Grundkompetenz: FA 1.7, AN 3.2, AN 3.3

Auf einer Teststrecke werden Messungen durchgeführt.

Die Teststrecke beginnt bei einem Stoppschild. Die Messergebnisse für ein Auto auf dieser Strecke sind in folgender Tabelle angegeben:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAoUAAABxCAYAAACjtdnyAAAgAElEQVR4Ae29iVdTWdb+3//J29+ut7QsZ+YpCiKDyCggCMqgCIoKzoiKEqAcSgVLUBQ1gArOEzIpDggyiBAUAQHDkLnprvV29a+nqlXQz2/dBJKbkGCwgJLc7Vp3mdx5P2ffsz/Z+5zLH0D/SAFSgBQgBUgBUoAUIAU4r8AfOK8ACUAKkAKkAClACpACpAApAIJCcgJSgBQgBUgBUoAUIAVIAYJC8gFSgBQgBUgBUoAUIAVIARAUkhOQAqQAKUAKkAKkAClAChAUkg+QAqQAKUAKkAKkAClACoCgkJyAFCAFSAFSgBQgBUgBUoCgkHyAFCAFSAFSgBQgBUgBUoBRgGYfkx+QAqQAKUAKkAKkAClAChAUkg+QAqQAKUAKkAKkAClAClCmkHyAFCAFSAFSgBQgBUgBUoDKx+QDpAApQAqQAqQAKUAKkAKMAjSmkPyAFOCIAl0fPuDOrdu0cFiDkgcPqf053P7M8/+opIR8gOM+UF5WZjTqERQalYY2kALmpcCpEyexLnwttsZvoYWjGqwJCUV0ZBS1P0fbn3n2VwcGITZmI/kAh30gwNcP//3vfw0GOIJCg7LQSlLA/BTYtzcJ53PPQ6EcpIWjGoQEBePhgxJqf462P/Ps8xwc0dTUTD7AYR/43z/+PwwNDRkMcgSFBmWhlaSA+SlAUEgwTFBIPkBQSD5AUGh+8Z0sIgUmrABBIQUDgkLyAYJC8gGCwgmHTzqAFDA/BQgKKRgQFJIPEBSSDxAUml98J4tIgQkrQFBIwYCgkHyAoJB8gKBwwuGTDiAFzE8BgkIKBgSF5AMEheQDBIXmF9/JIlJgwgoQFFIwICgkHyAoJB8gKJxw+KQDSAHzU+DLhUIFOqoEyEhcj7CAAASHxSBhfxZu1feZ1WszRE8uIEPwChKjr8KQ4lkeH5deyKBQsj8bD2Kix+eRkf/KZJ2mEwqlzTdx/EAKTt15B6lRm3tRee4QDh7ON9kG83ilkgKtVSWo7lBOu93TB4UKNN84jpQDp3CnVWHczo9PkJtyEHxBrfF9jPqP8Wfjy/UTCdpe3EVhXh7yr5fhVYd82u0mKDS/+E4WkQITVuDLhEIlWgs3YamVF7YdFeB26WOU3b2KrF1BcJrvjIQiLVBIWy4gblUaKiQzMRAo0Z6zGpbri9BnNMD14mLYXEQKxFAo2Z+N2avE++xgWMYUmxxUphMKxWV7wPt/f8Qs93TUSA3bIGs7j7A5f8RX36w32YYvN9gbttHg/Uqe4qCzA3Y+lE673dMHhTKU7XbA1//zFVbwa438GFKiLXcN5v/PHzEv6uq0a2GwbYw+nxNoX2PnkDQgL8YZDu6R2Lk/BUmbguBs5Yr48w0YMHbMFKwnKJxw+KQDSAHzU+CLhELJYyTzbLHlxke9gKCAMC8C1tYJuNOr7oylr7+Hv20C7oknoXOego52/ABjChQqIWp/i/Y+xj7zgMKlVm7wsFqCfRWG4EeBxpP+sHR1x9K5XIBCObqFDXj2qAgnNrpg7p9sOQCFPNi6usGOtw8Vhp5b2Ruc8l0EdzceFpo9FCrQ/EMwbP1P4hVLC1FVGlYuDsW51unLGhMUml98J4tIgQkrMGEolLTjcX4WMg4kIznlGM7ffY0e+SiQyfCm9Caq3svQ8ewKMg/vx/7DWSiu/QiZUonuhlLkn+Ij5dBxXHgoNJ4d685D2Bw/ZLYYKC/13cU+7/XIaZDh/dObyM+MhfPCIBy+VIiiJ+81ECl+9xSFJ/nYv3c/0jKv4mk7qxwjaUHZjWdok/Wj6f4FHD2YjP2HTyL/8XuINWA4aosCoqaHOH8kBcn7UnFSUIV3ellJcXs1in7IQErSAaSfvIIq9rWY80ne40lBJtKSk3EoIxvFL3tGSqdaKBR11aIok7nfA0g/fRM13aPBQI7m0iKUqbQwAIX9QpTmHcehpGQc/l6AyrditH3hmcKlDtuRmbQM9lvuQKTRe8SHpDXgu9kg7mQqvOfpQqGo8cFIOxzGiUuVEA6M+h3zvwztL4pxJj0FycnpyCx4ivfsTKSkEy+KslV+e4CficKqTk2WauB1KYoq3uqVsxVorShGyWuJqmzf+KgYFUIZPrwsRlZqMpKS0/HD9Vfo1vi++l4095icjpzbryGSCFF2tQLNMva9sj7LO3E7Yyvi4zYjPi4SXovtOQGFvMRMJLvYYtutscNBJNV8eFrF4tQhLyzSgcI+NN47r35eU07gcvlb9Ov4zwz0AXknzgUvwLqLPZq+S/VDUiZEpp814m8y/sfylyn8TFA44fBJB5AC5qfAhKBQVAm+ly08YtJxVnAVBee+w2Z3K3gerESvqrPqwfk1DojamYDwmFTkCApwnh8NZwt/pP2QjLDwffhBcA0FZ5IRbG2D9YI2yAx1cpKnSFk6Hz6HK9GhF3S1HaQCjUXfIXlLAGy/dcP6PclIK2iAQqlER8lh+Nq6IjolG/mF+fjhQARc7QKQUc7A6SAUXRcQbheD1L1BCIxLR47gKvKzUxHtYo/AjCr0sGzZeCgJwQGbkJ5dgCuCHKRGLoOj/xE8/qjuqCW1pxFi54oYfi4KCgXISgoBzyoEZ+rUECrrLMXhlXZwizyMbMEVXDq1D6EODog49xpipRoKFwcnYJvfauw4mov8/FykRyyBxfIUVIzJDupCoazjPpI97OAVl4Hc/Cu4eDIJ4V7h4O9a9UWXj5c67MbDmmPwsYiCQG/8XH/pHjg77UZJzTEWFCrRWpQAVyt3xKVm42LeaRyKXAZ773SU9zDtIEdtVjAcl21A+tlCFF7KQnKwA2yDs1HHgKG0DqeD7OEWnY5z+VdwOTMZofbWCP2hAZKRNhhbwhejKGYxQrI7oZB34mzwAoRs3YZVwTtw7FwBCs6lI4q3EB4a31dAeHUbltv7YfuxPBTm5yIjzh9BuxIQOCcCgn4TArusAUe9HLkBhTtLUHPUGzaR+XrPuARlu3lYuvMRao6woFDehqJtLrB1iwX/h0u4mHUI0S428ONXolv1vM5QH5C/x420ZFysZf1oZeyRvsBhVx72ljFjiU3wnUnYh6DQ/OI7WUQKTFiBiUBhlyASlgFZOlkPSd0ReNttx31V6aMH50NmYa7vSTRoMiP9uBVvhVlWW3FrBKQYcGvLDcWi4HN4bwT6eh6fQoTjXMy38UT45v04kXcXT4X9YyByTPm49yF2OPKQcOsDa18l2oo2gbckCWVMcO66gLBvvoHbntKRgKLudGXv8rHexhPp1UwH3YPzoXMwd9lelKjAY6Rjlr+HIMoWXvwaSJRyPD/kBue9lawM4wBKdvJU6xTKftxPdILz1js6ga//RRq8Fkchv0sNhXNmr8SRl6xS6kAlkpxskHiXWccGQfZnMR4x10m4hw8sDaUteYi2moWFX/CYQgYKH/W/Q06wBULOvGW1Uy9ubraB++Fq9NezoLD7JuJtXLD3Ua82QMo/4PomR3jxqyGRViN1+RIklbMCaF8pdjvxsK9CBsnzVHjwklDOyvD2luyCs9M+VEi02VrdcZ36UDgLc72O4CWrxNdfngRna/XQBVnHFcRYeyK1aoB1j124scUes74mKNSCDTOmkAfezlL0tZ5F6OJgZAtHs+KDUHy8hS3WbuA/l6D+qBYKu6/Hw37pHjzS9CGDkHXcQLyDJ9JeyKEwFx9QwZ0CzZei4Oiagsc62fCphUOCwgmHTzqAFDA/BSYChX2ttahq7GEF8UGIKvbDde56XFFlQhgo/Bb+J4WsUpwcNWmeqjKQOpuo7tgGSnZiiWcGatklPv1fu7KPaCy9gtOHEhHl6wzLWXNg77UJJx62aUp/+lDYe2MzbLyOs6B0pCOV1iLdww6JdyVqKJzthjQV/LE7WgkeJjqMDIBnbPkG7ir4Y+8ziP4HO+DknoaXUiVaskNg6ZqIwtrRkvAgpKJOtHYMQNF3E/GW3jjeoFcGl/egtqQMdT1y1USTeYE5aGOBHQOTgnXzEZbLlJTYIMj6LC7BDjt38A3YcG+rNRZ96VAoHsSHgvWw8TqqzuYpmSAvQJSlH042KiBlQWFvUSxsArLQoqPRIMSP98PVIx0vxa3ICV4M94QrqO0a1VoBUfs7dPQNQtZyFqGLlmN7QR26Rn+syPrwvvUDek3OFH6L1dkdOr6v6M1H1Lw1ON81iJ6CaFgEnEar/j1WJMN5NkGhISgcUPagMMoKPt8xGVvmGVOi43IkbHxPolGmYEHhAIo3WiIws1VXf6UMj5Nd4MWvhUJuJj4g/4hnZ9bD2W4NTlezfmDo941T8J2g0PziO1lECkxYgYlAoUIpRvPDXKTv2Ii1AT7wWemDwNVecPiWDYXzEJXP7szkeJWxAo6JD3Vm0g0wZUKPT0ChXscn/fgatzPCYT9nGVIqmNm4g9CFQgXenPCH/Za7emONmIAjQfFGCwT/0A4ZkymcE4a8bl3YUygVaD7pD+vYm+hnMoUhcxF+QX+yyyCkLZlYtTgON5hf8VIhbvGj4Gm5ALbLArE+kY+cu29U5XTpm5MIsN6GO0Z/7auzVBZjZh+zslTGoLDrPMLmRkAgGmtD0/e+X3z5+BGTceu9iwQ7Fxx8wmT4lGg5EwybNefxTj7IgkIFmr73wdzFLvDz8YU/e/F0wqIFm1TtIGm5jbRId9jMt4ZbQDR2pJ7FvdejfihH8800RLtZYZGVK4KitoOffR+NqvK8qZnChYi5qvY5DeD0FyN2UTBy2mVoPO4D2823x/idrP0sVlP5WJs9VWozhczMWtGdBDg6H8QTJosrb0V2kCXCc99DpmRBoawZJ7y/gbWzj277+/hipeN8WMTdVJ1/pvuA9H0Zjq9bAkffZBSpxrLqP9tT+52gcMLhkw4gBcxPAdOhUI66rCDYO8fgeGEl6tol6l/tnblYM58FhaHzEV3ADp5qKHRKLDERCpVoL0iA387rOqVdTSBW9qI41hLOSY9VJVtdKFSi9XQgrGOuG5jE0oeCiAUIy+1SZwrnBOJMG6tspQJQBeq+84KdCirVWc8gBiL14bT+KLyttuE2G/bk/Wh9WYL8E7sRYrcIPvynkL09g6DFsSg2Op7MBCAxBoUfL2Pd3BDkduoHCjlq0z1hMQMyhcx7FyuTneGUcB+9UmY8nTVir6gH3GszhUoIs1bBYm0uGlqEaNZbWoRMtk+rgay3DS8fFODkzmA4LVyJdHY5V6mE6G0tHgpOYneQAyy90lHVZ6wNPuLimrmsMYWLxoFCueo1QIvW5Y+MR9Xej7TpBPwICo1CoUL8BPuXOmD73QFI6o7Bx2ojrnYx+rGgUP4WpwMWIvLc6zHt39zSCiGTlZ/RPqDE+4dpCHJ0wfoT5Wgbr3rCspNt82R8Jig0v/hOFpECE1bAZCiUNeF7bxtsvcUGvkHVeC03dvn4N0PhIHqvb4KV3Q48VGVytAFW3fH1qTJ+y/Y/NQCF6pLiMidmzJrecSImK+UOPjP+iMkUzrLElpv6Mx+7IIiwQvBpZpwbA4WzYbP51pgZsh2CSNisOgOhtA3X9m1GZhVrLJtyEAOPD8DVficUkirsX8rD7ke6minEpdjj5In0GqmR9xSakCmU1iLN3QGJd3UDIjMp4uLaeV/+mMKRsXmSV0ew0nIDBPcPYrn9dtwbaXMtFA6CGWrAW56K53rBUvwiC3EJl/G6pQj747JQxRozyAAnU1rk7ShB69VkxJ96xhr3OQiFuAoHljpgV4kU3XnhWBiahw/sgDtQjr0Os7FaM9FkPChUqp4Dd+s4FKuAZtT3FGg6FYBvaUwhC9p0M4XMJCGmkmCzPh/39y8DL/HBCOSzoFApRckOR3gcrtYMG1H3BTK8yIzF9ostkL2duT4gqkyFt30Qjj8RsXQa9aHp+5+gcMLhkw4gBcxPAZOhUN6Oc8Hz4Z1RqymRybqe4kT0MljPXYuLqlIsMznjt2YKB6Hoq8R+l/lw3SJAbQ8rmycXofbyNrjO80DaMzWIyYRZCFwci6KR9xYqZE04E2yDlftLtZM7ZJ24t9sN9uF56kkyDBTOtsLSkAMo0cx+VeL9nV1YbhuDK+3MNdVjCm2cQnHgoXbSiqz9Hna72GFjYSdkSinK9/LgEC1AswZIZGjKXQf7lcdV2Y7GH1bDzvMgHmmu04+ak6vhFJCJOqmxLJUJUKhUoCk7BHZeqajUvL5GBmFRAlY52MyM8jEDYbJWnAlcCHsbK7geUIM+E/DZUKgQPwff3QahmbXarGDfK5xebQ+/o68gETMTc+wQc1moBT9JM86vtYHvsUYMMBNCbDdA0KKFd3HTBURYe+N4vQKSZ4fhtngd8oSj4xGlqM9eD1eLBSZmCpVQyN8hP9oWDmu+R4lwANL+DjwX7ELgKm+4fkNjCrWZLH0oZIZjZGP1AhvYW7ogRfMDiw2Fgxh4yscKqxBk1Wh/BPXWnMYaOx8cq5FDMVN9QNaMzABHxF3rGlOR0Go2PWBIUGh+8Z0sIgUmrIDJUKgcRM/j7xFmZwnngEhEh/nD3SUIqXce48waayxefnhkxu4kQKFyEOKW2+CvdYHFXGss8/BD8Cp/eNouwCJeGA7dYAf/Gpzwt4ClowdW8ytUv7Rl7Y+QsWYJHF2DEBUdiSAXe7iuPY6yzhHAZKBwXiTO3EzFGldPBEdswPpgNzjywnGsbHQijRpwo364Df5qN3itikRM1Gp42C3BuqMVmhm/sq4KHF/rDDsnP6yLWIvAZXZw9IhFzvN+9a9+eSdK0sPgbLccqyOisXYlDzzvPShqZmY4/xYoZIDqPe4cDMQSe0+ERW1AVLA/AjecREnuBtjNiPIxE+zUkwsWfe2Fo3WjUKYHhUz2tV6ABA9bLFkZjg2RoVjp4ACf7YVoVMG4Eh/KjiNyqQ2cfdciKjwAbrb28NqYg+fMjwV5D8qORWCZFQ/+4ZFY5+8KBztPxGVXq7PA8k7cSfKEpYUbwqJiEBXsi5BdhbicyEOoiZlCVQDva8S1wxsQ4OIIRwcXrIo7hdL6cwidG4VC/cw1Oys5+plTr6Qp1Q4nkX+AIGI+5qw4hrrRiUDs8rFKHynqLyfAy8YJvmHrER2yAjw7b+zMbxr5ITBDfaD7EtbN+gpz5szFgm/1l8WIEehXM6YOEAkKJxw+6QBSwPwUmAgUqgKfuAtNL6pQ+awJHazXc0zVr1pxtxA1TypRVvoEL970aDNBo4FU9b8cos5OtH/UZoKYMUk9wlo8rniKmtY+3V/hKigcCdTiD2h89gSPq4Xo1gQkpuNlZz2l6Gh8gcrHNWju0YKL1mYFRO8a8KyyCtVNXZpMqnb7IKQf36LmSRVevOlCv94MVfZ+n/NZ3NWM51U1EIpYWVUdfcYPJNP5Z+4+xz7tMRK8r3+GivKneNWmV5Jn7JX14V29up2aOse+9Fcqeo86VVs3o4M9HlSlFTPe8JXKX161abNR2muPr6FioB11NULWi9zV+zNZSHf7nSiZhmfF5Hs14BvT92fuPqGjgXvTsWugE/VVlSh/Uo82Q6BNPvDZJWiCQvOL72QRKTBhBSYMhZ/qtGfCdjYUGr1fNhT+xkBm9BpfxnlnDhR+GXrpQMpo2/YUI9bCBUmPRl6QzqyXf8DtbTzYx98aMwHF4DlGz/U7/D9joPB30MbktprhPkBQOOHwSQeQAuanAEGhMdAgKDQ5GH7JgXra7k2B5qs74WPHg39UAnbtTMD6lfaw9dyLm+8+L4M7nfoTFBrrByayfmb7AEGh+cV3sogUmLACnIRCpQTdHSKDZV52IO7v+YDuMWXGiQSJmbEvZQonsZ3621D96A6Krt7AvSohRJM8VIDtn5P5maCQfICgcMLhkw4gBcxPAW5C4SQGgGnLRE3dPRMUTp22kwluU3kugkLyAYJC84vvZBEpMGEFCAopGBAUkg8QFJIPEBROOHzSAaSA+SlAUEjBgKCQfICgkHyAoND84jtZRApMWAGCQgoGBIXkAwSF5ANTAoVvmprwqraWFtKAfGCG+EDi1m1IPZSKkoePaOGoBiFBq3E66zS1P0fbn3n2PZa7oyC/kHyAwz5gb22D4eFhg4mFPxhc+4mVzMn8VnqD6WBoIQ3IB2aGD6zyC8AqP3+Eh66hhaMarFkdguCAVdT+HG1/5tlnfIDJGFM/wN1+MMDXF//9738Nkt5nQeHPP/+M2V/972e/TXsqZ1bRuSk1Tj5g2Ad2JG7H9aIigx0BreSGAuvCwlFbU8MNY8lKgwq48Jagv7/f4DZayQ0FJr18TFBoOOgSjJAuX7IPEBRyo8Mfz0qCwvHU4cY2gkJutPN4VhIUmsH7xb5k2KB7mxkwTFA4XjfJjW0Ehdxo5/GsJCgcTx1ubCMoJCikUj/5AAgKudHhj2clQeF46nBjG0EhN9p5PCsJCgkICArJBwgKx+slObKNoJAjDT2OmQSF44jDkU0EhQQEBIXkAwSFHOnwxzOToHA8dbixjaCQG+08npUEhQQEBIXkAwSF4/WSHNlGUMiRhh7HTILCccThyCaCQgICgkLyAYJCjnT445lJUDieOtzYRlDIjXYez8rphcKexziXcgAHko0sB47hepPik5Ay8Owi+BerP7nfhGe+il/gYuplvJBM74zRKbOHYGfyfcRMNeXyRJOh/+tGXelt3LpThvqen2D4Xf7jdaPmsY2gcAhyYQ3a/8pVDwDMHQp//nMbnt+/iZv3KlHf9Vf8+qlHd/jvkHZ14kOn7tIt+bvZ9hPTC4WialzNPIVTJ8cu3+/0h8U33jheK/9kIO/JC8eCtfnq/WStOB8ThLQK2SeP6ypMgM/uu+g1Ftg/XsK6byMg6J9eKNSxx9i90fpPtu+EfwSQphpNuQmFQ5CVH4CfnSui9qThKH8X1rnYI4D/FH/mIBdwHgp/acHR5U44WPvzp1DBbLebLxT+gp4b2+DusBKb9h/BscM7sdbZDiu2X0f3OM09JDqLoMVO8FnprfpLbcxfa2OW4PSn+LeZesH0QqGxINxTjoPuNgjJqseAsX1Y62W9nRC2D4xA4Rt872OHxLtSTYAzDAdSPEx0gM+RRkhZ59LZV96PdmGncWg0dtxvXK9jz288l449dK5P+MT0wv+X3DZchMJh5S1ssvPByeZ/aLr34Z8a8N0KByQ8+IvZZgI0xup94CYU/oqfpN14V/cIFxLcMO9PDgSFZvgXTYbE+VhnE4K8LhYB/lOITB8rRF+V6T0J2q//KkuE594XYB2l3Wimn35/KJS/Q2GMI5ZuKkabnBWkRU24l3sMh5KScfi4AOVCiSbAS5rLca1MCFn7c9wQZCGOtwirUwQoKHqq2YcdgJn9CwXZ2OI8H6uSL6PwVg0+sK81Ck9SIcquVqBZNgiF+A0eXauEUNKDl9eywN+XhAP8M7hR8xGy0f31/5e0oOzGM7RJPuBZYSb4ycngZ15HbbcSCrkIDSUFyExNQeqxPJQ0izX3OmoPc88Dr0tRVPEW4q5aFGXysX/vAaSfvoka5hz616PvpMkk+QD3oHAI4rwQOGwpwU86nfswfry9EXZrr0LJsWwhJ6Fw+C94dno3dm3fgV2JsfCzdCQoNDsoHMZfr66D5frb+JvOsz4EyYXVcNjxWGet9suv6Djph6jCP3PqB+LvDIUSvPx+Few8U1Ep0gKh7G0xEp2t4RnDx5m8izidEoXl1j5ILxepIGC03Cp9XYzvkrYh0Gou3KP2Ipl/xQAkKNFRchr7E1fDcdZSROzehwOnyw1DIat8LGs/h5D5q5GwxR8hiceQKyhELj8SzgvccKhiJEupH5C7LiDcLhK7t4Yh9lAO8gXnkR61BDa+aTiTFIp1e3+A4EohspOCYG8VDcFbNeiN2qNQKtGesxqLgxOwzW81dhzNRX5+LtIjlsBieQoq+rQaESCSFpPpA9yDwn+hNN4SEYVjM4JDkjyE2uzEk/9owwMXPnESCtkNO9SDHL8lBIVmCIXKyixk3PigN4bwV7w7vgKuhxrYXsD6/HfcjVuB9FcStFbewMXssyi434CBf7J2McOPvyMUKvHh/h4stwnHuUb2OMKPuLHJFq67S9GjgS4lOorjwfNIwwvpILQQNQiFzLTysbg8Cc4e6aiRjgMT+lD49TfwyahllbQlKN/Lg/22+6x1rPN1XUDY198g4MRrbYm69za2Wn4F2y23tfbIO3A+ZAFCcjpVWUetPWoonDN7JY68ZJXDByqR5GRjQomcdS8a7WjdZMKTuZ6Lc1A4LMWlYCvsKDdQGPr3Q8TPD8fVQW6lCgkKCQrNd0zhWHobktzGZkdPHGs20Acwu//SjCOuDvAMDMGmfd/j3NlTSIl2hbVTLK51Gjlm7GVm3JrfDQqlzZcQZbsU22+pwUgTbPuuI85iFbJa9Mqlkirsd/ZE+kv5Z0ChEsKsQNjH30H/eLCkD4VzgpDzXvc+RIJILAq9gC5D52GgcI4fTjWzZlBLXyHDYz42FLKzi1KU7HDCyvQ6SJRsyFVD4bzAHN1SurIfgnXzEZbbYyATStCn8R1DbULrTPIZzkHhkAhnAxyR/NxA5/6fx9hlFYLLEoLCGRfRfssNU6bQ7Gcfq91jGD+9LcAWZydEX2rHv4z5zD9rkLU5DY8k7DnK/0JHbijsA86im73a2Dlm4PrfBwp7nyFjpTX8M56PmdQhbToBv9kWcPX2hb8Pe1mBJfMWYvN1yWdAoRg34qwRmt1hfDwgAw/6ULhgA67pzUTuu7YRlkFn8d7QmEQGCudGooBd5pXW4ztPe+y4z8r8KaUo28WDV5phKLRYX4Q+HZgRoyhmMUKyO00K8ARJBMoT9QHOQeGwDIJQSySWGYDCf93HpvkRKP5xBvbov+GWKVNImUKzzxQODaI+ZyOWOwYho7T38yaQ/PspkuwDcE409Bueti/30OmHQnknbm5dAoeIy+oJHTrwMwiZ8DQCF0Qgt0GI5hb95S06+tiZNRPLx9Jq8N3dcOjpJ15bow+FCz8DCiyDgM0AABwtSURBVOdFoZANkioodMCOB6ZDoSVBIcGv3nMxUcib6P6cg0L8jMeJ1gi7KB0ziFz1GgqHJFQb4MUvtyv/7XdGUEhQaM5QODxYi8zQpfCMO4+GwU+n+X5WdkD48f/G9A/4tQ2nvFyR0fTLb3/ovsAzTDMUytCQvQb2y/bgfpduWVYTxMSl2OXgBv5z9jjDQSgk1cjamIhLbxQTzxR2XkC4VSyK2Rk8Q0GXoJBgzJBfcGAd96BwGH++Fgn76OvQHTo4DFlBOOxj7+BHblWPQVBIUGi2UPiPNzjly8PanBb83UQQ+//ux8E6VAC5Xj8wPHgdGyzX4ZqZvsx0WqGwp+IQvKxW4cRL7etlNDCoCbxSPE31gF1wFmo0EDeAmqwQOHofU00U0U7MGIRC/hZZARaIK+o3CjTisr1w9sgYf5IJc32CQqMajm0nKtGakybcg0IAf6vCviXLkFShxGgh6FdJCbYvXYZDNaaGDhMjzAzYjaCQoNA8oXAI/XkhcEkoHf+H3rASj1LXIyGvVfW0Dv9Yhp12jthyQ6R9UfW/unFriwtck57qvd5mBjzgJt7iNEKhBHe2WOLrP83Ggm/nGlkWIerCByjEjRBs9YS9ozfWRUUhzNMRTl47UNCoLv/qQKFShurjAbBe5IQVgekGoUbadBZhFgvBW+aJrQK9iS0aGCUoNCfIIVsmBu2chEIM46fmPGxydYRn6EbEx4TA3dEdCQXvoH2dtYk9qRnsRlBIUGieUPgTbq//BrNnzcPCefPHLNbx99RP71Avcv1nwW7Ps5GnWd0/xLvaYMnKddi0cS38ljgjOPkOus31z5kAmEYonFiQYoJ6f3sjqioq8eRVu97Ei7HnkvR24X17r0EoVAGCWIT29h70jvdKGjYg0mfjWpI2ZqcNN6FwpO8f+jvkH4RoFnZB/o/RnKEZUN4ETeA8FE5QL3Pc3Tyh0PSW+vXtSWw53qJ3wC/4SdKJ1rci/PXferVkvT3N4esXDYWU7RkLv6QJaTIVPsBpKDSHnnwSbCAonAQRZ/gpOA2FQ1Lc3bMFlzo/PQllhjfzuLdPUEhZL7PLek0FNJn7OQkKx+0nObGRoJATzTyukZyGQvyMf/6T20DIOAdBIUEhQSH5AAgKx42VnNhIUMiJZh7XSG5D4bjScGYjQSEBAUEh+QBBIWe6fOOGEhQa14YrWwgKudLSxu0kKCQgICgkHyAoNN5HcmYLQSFnmtqooQSFRqXhzAaCQgICgkLyAYJCznT5xg0lKDSuDVe2EBRypaWN2znpUPjLL7/g21mz0dDwmhbSgHxghvhAXMxG5JzJhuijiBaOahASHIzbt25R+3O0/Zln35nHQ83Ll+QDHPaBb77+GsPDhl+98wfjLGl8C3My9+VucOYtoYU0IB+YIT7g7rpc1VbLXZaBFm5qEOjvD5clS6n9OfwMrA4KxrKlzuQDHPYBLw9Po4D3WVD4888/Y/ZX/0slSSpJkg/MIB+g2cdG+0HObKDyMWea2qihVD42Kg1nNkx6+ZigkF6ubO7v9DNH+wgKOdPnGzWUoNCoNJzZQFDImaY2aihB4QzK5pgjjJBNX8aPCIJCo30kZzYQFHKmqY0aSlBoVBrObCAoJCikMi/5AM0+5kyXb9xQgkLj2nBlC0EhV1rauJ0EhQQEBIXkAwSFxvtIzmwhKORMUxs1lKDQqDSc2UBQSEBAUEg+QFDImS7fuKEEhca14coWgkKutLRxOwkKCQgICskHCAqN95Gc2UJQyJmmNmooQaFRaTizgaCQgICgkHyAoJAzXb5xQwkKjWvDlS0EhVxpaeN2mg0USpse4MK1anTLleh6VoTzd99AanKwF6PqQjoEL+VTCkgDzy6Cf7F6Sq8xKbN5pQ24mnEMRY0KvXtVouNRNg6l5KKyR3/WrBwN144i8867Ceiuf46p+q5A88XdOFDcqWeP+nrShvPYmXIXXeP5i/gFLqZexgvJZ95j/zPk8QV4Kf3M48e7t0nYxuXZx0P/14260tu4dacM9T0/wfC7/I13ouayhaBwCHJhDdr/ylUPALgLhf+GXPgE92/cxIPKBvT+xF0fMBso7LuyAYs8j6JOJserDE8sjLqKPpODZQ/Oh85HdIHYIDRMCmgpB9GTF44Fa/Mn8RoKtOTGIphfCbHJtpoAJfL3yAmaC99jTXqA9xH5kYvw7SwLbCru17VD1ohjXhaIvdqnu34y7+szzyXruoltPom4wwbZrqtI8NqD232DUMjf4nxEINKfS43f+8dLWPdtBAT9Juhn6D67LiBsXhQKP/d4Q+ecxHXchMIhyMoPwM/OFVF70nCUvwvrXOwRwH+KP3MwJnAeCn9pwdHlTjhY+7O5cP6E7eAkFP6nE1fjlmGpdyz2px1B2q4IeDp6Ye8dEX6dsIIz/wCzgUJZex3Kn7WiVzmI3pbnKKvthMzkoDlzobDxmC8ctt3HgMm2mgI1CjQc88bC0Atol7P277uNLbarsG+3N3iJJehnXVP2PhehC8NxoV1pHKxY+08WaH/6PAo0ZwXBJ7UaEtb1Bx7sAM/rGOplavtEN7bAPe46uln76Jxb3o92YafKv3TWG9tffz1B4RfXWw4rb2GTnQ9ONv9Dc2/DPzXguxUOSHjwF85lDLkJhb/iJ2k33tU9woUEN8z7kwNBYX+/5nkw/w+/ouuMP5w23oSURYD/bD4OX6tY3PuRe78OpxcKB5pQUliAfIHekn8NFUIFBl6XoqjirV52SoHWimKUvJZAoZThTelNVL1XQtEnRFnhBRRXd6HxUbHqeJ1gLXuHyqJSNA5ooUb87ikKT6Zhf1IKjvxwHS+7RsujhqFQ0vYU1wsfok40co7eJtzLPYZDSQeQnn0XDSIZmkuLUNYyep5BKESj+yTj8HEByoXMfauPH5sp7EPjvfM4ejAZ+1NO4HL5Wx3QUh1n7Jpv3uPp9QJkbVwCy8DDuJxfjCfvtPchanyA80dSkLzvME5cqoRQo4MhDcdm9yRPD2H54lgU9Wr1GyjdA2evo6ipSoWHy0E8YZVSRVdjYOOfheYRyBpPB7Ue/RrbD/BzcLuhD+LmclwrE2r0GtVN+/8AmksFOHE4GckHv0P2jXp0s6FVH8SY79J6fOflCf6LkaEBUsZv8nFmswsW+R3ApYI7qO5i/Oketi9dhzzGtwyeR4iyqxVq+8Rv8OhaJYSSHry8lgX+viQc4J/BjZqPxn+IGIRCOdqqbuDK/QaINL4tQ8ezK8g8vB/7D2ehuJY5pxLdDaXIP8VHyqHjuPBQOIEsuLb9DNo1Yiv3MoVDEOeFwGFLCX7SiXzD+PH2RtitvQolx+IBJ6Fw+C94dno3dm3fgV2JsfCzdCQo5BIUDomQG7AEB2r0ssO/NOPI8hU4+Y5Fijr9hPl+mV4o/PgYOcn7sG+vdknauAKLZ7nicJUE7TmrYbm+SC/giVEUsxgh2cx4sB6cX+OAhNyLiFtig+UBUci4/Rpngxch5qpe6be/GLGLgpGjylwp0VFyGL62rohOyYag4DIy94aAZ7cOuQ0y9Xn1yseimnNYv9QFG3PrVNkhqbAI21wc4J/wPfIKCpGbvgkBAXuQGDAXkQL1tWVvi5HobA3PGD7O5F3E6ZQoLLf2QXq5SAUaOlAob0PRNhfYusWC/8MlXMw6hGgXG/jxKzXZqnGveekVijKSsc3fGgtco5GUlIbCOgZ8lGgtSoCrlTviUrNxMe80DkUug713OspV5VMDGt7tGQtC4lLstnfE7tLRkqoczw+7w/3gM4jF5djr5IXvXo2OwZSiZLsjvNJeqbJxn9JBIXuLa1uWgeebiO8vXEHBuQxs9g3Enm2rMN9YeV3eg3t73MDzTUB61iXk553ADi9rOCfeRdc4YCgTnkaQw3bcF6vhSNZRitPJOxBiNxsua/dgX/IZlDFQqBShIMoWMYW9Y7VgwIlVPpa1n0PI/NVI2OKPkMRjyBUUIpcfCecFbjhUMWD4+DFQ2I+anGgsc47B+VrmGHW7RO1MQHhMKnIEBTjPj4azhT/SfkhGWPg+/CC4hoIzyQi2tsF6QZtxADUEtZ9Yxz0o/BdK4y0RUTg2IzgkyUOozU48+Y/5dvyGLOMkFLKFGOpBjt8SgkIuQeHwj+h4Xo0uvTGEv/RcQJjjNpT+je0g3Pg8vVCoH5j6nuOorwNCTr1Cv1JpIhQuhL1rBDLKP6gzivLOT0Nh70PscOQh4dYHViCV4AXfE1aRBfjABGQNFCrx/sFhBDj54uDd9pFrfEDheht4HXrKKh8q0XFjGxz/NGsECj/ixiZbuO4uRY/GTiU6iuPB80jDC6numMLu6/GwX7oHjz5qMzmyjhuId/BEGpPVkptyTQXGlI+7byLexgV7H7HgRv4B1zc5wovPlFAZ+NDTUHO/2ntRKPtxI84KK/i16rKr7A1O+PKwu4SBRDFub7FHUFarWk9pNfhuS7GvggHsT+mgREfhBth7pKKKGc83cm1Z501ss/sKc4xBYf81xCwIwpk2bSaPAb7AhTEoGmecnujaRlgHn0UbGxwllUjieSK9ZhRqmftQoP6oN1z2VmruafTeVP/rQ+HX38Ano5ZVtpegfC8P9sZK+WwolHfiYYo/nH0O4l7baHa3B+dDZmGu70k0jGZblf24FW+FWVZbcUvjJ0q05YZiUfA5vGfbZLANtfrq2GJgX85B4bAUl4KtsKNcL0PA9Pv/foj4+eG4OsitVCFBIUEhJ8cUjrLekBh1t64hPzMZ61dF4EiFFEOj2zj0/+8HhfJ2FMcvxbKtN0cCtolQGDIbLvufaidWmACFvTc2w8brOCvYqoOlrKsOJaUN6JaPQmEP6i9ugot1ME69YJVUP17B+gWrcLpVCySqICt5jGSnb9RQ2HcdcRarkNWiv08V9jt7Iv2lnDXRZADFGy0RmDkCVZogLcPjZBd48WuhMOWayrFQ2FsUC5uALLToAYP48X64eqTjpZSBDz0NNdfXhYgPlyJhGfADhPJByNrOYY1dPG6MgFw3A3ZheeiQD0LakoVAuwTcYeDskzp0ozBqIQKz3rEAnbmuDJVJPMw1BoXSF0hzt0Ygvwxtmhm8A+gQdkKkZ6sWgJRoyVwF2823dcryquyh9Rbc1pTU1XZ3562FZdRV06BwThBy9ErNIkEkFoVeMDyLeRQKuxpxKW4p7INO4cXosASV/ky7fAv/k0LW8Ak5atI8sSjqKuvHyCAGSnZiiWcGajU66Lab1n7T13MOCodEOBvgiOTnBqDwP4+xyyoElyUEhRyKhQBlCjk8+xjAr514cOo7pO7eiOAVftiaXQ8uTkT/naBQjJffB8LJ7xiea7I8pkLhPEQJWDNfPwmFMrw54Q/7LXd1wEA3cKoDsmuAP5xd/eG12AHxRR0aaJG+PgE/q3jc0oMIhbwTOYHq8rG06QT8ZlvA1dsX/j7sZQWWzFuIzdclWiiUNeOE9zewdvbR29cXKx3nwyLuJky5JpPd0s0UKtD0vQ/mLnaBn849+MLf0wmLFmzCjQHGVj0NjUCh7G02Vi+KhKBLie78aNhHFmiAR9Z+AWutY3D1oxIfLkbAPvqKquz9SR2K6nDC2xpbbmrHWqrbQon32UHGy8fKQfS/LsbBEB5sHAKwJeMaarr1AHyMHXJUp3rAeXc5K6M3iL7rm2Crnz1UDoKZwW4RnGsaFC7YgGsa31XDV9+1jbAMOms4g8dA4RwXBPrx4O7rCWu7eBTrQOVIu+Szy8/MTPoVcEx8qHP/qrGdHgSFvwlYhmUQhFoiscwAFP7rPjbNj0Dxj7/pCjPuYMoUUqaQ05lC1hM7/Ld6ZHg6IvERxzoBAL8DFCrx/mYiXJ3icEUn82YMCj/i4pq52jGFmjLvSBbEGBR2X8Tab5kxhXK0ng6Edcx1vbGK7CwKE5BnwzY0E1XdCrRdiYWjVSQujUwgkbWfRci8SAg0JbyRY1Vw960qU6gqZS6IQG6DEM0t+stbdPSxysfytzgdsBCR514b2LcVwo4BmHLNsVCohDBrFSzW5qJhzD0I0SL8gF6dUjlbAwOfZY046mWDbbd7cCveAWty2jWgrJC3IivAAQl3enBzswPCzqkh+pM6iDqREzQfUQJWeVsFc2qgnWcsU6gBPgW66+8ic4snbOw24HLzaPnVwP0rFWg46g3nXWwolOPFYQ+4pzzXZptHzt19PgyLIgpMg8KFnwGFs6wRdvIpumXtuLrRHrYRl9GiKRWPZqvZY2PVUOiUWEJQyOqwJ+fjz3icaI2wi9Ixs4yHRGcR5JCEagO8ODnX/jLPQlBIUMg1KBxWPkH20bvoGTOfZAg9Z/zhsr/2y3xYp/Cuph0KB16dwRp7b6Q/ZpVnR4NyXjgWhubhgwYABqEYKMdeh9lYPTrRRB8KlQw0zkPYed3JEv2le8CbFaSaaMKUTpc57cYjvczOwKM9cPZIRw1TUmWfl5nUsH0JrIPPoJ4p0Umrkepqg01FuteQNmUhcNbImEJxKXY5uIH/nD1ObRAKSTWyNibi0huFNlOolKJkhyM8Duu+JoUpob7IjMX2iy2mXXNMplBdWuQtT8VzvdKi+EUW4hIu441Mz1a21mM+y1B10BWue05hJ88fJ5rYACZHXcZKLNuVid1LWds+qYMEzw+5wT72um47y5qR6T/b8JhCcSkyIlJxVwfKe1AYZQH/Ey2scutYMPyQuwbWMcWsHwRdOL/GGnFF7Iwcc5waIJ0SH04dFLLeUyjruo+dPAuEnG4ceVWOoXYhKJy6vm8Yf74WCfvo69AdOjgMWUE47GPvgGtvoyAoJCjkHBQOXkHEwijc+Iv+UJFf0HrEA+7pb6auC/pCzzytUCjrfIC9rk7YcIk9bkobyCXPDsNt8TrkCUfhQ4r67PVwtVhgPFOolONZiius1+ZBOJp1ETciJ8oFNvNXq2cfy5pwJtgGK/eXqsbAqcqVvbXIDHZA0MkG9eQLNhQycCSqxCG3xfD7rlo1CaZVsAH2tuH4vuQtemVitD3Px+6AIPgunTMy0USKp6kesAvOQo1mAsUAarJC4Oh9DDV6E00GnvKxwioEWTVaOOmtOY01dj44ppoAocSnr6mEMHOVCnpEo0Anfg6+uw1CM2u149D6XuH0anv4HWVmBxuCD20b6JbVBzHwcAecLCxh486MR9TdT1yVAldLS9i68VGt2fZpHWStBYixscPaY6UQ9inQ974agp2rELzSBQYzhdJqpLlZISy7SZvd66vGd942iL3yURfiBp6h8Eq9Zh3jUx4rWKVWSYVqkkmGziQTxi4xrsdaIyzX8F89GTP7+HMyhSwoZHQWVaTAc5EPjr5gSumG2oWgcEr7zb9VYd+SZUiqUGoGlP8qKcH2pctwqObvU3rpL/HkBIUEhVyDQgzLcTvGFp77nkCpmVUyjL8JzyPK3huZrRwrF0xv+ViB5pN+mP2nebC1c4CTzuKEwIxnYMbo3UnyhKWFG8KiYhAV7IuQXYW4nMhDqNFM4SBk7XeR7LEYNq6h2LAhEiE+q7EnX4AdTiEjr6Rh9nmEjDVL4OgahKiocPg6OcBvVzGaVTBjKCAPor/6GPwXu+NQBZPVHED91VTE+C4Dz84Rrn6bcaq0AWeD52n/Eoq4EYKtnrB39Ma6qCiEeTrCyWsHChqZWbms8rEK4KSov5wALxsn+IatR3TICvDsvLEznwU+JlxTXH0CgYsXY4l7ENLL1K+PGagXIMHDFktWhmNDZChWOjjAZ3shGlXvFTRsqz4Mar733sCmhV9hyV4DfzWFyQrafgWe3pg9xSd0YM7dW18E/np/LHewB8/ZH/Eny1CXE4KFkVc0QKe5B+UguitPIWqpDZx91yJ6bQBc7XgI2ntd+15EZT/q7l7AsU0ecN52T3uOgQfY7rQGuaMv1ZY1IyfUEhb2rvCKz9eO/5M8x6Hl3jhaP/qDRBeApwIKFUoJqo/6wcotBRUiQ+1CUDi18DSMn5rzsMnVEZ6hGxEfEwJ3R3ckFLyD9nXWU3sHX9LZCQoJCjkHhQCG/1KPnI2ucFrqj8jYOMQELYMTbw2+Kxfjly/pAZ2me5nWTCE7yBv/rITo7Ss8rniKV23aLJrx/UeCt7wfrTVVqKyqR5smU6cX2JUK9Ahr8eRxNd50SrTj40azbEb/l6CtrhbNH/UmNkhf4LCrA3apXtOivVZ/eyOqKirx5FU7q2yp3a5jy0An6qsqUf6kHm065e0JXFPaj472TvSwXibNAMf7+meoKGd0ZI9TM3IfRm3//P2N6dDf1oCall49/ZmM73LwdpRqgU7/nmS9aH31DJVVdRD26JXpmbZ934rmutOI38mCQqUUFUkeWHvuPet6UnS3d6KrT3sOyfNUrAzIRNNotln/2mb+nXOzj9kd7NDfIf8gRLOwC/J/aNIF7D048ZnzUMiJVh7fSC5C4agiv/wkQ3erEO0Df8W/9avJoztx4P8vEAo/H0J0YGtSg7gIRTGWcN1TyvoLGkp03E6As/UW3NQZ6zZZ9/97XHOy7n3883Rf2wgb5714xJo9LOu4i0QnG2y9qT8BZfxzjWlzkQA7dKBwENL6E1gdzH7/n/45xShP8kGMQDvjfMx5J9Wf9K//+3/nNBRyoKM3xUSCQlNUMu99uAyF5t2ypltHUGhisJe2FGGXlwOcfaORsGMXEqK84Wi1Akk32RmoyQ3uv8c1pwWGZEJc27ESTk5+WL91J3ZvjYavnTVW7rmFd0bfOWiitgagUKHsQ8muVUi4qTf+cKTtpS1nERmsHvc5Lfab6HPTeS8EhaZ3mua6J0Ghubas6XYRFJqulbnuSVA4oQAtRmt1KW4XFeH6vWdoFumVkyd0LhMhR/l7XNPUe/tt+/W9rcGjW8W4VvwAVS19rPLubzivQSgchELciy6RemznGNgaEKGrV1tKHrN9Str1N9g4BfdDUGiuXbzpdhEUmq6Vue5JUGiuLWu6XQSFUxBguQgVX4zNxqCQ2tn4WE3lIAgKTe80zXVPgkJzbVnT7SIoNF0rc92ToJBgYVxY+GJgj9ppStuJoNBcu3jT7SIoNF0rc92ToNBcW9Z0uwgKCTamFDYIKr+sMrGx9iAoNL3TNNc9CQrNtWVNt4ug0HStzHXPKYHCWX/6CiJRHy2kAfnADPGBrfFbkS8Q4B//+ActHNVgzeoQPHn8mNqfo+3PPPtLHZ3Q0dFBPsBhH/jqf/6IoSHDr+b6w+eSMPNrY96cb2khDcgHZogP8OwdMO+bOZg/51taOKqBr9dKanuOtv3ocx8SFEw+wHEfWO7sYhT9PhsKjZ6RNpACpAApQAqQAqQAKUAKzDgFCApnXJPRDZMCpAApQAqQAqQAKTD5ChAUTr6mdEZSgBQgBUgBUoAUIAVmnAIEhTOuyeiGSQFSgBQgBUgBUoAUmHwFCAonX1M6IylACpACpAApQAqQAjNOAYLCGddkdMOkAClACpACpAApQApMvgIEhZOvKZ2RFCAFSAFSgBQgBUiBGacAQeGMazK6YVKAFCAFSAFSgBQgBSZfAYLCydeUzkgKkAKkAClACpACpMCMU4CgcMY1Gd0wKUAKkAKkAClACpACk68AQeHka0pnJAVIAVKAFCAFSAFSYMYpQFA445qMbpgUIAVIAVKAFCAFSIHJV+D/BxFNctfnx1PyAAAAAElFTkSuQmCC[/img][br]Der zurückgelegte Weg soll in Abhängigkeit von der Zeit [math]t[/math] im Zeitintervall [math][0;2,5][/math] durch eine Polynomfunktion [math]s_1[/math] mit [math]s_1(t)=a\cdot t^2+b\cdot t+c[/math] beschrieben werden. [br][br][br][b][size=150][br]1) Berechnen Sie die Koeffizienten der Funktion [/size][math]s_1[/math].[/b]

Der zurückgelegte Weg eines anderen Autos kann näherungsweise durch die Funktion [math]s_2[/math] beschrieben werden:[br][math]s_2(t)=-\frac{1}{3}\cdot t^3+2\cdot t^2+\frac{1}{3}\cdot t[/math] mit [math]0\le t\le3[/math][br][br][math]t[/math] ... Zeit in [math]min[/math][br][math]s_2(t)[/math] ... zurückgelegter Weg zur Zeit [math]t[/math] in [math]km[/math][br][br][br][br][b][size=150]1) Überprüfen Sie nachweislich, ob die Geschwindigkeit dieses Autos zu Beginn des angegebenen Zeitintervalls null ist.[/size][/b]

[b][size=150]2) Berechnen Sie, nach welcher Zeit [math]t_0[/math] die Beschleunigung des Autos im angegebenen Zeitintervall null ist.[/size][/b]

Die Geschwindigkeit eines anderen Autos kann im Zeitintervall [math][0;3][/math] näherungsweise durch die Funktion [math]v_3[/math] beschrieben werden. Der Graph dieser Funktion [math]v_3[/math] ist in der nachstehenden Abbildung dargestellt.[br][img]data:image/png;base64,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[/img][br][br][br][br][b][size=150]1) Erstellen Sie eine Gleichung der zugehörigen Weg-Zeit-Funktion [math]s_3[/math] im Zeitintervall [math][1;3][/math] mit [math]s_3\left(1\right)=15[/math].[/size][/b]