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<p>Calcula el volum de la piràmide inscrita a l’ortoedre:</p> <p> </p> <div style="display: inline-block; position: relative;"><img 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/egVGqkQoUYQpt9I3Xmclqs7wP+oKGfMO1rZOXddMZ6hxtMCzDFn02b7SNqqn5JjGEuWl0cALHG+cxe9DLVe1bR0baBbTuvJCvjavJzb5u0vddP+q6J383uPTdjaXkLpVKPy2WdkuEvLf8J6JK1Hl5t6D9ssw39rfzvZiiJUAf/bb/F9gG7Kv4Lv9/NtKSvM3PGb87ol4C0/MVE4vX20Nj8KvXmZ+juORj8C1ShITHlG2Tm3jAuoRoI+Nmy9nx83i4Mccsonv2HL2wP0FD7F2prfg8BH7ExZZTNfIKwsJQpeVx9Pic7dl9La9ta1Ooo5s76C4bYuWd0H2rrn6bZ8gaZ6VeQnHSRtPzFyTnUFeA9S4AfZiu5LlfJXNPwv9s3Nr9G5d7bCAR8pKdeRlHBf8tYYCFOoKfnMHXmchqaXsHn6wZApQoHhQqft2ew5a9QaEhK+SYZuT8d15a0QqGksPS37Nl+Ne2tn9Lc8DLJqf9xzHYFaVlXEWOYy/6K2+hw7GLdpguYOeMhkhK+MqWOrcfTybadP6LDsR2tNo55s58mOqrwjO+H02mmw7GDPtf541ofEv4TTAAwf11DrPbkwvvYlflysq4nP/cWqUQhvtB6ttrWDIzNXzf4eFh4BgqFGpfLis/bNRCmWpJT/4P0nOtRKkOjF310TDEJyRdjbX6Dw9UPYTAuRB/++U5s0bFlzFr0Mgf23IPd9hE7d19HetrlFOSvRDUFFttyuWxs3fGDwZX55s9+hoiIrCl93kv4TzC5USffYu/qPjgY/AX5q8jKuCrol987H+QHfR6lQs1XztsfdLvf7+XdDwuCl1dqOGfZ5iHKu3n3w6Kg21VKHV8+d2/Q7T6/i/c+nBG8vErPl8/ZE7y8r4/31gRfIU2tCudL51QE3e719fL+mpLg5dURQ/7U4fV28/5HZUG3a9RRnHf2ziFbNB98HHxGRo0mmvNW7Djt8lpNLOeu2BZ0u9vTwYcfB791qtUaOXf5luDl3XY+/GR+0O06rYlzlgc/f1zuVtZ8EnxMu04XzznLNp5wvxsaX6Su/mn6XJbjW2i9dUdb0EotyanfJj37uuNC3+1qZdv6rwd//7p45p712hDBZGX7+m8G3399AnMWvxq8fF8L1uY3+z9LPidb132V/qm++unDpjFv6dtoNDHMmPU4jXXPcuTAI9Sby+no2EZB3t1s2XFp0OcPD0tl+ZKPg27vdTbwyboVwcuHp7P8rDXBy/fW88n6c4JujwjPYNlZHwa/W9Nby6frzwtePiKL0hmP0Ousn3Qr80n4ixPq7DwaeMGC/+j9BH/wcA54T+J+hH+IlpVvmNIjK0+AYcqPbP+Hff+BcX7/MMLyY/3+vWN8/E+tvKNzL3Xm/t9d/X7XsDWrVOpZuOKjMTv/hz9/T+f4+YPWf0rGpUQbZrF/9210du1j264fje3n3z/+xz8mpoR5s/9ORHj2pFqZbySkw98k1tj0KhV7byE56WLKZj42dHQM8QFVKBQoFKoRlfcHvNTVP41SqSMz/Qdn/PWl/NQuHwj4sLS8TZ25nA7H0bsoUdHFGIyLcLms2Kwf4h/4nV+h0DEt/bukZ10FJ/H6QwbcGSxfW/NHmhv+AaiZtegFIiJygpb3enuo2XcfNsvb/RcFyZdQOP1eVKqwKXf+nElV1b+ktv6vQ96NlZa/GOGl3Wf/Gf7EH2mnpeHKqxQqsjOvGbfXl/JTs3xfn4X6hucwN76A290/Nl+lCsdgXESscSHdXftoNP9jsHOfUhVGSvqlpGVdeWoftRHu/2iVz8q/AXvrx7j6mjmw5x7KFjyHUnHi51arIygoeYhY4wIO7f8Vjc3/wtG5m7KS3xMVmT+lzp+pSGpsKqQ/cnNHTC1t9s3Um8tpsb03eNtYr0/BFL+CqJhS2tvWc6TmUXy+nmNC/3LSsq6Y8O99xqw/sGPjf9DTVUX94SfJzP3pkH+flHoJUTEl7K+4le6eGjZs/jpF039OWup35USazOkgt/0njk5PgGjNyXf4a2x+jYo9N5Oc9DXKZj4qFSgmNa+vl6bm16gzP0N3d/XAoypiYsswxa9AH5ZKm+0jWq0f4PP1Dt4FSMm8gtSMyyZVXTTUllN/+E+AkrIFzxIVM3PYMj6fk0NVv6Klqb9zYXLSxRQXPoBaHSkn1yjqdTbgclkI06eN67TLEv4TRLcnwDVbfTy/+ORv1jQ1v87uPTdJ+ItJrae3lnrzMzQ0vYx3YEieWh2NMW4pxrilKJU6Wq0f0mpbg38w9CNIzfwhKRn/b9LWy85N38fZe4Sw8ExmLfonKtXJrTFgbV7NwX334/c5CQ/LoKzkCWKii+VEk5a/GA9/OeTjmi0+jnxNQ3rEybX+2zu2U1f/NIbYOWScoJOdEBNVIODH1voRdeZyWtvWDj4eHpGDKX4FMbGz8fv6aLWtodX6IX5/X3/oqyNJy/wR09In/y1tt9vO9vVfIxDwMS3t++QUrjzpss6eOqoqbqWnaz8KhYaC/JVkpl8xYevC3r4Fn68Po2EBKpVOPkAS/hPH/Hc9bLMHuGeGkvtKpKuGmJo8Hgfmxpeob3gWp9Pc/yWm0BBrnI8pbgVh4Wl4vT20Wj+gzfbRMaEfRVrWVUxL+/aUqi9Lw6scPtC/4t/MOU8Ra1pw0mX9fjeHqx+m2fwPABLiv0TJjIfQaGImXD18vHYpzr5Gli/5dMqu4ifhPwHttPuZ827/UJZpYVD7NQ1qpUzPK6aOzq591NWX02R5fXBsvlYbhzFuGUbTWajUEXi93ceEfv/fqNXRpGVfQ3LqJVO27iq2/ojurn1odYnMWfwqak3UKZVvbfmAA3vvxeftQq+fRtnMxzHEzpbwn+CkCTkB/O+hoxNYNDnh7eYAF6dMrPD3+VwcPPQISqWe/Nyb5aCKk2h5erBY36GuvpwOx/bBxyOjivp77UcXo1Ao8Xq7sTS+QlvrJ0dDXxNDeva1JKV8Y8rXY9Gsx9m69gLcrhYO7f8V02c+eErl4xLPIzK6kP0Vt9PlqGDztu+Ql3ML2Zk/ljVCpOUvxkq3J8C01zx0HzOHxQXTFKxePrGW4pVV/cTJ6nNZMTc8j7nhH7jcNqB/lj2DaTGmuOXoBnpIez2d2Kzv09b6CQG/eyD0Y8nI+QmJ0y6Wijyu9X4PAIWlvyMu8bxTfo6A38uRmsdorP17/0WBaSklxb9FpzWF/Pv/aO0S+vqaWLFk7ZRd0VBa/hPMi/X+zwU/wNtNAep7Aifd8U+IicDevoU6czkt1vcGp6TV6adhil+BwbAA5UBHLY+nk9aWd2lr/ZRAwAOARmMgPfd6EpMvlIoM0npvaXodR/s2Du67n+jYWWh1pxbaCqWa7PxbiDXMp3rPKlrb1rJ+4wWUznwUk3GRVLKEvxhNf645fs7qAPDXwz7+e6YcPjGx+XxOmppfp85cTlf3Z4tHKYmOnY0pbgWRUUdnmvN4HNha3sXeuvZo6GuNZOT+lISk86Uyh1FQ8ghb156P19NOzb77KZr12Gk9jzF+KbMX/YvqyjtwtG9jy/ZLyc3+L3KzbwipaXRDVW19/7oSmelXkJx0kYS/ON5Ou59t9hP/KvPUIT93zwhIxz8xIfX01lFvfpaGpn/i9Xb2fxmpozCYlmCKW4ZGazgm9DuwWd7B3rZu8I6ARhtHVt4NxCV+SSrzJKlUWqbPfJCq3TfRZltDS+NrJJ5mnwidPoGZc5+i/tCT1B/+MzWHn8DevpnS4sfGdeKaicDpNNPh2EGfa3wvWCX8Q9ixHf2+6GQ6/jn7mmlv34pen4zRME8qVIyrQCBAa9sn1JnLsbV+wmfTToeFZw2MzZ/zuTnaPe52rC3v0N62fjD0tdp4MvNvJC7hHKnQ02AwLcQYtwJ768cc2v8/xBgXoA87veVtFQoVGbnXE2Ocx/6KO7C3b2HdpgspLX6Y+LgVIfW+jYb5uF2tgz8dCQn/kNXtCfBcrX/oi4MaHxenKINudzh2s3vPjSQmfEXCX4wbj6eThqaXqDc/R6+zbiA41MQa5mGKP5uw8PTP/b3bbcdmeZt2+4bBefm1ugQy824iLmGFVOgITZ/5S7as/So+bxcH9t7NzDlPjajXfqxxPrMX/4vqypV0tG1g284rycq4mvzc20JmwZ3S4t/KgZfwnxhO1NHvi95qCmDuCZA2XMe/gAzoEGdeZ1cVdeZymppfH5xsR6M1YYpbhsF01nFzxrvdbdgsb2O3b4TPQl+fRHbezRjjl0qFjhKFQkVRySNU7rgGh30LTfXPkZJx6YieU6s1Ujz7SRpq/0ptzRMcqfs/2ju2UjbzCeldL+EvTsXFKUoOXnS0VX/zDi9vNAX4TZmSb6Qe7VRj0A75KQ+Z96NU6ZiedydKpdx2m8z8fi8t1nepM5fT3rF18PHIqMKBsfkzUSg+f7fK7WrF2vI27W0bgf67XTp9Mln5t2CMO0sqdQxExc4kIflirM1vUHvwUQxxZxEekTXCiwoFaVk/IsYwh/0Vt9Ph2MW6TRcws+jXJCVKh0wJf3FSEvQKEo5ZhyNKowACJOoV5ESdXKgrBpb0DYTAkr4qpY7szGvkwE5SLpeN+oZ/YG54Hpfb2n/Bp9RjMC3CFLdicGz+F8vYLG/Rbt98TOhPI3v6bRhMC6VSx1hOwUra29bjcduprlxJ2fxnUYzCbfro2DJmLfonB/fcS5ttDTsrfkJ66mUUTF+FSi7+JfzFmfDZRYLc9hdjo71jG3X15Vis7xwzNj8ZU9wKYo0LTriSnMtlxWp5iw77lmNCP4Xs6bdjMM2XSj1T3w4KBUWlj7N762V0d+6l/sj/kZFz3ag8t0YTQ9Gsx2isf44j1Y9Q3/AMHY7tlM18gogR3mEQEv7ipEn4i9Hj8/XRZHmdevMzdHbtG7zQjI4pwxR/NpFR0098d6DP0h/67VsHz0l9WBo5028nxjhXKnYcRETlMC3tuzSZ/4H58J8xxS8nMrpo1J4/Jf3/ERM7i6rdt9LZtY/1my9mRuEvSUmeutMuZ6RfQVLi+YTp0yT8xVi3/IUYuV6nmXrzMzQ0/hOP1wH0L5FrNC3BGLcMrdZ4wnJ9fRasljdxtG87JvTTySm4kxjDLKnYcZaZdwOtto9w91morlzJrIUvjeqQuMjoImYt+ic1++7DZnmbij0302bfwIyC+1CpwqZcfYeHpYbE4kIS/pOYXp9EcuJFREfPlMoQp6V/bP7agbH5H3F0bH7mMWPzT7zORJ+zCavlLRwd2z9XLrvgTmJiS6VyQ0jxrD+wY+N/0ttzmNqax8meftvoBo06goKSh4g1LuDQ/l/R2PQyDscuykp+T1Rk/pi/vzb7Zvx+F0bjAul38FnTUBb2mRgu3eDl+To/5QtVXJolU2iKsdU/Nv9l6huepbe3tv/LQqEmxjAXU/zZhIdnBC3b52zsb+l37Bh8LCwii9yCVUTFFEvlhihz7d8xH/4zoKBk7l/H7KeYnu4a9u++hd6ewyiVOoqm/5y01O+O6Xtb8+lCXC4rZy/dgF6fJAdbWv5CiGN1dVdTV19OU/Nr+PxOoH/RHGPccoxxS44bm38sp7MBa/ObdDp2Dj4WHpFDTsEqomKKpHJDXFrmFbRa3sPZe4TqvXcze9G/UKsjRv11IiJzKVv4AoeqfkVL06vsqVpFW/tGigsfGPL8EhL+YgLy+VwcPPQISqWe/NybpUJCiN/vpcX2HvXmcuztW475kp6OKf5somNKjhub/7nQ7zVjtbxJp2PX0dCPzCW34C4iowukgieQGbN/z/b1X8PlbORw9a/Jn3H/mLyOShVGfvH9xJoWULPvfpotb+BwVFBW8gQx0WN5d0j6QUn4izMcMC6O1D2FWh0l4R8iXO5WzA0vUN/wPC6XBQClUkescSGm+LOHvT3q7K2npXk1XZ0Vx4R+PrmFd31uNT4xcWi1RjLzbuLIgYdpaXwVU8K5mOKXj9nrJSRfSFR0MVUVt9LTtZ+NWy6hIH8lmelXjO4LySynEv5CTHXtHTuoM5djaV+8f/MAACAASURBVHl7cGlcnS4JU/wKYo0LTzg2/1i9PbVYLW/S1Vl59C5BVAG5hXcTEZkjFTzBJadegq35Lbq79nFw78+JXvwaGm3smL1eWEQGZQue43D1wzSb/0FV9f202TdSMuMhNJoYOSAS/kKI0+XzuWi2/Js68zN0du0ZeFRBdEzpwNj84W/P9/YcocWymu7OvceEfuFA6GdLJU8iRWWPsXX9hXjcbdRU3U9h6dgujKNUasktXEWscT4H9t6L1fY+6zZdSNnMxzHEzh69FwqBKc9r65+m2fIGmelXkJx0kYS/EGL0OZ2N1JmfoaHpJTyeDgBUqgiMcUswxi0POjb/WD09h7E2r6Z7cEIfiIyeQW7hPYRHZEglT8ZWoSaS3IK7OLjv57S2vI+1+U0Ski8c89eNSzyPyOgi9lfcRpejgs3bvkNezs1kZ147opUHAyE00ZnTaabDsYM+1/iudyDhP4m5XDba7BvR6eIxGRdJhUwRgUCANvs66szlWG1rGBxjH5aOKf5sYgxzg47N/1zod9dgtaymu2v/MaE/k7yiewgLT5OKnuTik76MtfkNHO3bOFT1ADGGuSdco2G06cOmUTrvaWprHqeh9m8cqPkN9vZNlBQ/gk4bd1rPaTIuwuNuR6nUyoGV8J/8Orv3s3vPjcQZl0j4TwEebxeNTa9Qb36Gnt7DwMDY/Ng5mOJXnPSqbT3dB2lpXk1Pd/XgY1ExpeQV3oM+XJZnnUoKSn7D1rVfxevt4sDee5g553/PyOsqlGqy8m8mxjifA5WraG1by/qNF1I689HT+i4rm/mYHEwJfyEml67ug9Sby2lsfhWfrxf4bGz+MoymJag1USf1PN1d1Vgtb9LTfeCY0J9FXtE96MOSpaKnIJVKT37xA+yvuIWOto00mV9kWtp3ztjrG+OWMGvRy1RX3oGjfRtbtl9KbvZ/kZt9AwqFTHYm4S9OfPU88N9Q+LVLqdIxPW8lKrntNioCAR8t1vepM5djb980+HhEZP7A2PzSIcfmfz7099PSvJrenprBMyc6dha5RfeiPwO3eUVoM8Ytxhi3AnvrxxypfhiDaRFh4eln7PV1+gRmzv0L9YeepP7wk9QcfgJ7+2ZKix+T81PCX4R6/KuUOrIzr5ZDMkIudxsNA2Pz+1zN/RdWSh2xxgWY4lagD5t28ncMOvdhtbxJb8+hwfMlxjCX3MK70ekTpLLFoPzi+9m67gJ83m6qK1dROv/pM9ryViiUZOT+hBjjPKor78DevoV1my6gtPgR4uNWyAGS8BcnDn8x0XU4dlFnLqfZ8haBgBsArS4RU9xyDKZFp7Q6WlfnXqzNq+ntPXJM6M8jr/ButPp4qWxxHKVSQ2HJw+zZcS1djt001P6NtKyrzvh+xBrnMWvRyxyoXEV723q27bySrIyryM+97aQ6sQoJ/ylGZreaiHx+F82W1dSbn8ExOIuegqjoEkzxK4iMKjyl4U+djkqsljdxDizUAwpijQvILbwbrc4kFS6GFB1bSnzShdgsb1JX8wcMcUuJjJp+xvdDqzUyY/afaKj9G7U1j3Ok7ins7VspK3kiJJbKHU5G+hUkJZ5PmH58R8xI+E/mdr9CWv4TkdPZSH3Dc5gbX8LjsQP9Y/MNprMwxS1Dqzu14U6djgqszatxOuuPhr5pEbmFd53UOH8hPpNbuJL2tg14Pe0cqFxF2cIXxqXFrVAoSMu6khjDbPZX3I6jczfrN13IzKJfk5R4fkjXYXhYakhcpEj4T2JabTzJSRcTFSHzrE8ErW3rB8bmfwj4AdCHpWGKP5tYw7xT/pLt7NhFi+VN+pzmwdA3mM4ip/AutGM4XauYzA0KFTPKHmP31h/Q032Aupo/kJV/4zjejShj1qJ/cnDvz2mzfsjOip+QnnoZBdNXoVLqBv+uzb4Rv9+DybhIfh747Fj67UfknvAEcOkGL8/X+SlfqOLSLBniMll4vT00Nv+LOvMz9Ax0vFMoVMTEzsEYv4KIiFObNjcQCNDp2IXV8iZ9zobB0DfGLSOnYCUarcyVLkbu8IFHsTS8CCgpnf800bFl475PjfXPcaT6EQIBD1GRhcwq+T0RA3NbfPDxHDyeds5ZvhWdVn7ikpa/EOOku+cQdeZnaGx6BZ+vu//DqInFNDg2P/rUQ79jB1bLW/T1NQ48qsQYv4zcgpWn/HxCDCUr72e0t36Cq89CdeUqZi96GZU6fFz3KSX9/xETO5uqilvp6q5i/eaLmVH4S1KSvyEHTMJfjBefz8WBQ4+gUurIz71lStZBIODDavuQOnM5bfYNg49HROZhiltBdGzZKQ+fCgT8OAZC39XXNBj6poQV5BSsRK2OlJNPjDqFQkFR2ePs3PQd+pxmjhx4hNyie8Z9vyKjC5m18CVq9t2HzfI2FXtuHvis9d/gVsgIKAl/cWb5/S5q655CrY6acuHvdtsxN75IfcNz9A0EtEKpxWBYgCl+BfqwU58yNxDw42jfhrXlbVx9zYOhH5d4LtnT70Q9zq0wMfmFhaeRmvkjGmqfornhJUwJ52KIWzz+oaaOoKDkIWKNCzm0/1c0Nr0MKOWASfgLcWY4Oiupq3+a5pbV+P2fjc1PGBibv/iUxuYfG/od7VuxWd7C5WoZaIapiEs4j+zpt0voizMqPftHtFnfx9lbx4G99zB78StoNKHRryQp9VtExZawf/etgxNZNTa9Slbmj+TASfgLMdp3ONw0t7xJXX05js7dA48qiIouxhR/NpFRRac1BDMQ8NNh34y15W3cLutg6McnfoWs/NtQq/VS+WJcFJU9wfYN38TtsnKo6gEKSh4KmX2LiMylbOELbPzoLAJ+N/sPPoCjczfFRQ+O209itfVP02x5g8z0K0hOukjCX4iJzNnXTH3DczQ0vIjb0waAShU+MDZ/+SmPzT8a+r7+0Le8jdttOyb0v0pO/i0oJfTFONPp48nMu4Hag7/DZnkbU8K5xCd9JWT2T6XSo1Lq8frdKJVhNLesxtFZSVnJE8REF5/57wqnmQ7HDvpc4zsfgYT/JOZ222ltW4dWayTOtEQqZAy02TdSZy6nxfo+R8fmp2KKW0Gscf5prx8eCPhot2/CZnkbt7u1P/MVauKTLiB7+i2yLrkIKdPSvo3N8jY9XfupqfoFMYY5p33BOxZiTQvwervJyruZA3vvpaerio1bLqEgfyWZ6VdMyWMm4T+J9fQeYfeeG4mNmSPhP4q8vl4am16h3vwM3T0HP2tfEBM7F1P8CiIic0/7uQMBH+1tG7C2vIPH3TYY+gnJF5OVf6OEvghZRWWPsm3dxXg9Dg7s/TnFs/8QMvtWWPrbwX+XLXiOI9UP02R+nqrq+2mzb6Bkxm9Cpq+ChL8YRTKP06hcTPUc7h+b3/wvvN6BsfnqGIxxSzHGLR3Rl4ff76XdvgGb5Z3BKX0VCjUJ075GVt5NKJXyURWhTaOJIadgJTVV99Pe+imWhn+RlHpJyO2nUqkhp3AlMcZ5HNz7c6y2D1i36ULKZj6GIXaOhL+YDEJnTKtSpWN63kpUE6zlGgj4sdrWDIzNXzf4eHhELqb4FcTEzhrR0qZ+v4f2tvXYWt7F42kfCH0NSSnfJCP3pxL6YkJJSP4q1ubVdHbs4HD1Q8QaF6APD83FduISzyMyuoj9FbfT5djN5m3fJS/nZrIzr50S66LIN8uUCP/xb/mrlDqyM6+eMDXn9nTQ0Pgi9eZncQ7MmKdQaIk1zscUv4KwES7M4fd7sLetw9byLl5Px+DzJ6V+i4ycn6JUyrhkMTEVljzE1nUX4fP1Ur33bkrm/hWFIjTPZ33YNErn/Z3amsdpqP0bB2p+g719EyXFj6DTxk3q4yThP5mjXxE64T9RODr3UmfuH4rj97sA0GrjMMavwGhcPOIpTP1+D/bWT7G1vIfX6+g/TkotySn/SXrOTyT0xYSnUkeQN+N+qitvp7N9O4115aRmXhG635NKNVn5NxNjnM+BylW0tq1l/cYLKZ35KCbjIgl/MXEFAhL+wwWypeUt6szldDh2Dj4eGT0DU9wKoqKLR3wb0O93HxP6nQAolTqSUr9Neva1EvpiUjHFL8VgWkp721pqDz6OIW7JiDrCngnGuCXMXvyv/iWC27exZful5GRdT17Oz0b0094XZaRfQVLi+YTp0yT8hRgPfX0W6huex9z4wuBwOpUqHINxEcb4Feh08aNwYeGmzfYJrdb38Hq7BkM/Of17ZGT/WA6CmLSmF/9i4PZ/N9WVqyhb8FzIL6er1cUzc+5fqD/8JPWHnuTQkd/T3rGF0uLH0OsTR+U1wsNSCQ8b/34QEv6TmEZjIDnpYsLDMqQyjtFm30y9uZwW23sEAj4A9PoUTPEriDUuGJXhdH6fi7bWT7BZ38c3GPp6pqV/n/Tsq+UgiElPqdIxveTX7Nt5PT1dVdQf/jOZuf81LvvS0baZQMBLrHEBimE60SoUSjJyfkKMYR7VlXdgb9/Cuk0XUDLjYRLiz540x0fhtx+Re8ITwKUbvDxf56d8oYpLs1RSIafI6+ulqfk16szP0N1dPfCoipjYsoGx+Xmj8jo+Xx9tto9ptb6Pz9cz8CUYRkr6paRlXSkHQkw5B/fdj83yNihUlM1/hqiYmWd8HzZ8uBCfr4dFZ29ArYk66XJut50De+6ivbV/pE9WxlXk594W8ncwpOUvprye3lrqzc/Q0PTy4G13tTr6mLH5saMY+h/Rav3gmNAPJzXjclIzfyAHQkxZOQWr6GjbhMfTTnXlKmYt+icq1cSYllqrNTJj1h9pqP0btTWPc6TuKeztWykreSIkbt1L+IuQ5/O5OHDoEVRK3Zgv6RsI+LG1fkSduZzWtrWDj4dH5AyMzZ89ah14fD4nrdY1tNo+xO/r7b+foAonJfMKUjMukwMvpjylUk1B6W+p3PZDnL211B58lJyCO8dnZ06j465CoSAt60piDHPYX3Ebjs7drN90ITOLfk1S4vkT9rhI+Iszwu93UVv3FGp11JiFv8fjwNz4EvUNz+J0mgc+uJr+sflxKwgLH73etT5vL622z0LfORD6kaRlXcm09O/JARfiGFHRBSSl/ieWhn/SVP8cpviziTUtmFDvITq2lNmLXubA3ntps37IzoqfkJ56KQXT70Kl1En4C3GmdXbto66+nCbL658fmx+3DKPpLFTqiFEM/R5abR/Sal2D39/XH/rqSNIyr2Ja+nfkYAgRRFbejdhtn+J2tVC95y7mLH71lH5/H5nR6dqm1kRTVPYoTfXPc7j6YeobnqW9YzuzSn5PRESWhL8QY38nwYPF+g519eV0OLYPPh4ZVYQp/rOx+aM3dt7r7aHV+gFtto8GQ1+tjiYt+yqSU/9TDogQw1AolBSVPcauzd/D7WrhUPX/ML34gTO9F6PyLNPSv0907CyqKm6lq7uK9ZsvZkbhL0hJ/uawZWvr+ycRy0y/guSkiyT8hTgZfS4r5obnMTf8A9fA+vZKpR6DaTGmuOXoRmks7tHQ7z4m9F3HhP61JKd+Uw6IEKcgPCKD1MwraKj9G9amf2NKOIe4hHMn5HuJjC5k9sJ/cnDffdgsb1Gx5xba2jYwo/B+VKqwoOWcTjMdjh30uca3v4CE/yTm8XRia/0IjSaG+LgVE/q92Nu3UGcup8X6HoGAFwCdfhqm+BUYDAtQqkb3Nzevpwub9X3srZ8cDX1NDBnZ15GY8nU5uYQ4TWlZV9Pa8iF9znoO7r2P6JgytDrTmL5mrGkRPl/vqM7UB6BSh1NQ8mtiTQs4VPUrGpv/haNzN2UlTxAVOT2kj4OE/yTm7Gtk956biIosmJDh7/M5aWp+nTpzOV3d+wceVRIdOxtT3Aoio/JH/TW9nk5s1vdpa/2EgN8N9E+WlJ5zHYnTLpaTSogRUigUFJU9xo6Nl+D1tFOz736KZj02pq9ZVPbomD5/Usq3iIopZf/uW+juqWHD5m9QOP1e0lNDt/OvhL8IOT29ddSbn6Wh6Z+D8+Cr1VEYTEswxS1DozWMwV0SB7aW97C3fkog4BkIfSMZudeTkHyBHBQhRpE+LImM3Oupq3mCNtsaWhpfn/B31CIicyhb+AKH9v+KlsZX2Ft1F3b7RoqLHkStjpTwF2fwCpvQWZNaqdIxPW8lqiBT5wYCAVrbPqHOXI6t9RM+650bFp41MDZ/zpisbd8f+u9ib117NPS1JjJzbyA+6ctyEgkxRlLSv4/N8i693Qc4VP0/xBjnow9LntDvSaXSkz/jPmKNC6jZdx/NLatxdFZQVvIEMdEzQ2pfJfyngEAILOmrUurIzrz6BOHbSUPTS9Sbn6PXWdd/0aJQE2uYhyn+bMLC08dkfzzu9v7Qb1s32IdAo40jK+9G4hLPlZNGiDOgqOx3bF//dXzebg7svZuZc54a8QqaoSAh+QKiYoqp2n0rPV1VbNzyHxTk3Ulmxg8l/MWZaPorPmtWh9yudXZVUWcup6n59cGhcxqtCVPcMgyms8bsNpnH3Y615R3a29YPhr5Wl0Bm3o3EJZwt54wQZ5BWayR7+u0c2v8gDvsWmuqfIyXj0knx3sLC0ylb8BxHqh+myfw8VQd+QVv7RvS6xJDYPwn/KdL2DwV+v5cW67vUmctp79h6zBdAPGERmeh0SQQCPuytn/bfLVCFY4pfEfT5fN5e2lo/Dn634Zjybrcdm+Vt2u0bBlfy02jjiImdTVhEJs6eWsxH/vb5D4cmmuTUS4JfSHgcWBpeCbpdo4khKfVbp19eG0NSyhDl3R1YGl8donwsSSnfHPJCyNL42hDlDSSlfOO0y2u1xiF/x3W77bQ0vh68vM5I4rSRlDeROO1rwcu72mhp+vcQ5eOG7OTpdrXS0vTGCMrbaGlaPUT5eBKnBR8H7nJZsTa9GXS7Tp9AQvKFwcv3WbE2j6R8C9bmt4Yonzhkf5ljy2t1SbhdFo4ceJg+ZwMajQFd2LQh66/P2Yx1iOM3fPkmrEMcv+HLN2Id4vjpw1NISL6InMKVxJjmc3DPvVhtH6DVJjCj4JckJJwn4S/GrOkfMnvS01vLth1X0uusBfrH5kfHlNLRvhm324Z7YMz+58PHNGT4e309tDQP8eWtjSMquri/pW/fCAOhr9UnkZ1/K2Hh6ezc9O3gH96w1CHD3+txYD7yv0OUTxs6/N3tQ5YPC88YOvw9w5XPHDL83W770OUjsoYMf7e7bcjy4RE5Q4a/xzVM+cjcocPfZRuyfERk/jDhP0z5qOnDhvfQ5QuGLO9yWYcsHxlVNGT4u/uGKR89Y5jwtgxZPipm5gjLlwwT/s3HlQ8EfDTVPwdAdOzsYcK3gbpDvw+6PcYwd4Tl5w1Z3tlrHrJ8rHEBCcn9xy8u4VwiFxWxv+I2uhy72Vf9c6Kji9DrEiT8xejTqKNJTroYvS5pXPejs6uKrTsux+1uQ6tLIC7+XGKNCyDgQ6M1Bm+5DzMtr0oVTnziV098V8DXi7O3jup99wL+gZZIMln5t2CMO2uw5Z2S8YMhW85Dfng0McOUH3pUgkYTO0x544jKa4crrzWMsLxx6PLDjN0evnzckOW1WtMw5eOHLq8burxumC9mrS5u6PL64crHD1M+cZjyCcOUH/pzr9MnDller08e0/Ja3efLO3vrsNs+Hgj+OcMOrdWHTSMt6+ohL94/0962gUDAj8G0eHDmT71+mPLDrAWiD0sZsvwX+yvp9ElERk2ny7GbQCCAMkjn5zPWNPTbj4TeD8LiOJdu8PJ8nZ/yhSouzVJNmP22t29l+64f4fV2ExlVSEbWtaM+Ic8XW1NWy9t02DcfE/rTyJ5+GwbTQjmRhAhhVbtvob1tAwqFirIFzxMZXTQqz7v+g7n4/S4Wn7t1XJYTDvi9HNh7L9bmN1AotMwqeZzEhPEdTSQtfzFmrLaP2FnxE/x+FzGxs0nNuHJMhuvBwO+HLZ+Ffv/1rC4shZzpdxBrnCcHQ4gJIH/GL9i2/mv4fD1UV65i1qKXxr2FPFJ+v5uq3bdit32EShXOnLL/xWRcPO77JeEvxkRj82tU7r2NQMCHwbSElLTvj+pCO0dD34LV8hYd7VsHQ18flkZOwZ3EGGbLgRBiAlGpw5k+80H27foZvT2HqD34ONnTb52w78fr7WHfzp/iaN+KRh3D3Nl/IzamLCT2TcJfjLq6+qfZV30fAPGJXyFp2ugvgNPX14zV8haO9m1HQz88nZzpq4gxlMpBEGKCijXOx5TwJdqs79NYV94/yZdx7oie87O5Ts7kxGcedzt7dlxHd+dedLpE5s0uJyoyL2TqWcJfjKqDhx6j5nD/PN1J075FfOLo/q7V52zCankTR8cOjp0FMLdwJVExM+UACDEJ5BXehcO+Ba/XQfXeu5mz6BVU6vAJs/+uPguV26/B2XOE8LAM5s15hvBjOiBK+ItJIxAIUFV9H3XmckBBSvplGE2j97tWn7PxmNDvFxaRTW7BSqJiiuUACDGJKFU6CksepnLH1bicjRyq/jX5M+6bEPvu7KmjcvvVuPqaiYosYN7sp9ENM/JEwl9MSH6/l8q9t9FkeR2FQk1a5o+IiZ01Oh+kXjNWy5t0OnYNPhYekUNO4V1ERRdK5QsxSUXFFpM47Zu0NL1KS+MrxCWcgzF++em2Ts7IPnd37mfP9h/j8diJjZnN3Fl/RaOJDsn6lfCfxLzeHqy2D1CpI0iMH5vZpHy+PnZWXI+t9SOUSh0Z2dcRGVUwCqFfPxD6u4+GfmQeuQWriIwukIMrxBSQlX8z7a3rcLttHNj7c+Ysfm3Y+TdOxBC3GL/fA2PQ6fgzjvYd7N15PT5vN3GmpcwufRKVKixk61bCfxJzuVvZvecmwsPSxyT8PZ5Otu+6mvaOrahUEWTm3kB4eMYIQ7+OlubVdHVWDj4WEZlPbuE9RETlykEVYgpRKtUUlv6O3Vsvw+Nuo6bqFxSWPnLKzzNj1u/HdD/ttrVU7b4Jv99FUuIFlBb/NuSHKEr4TwFjsaqfy2Vj644r6OquQqMxkJn7M/T6059JsLenFqtlNV2de46GflQBuYV3ExGZIwdRiCkqIiqHlPRLaax/htaW97A2vznktMNnmrX5bQ7sWUUg4CUt5bvMKPzlmAxrlvAXJ22shrX0OhvYuv0yep11aHWJZOX+bNipYIOH/mFamlfT3bVv8LHIqCJyi+4hPCJTDqIQgvSca2m1fYTL2cChqgeIMcwddvrjM6HZ/CI1VQ8AAbIzf8z0vDsmTJ1K+E/q9B/9JX27ug+wdfvluNxWwsLSycz5KWpN1Ck/T0/3IayW1XR3VR0N/ehicgvvJjwiQ46dEOKYrzIlM0p/x45N38Hr7eLA3nuZOefP47pP9Yf/j7qaxwHIz72dnKxrJ1SdSviHqP2dARp6j4a2xdn/7z2OAB9Y/IOPl8YqiNcrgrb9B9J/VPapw7GLbTt+iMfrICIyn4zsn5zyPNk93TUDob9/8LGo6JnkFt1LWHiqHHghxAnpw1NJz76W+sN/pKNtA03mF5mW9p1x2ZfD1Q/TWPc0oKC48AHSUr874epTwj9EVbT7+e4G33GPP1Tl56Gq/vDXKKHxG5phn2s0fvNvbVvLjl3X4vM7iYopJT3zKpRKzUmX7+46gNWymp7uA0dDP6aUvMJ70IenyAEXQgwrNfMyWq3v0dtdw5HqhzGYFh23et5YCgR8HNx3Hy2Nr6JQaCgt/i3JSRdOyLqU8A9R30hVEqfz0eoK/jeXpCmJ0wX/XX+0fvNvbnmL3ZU3EQh4iDUuJDX98pPu0NLdVT0Q+gcHH4uOnUVu4T3ow5LlQAshTklh6SPs2HAJfn8f1ZWrKJ1ffkY62Pn9HvZX3E6b9QOUSj2zS58kPm7ZhK1HCf8QpVUp+GG2kt9U+YP+zTU5Q5/wKlU4yUkXo9UYTns/zA0vsKfqLiCAKf5cklP+A4Vi+IuK7s4qWixv0ttTM3gpEh07m9yie9CHQEcdIcTEpNMlkJl3M0cOPESXYzcNtX8lLeuqIcu0t24ggB+D6ayT+v76Ip+3l327bqTDvhG1Ooq5s/6KIXbOhK5Hhd9+JCCnU2g62BVg+mrPCbflRcH+CzWndSKfrENH/sSBmt8AkJj8dRKSvjpsma7OfVgtq+ntOTwY+jGGueQV3oNWHy8HVQgxKiq3XUNXZyUKhZqyhS8QGTU96N+ufa8U8LPkvJ0oTnFZcY/Hwd4dP6HLUYFWG8e82U8THTXxZxeVln8Iy4tScHaigo9aAido9avGNPj3H3iQI3VPAQqmpX0P0zC3t7oce2ixvImz98jR0DfO7w99nUkOphBiVBWU/JrtG76J3+/iQOUqyha+cEr9kE6G22Wjcvs19HbXEKZPYd6cZ4gIz5wU9SfhH+J+nKPko5bPd/zTKOEH2WPzG1cg4KNy30oam14GVKRl/pBYQ/DlNDsdlVgtb+LsrR0M/VjjQnKL7j7tsf9CCDEcjdZATuEqDu79OT3dB6ir+QNZ+TcOXegUGkzOXjN7tl9Dn7OByIg85s0un1Q/WUr4h7gTdfwbrqPf6fL5Xeyu+BkttvdQKLVkZP2YqOgZQUK/AmvzapzO+sHQN5gWk1N4N9rTmHtbCCFOVXzil7E1v0WHfTMNtX/DlLCC6NiyEzVrTul5e7oOUrn9GjzuVmKiS5k7+29oNZPre00pp09o+6zj37GG6+h3OrzebrbtuJIW23uoVOFk5d54XPAHAgEcHbs4uP8B6g7/cSD4FRjiljJvydsUlj4swS+EOKPyZ/wCpSoM8FNduQqft3dEz9fZsZuKrVfgcbdiMi5m/pxnJ13wS/hPEFfnqAb/nRcFyxNGt9XvdtvZvP3/YW/fiFodTXbeLUREZH8h9HdSU/0A9UeepM9pBpQY45b3h37JQ2i0MXKghBBnnFoTxfSiXwDQ5zRz5MBQC/8M/d3Z3raBym1X4/V2khj/ZebM+gtqdcTkrDc5dUJfbpSCcxIV+i8ZpAAABABJREFUrGkJjHpHP2dfM1u3X0ZP72G02jiycm9Eq4sbDP3Ojh20WN7E1dc0eL1oil9OTsGdqEN0nWohxNRiiD8LY8I52K1raG54CVPCuRjiFh/zF8Pf9m9teZ/9FbcTCHhJSb6EmTP+B4VCNXkvmuS0mRiuyVGy1uY7pY5+Pp+LFus7KJU6khLPP257d89htu64nL6+JvT6FDJzb0CjiSEQ8OPo2IHV8iauvuajoZ9wdn/oqyPlgAghQkpe4d1ss2/D5+3kwN57mLP41cEGiiFuCYGAP2jL39LwCgf33Qf4yUy/koL8u8Z0NFUokHH+E4TbF+D2XT4enXPy12sul401ny5Aq43j3OVbPrfN0VnJ1h0/xOOxEx6RQ2b29ShVehzt27Ba3sLlsgyGflzieWRPvwO1OlwOhBAiZDnad7J3508AiE+6gIKSXw9bpqH274M/FeTl3Exu9n9NibqSlv8EoVUpeKjsNG9BfWFVvzb7Jrbvuhqfr4fI6BmkZ15Np2M3VstbuF0tA5eFKuITvkTW9DtQq/VyAIQQIS/GMIuE5K9hbf43NstbmBLOIT7pK0H//sjBx2g48hQARQX/TUba5VOmriT8J9gFwCk5wW2rFuv77Kr8KX6/m5jYOURGFVJT/SBul/Vo6CeeT07+rSgl9IUQE0z29Ftob1uPx91GTdUviDHMGezHdLQ95Kem6gEsDS+hUKiYOeM3pCR/Y0rVk/T2n9Q+v6RvQ9O/2LH7Ovx+NwqFBmdvHY3mZ3G7rCgUKhKSL2bh0g/IK7pbgl8IMTFDTamlsPRhALweBwf3/vxz2/1+D9WVd2BpeAmlUsfs0ienXPBL+E/66FcMRH+AI3V/oXLvbYB/4MrXg9vdikKhJiH5ayxYvobcwlUS+kKICS8yqoBpad8DwN76KZaGfwHg8/Wxb9cN2CzvoFJFMm/20yTEnzs180E6/E1e/7+9+0eJKwrDOPzONeP4DwQhhjFIsDBICgt1XIONhVWyjCwhWGQditjrAhLQKlXsooQIFjKmksRoklGZsVUSCxvFuc9TnvI0P87l8n3n58f5sDWXoqil3b65G7hSeZLRscVMTL5NUfS6LKCrdNqX+fzpdVp/m+npGch0YzX7e+9z8mMn1epIGjOrGb5lgqn486i1Wsf5uP3vXP7BoZepj7+5lx3YAA/lz++DHB6s3Djrq9XTmF3L0LVBZmXkh78u1vy+8d/zs9Ov+ba77IKAUhnof5H5ufX0942V/i7Ev4s9ry+lebSZX6df8uzpQiqFlz5QLp1OOxcXP1OtDufV1LvUeq0YT3z2B4DS8RQEAPEHAMQfABB/AED8AQDxBwDEHwAQfwBA/AEA8QcAxB8AuLMrUZxE2EjzXNcAAAAASUVORK5CYII=" alt="" /> <div style="display: inline; position: absolute; left: 280px; top: 10px;">#a</div> <div style="display: inline; position: absolute; left: 40px; top: 140px;">#c</div> <div style="display: inline; position: absolute; left: 40px; top: 60px;">#b</div> </div> <p> </p> <p><em>Recorda que el resultat s'ha d'expressar amb la unitat de mesura corresponent.</em></p>
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Answer 1
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
Answer 2
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
Settings for multiple tries
Penalty for each incorrect try
100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
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Hint 2
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Wednesday, 26 October 2016, 9:53 AM
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