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[/img]

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ADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAMcA0AyADXAIAM/gsUmOZ47C33SQAAAABJRU5ErkJggg==[/img]

Em canteiros de obras de construção civil é comum perceber trabalhadores realizando medidas de comprimento e de ângulos e fazendo demarcações por onde a obra deve começar ou se erguer. Em um desses canteiros foram feitas algumas marcas no chão plano. Foi possível perceber que, das seis estacas colocadas, três eram vértices de um triângulo retângulo e as outras três eram os pontos médios dos lados[br] desse triângulo, foram indicadas por letras. [br] [br][justify] [img 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Dj5gsDztyd70bgjbonM48YwLQSHvhhusqfZbHY4HIODgxaLpbu7+/bt29XV1Tk5OTk5Obdu3RocHJydnfV4PPxHJJGTuDajhqzwrzj0wEcafG8RZ1se1jp5iuI5HA5DXAcCPNAbpH7p8fHxy5cvV1RUwERINNF8nikC+TwLyixBFKuU8HRUAinO1sYha0wyjeW0MwwDI2FDQ0NDQ0MWi6Wnp+fevXu1tbW5ubkFBQUqlaqvr295eXlrawucW/JhwugRP8IMsat9p2ezMdI/8UdhWRb68LF+XZHyDywvxXWfliLr+yCaZ4iI4qquQV597NHR0e+++668vBzCS2QSGPLMEHEp6TxT0FqihQSSoS9BnsngHDrPgDEYYeAZD8gQY2xGrlApjn4xDAOROYPBABYbZnHq9frHjx/fvXu3qqoqPT09Ly8PqpfOz897PB6cEwJPEuscwjMMceUWcEiJ75mDzUSYqXxPlivqEAwGyeg6/FiwjAH42yKdZ9k+nzzRPJPzMeBLNjoJdHx8PCkpqaKiAoJhZKgJETJyiSV8nklnOC6eKaTRRAt2kkn7bBUSeRzSn+fvyBAzQBkuioZTviHhtK+v7+bNmxUVFUqlMicnp7CwEOaroDcOmFEvRwQJxo0BSL5DFCFsKZ/5SCQSCARsNtv9+/cnJibAQVhYWGhra9PpdG63GzeG98LBW4ysD1kC8yVDXGVcGPmA1z96ksBzVVUVw815xngyQ9QPIzHjx7fjstUU1aTLzcToXfPfDoIeO/+k1DFJLwDfFwzXCbdarVBxBWqtWK3W3t7e5ubm6upqpVKZmpqal5fX1tZmMBjm5uaAJejRoEHGcabd3V232721tQWrkUj55XB3lmUrKyt/9rOfPXjwAH6mJ0+e/PKXv0xNTfX5fCxX2gG6UbJffbIlFt/GkRhy5vD4+HhqauqVK1dIPxbZFjSYZGBZxD7H4nlfIGPFxkQAFgrDCQtvB7sV4MyjeYflfjQajcFgGBgYGBoacjqdWq22vb39ypUrUHpBqVRWVFS0tbU9e/aMfLwk0uAhx0KO38VluRySSCRSXFz813/914WFhaurq4FA4NGjR3/zN39z9uxZKG8O2+zt7cFaYofRbGR9oKJ5DoVCKysrsHjV27dvoSnA2x3iLpOTk2lpafX19VA5BOuHkJaZnFyF6VyC3AoiFBfbUt4OTDx5aWQ3ge8jMNw7i7xZuEf4AGEFo9GI26vV6tu3b8MszuTk5IyMjObm5qmpKZiDTbrQgCjkpZDfw5fkkBjLTcyGmdhFRUXJyclfffXV2NjYy5cv8/Lyvvnmm8uXL7948YJlWXQNwOGXTfQJFr1e7NLSUmpq6j/+4z/++7//++eff37mzBmdTuf3+2GINRKJPHnyJDk5ub6+fnh4GIJDTqcTsqZJmKnJzwauCrdEIxkLy8TAFoTZQEwCIy+Yn3aCczkxQmYwGPr7+6HIIWShYSIqQ6wrYOQmnMGh9Hp9R0fHtWvXVCpVZmZmWlpaQ0ODy+VaWVnBGHU4HHa73Zubmzs7OzgvEqy32+0Gbxy+wdg4y7LJycklJSVff/21Wq222Wzl5eXFxcUpKSmvXr2Coqj4E0NPSo5+nVT9H8/w2p6ZmVEoFHfu3FldXZ2dnc3IyPjmm2/AS4RGAPUAYf0qmJBss9ksXAUCtFf7TpY8dJ7FqRbk2RA9r5Pk2RCdwYrTM/FOYbgOh99xX4ZhMJYOCWfk68xutzudTrPZrFarOzs7VSrVqVOnTp8+XV9f//jxY36yCo54YTIpfI9kgu0tKSmpra2tra0tLS29f//+zZs3a2pqUlNTNzY2YJAiQgTVZJ6PSGSKHvnlcT5tmuf5+fmqqiqn0xmJRAKBQENDw4ULF+bn5/FyZ2ZmYD06aNkYATYQEydJ31UkHibCcyyk9+VZHGySaoOQjLz5WwyvHw5HMBgMFP+ku85wpRrIGB5A7nQ6R0dHZ2ZmZmZmxsfH7XZ7d3d3bm7u+fPnv/vuu5KSktbWVpfL9fbt262tLVhGO8Llh1AZAeFwGDbIz8/PyckZHh7+j//4jy+//NJms1VUVFy+fBmKN8BbAP1tuQt9cPFH+6ToGC6M9refPHly4cKFc+fOwRLtp0+frq2tXVtbA9rD4bDD4Th79mxeXl5vb69OpzNzwW0o5UeiYozO5YoL5oPzLMVWC4rqV5ti5KUJvg74YJu5ymcOh8PpdKLHDn/FIuRDQ0MDAwMPHz6sq6tTKpVpaWmZmZm1tbVarfbp06fkOiEw8QPtM/jSt27dun79us/nS0lJ+eKLL7a2tu7fv19eXs7nWa5tcnAlBvN74JllWYfD8bvf/e4///M/MzMz8/PzOzs7ITC2tbUVDAZXV1crKyt/+ctf/upXvyorKzMYDJhAYiDqGZBA8tEy8SZOSuE5LpLFwY6Fujm6ePC+ATMR5uFoZHI4JqjA6LeZSEozc0nvRq5Ymlqtvnr1KvSxMzIySktLOzs7x8bGyCKH2DH2er1TU1Pz8/Obm5sLCwuLi4uRSGRtbW1sbGxra4tlWWp4LJZYoUX8sC2SRziGdvkh6/vEs9VqTUpKUqvV+D0s7/727dulpaWRkZFLly794Ac/+LM/+7PLly/39/dbrVaoy2fkxqtQsaBCVuO1zwdBmhI/WUU8UwWnYfOLopG9CTOXhYIFDDGKhkWRTJw7o9VqIcHOwNUnh5P29fVptVq73T48PAyx8erq6ry8vLS0tNzc3Dt37tjt9o2NjQiXz9fW1vbll19+/vnnRUVFOLszEolsbW1tbGzARGhyTDscXW+QLE4myHkoWuEjm8X9PdL3g+dIJDI5OVlcXGw2m9HBhtSl1dXV+fl5l8uVkZHxox/96C//8i/z8vK0Wi3DMMCzIJCxLGRiPB8P0nyeyZnYmKyOIq/WzNlksmIpufCAiZuJrVarITyOgXE4DhwfXo42m214eHh8fNxmsz18+PDatWt1dXWFhYWXLl1KTU3Nzc29ffv23NzcnTt3/uIv/uIP/uAPCgsL0TNnWTYYDHo8nu3tbSovDRxviLGRK2YjqKRiWXKZ5wgR6/pweV5ZWdHpdOCz4RVAiHV7e/vt27dtbW3/8i//cvr06Xv37ul0OoZhMCQmBcgPh2dBkdeG7jQ5piU4DdsU3bnA7DF+kqmZW16XHCTDQzFcZBH+Cit+9fX1qdVqo9EIrwO9Xt/X19fY2JiVlfX73//+q6+++u1vf/vHf/zHf/qnf2q1WqlfN0yUB8dfGUazoeYBCAYjpTjSx99AZcUlgfkYkKUE0VR+ThLMx7h27ZrD4aBiwiKUJsDz4SIt8VDkhcUa1uLDLPLyIgnHWDfD9c/JPrmJCyVqtdq+vr7u7u7Hjx/39PTASwSwx2SVwcHB4eHh/v7+27dvFxUVffrpp//0T/+UnZ3d0tIyNDS0srJCzvSC6RkYG2e5ggewmp/H4wEzLr1jLCP9wSqKZ7DDEV5hfVLT09Pp6elQfxvbInqMlGXjx8biQjoWJNLBFj9CLPF5Fgxfi1yqlFvgG3aGs89QF6m3txcGEcjnCR1vhmFg/mZ/f7/ZbC4uLr57967T6bx+/XpWVlZxcfG9e/csFsvs7Kzb7SatdJhYuwf8bcjS59tnlouBxXKw34s/GUvo977Ha/gQRNtnwRmzED6B32xsbOzixYt1dXU2mw3KkojzTEaMBN3ahHkmSSCPKY6x+BlJGaOH36gAWKxLJd8FgqIwRuccet1UzIws5wT+NlhpNNfd3d1arTY9Pb2jowMssN/vf/XqlV6vLywsvHz5slKphKlX6+vr1G8NVnp7e3t9fX11dRVnX4EBx2nw5OI+fG7JbvbxB8zeb2f1AxTNM3/yPdhqTDYeHR29cOFCVVWVxWLBhApBnilTdkQ8S5R0jBOTOM8Gg3A1cuxmU8sDmKNrG+ITNhJ5aXq9XqvV6vV6u92enZ197949qrBBKBR69eqVRqO5cuVKWVnZlStX7t69azabX716hehCzGxzc9PtduNUWWgGGC3DmsSxeEaY+TGzI+WKfJXI4ToQzbPgg4DHBJ/HxsZSUlLq6uosFgu2M/gXrA3DxcYQaWzxsXqq+0JCKl4vWjqTpOGNZYelXCFJNdX9NkSnvpJhM1y+S5Bn8oCYmgpUOxyO/Pz87u5u8kUM5hd/tdXV1aGhoa6urqtXr1ZUVNTV1Wk0moWFBShyCCKLkyKf+2IZyyGXQtQBqaN4Pv4XygeoROr1Qn3PgYEB0hE1EdnOTLTXbeJNVJKIdFzcxguziEtM+cbilyQSUaPOwndVMEhGxcCpp2fiZmjig9Xr9QyXw2Oz2fLy8h4/foxWF/pNW1tbW1tbHo+HnIPp9XonJyd7e3vb2tquX79+48aNR48euVyu58+fAw/gV+/u7m5vb+/s7ICzLdIqEgZG3LpKfB2wREkmalWDj9P33n/9Kur7qampzMzM+vp6WCCKdKqxaVJtmmz3B+dZun0+IMyCSIvDLN6hIC1zLJ7hexMvpoi7IN6wdK7JZBocHFQqlY8ePULwoBYFDERh75cKcPr9/uXl5YmJic7OzqKiorS0NKgJNzc3h8kqVGVicTAE+9WxcIqFYkho6QKRM7JcSaYQVy9ZEGnx45wk7bO+JH6PnycmJlJTU6urq01cMX10CKEfSA60xmq+EnvRB+H5qGGmAKZGpGLhzd+XymYhoRW8GIZbrwtntjkcDqVS2dXVRSaBQbPm/95kEw9zJfhXV1chLyUvLw/C411dXWRuKdk8BDvSLMuSqWbUQpyCLQrPjhvjygQYjd/3DcISJdbIJTg/Wq+b7j9D8EOkLzQ+Pp6cnFxRUQEdQrA5Rm6BdbJ0Jr/58htuAjxL1MFhlshzrDwzQaT5qEvk2RA9Jdtms7lcLkB6aGhIqVQ+ePAAJ2NJEb+h7+7urq2tLS0t2Wy227dvZ2dnFxQUdHR0TExMvHr1CnvaUJkU6hySphtC4jgGRsbGBU13iKtzuBctMvlUOs+I9EduosXWcye/x88TExPJycmVlZUwoGIiQkex7PNh8SzRMosfMy6kY12PCJAH5FkQabJTI8IzmUOSgMAk4tDUzs6O3W6vr68vKioqLy9vaWkxGo0LCwswMwf3gsoKLJH2iKPWpKjmxN9AMKwljiLFM99p/9h5jsToI1E8p6Wl1dbWMgyDJtpArEdH9Z8ZwtmmamvuyzPfJB4zz8bYSSMiWAqSTInai4qH8XkmL8bM+duQGe50OvPz8x8+fJhA+U7kMBwOg2mFqHiYK3sQDodXV1efPHnS3d1dUlKSnJycl5cHk71ev369u7uLhwJ4YACcDzBpP8VBpV4NfMipWFes94LETvgJk9T4Nn6enJzMyMi4du2a1WolS2cZidVbmehgGMVzrHK5+/J8pDBTGSMJ87wvyeI8k9OwyAumLgOmtcH4ltPpLCgoIONhEoWowPQMhJDl1taALFEoPwpJo8vLy2azubW1ValUZmZmXr16tbu7e35+HvcNBoM7OztU/bMI11fH4uFSMENWsZtNjoQLegEfrVlGJcJzdnZ2U1MTtR6dQaheL9oTM1e1R7CWPZ+0I6U6YfvMvxK+/0xhLHgB5L5kmVTID7NELxhA7oUXbzabIRhmNpuB5+7ubok8o1lDwMAyixhMQJqMt21sbLhcrrt37xYXF8NynLdu3XK5XOQ1iFhIKbChL419clzNk5rg+XGiK6hEeM7Jybl586bT6SRzEsn6JBQP2HAFeWaI7It9reKhIH2kPAuenTqaCM9kPgnDG/MzRUcr4EtBntkYQxURIhaNa9ySFUVZYhiJNHRoD7HSK8jv98/Pz3d3dzc1NalUqoqKiubm5sHBwXfv3pFnx/EkOC/lkAs2tjBXgIVMMieplhgG/6iU4PrPt27dcjgcRqNxX57Jhku1WspEC1J0EJhj8RwX0uI885E+Hp6N3PRJhmEwP4ziOchbqwj/BJyQUWXSQ0YnXHDEC3uz1EAUTJIfHR1tb2+vra0tLi6uqanp6elZXFxEw46zrKl8+jsAABbYSURBVGO9a8iLxO4AXCq5PBCmsom8F45ZH8g7RRLPIWKN8vHxceAZ1nMnecb+JxWPNUeXyKRWhOO31Fg8IzAS+6hSwBbBW3BLwYOLXE+sI+D20nk2ExMtkWeTyWS32+PlOSxUoiSxFsnvqbIsu7Ozs7CwYLFYbt26denSpYsXLzY0NExPT0PXmtw9zC2xRBHOcuu0kFSTXegPhB8QGZ97v1eyP8/4ZOG/4+PjWVlZYJ8FeaaSxvbl2Rydq7wvz+IubsJUS4H5ffGMu4jwTOZ7Rnj52/zflB9Mkt5osO9NEYhJpvil3+9/8+aN0+lsaGjIzMwsLi7u7OwcHR199eoVgg0hca/XC3UO0e0nHX7BiJfEqz1q2FghHdvZKUnlGdvK6Ogo8My3z/zitWhYLERVekSaH/vhs7QvzPGybZJWjfCIeKZ2sRDzqxLgmWEYmI9RVFTU1dXF51nQYSZ/2YRbmyBR4BSQoXJSe3t7k5OTra2t2dnZkDLc19c3MzOzvr6Oh8LwuMg1k90BKa8h6o1w6FyRxxdk+73xLHhWaBk4X3J4eDgjI+PGjRvAM1WMniriQfJMlsjDiYGCXeiD8BwX3ofFM3l54ieSwjM/UmiK7W8bDAa73V5aWtre3k6GqcLhsMhUCr5imUEqSUO8UeJBwD3GYBXac7y258+fP3r0qLa2Nj8/X6VSPXz40OVyLS8vwxosEaLIGVTLIc8b5mZuw4Lb4u+sCJFbiqkyeGEHZyzWc+PDfDxdfdo+C3ZjICABfxoZGVEoFLAeKrQnEZ75/jbJ81HY57h4ToDqBHgWvx0cdhYfr+LzbOYWGBoYGCgtLW1paUEYIgTP0ptsWGh2BJmSLYI0STIZbAtzSSaBaOGOHo9ndHT0zp07SqUyLy/vxo0bDMMsLy9j6yddcTwXJKVh9ov4PQreV/iQxqil8JxAjyZh0fnb5G8WJqKL+BuMjY2lpaU1NjYODg4Cz0ajUUfUvuSXuTPz+s9k59kcY/qBONixIKdsWiwgqS8F42GxJII6/yzULkZuihU+FjTU+EAsxOJBuBdsb+JeoDDabzKZ9Hq91WotLS1tbW0leWZZNi77HOHSS8LRY1QkDNIb5b5OJowqk6bV4/EMDQ21t7fX1dVduXKltra2vb3d5XLhTSXmvvL3Ivc9uH2mTnRYR0tYtL8N8UP45YJElSnkeXx8PC0t7dq1a1ijNxbPaKWhBfPzw/iW2UisrSEIDxPdpYyFlojiQjcBqgXPQsUIyd35PJNGGHfB7dEVgr/qdDqwz3fu3CGzL9nY8e14FS9CcR0TDQb+yePxjI2N9fT01NfX5+Xl5ebm3rhxY2BggEwvJa+Hf1UJYH9iJFBvCEfqseIMxXNqampdXR3aVWhkJM9U3Xk0SnyYGV5km593mQC0h06vuCSSzKc6lrvO39fIje3j4zVyRX+PmufjERWs8vv9UB96bm6uo6MjMzMzKSmpsrJSo9EsLy+TewG08FIQGceizHKYSBc96ls7TtH1Pckhe8jghaQc9NxgflVNTQ06jSTP8AGESBt59cMELTO/9R8RfnhwQ/RoeVyScgpDdKFfkYq/ZGcbj0DtAt8Dz/39/fhZkOdIjBD0Byi+MxziltRE2La3t1++fDk4OHjnzp3i4uKysrLOzs4XL16QTjvEyUiDhLuzXOpomMg5g3b+oQ1lH1ACPMO0VUiy8/l8Ozs7FM8pKSlVVVXoLpqIxRZBaKspE01FjI6T58SgTYxnPsxkH0QQaeqZGIgiYXyeoR6gwWAAsIHn1tbW7x3PZIAGg1vkBoFAwOPxUHUONzc3XS5XY2MjpKA9evRodHR0ZWUFZo9g9BsC43BA5BmicTC3xOfzwWK6gib6A390sUT3n0PELHO4eSCc5Dk1NRXsMwZdkWdsiInxbIw9z+kQJXh8QVwNvHQ3iRcmnWdj9GK6UngGjE8Az2CNMeQmeLXkXUD7jBCwzc/PP3jwoKioSKFQ1NTUqNXqqakpsjIx5cZTnnaIN4uTvLYjuusjlUA+Cb414Q5hbAD7z5OTkwqFoq6uDuYDoOdsiK5BSQmNOZ/nw5V0qsV3Efmr9AugqKZINhCBLvJJ4r4UzKbo/jO8Q7VarcVi4Y9XRbj6BMfQho5TOHQMVge+9Pl8T58+7evrq66uViqVlZWVDx48GB4ehkJo5L4+n8/tdlOVVWD2GJhrcprHcd/bYUiAZ3xrwn8xSAb/hfnP9fX1UI+ObIUIKtmaSRPEH6Hl88DEGLAV3+s9SvDCKKr3hZl6OLgXf2N0hYxGI3RtLBZLcXHx7du3qfGq72+j3FcYAOOPya2trdnt9ubmZqVSmZOTU1tbazAY3rx5gxtA3VLSxw5zk8bgaOJpZxIf6fuKru+T74mjVhh1APvc0NBgs9nM3OwIaIU4IsUfB2aItSAEp/6j+N+TA7Ox9vqgRAW3TDGSwxkiQEg9EyY67G+KNuDYfwGX22w25+fn37hxA1ZvB0GLjyt4y49LxSspR44coK3H2gWddnKDtbU1k8l07dq1qqqqqqqq8vLy1tbW2dlZ3AAdb/LCKOOMl0r651JyUfDI8d7jAbUPz5jQgy1jfHw8IyPj+vXrdrvdbDabTCZoZ5jRiUlOkLRINnRLDFnjVKzjJCw45mEdXBBsQXuOz4Q/Mk9tbObedPi9xWIxmUw6nc5sNiuVysbGxp2dHbIh7pu/TengPB+KxK+QTFnjA8NyqZ3kjbvd7rGxsb6+vuvXrxcVFVVUVNy/f392dpZcSyDCZeDAAn1BYukfSDv1ExJPlSOv5PgHwwTytwOBwJs3b6anp1+/fg1PjYwBTkxMIM8MN2TFcEVkAWYzMbbMdyljSTonfGCkKD4jK1mxGOaTzHfUYx1HcEvk2chVBTSZTHq93mKxFBQUNDU1kfY5En//+dhATYBk3DEcnYktsjEVCYNv1tbWJiYm2traCgoKMjMzq6qq+vv7nz59CqFENMKBQGB7e3t3dxeHuMgEWHD1RXJp8SLfM8/wKgqFQkajMSMjQ6fT8TPXYX0MyN+2cFPqjVxCooVb74bqQhuik5zEe6GCEtwrZrBLSCJnP4ioyxM8NT9ASIYJ+ceJFYAwcYtjGAwGM5dJZrVai4uLm5ubqXgYpX2xkUIjG+0wS2f4PYp/JeFw2O12P336VKPRlJeXp6en5+fnt7W1zc/PQ5woEAh4vV63272zs0Oud48HBEPN8ryDCC+9/JijGAI8e73ehoaGX//6101NTeCTUDxD/TD0t7H9QYuEz4KjVmQDjZe0uDgRVGKQx/XKiHVJeiGJXB7uxYdfz60FzXDV2ux2e1lZWVtbGzVeRYlKzudLOpYfPsyxzk5GxXHLt2/fGo3GxsbGkpKSgoKCmzdvDg4OLi4urq6uwisyGAxCFC3I1ffmV1zDDnwoFMIK5MdffUFgvRur1Xrp0qX8/Pzi4mKr1Ur9PFNTUzk5Obdv34b5VdjiTSYTdkQpc2qMHmJFPxM9zFgOtjW6uK+Zl+ccy5eO5Wzz/fZ9nfxYDj9+Q1pX/Cv1LhB8CIKvFWoX6o2Dp7BarVB822w2j46OXr16taOjg8r8ocSPGJ0wHeTWwJFeX1+3WCzV1dXp6ekqlaq9vd1oNE5PT+OA9s7Ozrt37zY3N/k1iSPcmiR+vx+WGaJop7JijkgC+SQNDQ35+flzc3OZmZkqlYoy0fPz8xUVFRqNZn5+3mKx6LmVYi0Wi91udzgc0M7I2fk4GXBQSHZCjmjZeRI8gk1Iglvyzxjr1PteCXwJk1KMRqPZbMYjDw4ODgwMMAxDGl74YLVa4dos3OxlQT9C0EEAnnGa2vDwMJzi5cuXXV1dRqORZdk3b95sbGyAn4XOHpCMOVhkZcxDETUPMZakW29Ba88/HRhbDFPBLYt0WcnjoKuC2weDQYyQsSy7tLSk0+nKysouX76sUChaW1ttNtvy8jI5QxOeKphu/rkiXHkGr9e7vr7+9u3bY3iZ/h/PcLcvXry4fPnyl19+2dzcfPHiRYVC8fr1a5arCAld6//6r/+6ePHirVu3enp6gGdwqtFqQUMkG6iBq22ApjuWCRWxsUx0gE3EKxZ3ofknFTwX/6TU7iahvC7yMqjNyG34G1OWmX9qhhsRtNlsTqdzdHTUarX29PS0t7dfvHgxKSnJZDI9e/YM1q/Y29sDcw0Nl1ykhlwpilIwHuFeVF1B/qFC0UrgNYFhbUwOJfORvV4vLL6HKZ8irwPo3EL2CMDMEmNLYW7JJ4AiHA6/efPGZDJVVlbm5+dXVlY2NTXpdLqnT58iw16vd3t7+82bN3q9vqWlpaenZ2lpKcIlbvh8Po/Hs7GxQZZhOXKe4UyBQKC9vf13v/tdTk5Oa2vrvXv3CgsLHz16tLW1tb29vba29u7dO5VK9Sd/8id/9Ed/9Nlnn7W3t0Mj0+v1Go0GJ1dptVqNRtPX19fX16dWq/GDRqPRaDRqtVqtVmu1WtiMnL9BztAipeVJI0G4MXkQ6nTYm+WfQvBEak5wUzqdzmKx2Gw2o9GoVqt7enp6enp6e3v7+/sZhsElnW02G5S/N5lM8GQMBoPFYiGngluIUSs0wmjzwR2ANTHsdrvL5QIvQKvVnjt37qc//ekPfvCDS5cu4dwjlmW9Xq/P58MESTRKiApFmkTM9mWP/1dBy7xv45Zin+HNBYSjS7Jvo2ejS+JFiDwLMPjb29vb29tUz2Vra8vhcHR0dNy5c6empkalUkGvE/rYCwsLn3322R/+4R/+7d/+LcMwLDerJBKJ8K330SmK5+3t7eLi4rS0tJWVlUgk4vV6y8rK0tLSFhcX3759Oz09PTo6Wlxc/NOf/vTHP/5xRkYGRGVgjAqjPpCECCTgv5QEGTYQGaOxwkuCgSWdkCCDijTXgqYbzaDRaBQ8eKyzwMUDnL29vX19feSLA19nKLVaDcuvU28QeEeQ7yDYDGNgcIXYXTcYDFqttqen58GDB2VlZVlZWRcvXvzxj3/8V3/1Vx0dHcvLy+/evXv79u3Kysrz58+Xl5fX1tagRt/m5ubGxgb8u85pjdD6+vpGosIDCv51cz/hFQqKfy7ypKurq6urq+/evVtdXcV7wZNubW253W4YVfZ4PG5OW5zwT/y/bmxsvHv37tWrV8+fP3/+/Pm7d++2t7d9Pt/KysrIyMjjx4+rqqouXLjw7bfflpSUVFVVffXVVz/84Q+/+OILj8cTiUTsdnteXt7vf//7s2fPdnZ2LiwsHLd9Xltba2trU6vV8Ebxer3379+/evXqs2fPNjc3FxYWGIapra397LPPfvGLX1y4cEGlUuXn5xcUFBQUFCiVSqVSmZubm5ubm52dnZWVlZWVhR8ElZ2dnZ2dncMJ/puVlZVJKCNaCiGlC0mhUKSkpCQlJSUlJSUnJycnJ6ekpKSkpCQTSiGkUCgyMjLgwkQuAC8DPqSlpSUlJV2+fDklJSUtLQ2+VygUaWlpcC44e0pKynfffXfhwoVLly599913SUlJly5d+uabb84ROnPmzJkzZ86fP/+///u/Fy9exC2Tk5NTU1NTUlK+/fbb8+fPf/311//93//99ddfKxSKs2fPfvLJJ7/+9a///u///p//+Z+zs7PLy8tVKlVlZWV1dXVhYWFhYWFFRUVttKqrq6uqqioqKsqjVVVVVX1cquFE/jfeg0DiV2VlZUVFBf4LH/BzZWUlbEbuCM8Br6Gurq6+vr6hoaGhoeEap/r6+tra2vLy8tLS0pKSkuLiYpVKVVRUlJGRkZqaWlBQUFpampeXl52d/fnnn//sZz/7+c9//pvf/OYXv/hFeXl5JBJZWlo6derUF198YbFYOjs7z549++mnnx5DSEwgHgZLgUOMfnFxcX5+fmNjA3opfr9/aWlJq9X29fVBSMbhcDh5IsNIGEyKFZQiw07kvvwolMRIGOmpOp3OIZ5cPA0PD4+Ojk5OTk5NTU1OTk6IapzT2NjY2NjYaLTGooUbT05OzszMTHOampqamprCA46NjcGHkZGRkZGRiYmJqampmZmZJ0+ezM7Ozs7Ozs3Nzc3NPXnyBHafnZ2dn5+fnp4eGRlxOp0vX7588+bN1NTUkydP5ubmXrx48erVqydPnsB/nz17tri4uLS0tLi4uLi4+PTp03lOcFg4xcLCwtMPSQui4m8wT2iO0Cwh3IC82WfPni0RWlxcfPbsGXWKp0+fzs3NLSwsLC0tLSwsuFyuoaGhmZmZ+fn5xcXFhYUFOP7Q0NDy8nIoFGpubk5OTp6engayTCZTeXl5rKGHo+IZhdEU6LpAX4WNTkk9wSMfEsXGTq6I6yCsUJaixFNjKBt6ceETWnYjAeGDJfv2CTdaMjCODx/iaoL1iQsKCoqKiiKRSDAYhG0OeDsSJcxzOHpOFYZSZIY/HOFvEQwGh4aGCgoKxsfHoWE5nU6r1XqyR5vFJRhFCxNTLxJWiJuSIfLGDAQCxcXFBQUF8Bl63ccTFRObj0GaDnJdP/ItJV0HMWJxHfYQD57AZRxkX7L9YRPEz2Q+MMtVbgyFQoFAoLm5+Sc/+cnFixc9Hg/LsuXl5RkZGTAeE+tFzBIleI7hicX6maRIJFQea3v+oNqhpGqxXAFDslYRfhni6p8Eg0Gj0fjtt9+iRRwYGEhKSjru/rPgDYS5DHV8RjD0J5KPzj8C5fZgS5X+cPk/reBgieCQCfljSzzdvhdD3lqs0+17HApXbIJUQ8ThVnTbIFEBVl3c29urqan5h3/4h08//bS9vT0cDqenp586dcrj8YS5Ktz8H4t8btJREacIDyL4WCSK/2uKi78vn2TSFIUTdTNZomgRltkDU4dluWAAPBKJrK6ufvrpp/n5+bOzs2NjY2fPnv27v/u798BzrFvF78nGt+/bnfx1Y/Es/nAFG42Un5/ajDpO/A+Kvp5Yl0Gdbt9DwS7Y/uAgfFpCnAWIcDP7YIzU5/OxLFtXV1dYWFhSUvKrX/1qbGysvLz83Llzm5ubQW5xVrw28uyCT2ZfYsm94sBUsgR/zSC31qxImoqIcONwQgtf4YVRCS2ANMSPd3Z2QoTxDwaD3d3dubm5eXl5OTk5RUVFw8PDiTa6OETX6w0KTSulxHIuDU4cC8fuSwjyTLYJiRcqgrTgwclTHArJ4peRAM8R4uWINkRkF5Z4pe7u7sLAKczBePDgQXp6+vz8/P/8z/9cvHixsbHx7Nmz7969w4sJcR6W+PEPRWEiJpewpLPKl+ABE/j1w4TpItPgMCsO/COciRXmUbC7u7u0tLSysrK1tQVv3rguIAEJ1N+W4kjDDyaxT0IBcEC0YrUhQYATO0XCl5HAeeGy0eBIPDUEtNED7+rqOn369MrKyvj4eE5Ozm9/+9tTp05BgiEIbdTRPRPJvO8vKZCLvAsO+IuQCgv58KSVBk+bX8MownN138N8jHA4DBVMJe4crwMjK5awLca7PfxYHR0dZ86cefnyZSQSefTo0Q9/+MMvv/zS7XaHifzkI4X5GCTC/zGcl3yhhAmvCtPIIVWe2jccXQvkGETzLDEDFrc/zms92UqsaUL0xeVytbW1bW5uBgKB0dHR8+fPNzY2+nw+kmf5zXsQCfoOZF8pEGe1tiPS/us/y5Il6/simeeTIJaYx8vyJg/J+ngk8yxL1smRzLMsWSdHMs+yZJ0cyTzLknVyJPMsS9bJkcyzLFknRzLPsmSdHMk8y5J1ciTzLEvWyZHMsyxZJ0cyz7JknRzJPMuSdXIk8yxL1smRzLMsWSdHMs+yZJ0cyTzLknVyJPMsS9bJkcyzLFknRzLPsmSdHMk8y5J1cvT/AczWrTve8a/vAAAAAElFTkSuQmCC[/img][br]A região demarcada pelas estacas A, B, M e N deveria ser calçada com concreto. [/justify]Nessas condições, a área a ser calçada corresponde:[br](apenas um alternativa é correta)

A cerâmica constitui-se em um artefato bastante presente na história da humanidade. Uma de suas várias propriedades é a retração (contração), que consiste na evaporação da água existente em um conjunto ou bloco cerâmico quando submetido a uma determinada temperatura elevada. Essa elevação de temperatura, que ocorre durante o processo de cozimento, causa uma redução de até 20% nas dimensões lineares de uma peça. [size=85](Disponível em. www.arq.ufsc.br Acesso em: 3 mar. 2012)[/size][br]Suponha que uma peça, quando moldada em argila, possuía uma base retangular cujos lados mediam 30 cm e 15 cm. Após o cozimento, esses lados foram reduzidos em 20%. Em relação à área original, a área da base dessa peça, após o cozimento, ficou reduzida em

4 (Dolce & Pompeu)-Na figura seguinte temos um quadrado [b]ABCD[/b] inscrito no triângulo [b]PQR [/b]de área 75 m². [b]QC [/b]é igual ao lado do quadrado [b]RD=3 m[/b]. A altura relativa a base [b]AB [/b]do triângulo [b]PAB [/b]é igual a 4 m. Determine o lado do quadrado.[br][br] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAcYAAADcCAIAAABlOpY3AAAWlklEQVR4nO2dfWxUdbrHBzrDzHQK4yjULXTutvqHeDdIBLGKpekldcNKcOU2SK2ssu5qsomGS3whi2RFKxld1/TuzRKXa2ybhnW5vtSQosFAqJEbDzQkhPCHmqtZomZvamNXUxSb3vrcP8Y5zsyZaeflnPM7L59Pvn9QEmcOp2c+PvM7z+85AQEAAJMIqD4AAADvgFIBAEwDpQIAmAZKBQAwDZQKAGAaKBUAwDRQKlhCIEM4HF65cuWZM2dUHxGAHaBUsIRA4IdLa3Bw8Prrr1d4MAC2gVLBErKVKiLhcFjVkQDYCUoFS9CVOjMzs3///ptuuknt8QDYA0oFS9DXUkOhUGtr6/vvv6/6iADsAKWCJeR98QfwCVz3YAkoFfwJ1z1YAkoFf8J1D5aAUsGfcN0DAJgGSgUAMA2UCgBgGigVAMA0UCoAgGmgVAAA00CpAACmgVLBNM6fP9/b25tKpU6ePKn6WADUgFLBBKanp1taWqLRaDQaDYfDtbW1q1evHh8fV31cAHaDUsEEWlpaQqFQIIv58+evWrVqenpa9aEB2ApKhWo5e/ZsNBoNGIhGo6wAgN9AqVAtvb29tbW1RqWGw+FUKqX66ABsBaVCtfT29tbWFqhSw+GaVOpR1UcHYCsoFarl7Nn/jkaDRqXW1tacPLlO5GWR/1N9jAA2gVKhSsZFdrS0JEKhebm3pwKrVtVNT/9MZJPIb0T+R/VxAtgBSoVqGBP5lcimf/xjXUtLLBqdH4mEwuFQbe2CVavif/vbdSI3itwqsknkDspV8AMoFSpmTOQBkU0i/yKyRqT97NknenvvS6W2nTy5b3r6v0QeFVkrskakVWSjyCaRHSIfqD5sAAtBqVAZ47k+7RA5IDJkyEsiG0TW5Jarh0SmVB8/gCWgVKiA77/vZ/m0v5BP03lN5GGRm0XWiKzLlKs7WV0FT4JSoVwmcn26flafZperP8+Uqz/NlKuvsroKHgOlQllMiOzI9elLJfhUL1f/LbO6qperj4h8rPofBWAaKBVKJ2/9tCyf6nlRpFNkjUgLzQDgPVAqlEhZ66dzlqu7RFpE1oi0ZTUDsLoKrgelQimY6FM9B0Ruy11d7WR1FdwOSoU5yfu+3yryYtU+1cvVRw2rqw+KfKr6nwxQISgVZueiGeunczYDbMqsrtIMAO4GpcIsjIn8xmKfzlKu7hS5oPoMAJQHSoViGNdPLfJpdrm6hXIVXA1KhYKMGfab9lvsU71cLbjVit5VcAcoFYyM59an7ebdj6q4XO0UGaJcBeeDUiGPCZGduT7db69P9ewyrK7uoFwFh4NSIZvxivbvW5diW60YZAUOBaWCzpihX6pfqU/TeU3kt5lyNXurFc0A4ERQKqTJ6+dvKzL/VGG5utlQrh6yaHVVf9xLKBS6/vrrR0dHrXgX8CQo1a0cOnQoEAi88sorZrzYhKFfyub7USVmV6YZoM3SZoBA4PvPxczMTF9f3zXXXGP6W4BXQalupaura9u2bV1dXVW/0njuvD7b+qUqS/bc1exy1Ux0paaJRqPmvj54GJTqSqanp6PR6Ndffx2Lxaanp6t4pbx+/jan1qfFylX9qVZ7RMbMOr3ZSh0YGHj++efNemXwPCjVlRw+fHjLli0ismnTpjfeeKPSlzHej3pBtSurKVe3iLxlyukN5NLb22vKy4IfQKmuZNu2bYODgyLS19e3bdu2il5jzGH9UpXl8UwzwC0mlqvZVeqZM2fq6+urfEHwDyjVfczMzCxcuFCvoWKx2MzMTJmvcTF3Hkq7O32aTn/WViu9XD1STTNA3lpqOByu+KXAb6BU9zE8PNzR0aH/uH79+sOHD5fzAnn9Uu2u+r4/Z7mqr67urrhczVbqgQMH2tvbK3sd8CEo1X3cd9992b1Thw4d2r59e8n/tXEeitXzpWxLf6ZcvVGko5rV1ey+1Pb29gsX2FYApYJSXcbMzMxVV12V/U1/ZmamqamptO/+TttvakV+ZyhXzWwGAJgdlOofLoo8aMs8aeXpF9maW67eIVLW2ghAhaBUnzBmuB/lgfXT2bNHpDV3kNUenmoFVoNS/YCqedLK029oBmDuKlgLSvUgIyMjzz33XE9Pz7Fjx6anv3DkfCk7Y+xd3SHy90Lnqpp9aAAiKNVjaJqWTCZjsVgwGAwGg/H4ooaGmKa1+q8+zctAZu6qvrrapWn/nnuu4g0NDZqmqf4dgrtBqd5B07RIJFJTU5O3nzIWq9G0a0XavHs/qsQ8nlldvUXTbolEampq5hnOVQyrQjWgVO+QTCaNPk3T0BCenPyTaqM5IQdF7hJZk0wuMPo0c64aJicnVf8ywa2gVI8wMjJSV1dX0BGBQCAWW/Dkk51Hjz5Gjh597IUX1sdi84udq3g8Pjw8rPr3CW4FpXqEVCoVDAaLaSIQCCxZElm+/DKyfPllS5ZE5hWuUAOBQCAYDPb09Kj+fYJbQakeYU6lJhLB5uYIaW6OJBKznahgsAalQsWgVI8wMjJSVxcrpolIJNjd/ZO9e9eRvXvXbd9+3YIFhRedA4FAPB4aHt5L7ypUBkr1DOPJZF2xWy6JRHRwcMsrr9xF0rniitr584vdngpPTv5MZLfeuwpQOijVG4yJ/ErTWuPxAl9pY7EF+/bdqtxijsq+fbfW1oYK/b8nqGn/nOld7RR5i3IVygKleoAf5p9q2rVLl4aj0ZD+fT+RiOLTYlZNJKL6CkAsFm5oSGja/SJtuVutKFehDFCq27mYN0/60qX/TKW2LlkSSSSC3d0/4fv+LPnLX+68554ViURwyZLIk092Tk6+LDIkMlhoMgDlKpQESnU1efOl1ovsFxk6evSx5csva26O7N27Trm2HJ69e9c1N0eWL7/s6NHHcjcFPG0YZEW5CnODUt2L8Xl83+83RalmKHVIZCAzd5VyFUoFpbqU2eb1oVSTlEq5CmWDUt1I3vNO2kVezLYASjVVqely9W5DuXpc9WUATgSluo4JkZ25Pt2fpwCUarZS09lrKFefEJlQfT2As0Cp7qKk5/GhVGuUmi5Xf5FbrnZRrkI2KNVFjJU4nx+lWqbUdPSHsFKuQj4o1S2M5/q0TeRAsc88SrVYqUMi/SKbKVfBCEp1BRO53/c78u5HoVTblcrqKhQGpTqfcZEdZT3fFKXapdR0udpJuQo6KNXh5PXzt81en6JU25XK6irkgFKdjPF+1AulfMJRqu1KHRJ5KTMZ4EbKVT+DUh2Lcb9pf4kfb5SqQqnp7BG5mXLVz6BUZ3Ixdx5Ke+k+RalKlTok0p+ZDEC56kdQqgPJ65dqL/H7Pkp1hlLTeZxy1Z+gVKdhnIfyUrmfZ5TqAKUOZQ2yyi5XjzDIytugVEdR0n5TlOoSpaazy9AM8AiDrDwMSnUOF0UeLDj/FKW6WanpcjWvGaBTZIhy1ZOgVIcwZrgfVd76KUp1sFLT2ZMpV1sz5eoukQuqLzwwGZTqBGabJ41SvaLUIZH+rHI1/RDWLSKHKVe9BEpVzlclzpdCqe5Xal65uk7ktky5+qnq6xDMAaWqZSJ3nnS19SlKdYNS88rVWzPlKk+18gIoVSHG/fsV3o9CqW5Tal65mr26Oqb6soSqQKmqmChrXh9K9aJSC5arnayuuhqUqoSvcuf1Vd4vhVJdrtS8cnVdVrlK76orQan2U+rzTlCqb5Q6lFuu/pRmAPeCUm3GhP2mKNWLSk2nYLlK76qbQKl2kjdfqqR50ijVT0odyipX9ccE3CHyqsiU6qsXSgKl2sZ47n5TS+pTlOp+paajl6ttmXJ1J72rrgCl2kPl86RRqi+VOiTyYuYhrPrqarpcZXXV0aBUGxg3d78pSvWHUtN51LC6upPVVSeDUq3momGedL/Vn0OU6iGlDmWVqy2ZcpVBVs4FpVpK3nyp9SL7bfgQolRvKTUdY7lKM4ATQanWYVw/tep+FEr1gVKHCpWr9K46DpRqESbP60OpKDWTguUqzQBOAaVaQd7zTtot6j9Fqb5U6hCrq04GpZrORO68vnZ71k9Rqp+Umo6xXN0h8rHq69/voFRzMed5fCgVpZaW7HJV32r1MlutFIJSTcTyeSgoFaUWyqOGrVY7aAZQBUo1i7x+/jaRA6o+YyjVZ0odKlKuHmJ11X5QqilMWDdPGqWi1JKzS+Rmw2QAVldtBaVWz3juPGlb+6VQKkrNzUsiP899TEC6XAWbQKlVYnx+lMr6FKX6Xqnp6OWq/lSrPTzVyh5QajUY70e9oPqzhFJRajrGcjX9EFawFpRaMbbO60OpKLWiPJ5pBriFctUeUGpl5M3nt2O+FEpFqRWl3/CYgC0iR2gGsAiUWgHjhnl9jvi+j1JRavHo5aq+urqbctUKUGq52PE8PpSKUi1If9ZDWDtYXbUIlFoWjthvilJRahX5naFcZXXVTFBq6VzMfR6fffNPUSpKNTX9Iltzy9U7RA6r/nx5BJRaImOG+1HOWj9FqSi1zOwRac0dZLWHuavVg1JLQeU86QqCUlFqaek3NAMwd7VaUOqcfOWQ+VKlB6Wi1HJi7F3dIfJ31Z87t4JSZ2cid5600+vTdFAqSi0zAyKduaurXSJvq/70uRKUOgvG/fsOvR+VF5SKUivK45nVVb1cfULkK9UfQ5eBUosx4ah5fWUFpaLUSnNQ5C5DuUrvahmg1IJ8lTuvz7n9UgWDUlFqdXlKpC23XN1NM0CJoFQjTnneScVBqSi16gyI3J1brnaKvEUzwJyg1DxcsN90zqBUlGpS9hpWV3fTDDA7KDWbvPlSjpgnXUFQKko1LwcNW60oV2cDpeqM5+43dWV9mg5KRalm52nK1RJBqWmcO0+6gqBUlGpBBihXSwGlimH+qTv6+WcJSkWplqVgMwDl6g+g1IuGedL9qq/aaoNSUaqVGSw0GYBy9Xt8rtS8+VLrRfarvl5NCEpFqdbnacMgK8pVEX8r1bh+6tb7UXlBqSjVluirq5SrP+BbpbpsXl9ZQako1cZQrubgT6XmPe+k3aX9p8WCUlGqvdG3WmWXq8dVf8zV4EOlTuTO62v3xvppdlAqSlWRvYZy9QmRCdWfd7vxm1Ld8Ty+KoNSUaqiDIj8Irdc7fJbueorpbp+HkqJQakoVWn0h7D6sVz1j1Lz+vnbRA6ovvKsCkpFqarTL7LZn+WqT5Q64d550hUEpaJUZ8SPq6t+UOp47jxpT/VLFQxKRamOSX/mqVZ+KVc9r1Tj86O8XJ+mg1JRqsPio9VVbyvVeD/qBdXXlh1BqSjVeXkpMxngRnvK1WPHjq1cuTIUCq1cufLEiRPWvVEeHlaqp+b1lRWUilKdmj0iN9tQrp47d66xsfG9994TkRMnTixduvTs2bOmv0tBvKrUvPn8XpgvVXpQKkp1cPqz5q5aVa52d3cfPHhQ/7Gvr6+7u9vctyiGJ5U6bpjX54vv+3pQKkp1fB63tFyNx+NTU1P6j1NTUwsXLjTrxWfHe0r1wvP4qgxKRaluyEChcvWIKYOsQqHQnH9jER5T6pih/7Rf9XWjICgVpbonuwzNAI+IfFqlCOLx+KVLl/Qfv/76a6rUCjDu3/ddfZoOSkWprsqAoRngDpG3qnFBd3f3wMCAiDz//PNPPfXUwMAAa6nlMmGYz+9TnwpKRamuzJ7MVqtWkdtENonsqXju6vnz55cuXfree+99+OGHra2tTU1N586dM9c4xfCGUidy5/W1+qGff5agVJTqzhzMKlc7MuXqUGWrq++88066L/Whhx46derU5s2bTfdOQTygVOP6qX/r03RQKkp1bV4T+W1WuZpeXd0hMlalJk6dOmWKbubE7Uod536UMSgVpbo8g5lBVnq5ukXksCueauVqpfpl/mm5Qako1f1Jl6trc1dXd4h8rFo7c+BepRp96vfv+3pQKkr1Svqzelf11dVDquUzG65R6sjIyHPPPdfT03Ps2LHp6f+lX2qW/P73XfX10UQieM89K/761y7l2nJytm+/7vLLg0uWRFKprdPTryr/3ZFC2ZXZaqWXq7tELhQyw7RaTYkrlKppWjKZjMViwWAwGAzG44saGmKa1sr6qTGa9kxT05WJxKJkMtnU9OPFiy9bvLhu375blZvLgdm379b6+oWLFsWSyWRTU9OVV17R2LhY055R/kskhdJvLFc17alksjHLDPGGhgZN09T6yulK1TQtEonU1NQEconFajTtWnyaHU17prY2csMNqzuyWL16dSwWxqpGn0YiodWrV+Wdq3g8hlUdnJ16uappt0QiNTU18wxmiKm1qtOVmkwmjT5N09CwYHLyP1T/jh2UpqYr83yqm2Lx4rrBwS3KReac1NcvzPOpfq4aGxdPTr6s/LdJiqQ/3QyQTC4w+jRjhobJyUlVynK0UkdGRurq6gqetUAgEI8Hh4fXinQSkc6Rkbb6+kVGR6T50Y8WPfPM4nffTZJ3303+8Y/1V1wRK3auli1LcF05O/86MrK8rq6wTwOBQDweHx4eVmUtRys1lUoFg8FiJy4YnNfTs0xkDRFZk0o1Njf/UzFNXHXVj3/5y3nHj88nx4/P//Wv5zU1JYudq6uvbuK6cnhSqcbiYggEg8Genh5V1nK7UpeLbCIim1Kpa2dX6r33Bt9+O0zefjt8333BuZTKdeXopFLXBoNFq1SUWpS5vviHh4fvFNlNRHaPjNxdXx8vpomGhsSf/7z2gw86yQcfdA4Oti1eXHSRZNmyK7iuHJ6Rkbvr6hYUNwNf/Isz6+0plYvQDqSpqemGG24wOmL16tWNjY2cq2w4V27HsWZwulI1TYvH48azlkgklDegOQ1N0y6//PJVq/Ibg+rr6zlXeXCu3I5jzeB0pYqIpmlLly6tq6tzVEOvM0lvi6ivr29ubr766quXLVvW2NjIuSoI58rtONMMLlCqiFy6dOnYsWOpVKqnp2d4eJjvZbPAuSodzpXbceBv0B1KBQBwBSgVAMA0UCoAgGmgVAAA00CpAACmgVIBAEzDPqVmt+NGo9G2trYPP/zQtncHALABW5Wq/3lqaurpp5++6aabbHt3AAAbUKNUEZmZmQmFQra9uz/J3m25YcOG0dFR1UcE4HGUKbWvr2/t2rW2vbs/6ejo0P88Ojq6ceNGrApgKWrWUkOh0ObNmz/77DPb3t2fZCtVREZHRzds2KDqYAD8gIIq9c0331yxYoUTduN6njylFvwbADARNV/8+/r6urq6bHtr34JSAWxG2VpqR0fH4cOHbXt3f4JSS+T9999/+OGHN27cuH///i+++EL14YCLUabUTz75ZMWKFVNTU7YdgA9hLbUULly40N3dPTo6+t1333355Ze7d+8+cuSI6oMCt8LuKS+TrdTTp09v3Ljx9OnTCo/Hmezbt+/o0aP6j59//vkf/vAHhccDrgalehn6Ukvh9ttv//bbb1UfBXgElAp+h8UQMBGUCn6ns7Pzm2++yf6bvB8BSgelgt959tlns9dSP/roo3vvvVfd4YC7Qangdz7++OM777zzzJkzIvLJJ5/cf//9w8PDqg8K3ApKBZAzZ8488MADGzZs2Lp16+uvv676cMDFoFQAANNAqQAApoFSAQBMA6UCAJgGSgUAMA2UCgBgGigVAMA0UCoAgGmgVAAA00CpAACmgVIBAEwDpQIAmAZKBQAwDZQKAGAaKBUAwDRQKgCAaaBUAADTQKkAAKaBUgEATAOlAgCYBkoFADANlAoAYBooFQDANFAqAIBp/D9okrlaTwADOAAAAABJRU5ErkJggg==[/img]

5 (Dolce & Pompeu)- A área de um retângulo é 40 cm² e sua base excede em 6 m sua altura. Determine a altura do retângulo.

6 (Dolce & Pompeu)- As bases de um trapézio isósceles medem 4 cm e 12 cm. Determine a área desse trapézio, sabendo que o semiperímetro do trapézio é igual a 13 cm.

7 (Dolce & Pompeu)- As diagonais de um losango estão entre como [math]\frac{2}{7}[/math]. Determine a área desse losango, sabendo que a soma de suas diagonais é igual ao perímetro de um quadrado de 81 cm² de área.

8 (Dolce & Pompeu)- Determine a área do triângulo sombreado em função da área k do triângulo ABC, sabendo que os pontos assinalados em cada lado o dividem em partes iguais.[br][br] 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[/img]

9 (Dolce & Pompeu)- Na figura, ABCD é um paralelogramo de área S e M é o ponto médio de CD. Determine a área da região sombreada em função de S. 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[/img]