Grafische Lösung - Übung

[size=150][i](Sofern nicht anders angegeben gilt: [math]x,y\in\mathbb{Q}[/math])[/i][br][/size][br] [br] [br]
Aufgabe 1. Ermittle die Lösung des linearen Gleichungssystems durch grafische Darstellung.
y = 2x – 3[br][math]\wedge[/math] y = 0,4x + 1
Aufgabe 2. Ermittle die Lösung des linearen Gleichungssystems durch grafische Darstellung.
y = –5x + 4[br][math]\wedge[/math] y = 2,5x – 2
Aufgabe 3. Ermittle die Lösung des linearen Gleichungssystems durch grafische Darstellung.
y = 0,5x + 10[br][math]\wedge[/math] y = 0,2x – 8
Aufgabe 4. Ermittle die Lösung dieser grafischen Darstellung eines linearen Gleichungssystems.
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAV8AAAFgCAYAAAAcmXr5AAAgAElEQVR4Ae19bcxlVZVmOZOepO2kk+70n04m82diYs5bQNL+IPFHQwNT1T300AMolkqJIPBi+YHYg9j2iPBSUMpMA6IilIkfqRejI8SUZSJIjJWhjEwjMkO0LRMQidJ+lSgf9f2xJ+vcd92z975rn/Pc965797n7rpOcOnvvu+7aez3P2s/ddc7d791wzz33uK985Sud5xe/+MVOG/IzS7utN9zjTn/zx+rzLy//qNv1xS93jnGW4/NxRfv139NWRv3lspvnvPJxtzhkbbC8wnF54IEHHJ179uxx3//+992zzz7rqr+8yG343Oc+5+b53PIPn3OnXzE4z33v59ynPzO/8Vx33XXuta99raPrPHNiY5/fHDTudLn7/Oc/7/j8whe+4L70pS+5Bx980C2ddZHbsHv3bveb3/ym83zmmWc6bchPDruPrH7fve69u91ZH/qWu+zO77if/vyXybHmGB+CC60kNmzY4F7/+tfXV6q38dLXOHjMJeQVxWJxyNqQK//miY8DBw44//ztb3/rfve737mXXnrJVSS+jzzyiDty5Ejn+atf/arThvzkslu+4xF3zk3frc8rP/1/3YHfHxTHm2t8bf1+9atfrQVXuqa4afPnvyeXXSl5ZXHI2mB5NT4uR48edXQeO3ZsIL7f/va33cmTJzvPF154odOG/OSyozg+tvsn7txbHq/Pq3f+wL148NjImHONL9Uv3Qd61ateVd8PIvxo9UvXuD3mKOWvL3Yl5VWMqVQ3PmQN0calhLw6depUI75U6TppudxlQ6/nsiNSqP+P7X7WnXfL9+pzeecP3UuHjgfjzjW+VL833nhjLbSMLYkvl0mA6XWu+9eUP9+GyrnsmI94PHE91/jQfi0OWRtQ/LTtSuGjOutit2Hv3r0OOX7/+98jZi6XnR/H7V/7qTtv+xP1ufyZf3EvHz4xHHuu8aH9kvgiB+ovl53PR1s8ucaH9mtxyOyh+GnblcJHseJL6ZISYO1k0PZn4muTnRDQzqtSRKuUOIoW35QAaye1tj9JfFdXV93mzZvrJ6csTb/85S/d8vKyW1lZ4Sbxqj0+1F8pk8TiENNK/cNh0fKqOvsNZd528NMlXgE//6sX/JeTZTQZtO0k8d2/f78744wz3L59+4bjffzxx0fahi96Be3xof5MtDwSvCKKn7ad8eGR4BW1cUb9LYT4Es6+AF9xz/8L7gF7PARFFERtO0l8Dx06NLLK3blz58hqOAhgraI9PtSfTXaJDf3bCcZHv3BG+ajOfuNg5Utv6Dqff/75ThvykcuOJntbDCv/a7/7q5v/2Z31kcccCTCtgNvsc8VB4iuNi8T23HPPdT/5yU8c3XLYunWr+9CHPiTa+u/PFUcXHzzGXOND+7U4ZG1A8dO2K4WP6q8uKf+2g/+5SCtgEmD6JkT8LQjfjsokDsihbSetfGkctFOG7vvSrQe6DbFx48bgNkRqrNrjQ/3RJEEO1F8uO4tDZtH4mAyXhRNfgotWwKmvoflw5kqulPjWY19ZqR+w0QM4WgWTIHcdueIw0ZKZMT4mw6WUvFpI8aXk9+8Bp1bAuSZJm/jSqpdWv/QtB7rlgBy54ihlklgccpZZXk2Gy8KKL8HWJcC5kqtNfPnWA9k89NBDMvtRa644TLQiItaqxsdkuJSSVwstvpQCbQKca5K0iS+Nmb7XS6tfevCGHLniKGWSWBxyllleTYbL0rlbFuuBG8EVJ01KgGM7GepRf5PatYmv/5WzXOND+zXRkjMBxU/bzviQ+aC/AIgc2nxU57zJxJeAlwRYG2zUX5v40rccNm3aVH/bAfWXy84muzyljY/JcNHMq0cffdRde+217gMf+MDwpDbp0OatOsdWvkOcYwHOtRNOEl//Xi/vctNOBm1/mpOESNIeH+rP4hhOkaCA4qdtp8kH/cJELL7UJh3acSyd+2Zb+fpA+wKcayecJL7+GLmsnQza/jQnCcWsPT7Un8XBGRdeUfy07TT5uPfee0fEl9qk4+WXX5aaR9rQeKtz3zIQX3pD16m9U0XbH5HSFQO93tVv7p1wJL4acbCPrninZafFx7TGh+JiccjagOKnbTcuHy+++GL9izYf//jHHe0S/d73vlfPr127dtXCu23btvpKK2A+6TXKO7oFQe+jk376h3xxPqauaLyVrXxHPrjqBloB59oJZytfmRNKduTQtqPJjhza/Wr7W+Q46I9Q+fd1/XJ828F/zS/z7b6uXEB5G658uxzS66jTXHbayZVrJ5yJr5yNpeSVxTEZv+POc/qG0I4dOyYW3w9+8IOOfHUdKL8mvi1IEoj+PeBZ7YQz8ZVJQZNa227cyS6PvmnVHh/qb1Hj+OY3v5kUXlrZkjDTLyKT3Z133pm0pRUy2XQdKB/VOWv3fLsc0uuo01x200quLgHWjtfEV85GbZxRf9PKKznKphUdH2q3qHHQPV7/9oFf/uEPf+gOHz7cgO5cfU/Yt+HyDTfcUL8WGAsVlA9b+QrgcZMPYpsA+3b8XumK2pn4Sujl+/BfVNGSWWha0XzWtlsPH/QQLL71QKtcOughWnzEK2B67zPPPBObiXU0XhNfEb5BYwxiSoBju5RL1M7EV0YQxU/bbj2TXY5AzquUrcUhI7NePuLbD3wLQcKZbkPwipeuZHvw4EF5QFGr5C8yqavVuW+17/lKwFCbBKIkwJKd5BO1M/GV0JP5kCxRnFG79U52aWzUhvarbbfocfROfM8z8U3NkeQkiQVYeyecia9MibYYof4WXbRkNubrQ0S67XDXXXfVoaG3HZ5++ukUFEE7mldL511qK98AOa/SBqIvwNo74Ux8PRK8YhsfnlnyQ9O3oTLqz8Q3Rm5QR/HTthuXj7bv+I7zwI2+7UC+ug403uo/bbUdbgSWdHbtVJnWTjgSX2k8cVvX+Ng+lx1NEh5D2zXX+NB+LY71zQ/mHMUZtRuHD7pPu2fPnuHONd7B5l9vueUW97Wvfa0+P/rRjyZtaScc+SKfHJt0ReMYim+XmtPr1BFy5LIb9xOxKxYkDloBa++Es5WvzAzCB71T2y5HXlkccg5Q67h80MaIG2+8MXiA5j9MIyH266nyTTfdNPK1NGmUaP5Vm95mtx0kAKkNBVF7J5yJr8wIyoe23biTXR5906o9PtTfIsfRdusBFV/17cUmvs2kiEtoUpOdfw940p1wJr4xE4P6OHzIHsJW1N8ii1aIWFhD8dO2Wy8f9NfK6KRNF7Qa/vKXv1yveCXxpdfI5gc/+IGjPzFJ74s3Y4RoNDU0Xlv5NpiNlFAQ2a5LgNlupKOowcQ3AmStiuKnbbfeyS5Hgf+PyuKQEdTkg0Q1Fl9qkw71PylpK18J5kHbepK/TYBRfya+Micoftp2mpOdItMeH+rP4hjNK+mPqdOqVzpQnFG7atNlds9XApraUBBju5QAx3apfk18ZWRQ/LTtTLTK5SPrzwiZ+MqJRa2TTGJJgFF/Jr4yJyh+2nYmvmXzke0HNE185cSaVHzp/bEAozvhTHxlTrRFFfVn4mt8aOhBjKLddogR8ero5Gyz8wUY3Qln4uuR4BXbcPbMJvofi++Hyya+jER4NT5CPLiG4lJtfrvtcCOwpBPdqdJlN+5OOBJfaTxxW1e/bJ/LjkSLx9B2zTU+tF+LY7rzg3Nj0fgYii+rdtuVQEKOXHZ9XqHQChjdCWcrXznLLK8mw6XP84MiQ/ktJQ4TXzmf61Y0GVA7dCecia9MCoqztl0pk93i6FdeLf315fZVM5kS/JN4nMnu3wNO7YQz8ZUZGQdn2UPYivoz0Qpx4xqKn7ZdKXxUJr6cSqNX7aRhf10CbOI7ygW1MH7yq02rtl0pk93iaHLEL2nnC+pv6a+vsJWvT4RfRkFE7XzfbQJs4usj1ZRRnLXtTLQaDvySNs6ov1L4qP7mHSa+fkL5ZTQZELsDBw64zZs3O/8vI6UE2MTXZ6EpIziTtbZdKZPd4mhyyS9p5wvqz8TXZyEqoyAidisrK45E1Rdf6k4SYBPfiIi1KoIzmWrbmWgZH9PIKxNfOa/qVq1JTIK7vLw8svLlrmMBftUfvJpfar1qjY870fZnosXIhldtnFF/xkfIA9dQ/LTtqr+50m47MAnxVQNsut2wZcuWesUb33bw+/MF+I/P+bB7+fAJ/2WxrDE+37G2P5vsPrpNWRtn1J/x0XDgl1D8tO2q/3zVQHyJGDt1MHjqqafcK6+8UvO7urrq6PTv+b7wwgvuscceG8F729173Zk37HV/cuFOd+Gte903HtEZj/FqOFoO9C8HhuLrfxKkytrKr+2PEgw5tPtN+du/f7+7/vrr67+I74tv2xhpBUzie972J1zqe8D8/lS//Dpfc9n1jQ/Gg68oLhYHIxZeUfy07Urhw8Q3zKegNmnS0IqXHp7FZ/zQLejUOfdHr7u8Ft8uAZ50fHG/2v5KmSQWR5wpg7p2vqD+SuHDxFfOq7oVTQbEDl35Usck1v494NQKGOmX/OWyK2WSWBzyJLG8mgyX6vxle+AmQ6grWuOKL42pS4BzJT/ar4mWnFkoftp2xke/+DDxlfmoW7WTv6Wr4CX/e75tAqw9Pm1/NtkDWocVbZxRf8bHkIKggOKnbVf97Ttt5Rsw4VW0wT5+/LjnPV30xZesUgKsPT5tfzbZZY61cUb9GR/94sPEV+ajbkWTWtsuFl8ajCTA2v1q+7PJLieXNs6oP+OjX3xUf7vNVr4yJbr3fKkPdJJI4kvvjwUY/U04tF9tO5vscmZp44z6Mz76xUf1X95l4itTgoslmvyoXUp8YwFGfxMO7Vfbzia7nFnaOKP+jI9+8VFdsCa+RGDXif7GUi47Sq6uGOj1XOND+yXxbYtj3N+EQ/vVtiuFD4tD1gbtfEH9lcLH0gXvtpWv/HnYz5Uvj5VuQaC/CUdCjhzadjRJkEO7X21/FofMojbOqL9S+Fi64D0mvnJq9Vt8aczob8KhSa1tV8oksTjkGaKdL6i/Uvgw8ZXzqm5Fk0Hbru2erz9c6jd+CCf9NTTt8aH+SpkkFoefdU0ZzQNtu1L4qP7uvbbybdIpLGknDepvHPGlEXcJMNqvtl0pk8TiCOcF17TzBfVXCh8mvpxJwhVNBm27ccWXht4mwNrjQ/2VMkksDmFyjPHVSTRfULtS+Kj+7lpb+cqp1f97vnGypgQ4tptVvKVMEotDzhjLq8lwqf7r+0x8ZQjnT3wpDkmAbZLIDKO4mPhOhh+KM2pXCh/VhSa+cmZl/G/Vem47+EHEApxrJ1wpk8Ti8LOrKaNiqW1XCh/VhdfZyrdJp7CknTSov0nFl6LwBTjXTrhSJonFEc4LrqH5rG1XCh/VRWviSwB1negOlFx2REpXDPR6rvGh/ZL4asSReydcKXxYHLI2oPmsbVcKH9VF77eVL3+Sx1cSQOTQttNY+fK4aQWcayccTRLk0MZP25/FIbOojTPqrxQ+qov+m4mvnFrz+cBNiiXXTrhSJonFIWVVvvlRCh/VRdeb+MqplS+5NFe+FButKPx7wLP6TbhSJonFIc8QdKWqbVcKH9XFJr5yZs3xtx3igDj5uwSY7eL3x3XUrpRJYnHEGTCoo3mgbVcKHya+cl7VrdpJg/qbxsqXw2wTYHR8qF0pk8Ti4OwJr2geaNuVwkd18QfstkOYUk1NO2lQf9MUX4ouJcDo+FC7UiaJxdHMCb+E5oG2XSl8mPj62RSVtZMG9Tdt8aUwJQFGx4falTJJLI5oYqxV0TzQtiuFj+oNtvKVM6vAe75xoLEAa++EK2WSWBxx5gzq2qKK+iuFDxNfOa/qVjQZtO1msfLlsH0B1t4JV8oksTg4W8Krdt6j/krhY+kNHxzc86XAu07tnSra/oiUrhjode1+tf2R+M4yjmnthCuFD4tD1gbtvEf9lcLHUHzDzzS5RoKAHLnsiBTkyDU+tN9ZrnwZL1oBa++EK4UPi4OzJLyi+axtVwof1RvXVr4hrHJNG0Rtf6WQkkN8iXHtnXCl8GFx9EsPSuHDxFfOq7pV+8MB9ZdLfGl8/j3gSXfClTJJLA55kqD5rG1XCh9Lb/wH+56vnFplbS9Oxei38yTpEmC2898rlUuZJBaHxG6++VEKHya+cl7VrajIaNvlXPkyHG0CjMZbyiSxODgrwiuaB9p2pfCxdMmHbOUbplRT004a1F8fxJdQSAkwGkcpk8TiaOaEX0LzQNuuFD5MfP1sisraSYP664v4EhySAKNxlDJJLI5oYqxV0TzQtiuFj+qSf7SVr5xa+e5p9Ul8JQFGd8KVMkksDnmGaIsq6q8UPkx85byqW9Fk0Lbrm/jGAozuhCtlklgc8iTRznvUXyl8VJf8d9vhRqRLJ7rjRtuOxFcaT9ym3W+Xv3F3wtEkiccs1bv65ffksrM4+jU/SuGjetOa+MqfbWErTQLkyGVXyidiH1e+zDvdA0Z3wpXCh8XB7IdXm+chHlxDcVl604ftni+DFl9RELXt+iy+hBG6E85EK86oQV07X1B/xke/+LCVr8xH3YomtbZd38WX4pW+BRFDaZM9RmRQ184X1J/x0S8+qi228pUZWYC/5xsHjk5itusSYJvsMcKDOuMnv9q0atsZHw22fkkbZ9Tf0pYb7baDT4RfRkFE7U6dOuW7T5bnYeXLg28TYJvsjFJ4RfNF2874CHngmjbOqD8TX2ZAuKIgttmtrq46ElM6V1ZWhF5Gm+ZJfGn0KQG2yT7KLbW05Yv/Dm0748NHtylr44z6M/FtOBgpoSCm7Pbv3++uv/56d+jQofpcXl52JMZdx7yJL8UjCbBNdpnpVL7E1tp2xkeM8KCujTPqr9ryEbvtIFOiv0Ih4UVWv/MovoRhLMDfeKSMP25voiXPEFRktO1K4aN6s4mvnFnK/z2k1W/JK18G0RfgC2/d614+fIJfSl61J6e2v1Imu8Uhp6B2vqD+huJLxNipi8Ezzzzjjh075vbt21ff8928ebM7cOCAO3HihPvpT3+axJtWvvPMxba797ozbxicJMC0Ap7neGzsxt80cqB6i6185Y9D5ZUvdUIizAKc7NS5WqjbXufX0E/YHHa0AiYBPm/7Ey71ixjzEAeNkSYecuTAmcaF9mtxyCyi+GnbVW+5ye75ypTgSY2SQg/gNm3a5OjadszrPd84JloBk/h2CTCKXy47E62Y2UHd+JgMFxNfGb+6ddLkopUu3eel+7100AM3v57quhTxJdHy7wGnVsCT4hzjqO3PxDdGeFDXxhn1VwofJr5yXtWtaDK02fnf80VuOVDHJYkvxdMlwG34+fTksitlslscfjY15Vx5tfSWm+22Q0NDWNImJfSerpUmvhRpmwBr46ztz0RLzlVtnFF/pfBRvWXFxFdOLf17vvTNB+QoUXwp7pQAo5Mul10pk93ikGdfrrwy8ZX5qFtzkVKq+KYEOBfOaL8mWvIkQfHTtiuFDxNfOa9MfBVwSU2SeAWM/iac9iRG/aXiiCFC/eWyszhixgb1XHwsvfUWu+0gU6J/2wElueSVL2PtCzD6m3Aoftp2JlrMWnjVxhn1VwofFYsvBd515voNLbRfIqUrBnod9ZfLjsS3hDi6+Bj3N+Fy8dEVB3OVa3xovxaHrHEoftp2Q/ENP9PkGiUZcuSyo+RCjlzjQ/tdhJUv80QrYPQ34VD8tO1KySuLg7MuvGrnC+rPxDfkIaihIGrbLZL4EuDob8Jp44z6M9EKpsWwguKnbVcKHya+w1QaLWgnDepv0cSXcPHvAfdtJ1wpk93iGJ3j1ILOS2276lJ74CYzkpGURRRfIqFLgLWTH/VnoiVPERQ/bbtS+DDxlfOqbtVOGtTfoopvlwCj+GnblTLZLQ55smvnC+pv6dLt9lUzmZJ8/x1ZZPFtE2A0qbXtTLTkGaKNM+qvFD5MfOW8qlvRZNC2W3TxTQmwNs6ov1Imu8UhT3Y0D7Ttqq228pUZsXu+E+My6WSP7wHn2gk3aRwxkNqTGPVnccRMDOooftp2Jr4yH3WrNtioP1v5NqT4ApxrJ5yJVsOHX0LzWduuFD6qrbcO7vkSQF2n9g4PbX9ESlcM9Lp2v9r+SHxLiEOLj9w74bTiYE618wX1Z3HIGofip21Xbb3NHrj5n+Z+mSYLcmjb2cp3FHVaAefaCUeihRzaeaDtz+KQWdTGGfVXbd1h4itTYt92mBQX7cmeayecdhzo5NS2szjkjNbGGfVn4ivzUbeiIGrb2cpXJoVw9u8Bz2onnIlWmg/5lbBVe36Uwkf1to/ZyjdMlaamnTSoPxPfhgO/xPh1CTDb+e+VyqhdKZPd4pCyIN//cKvL/4eJr0xJPlJMfGVGfLFsE2DfTvY0aEXtTLRkFFH8tO1K4WPpyjtMfOXUMvGdFJdpT5KUANtkl5mbNh9yr/rzqJQ4lq7+uInvrJIGFQVb+cqMSPhJAizZSR5Ru1Imu8UhZYH+hwOaV0vv/KSJr0xJPlJMfGVGUkkdC7D2TjgTrfH4iK1TvK3XrhQ+KhPfOAWaunbSoP5MfBsO/FIbfr4Aa++EK2WyWxx+NjXltrxqrPQXY0PxpQF0ndo7PLT9UXJ1xUCva/er7Y/Et4Q4Zs3HtHbCzToO5l47rywOWeO0cUb9Vds+Zbcd/E83v0yTADm07WzlK6OO4EwrYO2dcCRayIGMj/zksrM4ZBZz8TFc+crDCltzDRLtt5TkMvEN845raB5o74QrJa8sDs6k8IrmlbadPXALeQhq2mCj/kx8AxqGFRQ/svPvAU+6E85Ea0hBUBiHj+CNiQrqrxQ+lq652247JHIh238PTXxlRtDJyXZdAsx2cm9NaymT3eJoOPVLaB5o251m4uvTEJa1wUb9mfiGPHANxc+3axNg3477kK4mWhIqdu9aRgXHxTZZpBDM+GDExFcmBRXL2C4lwLGd3KtzJr4yMih+2nal8GHiK+dV3aqdNKg/E1+ZFBQ/yU4SYMlO6rmUyW5xSOziK1U0X1A7E1+Zj7oVBVHbzsRXJmVSnGMBRnfCmWhNh4/YK8pvKXxU9rcd4hRo6mgyaNuZ+DYc+CUNnH0BRnfClTLZLQ4/m5qyRl413vCV9FB8aQBdJ7pzI5cdJVdXDPR6rvGh/ZL4lhBHX/kYdydcX+PgHEHzyuKQNQ7FT9tuKL6+cqfKRDZy5LKj5EKOXOND+7WVr8wiih9iRytgdCdcKXllcUw/r6gHJP/IzsRX5qNuRUHUtjPxlUnRxhndCWeiNRs+UH5L4aO66i7bZCGnFv4JhiYNamfiKzOC4jeOnX8POLUTrpTJbnHMLq/knsJWE98Qj6A2ziQO3piooP5MfGUAUfzGtesSYBOt2fIh99a0lsKHiW/D6Uhp3Ek84mCdDSa+MnDafPj+2gS4lMluccw+r+QeB60mvi3o+JOzxaz1BvvKyoojMaVz8+bN7sCBA22u6tdMfGWINPjwPcf+UgJsouWj1pRj/JpXwpK2XSl8mPiGeRLUJk2affv2ORJfPqjs17k9vpr4xogM6pPyEXuV/EkCXMpktzjiDJhdXkk9L11lP6Ap4VK3SZNTMkbtSIyR1a+Jr4Ty7B6AxgL8jUfK+AqjiW/evIp7r8X3tvt3uINHDsavjdRRkcll1/fkWl1ddcvLy+7QoUMj2PoNJr4+Gk15lnnlC/CFt+51Lx8+0QwkUZrl+PwhoP32fX4sWhy1+J5/+wXu4jsucSTCD3/r4fqvOBFRdq4fg8cee8z9/Oc/dwcPHnSnTp1y+/fvd5s2baqvJ0+edM8991wSXxJfw3792Gtht+3uve7MGwYnCTCtgLV8mx/Dcii+Wz79VkfnFZ+9yj3w+IPiShj9ZMplRwmNHLMeHwnvGWec4ei2A3LYyldGada80ShoBUwCfN72J1zqe8A82hzjo77Rfvs6P8bFr5Q46h1uu/bscjfv3l6Lb5sIoyTnsusjKSS4JLwkwOhh4isjlSuvaAVM4tslwLnGh/bbx/nhM71ocQTbi3/4/L+0ijAKTi67viWXf6vBT7KusomvjFDOvPLvAadWwLnGh/bbt/kRs7xocQTiy2CkRHjX/14Vb0fw+/iKgqht17fkogdsJKT+ad924Cxprtp5oO2P86pLgLX71fbHcTTIyyXtfrX9lRKHKL5MSSzCb/zkltZ7wvw+bbBRf30nhfHputrKV0YIzQNtOz+v2gRYu19tf34cMsKDVu1+tf2VEgf0PV8WYRLftnvCTKg22Ki/vpNy/Phxhqj1auIrw4PmgbZdnFcpAdbuV9tfHIeMMv4AT3t8qL9S4oDEl0n6Pz/+59Z7wmyHgqhtVwopJr6cSeFVO19Qf1JeSQKM+stlJ8URIjyo5Rof2m8pcYwlvgwOr4R5FRx/RY3tJGL9Nm27Ukgx8fWzpClr5wvqL5VXsQCjvwmH9qttl4qjQXhQ0u5X218pcaxLfJmslAjnejBXCikmvpxh4VV7EqP+2vLKF2D0N+HQfrXt2uLwkdbuV9tfKXEM/7AOAdR1pn7DiG5H/ONXbnR0T5jOi+++xF228wpHIvyvv/7XpN+Uv3gcqB2REr9XqqP+ctmR+ErjjttyjQ/ttxQ+uuIY9zfhUPy07bri4PzS7lfbXylxDMXX/+RLlYmctoNXwrkezBEpyNEVB/vIZWcrX2YgvObiA8krWgGjvwnX5zgI8VzjQ/tF+JiHOJam8TNCuR7MlUKKiW8oulxDJ6e2HZpX6G/CaY8P9YfGgfrLZVdKHFMRXyaFV8KzejBXCikmviy34ZXzKmwdrWnbjZNX/j3gvu2EGyeOUVRHW7RxRv2VEsdUxZfpSomw9oO5Ukgx8eXMCa/o5NS2GzevugRYe3yov3HjCNEfraH9atuVEsdMxJdpi0WY7g23/RU1fh9KXimkmPgy8+EVzQNtu/XkVZsAa48P9beeOEIGwhrar7ZdKXHMVHyZOhZh7QdzpZBi4suZEl61JzHqb715lRJgtJqcqHwAACAASURBVF9tu/XGEbLQ1LTHh/orJY4s4sv0aT+YK4UUE1/OkPCKTk5tu0nyShJg7fGh/iaJI2RiUEP71bYrJY6s4suk8Ep40gdzpZBi4itN9XxfgZo0r2IBzrUTbtI4YlZ4/sbtcV3brpQ4eiG+TFZKhNEHc6WQYuLLGRFetScx6k8jr3wBzrUTTiMOnxEUP227UuIYii8B1HVq71RJ+VvvjjkipSsGej3Vb/zeXHYkvvFYpHqu8aH9lsKHVhy5d8JpxcG5iOaBtl0pcQzF1/9ES5UJdOTQsuOVMPpgjkhBDq3xcV/a/mzly8iGV22cUX+aeUUr4Fw74TTjIGZQ/LTtSomj1+LLUw99MFcKKSa+zHx41Z7EqD/tvMq1E047DhQ/bbtS4pgL8WXyeCWcejBXCikmvqHoco3zgOupq7bdNPLKvwc8q51w04gjxYHfPg98+ONNlbXjmCvxZVBSInzb/Tt6/RtzKHkmvsx0eEXx07ablmh1CfC8xBGyNFqzOEYxoZa5FF8OJRbh82+/QHXHnHbSoP5MfJnh8Irip203LfGl6NoEeJ7iCJkKaxZHiAfXqivvdBummVzckXTVIoVFmMSXb0m0bVvW6pdj0vZn4svIhldtnFF/054fKQFGx4faTTuOkK2mho4PtSsljiLEl2netWdXr39jDk0uE19mNLyi+GnbzWKySwI8j3GEjA1qFoeEinNFiS9PEl4J8yqYrv5KWDsZtP2Z+MrJqo0z6o/zSh5V04r6S9nFAqy9E25WcTSIDEqpeNdrV0ocRYovk5oSYXTHnHbSoP5MfJnB8Irip203y8nuC7D2TrhZxuEzN898TDOOofgSQF2n9k4VbX+UXFIM690xpz0+1B+JrxRH3Ib6y2WX4sPieL6V32nthDM+ZI3LNT+G4usrfKpMkwY5ctl1fbLzShjdMZcrDlv5ylmWi4+uvOLRao6PVsDaO+FyxEHYaOJC/kqJY6HElycJumNOO2lQfya+zFR4RfHTtss12bV3wuWKoxQ+tONYSPFlEHkl3LcHcya+oehyjXnjeuqqbZdTtPx7wJPuhMsZR4orvx3lrZQ4lq68a/6/58sErpeUlAjnejBn4suMhld0cmrbrTevwtE3tXHH1yXAqL/ccTQIyKVFi8PE18uDWIS1f2MOTS4TX48Ur4jip23XB9FqE2A03j7E4dE5Uly0OJZK2OHGLGolF4twrgdzJr7MaHhFJ6e2nVZecTTrHV9KgFF/fYmDcYivixaHiW+cAV4914M5E1+PBK+ITk5tuz6JliTAaLx9isOjdVhctDhMfIfUjxY4GXglPKsHcya+o1xQC/Mhv9q0atv1TbRiAUZ3wvUtjoaxQQnlrZQ4THzjDPDqcTKkRFj7wZyJr0eCV4z58F4Kitp2fZzsvgCjO+H6GIdPHMpbKXEMv2pGgXeduXaCoP0SKV0x0Ouov5TdtHfMkfjOIo64j1S867WbFR/rHR8ab1/jGHcnXF/jYP7mnY9x4xiKr/8JlCqTc+TIZUfJhRxa4+OVsPaDOVv5yixq8cbeUX+zzqtxxkcrYHQnXJ/joJhL4GOcOKp33GHf8+Vkj69oMmg/mDPxjZkY1FE+tO36LlroTri+x4HyVkoctvKV53ndiiYD2/FKeNIHcya+MimMs/xq06ptNw+T3b8HnNoJNw9xNCymS6XEUb2jgF+yYJr6QkpKhNEHcya+zGh41RZV1F9f8ipEo6lxHF0CPC9xNJHJpVLiMPGV+a1bOalbTFrtUiL8wOMPtv7Qp4mvjPikfMReUX/zNNnbBHie4oi58uulxGFfNfNZjcro5OyyIxHe+k+XubNuPAf6jTkT34iItWoXzvwubbt5m+wpAZ63OJjP+FpKHPa3HWJmvbrWJF5dXXUkqNfd/H7oN+ZMfD0SvKIWH+wS9TePk10S4HmMg7nyr6XEYeLrsxqV0cnZZreysuKWl5fdfffd56hMR9ftCBPfiIi1ahvO/ju07eZ1sscC/I1HZvtVTObE+GAkwquJb4hHUNNMGlr9svhyJykR/tO/+LPWe8L8fs3xkU9tf/MqWowvX+c5Dl+AL7x1r3v58AkOK3nVzgNtf/PMhw/60lVrf8+XArJTF4Onn37aHT58uMabxffEiROO2n2s6Sfvr7l3mzv/9gvq8zVXvtZdfMcl7rb7d7iHv/VwYOu/z8q6fJWK57a797ozbxicJMC0Ai411nmKayi+viKnytqfYNr+CHjk0O4X8cfi2zY+XgmT+PJ3hf2fvI/fi/RL78ll12c+xsGlhDhoBUwCfN72J1zqe8CcX7nyBe23BD4I64pXvgx82xUFJ5ddn0lBxJex/8M/fzX0YC4Xzmi/feaDsF60OGgFTOLbJcAoLrnsSskrE19WPOGqmVzjiC8/cOOVMK+C6eqvhDXHN44Yof2WMklKisO/B5xaAaP85rIrhY/q6o/b33YQdLdu0kyu9YgvjyslwuiOOc04xhHpUiZJaXF0CXCufEH7LYUPE19WOOGKJgNqJ3QhNvHKN34xFuFcvzGHxlvKJCkxjjYBRvnNZVcKH9XVd9vKNxY5rmsn19GjR9l16zUlvvwmFmHtP2WpHW8pk6TUOFICrJ0H2v5K4cPElxVNuGonDeqvS3x5qNp/yhIdH2pXyiQpOQ5JgFF+c9mVwke1bCtf1rKRa67kQsWXx8cr4b49mCtlkpQeRyzA6G/Ccf6NTJyoQduuFD5MfKNE8avaSYP6G1d8ecwpEc71YK6USbIIcfgCjP4mHJrP2nal8FFds7byJYC6TvQ3lnLZESldMdDrucaH9kviO0kc0/6NOTSOUvhYlDjG/U04NA+07Urho7rmE/bAjVeO8ZUEEDm07da78o3HyivhXA/maJIghzZ+2v4WKQ5aAaO/CaeNM+qvFD6qd37SxDclEGgyaNtpiS/HlevBXCmTZNHiQH8TTjvvUX+l8LH0zk+Z+LJIxVc0GbTttMWXx8cr4Vk9mCtlkixiHP494L7thCuFj43vusfENxZdrrNocT111bablvjy+FMirP1grpRJsqhxdAmwdt6j/krh4/R3f9rEl0UpvqLJoG03bfHlOGMR1t4xV8okWeQ42gRYO+9Rf6XwccZ77jXxZTGKr2gyaNvNSnw5XhZh7QdzpUySRY8jJcDaeY/6K4WPje+ylS9r0MgVTQZtu1mLLweu/WCulElicTgnCbB23qP+SuGjevd9tvJl8YmvaDJo2+USX46DV8KTPpgrZZJYHIOZEQtwrp1wpfCx8b2fMfGNRZfrLEZcT1217XKLL8eZEmH0wVwpk8Ti4IwIV8C5dsKVwscSiy8JSNepvVNF2x+R0hUDva7dr7Y/Et8+xbHeHXOl8GFxhNqQeydcKXzYbYfmQ32kRAKIHNp2fVn5xrHzShh9MEeTBDm08dP2Z3GMski3IHLthCuFj6X32AO30cxaa9GexKi/voovA4U+mCtlklgczHx4zbUTrhQ+Tr/WvmoWZpRXQ8VS267v4svx8ko49WCulElicXiTwitSHsQP4V4+fMKzGBQ5X0ZeiBpQu1L4OP19Jr5RCjRVNBm07eZFfBmplAjfdv8Od/DIQTZLXrXx0/ZXymSfVhxdAmx8yKl/+nU77dsOMjT4T4trJ9e8iS/jF4vw+bdfEPzaMtvFV238tP1NS7RiHOL6PMXRJsDzFEfMgV/XjuO099tXzXx8g7I22Ki/eRVfBo9FmMSXb0n4P3nPdnxFccllZ+LLTIXXmI+UAMd2oZemhtqVwkdl4tuQH5fQZNC2m3fxZRx37dnlbt69fSjAJMSSCGvjp+2vlMk+izgkATY+eEaE1+o6W/mGiHg17aRB/ZUivjzZeSXMq+BYhFFcctlxHF5qiMVc40P7nVUcsQBr74SbVRwxySjOqN2SrXxjiJs6CqK2XWniy4imRBjdMaeNM+qvlMk+yzh8AdbeCTfLODh36YrmC2p32vvXHrjRG7pO7Z1c2v6IlK4Y6HXtfrX9kfiWEEeKj/XumNPGGfWXiiPmCPWXy27WcUxrJ9ys42CetXk77e/t2w7+h1tQJtCRQ9uu1JVvjCWvhNEdc9o4o/5osiMH6i+XXY44aAWsvRMuRxzEvzZv1XX2Pd/kvNIGG/W3KOLLwKM75lD8tO1Kmey54tDeCZcrDu28qt5v4ssaMHLVBhv1t2jiy7jwSrhvD+ZKmew54/DvAU/6m3A54xgRCaGB81l4KWgy8Q3gCCsoiNp2iyq+jH5KhHM9mCtlsueOo0uA0XmUOw7O09QVjcPEN4XgFO7xoKQsuvgyJbEIa//GHMpHKZO9D3G0CfCi8WHiyzNduKLJoG1n4huSwSKc68FcH0QrRCSsofnXlzhSAjxvcYQsNDU0DhPfBrOREgqitp2J7wgVdUOuB3N9ES0ZFfwpfJ/ikAQYnUe541hdXXU0R/ft2zekhMrURq+hcZj4DuEbLaAgatuZ+I5yQS2MM6+EZ/VgLvdkl9FoWhmXpkUu9S2OWIDRnXB9iGNlZcUtLy+7Q4cOuQMHDrjNmzc7aqMD5cPEV87TsUBEwUbtTHxlUmL8UiKs/WCuD5NdRmTQGuOSsu1jHL4Aozvh+hAHCy6tdEl0SXypjQ6Uj6H40hu6Tu0dHtr+iJSuGOh17X61/ZH4lhDHrPiY9o65WcURc66dV32NY9ydcH2JY+fOnfWtBpqvDz300HDOorxVf28/HZ9aKNRgJl/0XqBJgxyona18ZTS78OOVsPaDOZrsyNE1PvaRy67PcdAKGN0J15c4ePXLtx/G5dfElxETrrkmiYmvQMYY/53TfjDXl8kuo4L/N7fvcaA74foSB91uoLlKJ91+4APVDdtezIgJVxREbTsTX4GMMcSX+eCV8KQP5voy2WVUyhFf4s2/B5zaCdcHPvjbDXQl4T3jjDPc/v37a4o4/1J8cXv1Pvv1YsZi5IqCqG1n4jtCRd2wXpxTIow+mOvDZJcRGbSiuMxLHF0CnDsO+oYD3WrgbzdwnW8/oHyY+LZkNQqitp2Jr0zKpDjHIozumMs92WU0mlYUl3mKo02Ac8dBouuvdIkJWvVSG72G8mHi2+TwSAkFUdvOxHeEirpBC2cWYfTBXO7JLqPRtKK4zFscKQGetziIqZtuusl9/etfb0hzzpn4BnCEFTSpte1MfEMeuKaNM/pgbh4nO2PmX+cxDkmA5zEOEl6a174AV9faV838/AzK2pMd9WfiG9AwrKD4jWvHK+HUg7l5nOxD0LzCvMYRC/A3HpnPr/7FAly91/6er5eeYXHcSRy+e7SG+jPxHcWOWlD81muXEuHb7t/hDh45KA/Ka11vv56LoKjtb17Fl0DxBfjCW/e6lw+fCLCSKtr4afjzBbh6z720Gh58V82uhoPlwAb3h3/+avfvz/8P7jVXvnZ4/se3vcb96V/8mfs3/+7fDr/baVjNdr780esud39y4c76/ONzPuxe9QevnksuzjrrLHf22We76t32VTPpQ7Nu0/ik852j/mhSIwfqL5fdPK+0CH9eCZ9/+wWOb0lc8dmr3AOPPyiuhHPhjPY773wQJ7QCPvOGve687U+41PeAee6guMzSLlj5vvset6EEUgjwUuIw8eXpE15nOUn8nnft2eVu3r19KMAkxJII5xof2m8p82Pb3QPx7RJgFJdZ2fnCS/lVmfj60ywsz4qUsFdX/1cqbpPqucaH9lvKZOc4eCXMq+BYhFFcctlxHFIu+W25xof2S3H494BTK2DU3yzsYuElvKt32crXz7ugPAtSgg7XKrbylVCZ/gM3udfR/1GlRBjdMZcrr0oSX+KqS4Bz4Sz1K37P18Q3NeXyTXYTX5kTKaklS227lGjFIozumNMeH+ovFUeMIeovl50fR5sA5xof2m/1zk/ZPd84+biOgojasd+uayni+4tf/KIr1Pp1FL9cdl1BsAijO+b6GgfHmWt8aL/PPvssD7W+pgQY9ZfLrhbfxx57rA6C/0AETX46+Q9FcKS5Bon2638i8phpr7X/596oHfWnYcd/81PCk8cYX0sR31OnTtXY8x8giePkugbO7Iuumv5o7Dwf/F8r8PvjMrpjTnN8aLw0BziOeeaD4j1y5Mjwp3v4d9QkAc6BM8oH2dXi++Mf/5jK9URhoWIh5vo4TnMFHYsvTxw/hlnGEWNI4+lKfBpfKeLLE74r5lz50tUvTWx/7F38sT9eCfflwRz90Zfrr7++/r2xOCcp3+KD44jb43ouOxoHcUHzhMWX2mIBRn8TLlcc1TWfdBuee+65GNe6TpPHX/3mGiTa73e/+9163JxgPFlyiS+terds2TL8O5+UKF2rJwqgBPEl7Cl37rvvvkDApERD+c1lx2Pu4i8eX0qEcz2Y4zhoPhA/qSOOo292xAPlFs0lX3xpnL4Ao78JlyveavmTbsOTTz7pTpxotuvRfxfpYPGi8tGjR3v/22ff+c533LFjx+qx8z8UAyXbyZMn3SuvvFL/lxT9jaX12pH4E4a04iDxJRHm+qZNm+p2wvull16qx0Pk+yeJr19Pldc7vmn6O3z4cB0r488TneKn16S++xYH8eLn0fHjx+twKBZejFBbzF8qjmn/xlyqX8Ka/ovO85mC4IUJxZLipM2fz98s7XhO8YKGPwjpGnMx7m/CzTIOH79q+RNO3E7FwVGwfNAbkSOXnTQ2Fl//tVmNL8aQxJjF1x9PXC5h5csxsfhyXbrOio+4b7Tf+IMz9sP1Ln+8Es71YI7ykXKr639fXXGg8U7DjvKJTtIlaeXLfdIKGP1NuFzxVld/gvjYEPw3hEiK/1gwBZVrkHG/DDyNOz7j/07lFF9/5Uv4LZr40uq+BPEl3mg+0LxoO+I8TdnmejDH44kXBdzOVzSOWdsRD3zvmjWgjRP0N+FmHQfjXF19d7jypcmS+mTMNUi0Xw7Kv+YUX0qQRb3nSxyUIL6phYifY1xG85TteCU8qwdzPM6uRQCPj+1T11nbkTbFiy2qpwSYxuffA+7bTrilq+9yG/h+77x+InJy0H3p+Mgpvv79NRoXjYXOroMSCjlmnfw8JrTfeRffLpFiPPiK4hLbpURY68EczWu+V01jJRHz6zx+vsbj4/b4msuOxoGsfHl8XQLMdnF8cV3bbunqO92GX//613U/JAzxJ4tP0osvvhiPR6xrDxL1F3/VjAaXU3ypf04SwtXHUgRurdHEV0YHzQMtO2mllfpfIY140n5jEdbcMefH0haDRhwxe5PiEvujB2w8r1Kr3jiONgHWHh/qrxbfp59+Oo5PrKNOc9lJ4isFkmt80liktlLEt+8f1mgeSBxJbai/LjsWYe0Hc9KYpbau8fF7ctn97Gc/4yG0XuPxpQQ4tks51bZbuuoO2148K7D9ry+l+qT2UsSXvsKIHNpJXYq/XA/m+o7fo48+iqSV+D8RSYBzxWvi20JjLlJKEd++/08E5Td3HLwSnvTBXO44WqZa/dKs+IgFONdOuI228k2nBJoM2nYmvjIn2jij/voiWikRRh/M9SUOmV38nrlGHL4A59oJNxRfSsSuM9dOELRfIqUrBnod9ZfLjsS3hDhK4aNvcax3x1zf4ohzHJ1vWnHk3gl3mq18U5/D+CcxJRFyoHa28pXRRPHTtqPJjhza/Xb545Uw+mCur3Ewtl3xsp1mHLQCzrUTbuOV9sCNOR25osmgbWfiO0JF3aCNM+pPc7JTIGi/qB36YK7vcaDxaseRayfcae8w8ZVn+hQmCZpcJr4yJSh+2nbak117fOyPV8KpB3PzEofMftM6jTj8e8Cz2gln4ttwOlLipB55IWrQtjPxjQBeq2rjjPqbxmSXIwxb0fHFdikRvu3+HeJP3oe96q/M4/HF/XEdtZsWH10CjI4Ptdv4jn+y7/ky+fEVBVHbzsQ3ZmJQ18YZ9TetyS5H2bSi40vZxSJ8/u0XiD953/SYF+dUHPH4pslHmwCj40PtTjPxjalt6iiI2nYmvg0HfkkbZ9TfNCe7H19cRsfXZcciTOLLtySu+OxV7oHHHxRXwl3+eJy57KbNR0qAtePdeIWtfDmXRq7aYKP+THxHqKgbUPy07aY92eVo9f/7v2vPLnfz7u1DASYhlkRYGz9tf7PgQxJg7ThMfFOZbw/cksigSTiLSSINEh0faldaHLwS5lVwLMIoLrnsZsVHLMDaO+GWrrBvO0jzt27LlVy28pUpycXHrCZ7HLV2vHEcKRFGd8xpjw/1F8cR48Z11F+bnS/A2jvhKhZfGkDXie5AyWVHpHTFQK/nGh/aL4lvCXGUwkfpcax3xxyaz9p2s+ZjWjvhKvueL39Ojl5JAJFD285WvjLq2jij/miyIwfqL5ddVxy8EkZ3zPU1DuZKc3y0AtbeCWfiy0wJV03yyD3qz8RXIGMM/FCcUbsu0eLRov5y2aFxoDvm+h6H9vi0d8INbztwArVdtYPR9ocml3a/2v5MfOUs1MYZ9VdKXo0bB6+E+/Zgbtw45GxqWtE8IDv/HvCkO+FMfBsORkrjkDLyZqEB9WfiK4BnK18ZlDFwWa9opUQ414O59caRAhCdl2zXJcBsl+qP2018GQnhioKobWfiK5Axhsho85F7sstoNK1ovJPGEYuw5m/MUTSziqNBblBC+/Xt2gTYt4v78uvV5fZVMx+PoIyCqG1n4hvQMKxo44z6m1S0hgGsFdB+te204mARzvVgTisO5mW9OKcEGPVn4ssMCFcURG07E1+BjDFWRtp89GWyy6jkWzHmejDXJz4kAUbzz8Q3ldEZJ7uJr0wKmtTadn2a7BIyaLzTioNXwrN6MDetOCRs/bYUzrEAozvhTHx9dKNyCuzIDL5Xhfoz8Y0RHtRR/LTt+jbZY3TQeKcdR0qEtR/MTTuOGF+ut+HsCzC6E26J7/mS465Te6eKtj8ipSsGel27X21/JL4lxFEKHxaHrA2pvJ/2jrm+8jHuTrjqcvurZvzBNnIlAUQObTtb+cqoa+OM+qPJjhyov1x2s46DV8LaD+ZmHQdzj/BGK2B0J5yJLyMrXBGw6W3adia+AhlTwBnlrc+TfZz8yxWH9oO5XHGg+YLuhKvebitfeaZnnOwmvjIlaPJr2/V9sqPx5o6DV8KTPpjLHYecnU0r8eHfA07thDPxbTAbKaFJrW1n4jtCRd2gjTPqbx4mu4xY2NqXOFIijD6Y60scIbpNjfOqS4BNfBvMRkoM4sgLUQNqF70tWTXxlaFBcda2m5fJLqPWtPYtjliE0R1zfYujQXhQ8vOvTYCrt/9P+wHNGDyu+yBym3RF7VZWVtzq6qrkImgz8Q3gGFZQnLXt5mmyD8ESCn2Ng0UYfTDX1zgY8jj/UgK8ZOLLkI1eYxBHLQYtiB0JL4mqie8oigh+9K5cdvM22UcRHrT0PQ70wVzf45DyVBJgE99UpipN9kOHDrnl5WVH4msrXxlsKVkly1x28zjZJfzmJQ5eCacezM1LHDEHsQBXb7/dbjvEIHFde7Kb+DKy4VUbZ21/8zrZQ5Sdm7c4UiJ82/07xJ+8j+PVzgMNf74AD8WXiLFzPAyefPLJ1v8Knzx50r3yyivu+PHjdV6w+B4+fNg99dRTSbzp9oRxMR4Xhle5eNFP3l9z7zZ3/u0XDM+L77jEkQg//K2H526ubLt7rzvzhr2uuuxjtvKNPzG5jnzSHThwwG3evLm+n0ui6Z8ktv7B4uu3SWXygRzI+MhPLjsSROTINT60X4tDZhHFT8uOV8IkwnxL4orPXuUeePxBcSWs1S9Hr+mPVsAmvoyscEXBFt4qNpn4irBk+3BA+TXx7RdvtBK+eff2oQCTEEsijPKby87EV86ruhUlhW4vIIeJr4wSinMuOxPffvHGfPBKmFfBsQjnyhe03yW77SAnFrWiIKJ2Jr4y1ih+uex4ssujb1pzjQ/tt9Q4UiKM7phD8dO2M/Ft5s5ISRvskQ4SDXbPVwZGmw/UX6miJaOsv+hAcUbtUnzEIozumEP71bbbeNlH7YHbrJLw2LFjqa6CdhPfAI5hRTv5UX+pyT4c2FoB9ZfLblHiYBFGd8zl4sPEN55BXj0XKSa+HgleMRcfiyJaDHUunNF+UT7QHXNov9p2p73NVr6ccyNXbbBRfya+I1TUDSh+2nboZNfuV9vfosbBK+G+PZjb+LYddttBnur57n2Z+MqMaIsR6m9RRUtmoWlF8dO2Wy8fKRHO9WBuKL4EUNeZ+s2m+H257IiUeCxSPdf40H5JfKVxx22ov1x2pfBhccjaMK95Ne3fmENxWbKVb/NJHpdI7JBD285WvjLq2jij/ta70pKjyPc/KosjZIRXwrkezFV2zzckxK+hk1PbzsTXZ6Epa+OM+jPRajjwSyh+2nbafOR6MFdttXu+fj4FZe2kQf2Z+AY0DCsoftp22pNde3yoP4tjmEpBgfHjlfCsHsyZ+AY0hBUmJWwdrWnbmfiOYkwt2jij/ky0FouPlAhrP5gz8ZXzqm5FJ6e2nYmvTIo2zqg/E9/F5CMWYe0dcya+cl6Z+CrgYqIlg4iKvrad8bE+PliEtR/MmfjKfNSt2smP+rOVr0wKip+2nYmW8UEIaD+YM/GV86pu1Z7EqD8TX5kUFD9tOxNf44MQ4LzilfCkD+aqS+3bDnJmeWAnDdZeYFK07Ex8ZSS1cUb9mfgaH4RAnC8pEUYfzFVbbxtsLybHXSe6cyOXHU2Srhjo9VzjQ/sl8S0hjlL4sDhkbUDzWduub3ysd8fcUHzlz7awlQQBOXLZESnIkWt8aL+28pVZRPHTtislryyO6eYVr4TRB3NLl66tfOVhha3aSa3tr5TkMvEN845r2vmC+islrywOzqTwiuYBaoc+mDPxDXkIaijY2nYmvgENw4o2zqg/E60hBUEBxU/bbl744JVw6sGciW+QTmFFO2lQfya+IQ9cQ/HTtpuXyc44pa4Wh4yMdr7E/lIibOIr81G3xiCmTLXtTHxlO+FiCwAAA1pJREFUpLVxRv2ZaBkfhACaLym7WIRNfOW8qltTIMZv0bYz8Y0RHtS1cUb9mfgaH4QAmi9ddizCS1tvtV+ykFNLD2z230UK25n4MhLhFcVP287EN+SBa9o4o/5K4WNp6y0mvpxM8RVNBm07E9+YiUFdG2fUXymT3eLoV14tbV0x8ZUpsZXvpLjYZJcRREVf28746BcfQ/ElortO7Z0q2v4oubpioNe1+9X2RyvfEuIohQ+LQ9YG7bxH/ZXCx1B85c+EsJUEATly2REpyJFrfGi/dttBZhHFT9uulLyyOPqVVya+Mh91q/YkRv2Z+MqkoPhp25loGR+EgHZemfjKeVW3aoON+jPxlUlB8dO2M/E1PggB7bwy8ZXzqm7VBhv1Z+Irk4Lip21n4mt8EALaeWXiK+dV3aoNNurPxFcmBcVP287E1/ggBLTzqrr0ZvuqmZxa+mCj5Jn4yoyg+GnbmfgaHya+cg4MW0uZJCa+Q0qDgraoov5KySuLI0inYQXNA207W/kOKRgtaION+jPxHeWCWlD8tO1MtIyPaeSfia+cV3Wr9iRG/Zn4yqSg+GnbmfgaH4SAdl4NxZccd53oDpRcdjRJumKg13OND+2XxLeEOErhw+KQtQHNZ227UviwbzvIH+p1Kwkgcmjb2cpXRl0bZ9QfTXbkQP3lsrM4ZBZz8WHiK/NRt+YixcRXJiUXHyZaxgchoJ1/Jr5yXtWt2mCj/kx8ZVJQ/LTtTHyND0JAO6+W7Hu+cmJNA2yUPBNfmRMUP207E1/jYxp6YOIr51Xdqj2JW7oKXjLxDeAYVrT5QP2Z+A4pCAooftp2pfBh4hukU1jRSJpDhw655eVlR4JKJ5Wpre0w8ZXR0eDD94z6K2WyWxw++00ZzQNtOxPfhoORkgbYq6urjk46WIi5PtLhWoOJr4yMBh++Z9SfiZaPWlNG8dO2K4WPpUvtZ4SabIpK2klD7kl4u1a/Jr4REWtVbT5Qf6VMdoujX3ll4ivzUbeikxO1I6crKyv12dJtfXui7XV+De03l51NdmYqvBofIR5cQ3EpJa+G4ksB2TkeBk8++WTr109OnjxZ32o4cuRInV/79u1zmzdvdgcOHHBHjx51P/rRj0TMaeVrXIzHheFleM1bDpD4/n9cHGpD8ahzNQAAAABJRU5ErkJggg==[/img]
Aufgabe 5. Ermittle die Lösung mithilfe eines linearen Gleichungssystems.
In Badewanne (I) befinden sich bereits 80 Liter Wasser. In jeder Sekunde fließen 0,1 Liter Wasser dazu.[br]In Badewanne (II) befinden sich bereits 20 Liter Wasser. In jeder Sekunde fließen 0,2 Liter Wasser dazu. [br]Die Wassermenge y Liter nach x Sekunden lässt sich jeweils durch eine Gleichung darstellen. ([math]x,y\in\mathbb{Q}_0^+[/math])[br]Der Zufluss beginnt zeitgleich. Zu welchem Zeitpunkt befindet sich in beiden Wannen die selbe Wassermenge?
Aufgabe 6. Die Lösung eines Systems linearer Gleichungen ist gegeben.
[br]L = {(4|–1)}[br][br]Finde ein passendes System linearer Gleichungen in der Form [i]y = mx + t[/i]. (Eine Zeichnung kann dir helfen!)
Aufgabe 7. Die Lösung eines Systems linearer Gleichungen ist gegeben.
[b][br][/b]L = {}[br][br]Finde ein passendes System linearer Gleichungen. (Eine Zeichnung kann dir helfen!)
Close

Information: Grafische Lösung - Übung