/TJJ97J9c03OCVHRsLfrfe8cblwyouMhOnyp5/8frSG8/bbcLlER0PmQFMvL1zfcnPVSTwjw7fNH28sqlWDxcXp1HfuTJ+uNr133eW9XKdPwxLAcTf5+f5ZBDxdbJ0dNQrujMREpHV5y86dCN7TNATLsftDL9kcDrjA2M2ihxvREAX+5594OJUq4UEb5Vt1OpUpPT3diDsJnL/+wm41MRF+JL0ma3mXzQazT+3acF94miihKpfZ3HefCgzLyzPGjeBwYFHRNMQc7Nt3cbnmzVO/zwuAnjKxP2/gQHzPoEHeKQg2yXbvbszGnDNQunTB98yYEfgzNoIdO9AXQNMQPW2EBcvhwMmZzbmvveadbF98gVOe+8ZC7znNG62oKGxON23yTrbHH8e9VK+OdUdv3cDWWVaUPXp419739GlstNktW1Cg/1rAMSvsr8/ODtwKaYgCf/NNCNimjfJ96j2BLBa86NnZmAw1augXtaknmzerIjXz5hnrZ3ZfBPPz4duOjERBhnCRy0x270aaiqYh0EfPU4qnF5d9fhc7sfz4I8zbsbHGboDtdmxa2JS+ZEn5cq1cidN6jRp474za9DkciORNSoJpOhSta3fdpSKT8/ONy95wuVCohwMrL1b5r6REnXA7d/Y+ANMf2ex2Vddj2rSLd1k7dEi5VYcONc5tx+tMgwaIH3nkkYs/z2+/xfvG8VpGvnMzZsAXHhdH9NVX3s85TxiiwKdNU75voxZF9wnOi/DjjxtxN4Gxbh0mRXKycS+6pwlcWAgrSGQkelaHi1xm8sorKojPyI2mxYJ5On487rtNm/ILdtx+u/IPcvS4UXLNn68UxJAh5Y/XjBkqEt5ol4vLBZeGpmGDGUrs3KmyN8aPNzZ7w2bD+8kR0ReLC/jkE2x84uNxojTSssYWgsqVYSVYvbp82R56CPfQuLFaD4yUbfRo5cb944/yZeO53aOHse8cb3x4bk+cGNgpXHcFXlIC01J0tLGnB/cXnc3oc+bofTeB8/PPeKHq1YNPy6yTbkEBXpSoKER8hotcZnHmjNpoDhli/DzlU0H9+ng3yvI5/+9/CCrkl9to14bNhvemShXMhbJ8zjt3oihFVBQWO6Pni82G5xMRgVOeN24Hs3jtNeNP3+6X+yl80KDyi7xwRHynTua4xex2VcTnxhvLluvMGbga3ANFjZ4/7huf8tKN//gDbr3YWARRGr0WOBzQjXFxiCMIpE6E7gp8/34MRs2aKDRh9IvucCDAgyfGxcw4ZrNvH8ajalWYBc3yNefkYEGOjSXasiV85DKLvXvh6+I4DTPu3+VS6STz53uWa906VXZ03jxzLCMOB4qwaFrZpW7ffhvKu359460VFosq2FGnDp7Rhx8aNxd84exZtfEbNMiceWO1YpNVuTLG4/vvPcv2559Q3Bz0Zsam3G5HdgVbZsqqOPbVVzilx8XB/WL0vOaT7tVXQ7by+jA89ZQKquP8bqNls1qVS+2xx/yfj7orcPatpqTgtGX0g7LZYMbhCRRqzU6Ki5EyUakSXiojXQp88Q6vShX4gTyV8wxVuczip5+gkJKTzYsBcDhUEaJx4zzLtWKFilK1WMxT4H374ntdLs9yPfKISmnytoBMIBdXLePT3bPPGjYVfOKvv2CJiIxU+e9GPx8eC85KePJJz7J9+SU2xtWqmTeneVNetSqUc1k56w8/DNmbNjXOL3/hxbUFIiORkldW85MpUyDbVVepiopGX/Pnq83FhAn+z0fdFfjGjVDgqanGlea8cALNmgVTWygqcCIoLd6xm5Gu5XSqqOdrry07ujhU5TKDDz9UhTLMmKc8V9la1Lu350ITTzyhfHFmnAYsFiyoXKt+8mTP4+VwqJQ2MxU4L3I332zsfPCWrVtxEq5Z0zzLFY8FR1bfcINn2ZYuVZkLZhyeLBblFuPgtLLym7mcdt++5owZz+tZsxB0mZDgOci5pASKm4saGW0+58vhwCaeN8X+1r7XXYFv344dYHIyIlzNUOCsiAYODD0TOpEKljLjVMXmGT65lBf0EqpymQHfe4cO5ilKm00Fy3Tp4tkCwdHN/fuboygtFix0EyaodExPRZG48trIkeYuwBzfYrUaPye84bPPVCCWGeub+9zhIkjTpnmW7cEH1ebPDDcHv9dFRaqolqf3uqREbVxHjDDHMmCx4Nnk5io/+Bdf/F22w4dhyo6MRPS5WbKx3oqOhmXF3zbEuivw48cR3JGYaHwUpMWCUx3vZMaP1/tu9GHXLjTIiI7GCcfIMeFdJ7e83Lgx/OQyg9dfD64C79bNcyEbrnIWLAU+YYJnBZ6TE1wF7nQaPye8YflyyNO8uXmWG5473CFv0iTPz2jRInXKNWvuXGgduOeev8t17pyKCB83zlwFXlCgXA+e4ih27cLPY2KwPpmpwGfPhjsxNdX/QDZD0sjS0mDSnjTJeB/R/PmqRJ2vJSHNorgYE51Tg4x6ubg4R7du+K4pU8o3U4eqXGawcqWqVcAvuxkvbWamWmQ9LcIcUNOzp7kmdHZtTJ/uebycTvz8mmvMU+A2G5qcaBqUUyjw/vvBV+BZWZ7nzh13BF+BP/jg3+UqLoZlJ9gKfNWqv8u2Zw/88sFU4I0b+9cngcggBc4dyPr3N9anwL3DOa/43XeNuBt9WLsWRVMiIlRTCr3Hw+mEqSo6GhYQb3r3hqpcRrNpE+Rp0MDcIDb2NY8d61mu995Tvnme40bLZber1DW73bNcHITUvbu5PnCO2i8rOt5svvlG1Q4w24TO1ojZsz3LtnixekZmm9C5cl5ZwYZTp+Lnw4cHx4QeGYkMjws5cQKb+IgI803o06YhkLZ5c/8Deg1R4GvXIrq5fn1j8yQdDgxCTAx2UaHegvDOOzGJ69RBAIyemxuHA4qI/T0FBeEvl5H8+WfpvGYzgldcLmWFsNk8y7VhA4JuOI3MrI0FByEtXuxZruXLVdS+Wak2FgvWkMhI32paG8n27XAD1ahhfhBbr154Rjfd5Fm2t99WMS1mB7FxedD33vMsG1twrrrK/CC26tXxPnk65ZaUqM2rUQcYT5fTqawS3bqFUBAbERQpN0IfPtyYCGc2y3LwRHlFBEKF48dVb96UFORD6lFOkEtiNmuGz+7Xz7c+z6Eql5GcPg1TJM9RMwq5FBbixB8VVba16NAhVfAiI8OcQi45OYjSrVmTaP16z3Jt2wZTZFQUalibUchl5kwo79atL15JyyyOHEHcREQECu2YlUZmtcLUqmlETz/tWba1a6Gs4uPNqcHBzyk7GwoyMbHsHPVnnlHBf2amkU2YgGfVtm3ZaWTZ2Sr4z8w0Mnb9ZmT4Px8NUeBERC+/jIGrXRsnCb0XIqcTC3Dlyuh1+9//GnUn+rJ3r2ogcdllqlqdPy8bt9C7/nrVsrJLF/8KpISqXEbywgvmFXBgN0KlStjQlGctuvlmFWBnRilVzk0fOLD8try84enXz5xSqpybPmuW/s/eX86eVRH5V19tXgGk2bNhaaxfn+iHHzzLduBA6RKdZhVy4QDIfv2wAfXEunVYpytXxr0YLRsXcmElmZdX9in3pZfU5sJiMd5ywWsNWy3K2pB5g2EK/ORJFXnIZf30bLWXn49od01D8EYopo+VxY4dKiUkIQE50fn5WEy9mdjcNs9iQVRwrVr4rK5d0Qgj1OTq1i0wuYxi2zYo04gILEJGnaY4VqNt2/LzeJnvvoOJlpuZGNlkpaBAvUdlFQhh3noLY1WrlrHNTLhJUY0aiFNYsUK3R64Ly5apja4ZfnCXC4HBXD+hvE3W/Pn4vfbtzSulyr0oFi4sW67iYnVASEszp5RqXh6eUXmmfSJUD61fHxskM4rzsOs3NhZzfOdO/+eiYQqciOiXX5T5tH9/DEygk50nJTe7Hzq0bNNIKHPgAAIsIiJwH6mpuBc2Xzscqh+tzYb/djjws9xcRA3z6Zb9N7/9FppyhULb0LJwuSDn5ZfDxG1UO9Hx43H6rl7dO2vRxImQq107yGREO1GnU23YmjVDTmx5nDmjeqf36WOMdYBdYxzV3L+///5Bo3DvYjdihLHuF+4LnpzsXTDfF1+gDkflylASRsrmHoNUsybR11+XL9tjj6mNj9H9F9wDRjt2hIWxPObMUb/LG24j5GLLAMfCTJ0a2Pw2VIEToUMN74Kuuko1Nvf1xbdaseDk5Cjl3aNHYLuXYFNSgspFXAlI09BgpHlzmOfGjIHZNSMDUcuDBqGzTvXq6vcbNUKZSz0D+EJVLiPYvVvNp6uv1r/Fod0OFxK37Fy4sPwTFLNhA4IKIyKwELlc+srFnaSSkiDXc895N17vv4+TQ+XKxpxWXC5sXmJiUJpz5crAnq9RcMpWcrJxyog3WRxP5G20Mqeb8ebPqNRQm01ZldLTLy7XoUOq5n5amnHtRG02PBN+5zzlpl/IN99gXsfGYl4b2U506lTM7ZgYz6ltvmC4AidCAn1qqkqPYf+qNw+QzbI2G04x/FD69Antk50vHDsGP0j//srsXN5VrRo2Lw88gDzGiiaX3ixbhhc3MhIWBL2UJVuL2rRRG4SyfISeePRR/F18PBYVveTijTAHRU2e7FtLQ44orlMHAW16KXGnE5uK2rXx+WU1fAkF/vhD9cLu2RPrmd6nNj7hJibie555xjvZvv4a72JUFFxZem/+uI3ziBH4jurVL376Zp58Uh0IjHAP8QGxe3d1ot69++JynT6tgtlSU2F+13tTZrPBysd56VOnBl762xQFToToRI6ujYlBUNOUKUpB2+2lL1bwBQXwT3L/XU3D//c38T3UWbcOxRAKCrBhGTIEQUYTJmCC3XMPOvuY7fMPVbn04v77ocCrVFF97ANZkJ1OxA+w8m7dGo1+fOHcOVVop0YNnExdLv/l4hPdnDlwGXDgkTcLnDtHjyoTf3Iy0vACURKsEKZNQ6c6TcOG5ehR3+Qym3ffhXKNjIQrQg8XIV8cB8DxCRkZnmvnlwVbCBISsEHTU1E6nfjMhAR8x113eS/X2bNq7qSmYiOpl6+edcnQoXgmiYm+1QbZtUttytiUrpcSZ3cjm85bttQnqNc0BU6E08fdd6tJqWk4UXftqpTBpEmo1nPNNRhM95PfFVeg2cOpU2ZKHVzOnAms4btRrU/pDgAABjxJREFUhKpc/lJcjGpfkZGqMU5+vorE90Y5sX/L4cDmtFEjzNs2bTwXkfCG48dVGdPKlWF6ZD+xt4uL1ao2xuPHqxNu797Ia/aH/fuVqTYpCSc9XqS8VWIsl9WKTROfNNPTQyfd8GLcfz/mS3Q01jCnM7BFnzdZc+eqWJLevT034iiPU6dUl8batZUSD+Qkzm7MrCz4vDUN3+Hrerx9u4qWb9YM9xroBoMzX4YNQ6xJZCSeja+sXq3iDbp2xWcHak5nlzHHj9SqpV9dA1MVOLNzJ4oRdOkCX0B5ZtlatVBO8dFHsWgIglGUlKCQSY0aKthm5EiY0xwOZSnioDLeofPPrFakzvXqBSuTpuG/N2wITK4zZ+A758+84goo4oICLFosF8vEcvHPiopgruRe0ZoGV0Gg8SNHj8K/z5/ZujUW98JCfK/T+Xe57Hb8Oy/YWVnKSqFpGL9QP3m7U1yMZxMZiatvX/VcfFWW/MwyM1EvgE+Cmzb5J9uBA+q0W7UqNkm8wfRFNvcN44gRKm5i4sSy+39fjB9/VI2NUlJUPIWvmx/e8BQUYOz5Odxyi3exJp545x1lCWrdGnNy/nzfrStsWZozh+jKK5Ul7bXX/JPLE0FR4MzZs0SffopF0+VCvueMGQhAWLAAPp+yCgMIglGsXq3SdliR9+0Ly9DMmVBa+flQ7HPnwpc1fDgWpPh4/E2VKvgdPWMBli5VhYs4cv7qq2G5mjUL7w3LNXs2Tl1DhiDQKDpabYhvu03fzI2nny7t4mrRAoFXGRlY/PLyIFduLv5/ZibGl6u/cdDj4sWhF3HuDcXFRPfdp0zKjRtjrrhbPnjTx6VHuTgLWy3sdiz0vXrB0qJpmHO//BKYbIcOYcx5nNu2xXx1d1deKJcn2aZOVUpI07Ah/OuvwGTbskUF6MXE4FQ+Z07pTBdPY+Y+rlYrNrMczxEbC/dBoPPoo49UcGv16pivvJH39nkWFOD9Y4tXSgreYT0JqgIXhFDl1CkUeuHylXwlJKB2fIMGMLXVrKlOxmxOnjHDc+cjPfjrL9Ql5+hf9++tV0/JVb06TIn883r1sAB5G2zkKzt2EN16q1pI3QMb69eHXPXr4yTIKYpsTZg/3/9TZiixfLnyoWoaTODDhyPQLy9PmaF54S8ogJ87MxPmVXYhxMRgY+hvi8kLOXsWc4azgSpVgjJOT4fCzM8vLZvFgn+bMwcbkXbt1FyqXRsKUi835uHD+D7e/CQmIgAtMxNjU1BQWnEXFmIsZ82CNYCj2jlA+pVX9JGLCJunceMQqKdpeO+vvhqbmZwcVa7WXbZ587C5SUtTpnhNQw68Ee+eKHBBKIeDB9EDmiNbk5OhLOPisNjUqKEW6ieeIPrpJ/9Nd76wZw/RBx9gwejYEYtLYqKSq2ZNnHAnTCB68UV9agR4w/btOGVMn45NRq1aWJzj4zFutWoh5XD6dPyer77dUOfQIcRSuNdCiIqChaFDB5wye/WCJaVVK+VL5tPjgAFEb7xhjGxbtkAp8olQ0zBfmjZF05iePXF16gTfNCtVVtwTJyLdyghWr0bNiNjY0pu/Vq0wVr16Qbb27bFJZIsSb5QKCoybSy+/rHz27hvitm2xJvTqhf9t21Ztkvhq3x5Bfp5aB+uBKHBB8JLiYvhnf/4Zrp1NmxC5euJEcKPvz53DyXzzZsj100+ILA92sOe5c0T79qH3+/ff40Tz55/BbyVrBlu24NSbnq78qZ6u6Ggoz6IinODN2Px99RU2GQMHKn+2pysxEb9z2234GzNYvhyn2S5dSlu2Lrzq1kUNigcfDNzN4A1HjhD95z9wR7i7fjxdV1wBK9zzzxsftyUKXBAEwSBOn8ZGb/VqKICHHoLSefZZlKb99lvf0/j04vBhNK9ZuRLxRg88QPSvf8F19P77yJzwpW6BnuzejZLCy5cTPf44IsoXL0bd8o8/xpgGa4P6++/Y0LzxBoKrH3gA1rdXXyX6/HOiX381TxZR4IIgCIIQhogCFwRBEIQwRBS4IAiCIIQhosAFQRAEIQwRBS4IgiAIYYgocEEQBEEIQ0SBC4IgCEIYIgpcEARBEMIQUeCCIAiCEIaIAhcEQRCEMEQUuCAIgiCEIaLABUEQBCEM+X+1lT0VTnyFeAAAAABJRU5ErkJggg==[/img][br][br]En la construcción deben aparecer tantas filas de círculos como indique el deslizador.[br][br]Además, en la Vista gráfica tiene que aparecer un texto con la suma de los números triangulares que debe ser dinámico, de manera que se actualice al cambiar el valor del deslizador.