Berechnen Sie die Koordinaten des Mittelpunktes M der Strecke zwischen den Punkten A und B ausgehend von den Koordinaten von A(1|3) und B(5|1). [br]Suchen Sie dazu einen geeigneten Weg von O nach M, den Sie nur mit Hilfe der Ortsvektoren a und b ausdrücken.[br]Geben Sie eine Formel an, mit der sich m aus a und b berechnen lässt. [br][br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAgIAAAFHCAYAAADTOCSOAAAgAElEQVR4nO29fZRdZZnmvZFuFafbRqfV9p0xIDUiDQq29sdYTdMqVZ29YJWwzDch6AA6pud9SRBlQhCCptVOJ6nQJqYSUUIIUJpAM4EmQAt6QlUSdJJQJBJI5QuTVEiFVDjBhJAvrvePuMtTp87ZZ3/cz97Xueu+19prSSX5ee2r7vM813me/eGhQhWLxUo/jlUSDADwPE+EI6WHyRspTqFQSM1gOycmjoS/ANc5MWkBuDxm88Z62C1HQw9XnGWZzLEg4J5jQcAtR+MgyqQF4PKYzRvrYbccDT1sQSAHDpMWwIKAa47GQZRJC8DlMZs31sNuORp62IJADhwmLYAFAdccjYMokxaAy2M2b6yH3XI09LAFgRw4TFoACwKuORoHUSYtAJfHbN5YD7vlaOhhCwI5cJi0ABYEXHM0DqJMWgAuj9m8sR52y9HQwxYEcuAwaQEsCLjmaBxEmbQAXB6zeWM97JajoYctCOTAYdICWBBwzdE4iDJpAbg8ZvPGetgtR0MPWxDIgcOkBbAg4JqjcRBl0gJweczmjfWwW46GHrYgkAOHSQtQuwEnTABaWoDFi91r0cjROIgyaQG4PGbzxnrYLUdDD1sQyIHDpAUIb8AVK06FgBtuOHW41qKRo3EQZdICcHnM5o31sFuOhh62IJADh0kLEN6A06adCgCLF58KBBs2uNWikaNxEGXSAnB5zOaN9bBbjoYetiCQA4dJCxDegC0twJw5g/+3Ky0aORoHUSYtAJfHbN5YD7vlaOhhr1gsovzo6ekZ9LO4hwSjWCzC8zwRjpQeJm+kOIVCYdDPjh8/PmgVYNq0U9cLAMChQ4eoz4mJU8nfej8nJi1sHrN5Yz1cH7/vPD22FYEcOExagOpJtPy6gOB6gRUr3GnRyNH4bYpJC8DlMZs31sNuORp62IJADhwmLUDlBtywofKdAhMmnFoZcKVFI0fjIMqkBeDymM0b62G3HA09bEEgBw6TFqByA86ZcyoIVDtcadHI0TiIMmkBuDxm88Z62C1HQw9bEMiBw6QFqNyA1b75B9sD5SsFbOfExNE4iDJpAbg8ZvPGetgtR0MPWxDIgcOkBRjcgGHXAgCnQkL5MwXYzomJo3EQZdICcHnM5o31sFuOhh62IJADh0kLMLgBp02rvPwfVLBtUPpMAbZzYuJoHESZtABcHrN5Yz3slqOhhy0I5MBh0gIMbsCWlsrbAkEFFxKW/h22c2LiaBxEmbQAXB6zeWM97JajoYctCOTAYdIC2EuHXHM0DqJMWgAuj9m8sR52y9HQwxYEcuAwaQEsCLjmaBxEmbQAXB6zeWM97JajoYctCOTAYdICWBBwzdE4iDJpAbg8ZvPGetgtR0MPWxDIgcOkBbAg4JqjcRBl0gJweczmjfWwW46GHrYgkAOHRcurr76KJ598ElOnTsULL7yQqxbNHI2DKJMWgMtjNm+sh91yNPSwBYEcOHlrOXbsGL761f+FM854N84++7P48IdH4E//9CNoaPgYfvazn2WqZShwNA6iTFoALo/ZvLEedsvR0MOZBoH29nZ4ntd/RCkLAvKc88+/COed91VcfvmRAY8N/uQnH8C73/1neOCBBzLTMhQ4GgdRJi0Al8ds3lgPu+Vo6OHMgsC2bdsGTOoTJ07E8OHDa3IsCMhyJk78Oi666ItV3yHw6U8/hTPP/ABeffVV51qGCkfjIMqkBeDymM0b62G3HA09nGkQKK329nY0NDTU5FgQkOW8853/CZdeuiP0hUIf+cj/xPz5851rGSocjYMokxaAy2M2b6yH3XI09HBu1wgMHz4cEydOrMmxICDH2bBhAz7wgfNCQ0BLC/AXf3Evxo37ilMtQ4mjcRBl0gJweczmjfWwW46GHvYKhQKyONasWYMjR46go6Oj/xqBjo4OAEBnZ2fVf+d5Xib6hsLR1taG97//4zWDwCc+sQgXX+znrtcOO+ywww73R24rAsE1A0EYqFa2IiDHOX78OE477TRcfvnR0CDw4Q9/BS0tI7Bnzx5nWoYSp1DQ922KSQvA5TGbN9bDbjkaejjX2wcbGhrQ3t4e+ncsCMhyLrvsKnzqU1OrhoDPfvZFnHba2/D3f//3GDt2LObOnYvnnnvOiZahwtE4iDJpAbg8ZvPGetgtR0MPZxYEgi2BoIJbCcsvIhwk0IKAKGfv3r0488z34eMfv3NQCLjkkvX44AcvwRVXjMDYsWPR0tKClpYWjB07FvPmzQsNBEz+snE0DqJMWgAuj9m8sR52y9HQw7k+R6DWtgBgQcAFZ8OGDTj3wr/Ae9//KZzTcAPOO++7OPvsETj99D/AnXfOBQA899xzmDdvXuRAkPc5MXM0DqJMWgAuj9m8sR52y9HQw/ZkwRw4eWv55fZfYsKPJ+DT/++n0TjuYowYcRUeeOAB/OY3vxn0d6MGgrzPiZmjcRBl0gJweczmjfWwW46GHrYgkAMnTy0HjxzEP/37P6Flbgta5rbgln+7JVID1goETP6ycTQOokxaAC6P2byxHnbL0dDDFgRy4OSpZdnaZf0hoGVuC77z2HdiNWC1QDBz5sxIFxXWKqbfkxRH4yDKpAXg8pjNG+thtxwNPWxBIAdOXlo27t6Ir9z7lQFB4PtPfz9RA5YHAt/3I11UWKuYfk9SHI2DKJMWgMtjNm+sh91yNPSwBYEcOHloOXbiGFr/o3VACGiZ24K7O+9O1YBBIBgxYkSsuwyqFdPvSYqjcRBl0gJweczmjfWwW46GHrYgkAMnDy2PbXhsUAhomduCZWuXiTRgR0dHrLsMqhXT70mKo3EQZdICcHnM5o31sFuOhh62IJADJ2st2/Ztw+SfTK4YBB7f+LhIAwZa4t52WI0jpYeBo3EQZdICcHnM5o31sFuOhh62IJADJ2stbYW2iiGgZW4LOro7RINAUEkDAdPvSYqjcRBl0gJweczmjfWwW46GHrYgkAMnSy2/eOkX+ML8L1QNAl07u5wEgaDswUQ6B1EmLQCXx2zeWA+75WjoYQsCOXCy0nLk2BFcd891VUNAy9wW7Dqwy2kQCGooP5hI4yDKpAXg8pjNG+thtxwNPWxBIAdOllo27t6I9l+142s//Ro+POXDOO+28wYEgd7XezMJAkENxQcTaRxEmbQAXB6zeWM97JajoYctCOTAyUPLkjVL0DynGZ+a/inc0H5DfxAAZBow7jkNpQcTaRxEmbQAXB6zeWM97JajoYe9YrGI8qOnp2fQz+IeEoxisQjP80Q4UnqYvInK6TvQh8n3T4bf6mPqsqkoFot4aedLWLRyEYrFIgqFQm7n1NHRgZkzZ2LEiBHwfR/Nzc0YMWIEZs6ciY6OjrrxOOyQ8JftnJi0sHnM5o31cH38vvP02FYEcuBkraVrV1f/CsC/rf+3QX+ex4pAeQUrBCNHjuxfIRg3bpyKBxNp/DbFpAXg8pjNG+thtxwNPWxBIAdO1lqWrFmClrktGNU2Clt6twz6c4YgEFTwYKJx48alCgRMv2+NgyiTFoDLYzZvrIfdcjT0sAWBHDhZajlx8gT+94P/Gy1zW/DtR79d8e8wBYGAE6wQJA0ETL9vjYMokxaAy2M2b6yH3XI09LAFgRw4WWqptS0AcAaBoJIGAqbft8ZBlEkLwOUxmzfWw245GnrYgkAOnCy19G8LLKi8LQBwB4Gg4gYCpt+3xkGUSQvA5TGbN9bDbjkaetiCQA6crLRE2RYA6iMIBBU1EDD9vjUOokxaAC6P2byxHnbL0dDDFgRy4GSlJcq2AFBfQSCoWoGA6fetcRBl0gJweczmjfWwW46GHrYgkAMnKy1RtgWA+gwCQVULBEwPJtI4iDJpAbg8ZvPGetgtR0MPWxDIgZOFlqjbAkB9B4GgygOB7/upnkOQVk9paRxEmbQAXB6zeWM97JajoYctCOTAyUJL1G0BQEcQCIrxwUQaB1EmLQCXx2zeWA+75WjoYQsCOXCy0BJ1WwDQFQSCYnowkcZBlEkLwOUxmzfWw245GnrYgkAOHNda4mwLADqDQMBheDCRxkGUSQvA5TGbN9bDbjkaetiCQA4c11ribAsAuoNAUHk+mEjjIMqkBeDymM0b62G3HA09bEEgB45rLXG2BYChEQSCyuPBRBoHUSYtAJfHbN5YD7vlaOhhCwI5cFxqibstAAytIBBUlg8m0jiIMmkBuDxm88Z62C1HQw9bEMiB41JL3G0BYGgGgaCyeDCRxkGUSQvA5TGbN9bDbjkaetiCQA4cl1ribgsAQzsIBOXywUQaB1EmLQCXx2zeWBBwy9HQw16xWET50dPTM+hncQ8JRrFYhOd5IhwpPUzelHP6DvRh8v2T4bf6mLpsamROoVCgPaesOZ2dnZg5cyZGjhwJ3/fR3NyMkSNHYubMmejs7EzElPCXwRtWLWwes3kjwWHyl42joYdtRSAHjistSbYFAFsRqFRdXV1VH0zU1dUVi6Xx2xSTFoDLYzZvJDhM/rJxNPSwBYEcOK60JNkWACwIhFVnZ2fVawiiBgKNgyiTFoDLYzZvLAi45WjoYQsCOXBcaElyt0BQFgRqc4IVgiSBQOMgyqQF4PKYzRsLAm45GnrYgkAOHBdakm4LABYE4nCSBAKNgyiTFoDLYzZvLAi45WjoYQsCOXBcaEm6LQBYEEjCiRMINA6iTFoALo/ZvLEg4JajoYctCOTAkdaSZlsAsCCQhhMlEGgcRJm0AFwes3ljQcAtR0MPWxDIgSO+f51iWwCwICDBCQsEP/7xjzPVkgWHSQvANVGxeWNBwC1HQw9bEMiBI60lzbYAYEFAklMpEFx66aWJbjtMq8Ulh0kLwDVRsXljQcAtR0MPWxDIgSOpJe22AGBBwAWnNBA0Njameg5BWi0uOExaAK6Jis0bCwJuORp62IJADhxJLWm3BQALAi45XV1dmDRpUqrnEEhpkeQwaQG4Jio2bywIuOVo6GELAjlwJLWk3RYALAi45hQKhVTPIZDUIsVh0gJwTVRs3lgQcMvR0MMWBHLgSGnpO9CXelsAsCDgmlPqb5pAwHROTFoAromKzRsLAm45GnrYgkAOHCktnS92pt4WACwIuOZU8jdJIGA6JyYtANdExeaNBQG3HA09bEEgB46UloVPL0y9LQBYEHDNCfM3TiBgOicmLQDXRMXmjQUBtxwNPWxBIAeOBOPEyROYfP/k1NsCgAUB15wo/nZ1deEHP/jBoEDwgx/8oD8QMJ0TkxaAa6Ji88aCgFuOhh62IJADR4LRtasLfqufelsAsCDgmhPH37BA0NnZmVoLwNPDkhymiYrNGwsCbjkaetiCQA4cCcaSNUvgt/qptwUACwKuOUn8rRQIRo4cOWCFIGmx9LAkh2miYvPGgoBbjoYe9orFIsqPnp6eQT+Le0gwisUiPM8T4UjpYfCm70AfJt8/Gc0zm3HL0ltS6ykUCrmfk2ZOGn87Ozsxa9YsjBw5Es3NzfB9HyNHjsSsWbPQ2dmZ2zkx+ZvWY+3e5N3DrOfE9vvO02NbEciBk5YRPETIb/VTbwsAtiLgmiPhb1dXF2bNmhV6DUHUYuhhaQ7TN1Y2b1h6GOA6JymOhh62IJADJy0jeIjQlXOvTL0tAFgQcM2R/IBHuagwCkdCi0RpGERdMNg4TP6ycTT0sAWBHDhpGKXvFrhl6S2ptQAWBFxzXHzA0wSCvHvYBYdpomLzhrWHtXA09LAFgRw4aRil7xa4r/O+1FoACwKuOS4/4EkCQd497ILDNFGxecPew/XO0dDDFgRy4KRhlL5bYP3W9am1ABYEXHOy+IDHCQR597ALDtNExeZNvfRwvXI09LAFgRw4SRml2wLfeuRbVA3I5C8bJ8sPeFYPJmLyF+CaqNi8qbcerjeOhh62IJADJymj/JXDTA3I5C8bJ48PuOsHEzH5C3BNVGze1GsP1wtHQw9bEMiBk5RRui3QvbebqgGZ/GXj5PkBd/VgIiZ/Aa6Jis2beu9hdo6GHrYgkAMnCaN8W0BKC2BBwDWHYRAtDQS+76d6DkFaLS44DB5LMtg4TP6ycTT0sAWBHDiJvtmVbQtIaQEsCLjmMA2iUg8mYvIX4PKYzRttPczG0dDDFgRy4CRhlG8LSGkBLAi45jAOomkfTMTkL8DlMZs3WnuYhaOhhy0I5MCJy6i0LSClBbAg4JrDPIgGgeCqq67qDwRXXXVVzUDA5C/A5TGbN9p7OG+Ohh62IJADJy6j0raAlBbAgoBrTj0MonEDAZO/AJfHbN4MlR7Oi6Ohhy0I5MCJy6i0LSClBbAg4JpTT4No1EDA5C/A5TGbN0Oth7PmaOhhCwI5cOIwqm0LSGkBLAi45tTjIForEDD5C3B5zObNUO3hrDgaetiCQA6cOIxq2wJSWgALAq459TyIVgsEs2bNSvUcgiRawqqSx+PGjUNTUxO6u7sr/ItTNX36dDQ1NYnqYeo9KU4997BrDtM4DCQMAsViEeVHT0/PoJ/FPSQYxWIRnueJcKT0ZO3NwqcXwm/1ceXcK7Fuyzon51QoFCh80cqR8Dfvc+rs7MSsWbMwatQo+L6P5uZmjBo1CrNmzUJnZ2fu51Tq8eHDhwGcCgJBGACAN954o//vnDhxAsuWLRvw50ePHqUa+5g4GnrYFYdpHE6qx1YEcuBEZYRtC0hpAWxFwDVH07epYIVg1KhRse4ycKGltKqtCATf+FeuXDnozydNmmQrAhFLUw9Lc5jGYcC2BkKrHhsnbFtASgtgQcA1R+Mg2tnZmei2QxdagPAgEByl1d3djUmTJmHBggUWBCKUxh6W4jCNw4AFgdCqx8apdreApBbAgoBrjsZBNGAkfQ6BpBYgPAgEWwCltWDBgv7DgkDt0tjDUhymcRiwIBBa9dY4tbYFpLQAFgRcczQOouWMvB9MFBYEuru7B20PjBs3Dt3d3RYEIpbGHpbiMI3DgAWB0Kq3xqm1LSClBbAg4JqjcRCtxsjrwURhQQD4/fUAALBy5UpMmjQJACwIRCyNPSzFYRqHAQsCoVVvjVNrW0BKC2BBwDVH4yBai5H1g4lqBYEFCxb0bw9Mnz4dCxYs6P+5BYHapbGHpThM4zBgQSC06qlxomwLSGkBLAi45mgcRCNf8JrRg4lqBYGVK1f2bw+UPlvAgkC00tjDUhymcRiwIBBa9dQ4UbYFpLQAFgRcczQOonEZrh9MVCsIBP8dHEFZEIhWGntYisM0DgMWBEKrnhonyraAlBbAgoBrjsZBNCmjPBD4vp/qOQRBRQkCwTMDgm0BwIJA1NLYw1IcpnEYsCAQWvXSOFG3BaS0ABYEXHM0DqJpGdIPJooSBJYtWzbo7gELAtFKYw9LcZjGYcCCQGjVS+NE3RaQ0gJYEHDN0TiISmmRejARk8dMvycpDpO/bBymcRiwIBBa9dI4UbcFpLQAFgRcczQOotJann/++aqB4Pnnn6/JYfKY6fckxWHyl43DNA4DFgRCqx4aJ862gJQWwIKAa47GQdSVlqSBgMljpt+TFIfJXzYO0zgM1EEQmDhxIjzP6z86OjpqCxxCQSDOtoCUFsCCgGuOxkHUtZaogWDevHn4/Oc/j7POOgsTJkzA448/7kRP1gw2jsYeluIwjcMAeRBob2/H8OHD+/97xowZkSb5oRQE4mwLSGkBLAi45mgcRLPSEhYILr74YnzoQx/CBRdcgI9//OM477zz8Cd/8ie48cYbnenJisHG0djDUhymcRggDwIV/88jrAoMlSAQd1tASgtgQcA1R+MgmrWW8kBw7rnn4oMf/CCampoGHH/3d3+H97znPVi+fLlTPa4ZbByNPSzFYRqHgToLAh0dHbYiUFJxtwWktAAWBFxzNA6ieWkJAsEZZ5yBv/zLvxwUBJqamvCxj30Mn//85zPR44rBxtHYw1IcpnEYSBgECoUCsjhefPFF7NmzBydPnjz1f+x5mDFjBgDgV7/6VdV/53leJvryPm5ddCsa72jEZ6Z/Bvc9cl/ueuywg/V48MEH8a53vatiCAhWBT7wgQ/krtMOO+rlyGVFoDQE1KqhsCKQZFtASgtgKwKuORL+AlznlLeWd7zjHfjMZz5TMQhcdNFFaGhoiHTboZQeaQYbR2MPS3GYxmGgDrYGtm3bBs/z0N7eHpkzFIJAkm0BKS2ABQHXHI2DaF5ajm7fjuvf/3585G1vw0fOOadiEHj/+9+Pj370o7GeQ5BUjysGG0djD0txmMZhgDwIBCEgyi2DpTUUgkBwt8DItpGR7haQ1AJYEHDN0TiIZqnlyObNOLB0KXbfeise//M/R6vn4eeXXop3/MEf4KMf/Sg+97nPoampCRdffDGGDRuGs846K/GDierNm6w4GntYisM0DgPkQaD8GQLBUWt1QHsQSLotIKUFsCDgmqNxEHWt5eiuXSj++79jz3e+g22jR2NLSwu2tLT0B4HdU6di4xNP4HOf+xxOO+00vOc978EZZ5yBL3/5yzh58mTiBxPVgzd5cDT2sBSHaRwGyINA0tIeBJJuC0hpASwIuOZoHERdaDne14fXf/5z7J0zBzu+9KX+yT84lrzvfWj1PNzoefhoyXVGx48fx7333luRHzcQsHqTN0djD0txmMZhwIJAaLE2TtJtASktgAUB1xyNg6iklrdOnMC+H/wA28ePHzT5lx8rLrwQZ1UYE2p5HDUQsHnDwtHYw1IcpnEYsCAQWoyNk2ZbQEoLYEHANUfjICqtZf+999YMATu+9CX88CtfqTgmRPW4ViBg9IaBo7GHpThM4zBgQSC0GBsnzbaAlBbAgoBrjsZBVFrL8X370DNtGrovu6xiCNg+diyKjz1W9dHkcT2uFghmzZqV6LbDSueUtpg4GntYisM0DgMWBEKLsXHSbAtIaQEsCLjmaBxEpbUceeklbL3ySmwYNgwvfeYzA0LA1iuuwGsPPQSg+jtKknr8/PPPY/78+f2BwPd9XHXVVZg/f37iQMD0e5LiaOxhKQ7TOAxYEAgttsZJuy0gpQWwIOCao3EQldJyYN8+7L/7bmy98kpsaWnBpk9+Ei82Ng4IAn333df/96WDQFBBIBg1atSAFYIkgYDp9yTF0djDUhymcRiwIBBabI2TdltASgtgQcA1R+MgKsE48tJL2HLddf0T/rYRI7B/8WLs+da3+n+2/0c/wltHj/b/G1dBIKhVq1YNWCFIEgiYfk9SHI09LMVhGocBCwKhxdY4A7YFeuNvC0hpASwIuOZoHETTMI6/8gr2L1qEbWPHYpPvY0tLC175zndweO1aAKeeHrj1yivxyve+h7dOnBjwb10HgeC8yrcM4gQCpt+TFEdjD0txmMZhwIJAaDE1Tt+BvtTbAlJaAAsCrjkaB9GkjN92dKDnm9/s/8a/efx49P3kJzj+2msD/94zz+CtI0cG/fusgkBQSQIB0+9JiqOxh6U4TOMwYEEgtJgap/PFzv5tgYfWPZSrFsCCgGuOxkE0LuPYK6/g1d+tAgQh4JXvfAe9Qt649jhOIGD6PUlxNPawFIdpHAYsCIQWU+MsfHph6m0BKS2ABQHXHI2DaBxG+SrAjv/xP/pXAZh6GKh9XlECAdPvSYqjsYelOPXWw5XKgkDGnBMnT2Dy/ZNTbwtIaAnKgoBbjsZBNAqj2ipAcC2AlBYge4/DAsGqVasy1ZIFR2MPS3HqtYdLy4JAxpyuXV3wW/3U2wISWoKyIOCWo3EQrcWotgpwouzfMfUwEF9PpUAwatSoVM8hSKrFJUdjD0tx6r2HAcArFosoP3p6egb9LO4hwSgWi/A8T4QjpSctZ+HTC9E8sxlXfP8KrNu6juKcCoVC7r5o5kj4y3ZO1Rj7N2/GrrY2vDRiBDb5Pjb5Pnbcdht6q3jA1MNp9KxatQqzZ8/GqFGj0NzcDN/3MWrUKMyePRurVq2q+9933v4yczT0sK0IZMgJHiLkt/qptwXSaiktWxFwy9H4baoSI+oqgLQWgMfj559/HrNnz071HAIpLZIcFn8ZORp62IJAhpzgIUJ+q596WyCtltKyIOCWo3EQLWUce+UV7L/nntBrAVxqAbg8LhaLqZ5DIKlFisPkLxtHQw9bEMiQEzxE6IrvX5HqbgEJLaVlQcAtR+MgGjCSrAJIawG4PC5laHkwEZO/bBwNPWxBICNO6bsFbll6S65aysuCgFuOxkF0/+bNiVcBpLUAXB5XYtT7g4mY/GXjaOhhCwIZcUrfLbCkY0muWsrLgoBbjrZB9LcdHdj+jW8kXgWQ1BIUk8dhjEqBYPz48fQPJmLyl42joYctCGTEKX23wLqt63LVUl4WBNxytAyipdcCVHpHQJZayovJ4yiMIBCMHz++aiDI+/ddWkz+snE09LAFgQw45a8cZmpiwIKAa46GQbTaOwKSrAKk1VKpmDyOwwgLBEwPJmLyl42joYctCGTAKd0WeGjdQ1RNDFgQcM2p50E0WAXYPm6ck3cEMPUwkN/YVykQjB49mubBREz+snE09LAFgQw45a8cZmpiwIKAa069DqJhdwQw+QtweZyGURoIfN8PvYYgCz1BMfnLxtHQwxYEHHPKtwXy1FKtLAi45dTbIFptFcDFOwKYehjgGfuCBxOFXUOQpR4mf9k4GnrYgoBjTvm2QJ5aqpUFAbecehpEs35HAFMPA1xjX7FYjHRRYRZ6mPxl42joYQsCMevEiROx/n75toCkFqYGZDsnJk49DKJRVgGy0pKkmDx24U2aQDBUejgvjoYetiAQo8bfNR7e9V7/ccm/XBL69yttC0hpkeRYEHDLYR9EK60CHPjpTzN5RwBTDwNcY18lTpJAMBR6OE+Ohh62IBCxxt81HsNuHjbgZ971HsbfNb7qv6m0LSChRZpjQcAth3UQjbsK4FJL2mLyOAtv4gQCzT3MwNHQwxYEIlTXzi5413uY9/N5A35+yb9cMigclFalbYG0WkqLqQHZzomJwziIHursjL0K4EqLRDF5nKU3WT2YiF8gMX0AACAASURBVMlfNo6GHrYgkKCG3Tysf3ugWhCoti0gqYWpAdnOiYnDNIgee+UV7GprS7QKIK1FksPkcR7euH4wEZO/bBwNPWxBIGKVXh8QXBsQtiJQbVtAQos0x4KAWw7LIHqosxO7v/nN/scDx10FkNQizWHxWIqRlOPqwURM/rJxNPSwVyyeejhI6dHT0zPoZ3EPCUaxWITneSKcpHqOHj2K5V3L4V3vYXnX8gHmlQaBQ4cODfh3C59eCL/VxxXfvwLrtq5z4o0Up1Ao0GjRyJHwN42W/Zs3Y1dbGzaPHIlNvo+Nzc3Ycdtt6E2hi8lfBo/ZvFm1ahVmz56N0aNHo7m5Gb7vY/To0Zg9ezZWrVpV1/6ycTT0sK0IRKh5P58H73oPXTu7Bvx82M3DKq4IDNgWePRbg/5cyhspjq0IuOXkmfSDVYDSawF2L1pE844Aph4GuMY+CY7Ug4mY/GXjaOhhCwIRKrhYcMpDU/p/FmwVVAoCYdsCabW44FgQcMvJ4wMedkcA0+ebqYcBrrFPkpP2wURM/rJxNPSwBYGIFawKBMf4u8b3/6x8y6Da3QJSWqQ5FgTccrL+gP+2sxM9t91W9Y4Aps83Uw8DOr0p5SQNBEz+snE09LAFAeGqtS0gqYWpAdnOiYmT1Qc86nMBmD7fTD0M6PSmEiduIGDyl42joYctCMSsY8eOhf55rW0BSS1MDch2TkycLD7gtVYBonIktOTBYZqo2LwJ42zYsKFqINiwYUP/32Pyl42joYctCAhzam0LZKklalkQcMtx+QFP8nRAps83Uw8DOr2JwqkVCJj8ZeNo6GELAoKcKNsCWWmJUxYE3HJcfcDjrAKEcSS05M1hmqjYvInDqRYIbrzxxgErBFloqReOhh62ICDIibItkJWWOGVBwC1H+gNeaRVgT4ynAzJ9vpl6GNDpTRJOeSBobGysuGWQhRZ2joYetiAgyImyLZCVljhlQcAtR/IDnnQVoJwjoUWimHoY0OlNGk4QCJqbm0OvIchCCytHQw9bEBDilG4L3PHIHblqiVsWBNxyJPyt9I6AOKsApcX0+WbqYUCnNxKcu+++O9JFhVloYeNo6GELAkKcqNsCWWiJWxYE3HLS+husAgTvCHj52msTvyMA4Pp8M/UwoNMbyR6OepeBSy1sHA09bEFAiBN1WyALLXHLgoBbTlJ/j+/dO+BagE2+n3gVoLSYPt9MPQzo9MZFDycNBEznJMXR0MMWBAQ4cbYFXGtJUhYE3HKS+Ft+LcDL114r8o4AgOvzzdTDgE5vXPZw3EDAdE5SHA09bEFAgBNnW8C1liRlQcAtJ46/5asAwbUAh4TeEQBwfb6ZehjQ6U0WPRw1EDCdkxRHQw9bEBDgxNkWcK0lSVkQcMuJ6m+lVQDpdwRIcZi0ABYEXHOi+lsrEDCdkxRHQw9bEEjJibst4FJL0rIg4JZTy9+wVQBpLVIcJi2ABQHXnLj+VgsEs2fPVvdgIg097BWLRZQfPT09g34W95BgFItFeJ4nwpHSU87pfLETfqsPv9XHko4luWpJehQKBRotGjlh/r7yxBPYfvPN2OT72OT76L76auxetAgHdu6kPicmLbU8HureuO7hsGP16tWYPXs2Ro8eDd/30dzcjNGjR2P27NlYvXq1Cm809LCtCKTkxN0WcKkladmKgFtOJX+jrgJIa5HiMGkBbEXANSetv8EKwejRo9U9mEhDD1sQSMFJsi3gSkuasiDgllPub61rAVxqkeIwaQEsCLjmSPm7evXqilsGbW1tdftgIg09bEEgBSfu3QIutaQpCwJuOYG/x/fuRd/ixdgWYxVAWosUh0kLYEHANUfa3w0bNqCtrS1xIGDyRkMPWxBIwSndFti8d3OuWtKUBQG3nEKhkHgVQFqLFIdJC2BBwDXHlb9JAwGTNxp62IJAQk7SbQEXWtKWBQF3nON792LVLbcMWgU4vG5d5lokOUxaAAsCrjmu/Y0bCJi80dDDFgQScpJuC7jQkrYsCLjhBKsAzzY20rwjQIrDpAWwIOCak5W/UQMBkzcaetiCQEJO0m0BF1rSlgUBWc6xvXuxv+RagGcbGxOvAqTV4orDpAWwIOCak7W/tQIBkzcaetiCQAJOmm0BaS0SZUFAjlPpWoDOadNo3hEgxWHSAlgQcM3Jy99qgaC1tZXmwUQaetiCQAJOmm0BaS0SZUEgPSdYBdh+1VWDrgVgmqSkOExaAAsCrjl5+1seCHzfT3TboZQeaQZgQSC0GINAmm0BaS0SZUEgHafWHQF5D6IuOExaAC6P2bzREASCCgJB+YOJkgYCpt+3BYGQYgsCfQf6Um0LSGphakC2c8qCE7YKUFosg6gkh0kLwOUxmzeagkBQq1evTvUcAkk9GnrYgkDM6nyxM9W2gKQWpgZkOyfXnDjPBWAbRJk+30w9DOj0RmMQCDgMDybS0MMWBGLWwqcXptoWkNTC1IBs5+SKE3UVoLRYB9G8GZIcJo/ZvNEcBILK88FEGnrYgkCMOnHyBCbfPznVtoCUFkmOBYFonKRPB2QfRPNiSHKYPGbzZigEgaDyeDCR6x6+4QagpaXyIaXHgkCM6trVBb/VT7UtIKVFksMUBE6cOCHCkfQ4ySpAadXLIJo1Q5LD5DGbN0MpCASV5YOJsggCN9xQ+ecTJsjosSAQo5asWQK/1U+1LSClRZLDFATWeh72zZuHDcOGYa3nYa3nYfv48f1/Fhz75s3LRM/eJ59M/Y6AehtEs2JIcpg8ZvNmKAaBoLJ4MFFeQWDFilOrAitWpNdjQSBiBQ8R8lv9VNsCElqkOWxBYK3n4bXlywEA++bN6//ZG11dAIDdU6YM+G8XeoJVgM2jRqV+R0C9DqKuGZIcJo/ZvBnKQSCoIBBcffXV/YHg6quvFnkwUd5BoFx+oiBQLBZRfvT09Az6WdxDglEsFuF5nggnrZ7OFzvht/pontmMJR1LKLyR4hQKhdy1HDlyBAAGrAAAwBtdXVjredg9Zcqgn722fDnefPNNcT17n3wS22++GZt8Hxubm9F99dXYvWgRDuzcmZu/bH3DpIXNYzZvJDhM/qbhrF69Gq2trRgzZgx830dzczPGjBmD1tZWrF69OtdzKvf48OHDoUHghhuAOXNO/e8jR46k0mMrAhEreIjQFd+/ItW2gIQWaQ7bikClSb90K6DSzyT0VLoWYPttt6V+R0C9f5tyxZDkMHnM5o0Eh8lfCU6wQjBmzJgBKwRJHkzkuofDLhacNk1GjwWBCFX6boEpS6fU/gcOtbjgWBAADq1aVfFagAM7d8Y/ibLSNohKMSQ5TB6zeWNBoHoFDyYq3zKIEwiyCAKVVgTmzDkVBhYvTq/HgkCEKn23wJKOJblqccEZykGg1h0BNoi6Y0hymDxm88Z6uDan2jUEUQJBXkEAOHXXQPmqgAWBkEqjp/TdAmu3rM1ViwvOUA0Ch1atwp7bbw+9I8AGUXcMSQ6Tx2zeWA9H5yQJBHkGgRtusCAQq5LqKX/lMJM3TINoPQWBSqsAr3z3uxWvBbBB1B1DksPkMZs31sPxOXECQd4rAsEFg2n0WBCoUeWvHGbyhmkQrZcgEGUVIAonTmkcRJm0AFwes3ljPZycEyUQ5H2NQHlZEAippHrKXznM5A3TICqlRarK9cRZBQjjJCmNgyiTFoDLYzZvrIfTc8ICwerVq0W02COGQyrPIFC+LZCUI6HFJYcpCATPE0hbpXrirgJU4yQtjYMokxaAy2M2b6yH5TiVAsGYMWMS3XZYXvbSoZDKMwiUbwsk5UhocclhCgKSnKSrANJ6NA6iTFoALo/ZvLEelueUBgLf91M9hyAoCwIhlWcQKN8WSMqR0OKSozEI7H3ySfQkXAWQ1qNxEGXSAnB5zOaN9bA7zoYNG9Da2prqOQRBWRAIqbyCQKVtgSQcCS2uOZqCQKV3BMRdBZDUA+gcRJm0AFwes3ljPeyWUywWUz2HICgLAiGVVxCotC2QhCOhxTVHSxA4tGpV/yrAJt9PvAogpScojYMokxaAy2M2b6yH3XJKGUkDwWuvvYa5c+di//79onqilgWBKlVpWyAJR0KLa069B4Hjvb2DrgXYcfvtqd8RkFRPeWkcRJm0AFwes3ljPeyWU4kRNRA8+eSTaGg4H29/+7vwjne8G+985x/jv/7X/4aHH35YVE+tyiUItLe3o6GhIRInjyBQbVsgLkdCSxaceg4Cvy1ZBZB+R0ASPZVK4yDKpAXg8pjNG+tht5wwRlggmDTpRpx55v+DT33qpwNuCfzrv34E//k/N+Dmm6eK66lWmQeB9vZ2eJ5HHQSqbQvE5UhoyYJTj0Gg0ipA6bUATB5rHESZtABcHrN5Yz3slhOFUR4ILrnkErztbX+Iz32uu+LzAZqafoM/+qM/xS9+8Qsnesor0yAwfPhwNDQ00K8IBNsCI+aPGPTKYY0DRb0FgWqrANLvCJDiaBxEmbQAXB6zeWM97JYTh7Fx40a0tbXhnHPOw3/5L2OrPiiopQX48If/PzQ3X+lUT1C2NVBWYdsCcTgSWrLi1EsQqLUKkLWeqKVxEGXSAnB5zOaN9bBbTrFYxPKu5Xjglw/gwXUP4qlNT+GpTU9hzbY12Lh7Izbu3og9xT3ofb0X+w+duhjw7LMvwCWXrA0NAv/wD7143/uGZXJOXqFQQFbHyy+/DOD3QeDkyZM1/43neZnpKxQK+PH/+TEa72hE4x2N+Pa93870/9uO6scz8+Zh9Re/iGcbG08dl12GzmnTsPKxx3LXZocddgzt49q51/bPG1GOPzzjXWhu7gkNApdddhinn/4Hmei3FYGyCtsWiMOR0JIVp1DgXRGIswqQhZ4kJeEvwHVOTFoALo/ZvLEedsspFov980bU433/7Rz89V8/GhoE/vZvn8H55/9NJudkQaCkam0LROVIaMmSwxoEql0LcPLgwVz0JC2NgyiTFoDLYzZvrIfdcE6cPIHtr27Hw796GN9Y9g387T//baQQMHbhWFz2pRacdfbloUHg7LPH46abptQWInBOFgRKKuxugTgcCS1ZctiCwPHeXvTde2/u7wiQ4mgcRJm0AFwes3ljPZyeE0z6//HCf2BBYQFu/OmNGNE2Ai1zW+C3+ri09VL82U1/hsv/9fKqAWDCjyagrdCGrp1dAIC/+ZvP4IIL/qliCPjYx2bj3HM/6fScSsuCQEnV2haIypHQkiWHKQi8UvaOgB3XXou+iKsALvTYIOqOIclh8pjNG+vheJywSb/S4bf6GLNgDC6ZcUnFP7920bX4UceP8ELPCwP+f7Zv345/+IcrMGzY3+PP//x7OP/8f8H55/8LzjrLR2NjM37961+LnVOtsicL/q6ibAtE4UhoyZrDEASCVQCmdwRIcTQOokxaAC6P2byxHq5eO/fuxMbdG/HYhsfQVmjD1H+biqt/dHXo0v6XF38Z0/99Ou5ZdQ9+/uLP8dy253D0+FF897HvDvh7X13yVSxevRhbereEarjvvvtwww1fwwUX/CX+8R8nYfHixanOyYJASNXSE2VbIApHQkvWnLyDwG/L3hGQdBVASo80R+MgyqQF4PKYzRvr4d/9mzeKgyb9MW1jYk36W/dtxdHjRytqCVaUxy4ciwd++QAOvXkolr48PbYg8LuKsi0QhSOhJWtOXkGg0rUATO8IkOJoGERdMCQ5TB6zeTMUe7jSpF/pm77f6sea9MO0bNy9Ecu7luPIsSOJzsmCQEhlEQSibgvU4khoyYOTRxAovyMgWAV4bdeu1FqS6HHJqbdBNCuGJIfJYzZvtPdw1Em/0jf9tqfaYk36Ls/JgkBIZREESrcFHlz7YGKOhJY8OFkGgWAVYMf48fTvCJDiMA+ieTIkOUwes3mjqYeDSX/pmqWJ9/RLJ32m37cFgZDKIghE3RaoxZHQkgcnqyBQbRXgRMm1AGzeaBpEJTlMWgAuj9m8qdceDvumX7qkH3dPP6kelwzAgkBouQ4CcbYFwjgSWvLiuA4CtVYBonKk9GTNYZqkpDhMWgAuj9m8qYcejru877f6iff0o+jJmgFYEAgt10EgzrZAGEdCS14cl0EgyipAFI6Unjw4TJOUFIdJC8DlMZs3bD2cZk+//JY9CT0MDMCCQGi5DgJxtgXCOBJa8uK4CAL9dwREWAUI40jpyZPDNElJcZi0AFwes3mTZw+XT/o3td+Uak9f8pykOBp6eEgHgbjbAtU4Elry5EgHgUqrAAeWLq26ClCNI6Unbw7TJCXFYdICcHnM5k1WPRzlm3753v6ASf+l+LfspS2m37cFgZByGQTibgtU40hoyZMjFQSSrgKUcySKicM0SUlxmLQAXB6zeeOih5Mu79/64K2xJ31X5yTF0dDDQzoIxN0WqMaR0JInR6IBK70jIOoqQGmxeWNBwB1DksPkMZs3aTkHjxzEov+zKPmefsmkz3JOkhwNPewVi0WUHz09PYN+FveQYBSLRXieJ8Ip19N3oA+T758Mv9XHlKVTMj0vKW+kOIVCIfG/3b9lC3YuWIAXvvAFbPL9U48Ivv129K5cqcIbCU4af1nPiUkLm8ds3sTh7OrdhTUvrcHSNUsx54k5uKn9JoxpG4PGOxrht/oVjy/e9UXc+uCtaHuqDY+uexTPbXsO+/bvozmnevl959nDQ3ZFIMm2QCWOhJa8OUmT6KHVqwe9IyDJKkBpsXkjwWH6tirFYdICcHnM5k01zsEjB/uX9xesXBD6Tb/xjsb+b/rffvTbiZf368WbrBmAbQ2ElqsgkGRboBJHQkvenLgNeKy3F/vLrgXQ+I4AKQ7TJCXFYdICcHnM5k2xWIw16Zcu7weT/pyfzsGW3i2pb9lj9IaBAVgQCC0XQSDJ3QKVOBJaGDhxGrB0FaD0WoADCt8RIMVhmqSkOExaAC6P8/amfNKPeste6Tf98kmfyV82joYeHpJBIOm2QDlHQgsDJ0oDVloF0P6OACmOxkGUSQvA5XGW3kT5pl/plr2wSb9SMfnLxtHQw0MyCCTdFijnSGhh4NRqwGqrANrfESDF0TiIMmkBuDx25U3S5f2py6bGmvQrFZO/bBwNPTzkgkCabYFSjoQWFk61Bqy1CuBCi0aOxkGUSQvA5bEE4+CRg1jz0pp4k/69lb/pWw+75Wjo4SEXBNJsC5RyJLSwcCo14KHVq7Fn2rTIzwVgOycmjsZBlEkLwOVxXEa1b/rV3rAXNum7Oicmf9k4Gnp4yAWBNNsCpRwJLSyc0gaMswrgQotGjsZBlEkLwOVxGCPO8n4QBOJM+q7OiclfNo6GHh5SQSDttkDAkdAiUdINGHcVwIUWjRyNgyiTFoDL44AxYNIvxF/ef3TdozS37DH5y8bR0MNDKgik3RYIOBJaJEqsAR9+ONEqgAstGjkaB1EmLUD+HpdO+nMen5NqTz+tFqlzKq28/WXmaOjhIRUE0m4LBBwJLRIlwTm0ejXWfOlL9o4Ah5wsP+De9R6mPDQlNUdCS5acLD2u9U2/0t5+kuV9Jo8tCLhlABYEQksqCPQd6Eu9LQBweZOGU3otwLONjYlWAaS0aOdYEHDPceVxkuX9L/7oi6n29KtpkTqnJGVBwC0DsCAQWlJBoPPFztTbAgCXN0k55dcCrLnsMntHgEOOBQH3HAmPB9yyl2BPP5j09+3fJ3BGXB5bEHDLACwIhJZUEFj49MLU2wIAlzdxOcf37at4LcAzP/xh5lqGEiePIOBd7/Uf5cGgnnu4WsX1uNo3fYlb9ti8qbcerjeOBQFhMZVKIgicOHkCk++fnHpbAODyJg6nfBXg5euu618FkGhApg8mGyfrIOBd72Hez+cBALp2dg0KA/Xaw2EV5nEw6a/YuKJ/0p/w4wnObtlj86beerjeOBYEhMVUKokg0LWrq/8DnmZbAODyJgqn2ipA6bUAFgTccrIOAuPvGj/gZ8EKQRyOhJYsOYHHB9+IPukHx/WLrxe9ZY/Nm3rr4XrjWBAQFlOpJILAkjVL4Lf6qbcFAC5vanHCVgFKy4KAW07WQSBYDQhqeddyeNd7WN61PDJHQotrTumk/7Uffi32pP/0i087uWWPwRtpjgUBtwwg5yBQLBZRfvT09Az6WdxDglEsFuF5Xqp/33egD5Pvn4zmmc2YsnQKxXlJeVON07d1K3YuWIDNo0djk+9jk+9jx+23o3flyop/v1Ao0J9TPXMk/K2l5ciRI6c+0L8LAm+99RaKxSKOHz8+IAgcP368Lnq4/Ni1dxfWvLQGy55dhjmPz8FN7Tdh7IKx8Ft9+K0+Gu9o7P/fwXHNXddg6rKpaHuqDY+sfQTrt67Hvv37nJ8XU+9JcbLo4XrlSGnJ02P1KwLBQ4T8Vj/1tgDA5U0lTtRVgNKyFQG3HJYVga6dXZE5ElqScpIs71/+z5eHftNPoycPBhvHVgTcMgDbGgittEEgeIjQ5//186m3BQAub0o5Ua4FqFYWBNxyGK4RGHbzsFgcCS1RatfeXan29INJ/2dP/0xED5M3TBwLAm4ZgAWB0EoTBErfLTBlafi91VGLyZuAc2j1avTEXAUoLQsCbjl53DUQXA8QrAaUrhLk1cOVvumPXTA21Z5+UEwTFVPvSXGY/GXjWBAQFlOp0gSB0ncL3PvMvSJ6mLzp27o19TsCAAsCrjl5bA2UPkegfKsgix6Ourxfet9+1Em/UjFNVEy9J8Vh8peNY0FAWEylShMESt8tsHbLWhE9LN4cWr0a26dMSbwKUFoWBNxyNA6ipYw0t+y1PdWWak8/KCaPmX5PUhwmf9k4FgSExVSqpEGg/JXDWhrn+L596FuyBNvHj8cm30/9jgDAgoBrjqZBNJj0lz27LNWefjDpaxhEXTDYOEz+snE09LDaIFD+ymENjfPbsmsBuidMSP2OAMCCgGtOvQ6iYd/0qz2KN+7yvoZB1AWDjcPkLxtHQw+rDQLlrxyu58YpXQUovRZg3zPPpNYCWBBwzamHQTTu8r7f6qfa05c+JyaPmXpPisPkLxtHQw+rDALl2wKSerL2pnwVoPRaAKYGZPKXjcM2iErcsrd+6/pUe/pBMfUwwDX2MXGY/GXjaOhhlUGgfFtAUk9W3lRbBXhj/XpRLYAFAdecPD/grm7ZY/IX4Jqo2Lyp9x5m52joYZVBoHxbQFJPFt6ErQJIawEsCLjmZPUBz/KWPSZ/Aa6Jis2beurheuRo6GF1QaB0W2Da8mnielx6E6wC7Lj66v4QsKdsFUBaC2BBwDXHxQf84BsH8eueX/dP+rc+fGvk5f35P5uf+pY9Jn8BromKzRvWHtbC0dDD6oLAgG2Bdb9/twB740RdBZDWAlgQcM1J628w6Qe37MWZ9Bd1LnJyyx6TvwDXRMXmDUMPB8V0TlIcDT2sLghU2haQ1CPtTdxVAGktgAUB15w4/oZ90691y16lSd/VOTH5C3BNVGzeWBBwy9HQw6qCQLVtAUk9kt4kWQWQ1gJYEHDNqeZv3OX90lv2Bkz6J7K/ZY/JX4BromLzxoKAW46GHlYVBKptC0jqkeD0bd2aeBVAWgtgQcA1p1AopNrTDyb99VvX483jb1KcE5O/ANdExeaNBQG3HA09rCoIlG4LvPTKS070pOX8VvAdAUwNyOIvA6d80p/wrxMS7emXT/pM3jBpAbgmKjZvLAi45WjoYa9YLKL86OnpGfSzuIcEo1gswvO8SH+v70AfJt8/GX6rjylLpzjTk5TTt3Urdi1ciO4xY7CxuRmbfB/bb78dvc88k7vHhUKB5vddb5xde3fh2c3PYtmzyzDn8Tn4+k++jrELxsJv9fuPxjsaB/z3NXddg6nLpmL+z+bjkbWPYP3W9ejd30tzTkz+Rj0kelirNxIcJn/ZOBp6WM2KQNi2gKSeJJxDa9Y4eUeA1DnZikA0TtLl/WvnXhv6TT/Pc8qTIclh+sbK5o0Eh8lfNo6GHlYTBMK2BST1xOFUuyOgV+gdAUwNyPTBlOBI3bL35vE3VQ6iTFoAromKzRsLAm45GnpYRRAIu1tAWk9UTvkqgIt3BDA1INs5xeFI3bJX7Zu+xkGUSQvA5TGbNxYE3HI09LCKIFBrW0BSTy1OtVWAww7eEcDUgGznVI2T6pa9VcmW9zUOokxaAC6P2byxIOCWo6GHVQSB/m2BtsrbApJ6wjhhqwBZa4lTWoNAqlv2VsndsqdxEGXSAnB5zOaNBQG3HA09XPdBIMq2gKSeSpz+NwWWrAK88r3vDVgFyEpLktIQBMon/a//5OuxJ31Xt+xpHESZtABcHrN5Yz3slqOhh+s+CETZFpDUU845tGYN9txxRy7vCGBqwCzPqeI3/R9NGLSkH3fST6qnVmkcRJm0AFwes3ljPeyWo6GH6z4IRNkWkNQTcOKuArjUkraYg0CUSb/SN/2py6Ym3tMP05OkNA6iTFoALo/ZvLEedsvR0MN1HQSibgtI6ikWi4lWAVxpkSiWIPD6kdfx7OZnsWLjCixcuTDypP+tR741aNJn8ljjIMqkBeDymM0b62G3HA09XNdBIOq2gJSeY/v2YefChYlWAaS1SHLyCAKvH3m9/5t+6aRf7Xa9sElfQk+1skHUHUOSw+QxmzfWw245Gnq4roNA1G0BCT3BKsAm36d5RwBTA4ZpqTbpV7tdL+6kH1dPnLJB1B1DksPkMZs31sNuORp6uG6DQJxtgTR6ju3bh/0l1wJs8v1EqwASWlxxJINAnEm/0jf9R9Y+kmpPv1xP2rJB1B1DksPkMZs31sNuORp6uG6DQJxtgaR6Kl0LsPuee2jeEZB3A5ZO+nc+cWeiPf3uvd0DJn02b2wQdceQ5DB5zOaN9bBbjoYertsgEGdbIK6e8lWA0msBmLzJsgFrfdOvtLdfa9J3eU5MHI2DKJMWgMtjNm+sh91yNPRwXQaBYFtg3A/H4bmdz4nqqXVHAJM3rhowyfL+NXddE3vSd3lOTByNgyiTFoDLGJvshAAACtlJREFUYzZvrIfdcjT0cF0Gga5dXfjuiu/i1d++CgBoamoacEyfPj22nuOvvlp1FSAOJ0oxNfHrR17HPcvvSXXLXvfebvTu7xU4Iy5vpDgaB1EmLQCXx2zeWA+75Wjo4boMAo9teAwAsGzZMjQ1NWHBggUD/nzSpEloampCd3d3JD1xngvA5E1cTv83/Q0DJ/3GOxoT7+nnfU71wNE4iDJpAbg8ZvPGetgtR0MPe8ViEeVHT0/PoJ/FPSQYxWIRnucN+O++A314oecFdHd3o6mpCcuWLat4YpMmTcK4ceMAAG+88UZFPX3btmHnwoXYPGYMNvk+Nvk+dkybht5nnnF6XlLehHF29+7Gs5ufxbI1y3DnE3fi6z/5Osa2jYXf6g86Gu9ohN/q45q7rsEtS2/B/Kfm45G1j2DdlnXo3d9Lc071yikUCjRapDhMWtg8ZvPGerg+ft95elx3KwLbX90OAJg+fXr/RF+pgqCwcuXKinqSPh2QyZuAU+2bftTl/daftCbe03d1Tpo4Gr9NMWkBuDxm88Z62C1HQw/XXRD4vy//XwDAuHHjKl4LUFrjxo3r3zYI9ES9FqBa5e1N6aQvdcseyyOGtXI0DqJMWgAuj9m8sR52y9HQw3UVBE6cPIFntz0LABWvDSivSZMm9YeFgwcPpn5HAJCtN7W+6UvdsmdBwC1H4yDKpAXg8pjNG+thtxwNPVxXQaBrVxd+uf2XAOIHgb0PPZT6HQGAO2+SLO9L3bJnQcAtR+MgyqQF4PKYzRvrYbccDT1cV0FgyZoluHfNvQAGLvtXq+DvvHX06KB3BJx8/fVEeiTOa3fv7kGT/jU/via3W/YsCLjlaBxEmbQAXB6zeWM97JajoYfrJggEDxG69eFbAcS7WPDwc8+JvCMAkLllb2zb2NBJ/7p7rsv0lj0LAm45GgdRJi0Al8ds3lgPu+Vo6OG6CQLBuwVGto0EgFi3DxYffRS777kn8SpAaYWdVzDpP77x8dBv+qV7+1En/bha4pQFAbccjYMokxaAy2M2b6yH3XI09HDdBIHSdwvse30fgGgPFDpx4ADeeOEF8caJOulX+qY//6n5qfb0y7WkLQsCbjkaB1EmLQCXx2zeWA+75Wjo4boIArVeOVztEcMnDx/GyUOHUuspnfSDW/aiTvqVvukzNTFgQcA1R+MgyqQF4PKYzRvrYbccDT1cF0Eg7iuHAeCto0cT6an1Tb/SLXulk/5Tm56q+U2fqYkBCwKuORoHUSYtAJfHbN5YD7vlaOjhuggCwbbAF+Z/YcArhw+tWYPeO+/E/sWLcfCJJ3BozRocXru2fxWglp4ky/sTfjgh1qRfqZiaGLAg4JqjcRBl0gJweczmjfWwW46GHuYPAqd5g7YFjr/6Kvruuw87JkyI/FyA4Ja9JHv6pZO+xC17TE0MWBBwzdE4iDJpAbg8ZvPGetgtR0MP0waBLVu2YObMmXjbO9+Gc/1z8d//8b/jwXUP4tCaNeip8HTA0jsCKn3Tj3PLXtg3fQZvpDkWBNxyNA6iTFoALo/ZvLEedsvR0MOUQWD+/Pl4+9vfjnPPPRcXXHABzmk4B+/6ozMw9pLGQasA+57tSHXLXtzl/by9ccGxIOCWo3EQZdICcHnM5o31sFuOhh6mCwLr16/H6aefjgsvvHDAnQCf/exn8aH3vheTzvsIOr8wHEu/9RXc8cA3Yt2yl3RPX+K8pBmSHAsCbjkaB1EmLQCXx2zeWA+75WjoYbogcN111+GDH/zgoFsCm5qacNFFF+Hd73w7xk9vrjjpj104Ft98+Ju4u/NurNq6CnuKe0TPSYrDpAWwIOCao3EQZdICcHnM5o31sFuOhh72PM8D03H66afjr/7qryoGgaamJpz+h6fDu9SD91kP3qc8eOd68D7gwXtX/trtsMMOO+ywo+4OqUQhxfj0pz+NT3ziExVDwKWXXgrvNA8v976cmR4XHCYtgK0IuOZo/DbFpAXg8pjNG+thtxwNPUwXBKZMmYJzzjmnYhA4//zzcf7552eqxwWHSQtgQcA1R+MgyqQF4PKYzRvrYbccDT1MFwQAoKGhAeeee+6AEHDhhRfijDPOQEdHR+Z6pDlMWgALAq45GgdRJi0Al8ds3lgPu+Vo6GHKILBjxw4MHz4cf/zHf4wzzzwT733ve/GhD30IK1asyEWPNIdJC2BBwDVH4yDKpAXg8pjNG+thtxwNPUwZBIL6zW9+A8/zsHHjRgo9UhwmLYAFAdccjYMokxaAy2M2b6yH3XI09DB1EAB+/xritKWxcaQ4mzdvTs1gOycmzuHDhwWUcJ0TkxYAePPN5M8GKS2N3khw1q5dK6CE65ykOFJaTp48KcKpiyDQ0NDQf8vCtm3banIsCLjnAEB7ezsaGhpy16KNM3HixAG36SS9xkVCiySHSUt7e/sAj/PWw+SNFCdgNDQ0YMaMGblqYeO46OE0fUwfBCZOnIiJEycCAGbMmBFp4rEg4J4TNKEFAVlOe3s7hg8f3v/fM2bMyPwD7orDomXbtm0DPJ04ceIAz7PWI8Vg5AT9a0FAnlE6N6Yt+iBQ/o0oyjckCwJuOcOHD0dDQ4OtCDjmBJVmVYDpnFi0lK8qMvQxizeSnCBwDR8+3IKAA8bw4cPR3t6emgOQB4GgkUo/uMEEFCrQgoBzDsAxgGrl7N27FwDQ0dFhKwKOOEENHz481Tcrjd5IcBoaGtDR0WFBwBEjWJHNawsxsyAQDIIWBLi0BGVBwB0nuAhI07Iqkxbg9+MLw3UYbN6k5cyYMaM/XFkQkGcEX5KDvg22aqNcQyelx1YEcuAwaQnKgoBbTtoQIKlFaw8DgwfVPPSweZOGU34NhgUBN4zyijI3VivqIADYNQKSDEkOYEHAFScYSCX2/1jOSYohySmtrAdRFwwWTnCBYPmRdPuF4ZykORp6ONMgULp/Z3cNpC8LAtyctN9OJbVIc1i0lF93kceyqgsGIwewFQEXjI6OjgFjbx53F2X+HIHSVGnPEeDgABYEXHDKnyEQHHl+W5XiMGkpvwfbrhGQ57z++usALAi4YpSvvCQNskn12JMFc+AwaQGATZs2pWawnRMbR6KYzolJi2Rp9EaCIzFGAFznJMXR0MMWBHLgMGkB7F0Drjk7duxILwRc58SkBQC6u7tFOBq9keDYuwbcMoB8e9grFosoP3p6egb9LO4hwSgWi/A8T4QjpYfJGylOoVCg0aKRI+Ev2zkxaWHzmM0b6+H6+H3n6bGtCOTAYdIC2IqAa47Gb1NMWgAuj9m8sR52y9HQwxYEcuAwaQEsCLjmaBxEmbQAXB6zeWM97JajoYctCOTAYdICWBBwzdE4iDJpAbg8ZvPGetgtR0MPWxDIgcOkBbAg4JqjcRBl0gJweczmjfWwW46GHrYgkAOHSQtgQcA1R+MgyqQF4PKYzRvrYbccDT1sQSAHDpMWwIKAa47GQZRJC8DlMZs31sNuORp62IJADhwmLYAFAdccjYMokxaAy2M2b6yH3XI09LAFgRw4TFoACwKuORoHUSYtAJfHbN5YD7vlaOhhCwI5cJi0ABYEXHM0DqJMWgAuj9m8sR52y9HQwxYEcuAwaQEsCLjmaBxEmbQAXB6zeWM97JajoYctCOTAYdICWBBwzdE4iDJpAbg8ZvPGetgtR0MPWxDIgcOkBbAg4JqjcRBl0gJweczmjfWwW46GHv7/AQLq21EAdT7yAAAAAElFTkSuQmCC[/img]
Auf den einzelnen Feldern sind Rechenschritte abgebildet. Wenn Sie die Felder in der richtigen Reihenfolge geordnet haben, ergibt sich eine Formel für Koordinaten des Mittelpunktes M.
Übertragen Sie die Reihenfolge der Zwischenschritte in ihr Heft.