Die Menge der ganzen Zahlen

Welche dieser Zahlen gehören zur Menge der ganzen Zahlen?
☆ Welche dieser Zahlen gehören zur Menge der ganzen Zahlen?
Wie lautet der Nachfolger der Zahl -8?
Wie lautet der Vorgänger der Zahl -3?
Die Zahl 0 hat in den natürlichen Zahlen keinen Vorgänger. [br]Die Zahl 0 hat aber in den ganzen Zahlen einen Vorgänger. [br][br]Erkläre mithilfe des Bildes, warum das so ist.[br][br][img]data:image/png;base64,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[/img]
Gib 2 ganze Zahlen an, die innerhalb von -4 und 5 liegen.
Gib die ganze Zahl an, die genau zwischen -13 und -11 liegt.
Zamir möchte alle Zahlen innerhalb von -5 und -1 auf der Zahlengerade markieren.[br]Beschreibe, welcher Fehler Zamir unterlaufen ist.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAApAAAABCCAYAAADg3OZdAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAACQAAAAAQAAAJAAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAApCgAwAEAAAAAQAAAEIAAAAA2+aspwAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAQABJREFUeAHtXQe8FcXVP68/imBFBUSwICrYezTGEvMZezfGlqgxxlgSozG2qFGj0ZifsXeNLXYN9thFsSsoSm+idNAHvP7e/c5/9u7OzO7M3N299z5eZOcH756Z08/uzk7fihwnKkGCkIoSyHGJSKMjDY/LBhOuu+rornaZYugqS+NHUp6k9LA3DY/LTxMujY6kPEnpM9+/H3Vddt1NT5y9LE287NLMmDQ6kvIkpYelaXjMHtpLu6uO7mqXPZJmTBo/XDwVSKVqQJpNzkqzCGQRyCKQRSCLQBaBLAJZBL5PEUD7sTKRQ2iOljt1hY40PnSFXV2hY0X2PU180/AkjXF31dFd7eqK+Ga+J41yMvruGt/ualey6HpDhl3B833RkV33pFdS0CsNyBgRjMxRW3gsxU4LfZ6S6PCFhTRaimM9bSWxK2SPn/XtKokOX5gvPP9rKf5++R7y2c/6vseNr8+H37g8vg6VV8BWhAx90ToiSmWBrz6uDsmZ+a7GQkziaQVexo9vBGVFZNcdsYp7PzrCGAm5X+DzxNXh8+E3Lo+vQ+UVsBWxYl93P05Fx9cXZPj1Q59GRxoezQRfuVaoZ4rWoYvTcr76NDrS8OSVp5vChrERpZo70UwanqgUd0l31dFd7XJHM4pN40canqhmd0l31dFd7XJHM4pN40canqhmd0l31dFd7XJHM4pN40canqhmd0l31dFd7XJHM4pN40dSnqT0sDINT9Q7d0kaHUl5ktJ3U98xhZ2uAem+BBm2ZBFIc6eVTPlyFpT5vpwvwHJSvyJf9+UU8kxtFoEsAlkEEkYA7UdlClvnRjWeNKXh+b7oKI/v+jBveXToVyCNjjQ8ulZTLvPdj0p54utL937T6EjKE4/++3nd4/le/DXRJRTOpbGrsFSdIo2ONDy61sK57qqju9pVOKI6RRo/0vDoWgvnuquO7mqXK6LZCKQrOhkui0AWgSwCWQSyCGQRyCKQRUCLQGQEUm8B6zmN07ag3FoObk+eS6quQ+Z0Hj0nqQC5cDplOKdz6jmd1oazlYPbw7kodB0yp/PoOUkFyIXTKcM5nVPP6bQ2nK0c3B7ORaHrkDmdR89JKkAunE4Zzumcek6nteFs5eD2cC4KXYfM6Tx6TlIBcuF0ynBO59RzOq0Lp1PKnMeTntOX5JLgwvn85l+dU8/pHC6cTilzHk96Tl+SS4IL5/Obf3VOPadzuHA6pcx5PDqnnpO0LsjF48K5ZIafFpccF86mw+PROfWcjVMvd/G4cLqUcE7n1HM6rQunU4ZzOqeeC9Oa8y4eD+eiMMss93X3tOp26TmbXXq5i8fDuSh0WTKn8+g5SQXIhdMp/VxkBBIi9EmkPKkV4Ysq8KvwK2ABphhoVZgKx2CNTVKsXIVfAWOrtxKqwlTYypACUaxchV8BUxgSYlGFqXCIrKhsCeWWUJT3nPsPqSJYAYtyWzCXUFgJRa3YvqtXVQmqAqoU6WBVmAqnkFYku12jIlgB7fRxMaowFY7Lr9AVya5ICoGKYAUMEaXIqsJUuEhRGnuRckX7Jl/vFSvKaleRgq3sVoRmiT2j8CugnT4uRhWmwjH4IyOQ4PHfSxH+Cpbu/Yug7AU52aZVBCtgiDWFjrxdQpBdsK4nqR+Z7/I66pG05LLrHg6M/dYs3T1v18HWpLznw36488p1VwjtdqX03ZetCFZAHyt/u8J3iw67XSl8V59CRbACSp99yGKXj478lrA+tduV+c4RSJCU50oJqgJGZXXH694l71EOxQrre4rnqsjnPTICGb0Ts5IsAlkEsghkEcgikEUgi0AWgSwCXgSMI5BZcLIIZBHIIpBFIItAFoEsAlkEsgi4ImA9xsfFlOGyCGQRyCKQRSCLQBaBLAJZBFbcCFSqy2rCYXCv03BjNVkBaQAE6GhJHiUQZqyxNCgMgJg6AjINiEpR0W6sSinjG+WJluQ5BcKMNZYGhQEQmBAtUXUEZBpg5RFUbqxZUJQnWpLnFAgz1lgaFAZAYEK0RNURkGmAlUdQubFmQVGeaEmeUyDMWGNpUBgAgQnRkpQ6CksMKALAqtzbAxPQqYDgMTMaS4PCAAikRUvyKIEwY42lQWEABDqsgIPUgWJxZqyxNCgMgMCcaEkeJRBmrLE0KAyAQIcVcJA6UCzOjDWWBoUBEJgTLcmjBMKMNZYGhQEQ6LACDlIHisWZscbSoDAAAnOiJXmUQJixxtKgMAACHVbAQepAsTgz1lgaFAZAYE60JI8SCDPWWBoUBkCgwwo4SB0oFufGavoC0gAI0NGSPEogzFhjaVAYAIV1MEWyNZCQ7Vy5G+hMD6TRkZQnKT28ScOTNAppdCTlSUrfnX3vjvFNalN3jm+aeyWp/91VR3e1qyvim/meNMrJ6LtrfLurXcmim+5dnfmeNMqENZDJGpCJVWQMxUWgK+7q4iwsH3cC3xOQls/eUkr+3jmUIDgJfE9AmsCA/w3S7uB7d7BheV2tzPflFfnlq3dFvu6hyKP9WC3L0kQmDY/UGA/qrjq6wq54ESqOKo0faXiKs9LJnXpUPKYf7S3UPPoh6pg3laoHb0V1Wx8YMaezYT41v3YrVfToQ3XbH06VfdeK0CQtyLU2UfObd1PnkvlUu+FOVDN8TxahO9v53Txqfv02qui9OtXveCRV9Fw5phq777mWZdT03+uJOtqpZpPdqWaDHVkt9EqejnnTqOXt+6hylQFUv8uxRFU1MfWWkEwPRQLB0o/4TGl44kv3KBPo6A6+p7bBFJcEvpvYY5Wl0WHhsfpuoXfal4bHKdCATKPDwrNC+G4IIYpWZN8NIVE20VgjY2Dzi+LzfPvtt/TYY4/RrFmzfOaYv/F1mAQuWrSIHnnkkQJ60+hw88DfBx54gL76Kqm/qhduHSqlD0Pvgw8+RDNmzPCLCvwm12F6ipYuXUr3338/jR8/voC+uOioXbm2Fmp6/h/U8M9DadnTl7GgHLW0tNAtt9xCH374gRDcufhrarjhCFp618nUPuvzAsqiOowM1XXUMWcitXz6H27Q3Ukds8ZRZ0cn3XPPPfTe++8LlqbnrqbmDx+jtmlsR0ebUUz8Qs+uitoe1P7VGGr5+ElqfOMO6pg/nXK5HI0cOZI++OAD6uzspKWPnif0ts8aS7nOjvgq7DUhVdT2pPbJ7wm58Lfzu7lC7gsvvMhx/pD15mjZE3+m5o8ep/a5E/ky4EVTfOpcspAarj+MGm4+mtomvMkCc9Te3k4vvvgijR49WjRf28a/JWgan8T1T5sKX3fcVy+++AK9/957eSWFedJaI/kqqLW1lV566SV65513ZHFJIbMfHR0d9MILL9Czzz5ruJxmnlKZBZ2PP/5EqcQ55Oh+vPrqq/wsPUNtba7nVedxCM+j3PR4ft/je+o//Ay38LX2kpunsM44FBU0dswY8Q5uamqKw8A0Se0y048dO1bUWWa9Zp6YBlrJEOdx48bRc889x8+U6/paRSREeH7kuG78bOxn9OSTT8bgL53v8Pfjjz+me++9N1Qfl06H0SFWbEydhtKp06bluIGQ4wfOgM1x7OyJK8VcTU1N7sYbb7QTxcC4dJjYn3/++VxdXV3ub3+72oQ2liXVASFhnudYb9++fXPnnnuuUUeawrAOkwx+YHJrrrlm7uSTTzahC5bF0WESAr19+vTNHXrIISZ00WWeXZ25plH35RZdvF1u0WU751rHPJ8b9dabaL3k9ttvv1xHa1Nu6cPn5hZesHnuu9uOz3UsnJVIr8v3jrlThc6FF22da3zmqtzEz8cIvYewvws+fC636C8/yC26dMdc83uP8M3gkpTIpFzbN+NZ9s456G169bbc/LmzcyuvvHLu8MOPyM198+HcwvOG5xb9dbdcy2cvFaU3bHH7rC/Y311Y71a55nf/nVvW2JRbZ511cj876qjc3JfvyS08f7Pc4r/tlWud8kEyhxzUnR0duYY7T8otwvW79bhcR8O83Lz583Prr79+bt999821NCzMffuP/XMLL9wq1/jKLQ5JyVBh38E9beq03LbbbpPbfffdkwkrknry5Mm5bVjvpptumuNGbJHSCrP7vnOHk/3dNscjzSXX6+swWbNgwYLcsGHDcv3798/NnDkzIHHxBERFAM3NzbkhQ9bLbbDBBrkJEycWIcnNGvajsbExt+UWW+Y22XSTHDdwjMxhHiNRisI99tgjt+GGG+Y+/fTTyPsqhbiCLL4fxx5zbG7dddcVbYdCTD5PIbpCeO6IiXcg3oVTp07VyEulQxOaz/BASu7UU08VbQ5bO8nEh7Ji7Fq2bFnupJNOEm2sTz75xKbCqoM76jlugOZQD8RNaFAqI5Do78sUbrd+wCMtxx93HF144YW0YMF8SahAYR4FRe08HdbJIyQYNUmadLvUXFhSFAd9HBAeqWoOE2t5lbNCi4RGZs2EfeeXIXXmOgv0bq3ijAi3XZ4H6E3DX4wIxk3F+g49iDNmOdvZbz2p0nVMkpznewXVbbUfVa01lDDN2vIJjwgu+FqIaWltofZJo6lt6vtsRyXVbXMwVa46oKAK1TpXfCv7DaGee/0OjlLrZy9Sy1fjhOzOpYuo+f3HiHi6uXrgCKrdbO/8dG9B1bEIqtfeiHr88AQxndzywaPUvuArwmhRrmEetbz/CD/BVVQzZDuqGfqDxHpdvlcN2JjqtzuU9XZQ06h/UeeyxUJv27wZPJ1/v5iyrhn2I6peZ7jTD1WHk5CRFZWV1OuAC8V0fAePqLZ++ixfywqhF/dV40vXU8fCmVTdf2Oq3ZzjnOI59W1Q7TJdd9RV7e0dxA0NnyXxr6ojLrOoH5kR+t3+pZHuWaFy+r7jnsJ/DD8i5lHKfFHMH12HnQn+ivuZ9Qr9eVLfLjOnKt1MYStVOdvaWkW9xR0+A7lKaUA7ilROP5IqeQvPpPCbXIyuq+U+XC7f29rbhL+irnY+O6oHvlXxflVO33fUzXgviXu7gBifx0ymSjdT+KV4B0Kf/+uX47dc8YV10AdfMYNRyfVZklSM79CL2RokzGKoSY2azfc5c+bQ8cf/gk477bf0+eeFZu6kdM1DmwOYLjvhxBPFtMrgwYOJR5qkBAGpJoZQfpZJBFWgRPJIyCfWfwMWUaznXJTA+dRpdBTi8XRLKgl5mIqcr93Ly7+SUkISa4ds8sDh4Xx5wTuAMX6ZTa4uVZdj4/HKdclmTl26ao3O7dbk+1fRoy/13OccJuYHZvpH1DZ5tGDMcUOu9dOR1Nn4LVWvy+sURQND1WaWr1tn9sDnrNv2YKpZfzvqWLaQeox9VBSvvGwm1c/7ghV1Uo//+z1V1Pf2yQ2/0mMJGciCIo8KeqsHbUEdvBay8i1e78gXd61lU6i+YSa3NDqox49OEtPOHpuULKFAoAYU8r12qwOpihuwue++oc4XrqHqqkoaXjmLerQsosq6lah+p2OIauo1meGM1CGtkVCYmtvDq61D9Tv8TFTETa/fTh2LvuFLX0GrLJlBbWO5QVnXk+q24E7EqgOZWUr3JEnJEorqQInO6eV0Hp1CSpFUEpJYFZISJKWEVEoDLAilhChFGCclSyjKhRKd08uZeXRK9Wky00t9klNSSkjSATKXSwk6NXJhnJQgoSiXzgnKsByVJ4yTkiWk0ktYckpKH8JvhVWvTyUlSKk+FMb5PLY4+nysV3sfheVIumhcEugIxEgeaHJp81gkfSAiAoSlSB4J6UyyM6SWh+W4cFKyhFR6CftS/V9gCvF43HGoVKm6ZJ0bOZ3WlfP0E62++uo0bNhQeuaZZ+kPf/gDTZkyhVFSsoR8Du+3WvwoOhVQVOI83E2/+c1v6Msvv6QjjzxSjEDWVNfEG1nLCxOjCNybx2cXO/gXLXRj0pQzheK5itJ4VYQCA6zkFw9GEZCwPqyDeyQYGdRSiEdRKckUGhFTI5EkB4TeAL5gil5Qe5sHo1wVhXyQVIQKM0EoG7BoiDxRR74X0tnh9UjQM7EmRbAC6uQqQoEVUNB7/rKtjMBIQtDbVAgVMJYOnUjJrb0pVW9xMHV88gQNmvcO1VdX0pqtc6lj8tuUq+lBdQdeSm3sv3MtomKMAipKGFQRebh6h2Oo7avPadWl0+mYLVenwzaoooqOZqra/ueUW2N9asN6G//+UPgVsKAOnYBzVfVUvc1h1M7rMOtnf0THjliJDh7Wg6py7VS96ynUueq61ImRZyb1VUdkqAUKoQKqFJ7vvdekqhH7UMeCGVQx6TX62dAa2nuDHvxcsUk/+AV19l1b6A0YVWEKrIABqQBUhAoP3ZUqPn+ZcnMnUNNzV9HK9TW0z4AW9reOa7phVDF8L2rDc53j/3mHVXZdiT1n5WEERmvw7PjPjxjZZ1HW+KrCFFgBdUNUhAKL5wh6mRo6tRegQqdebLVYV2LPhXnacf/k64qgflaIFDAqVEUqsALqPAoCdSMqDZ7A45i3J343KKKsOnSEd2u3QS8HES4HelVhCqyAYVF6XiFUQI2mnesH4BBrXOsg1hpVKKMKU2AF1BkMiKqqKtbrjbQa9ao8CqyAuo5wTiFUQOJla/wu8O5nXOvAX5UoLEvNq3QKrIAqtXdx+SGFHn8E0ve3EI8QpBApoK4jnFMIW1lvR/ActfIoZJVHrdCoz25YlJa38KjFPr3vL/LtXHf59YiPN/EIXB6B0dK77rqb+TroqaeeotNPP4P3cNxPvAxP1EG2es9rQCpYBRStUDQeeU6d1lhjDeI1UHTttdf6Nll/Tcby2h6e0s2JBeLY6BFOJp4wjTNvETBp0iTRoHnj9TeZ/TLx4AZyLDwBPgXgi5w4caIYSn7v3Xfp8isud0ryeZxELqQiYMKECcTrIejzcZ/TFVdcEfirkHiSIgUuBYVx8BfD9tB/+eWXe3pj6IhBoin36euaF9FeyzpovVUq6Lzd1qZdh/TmhnorjVzQh2bceBdXJLKj4PMEgiIFAaYgUNG6jLZeWkPbrZSjy/fqT71qq2jSonZ6efQcav9Iuc4xdMQgCeypaG6gXZqraLOViP64y+rUq6aSPlvQQa+MmkOVoxW9AYcHRHRECkIMoWwFj7b+uKOChvHA6unb9qGe7O+Hs9to1CuTqeJ1byNLRGSkICS0UJYbE4MWLqH/65Oj6jmf029HVNB2A3ljDzYujW2mpmt5hzi/lOytOU9BxIxIgd2QxYsW09y5c6m6upouu+wybXpV5YqIjBSo1IXhRYsW0uzZs7kj0kpXXXkVVVXjxR9yNVIQlRshiRToPIsXLyZMYyFdeeWVhAZHoRQRGSkoJIFEXbVoMc8etLTSTTfeSLy+V2OKiIwUaOQiEyGJFHgd/IaGJexnJd3Km/AwApMkRURGCszS8KKfP2+eQN5xxx3Ea/TMhFwaERkpiLJGSPIF6IjMmPEVLVnSQHfeeSetvfbaUeaYJTYdJnbcR198+QXrXUK33naraEeY6MJlSXT4vCoPBjE+/fQTcX/dfPPNtMoqq/hk9l9VgIUqQhIqwPTxJ7yZBemvV1zJy3LUFpVFaKg4JNJwI4QYOAu92KzUkd/c+fJ/uQMu7qAorbEkr3TAgAHUr18/3nz0LB1y6CH8bNxKvE44wgJyJOc5kE89/TQddOCBxJtQqLa2ltcDtTCLzyr4Y//BOhOsY8INlXRtQGwlBkL0bNGqhs44laJBRKoi6W+l7IWkkpSMCb0uPDxd7W9X663hB/PEbVajP/5wTW5H5KiWRyE/+aaJTh05i6YubinUtkgW1BD1DoN60y37D6S1e1dTC490XvzqXLrnk4Wipx0iLVkWT91eG/alOw4YyCOuFdTcnqPTn/2GnvpikT5KVTKNniB0pg8evgrdceBAMaoLvUc/OpNGTW/g2iN55RjXvFXqq+iBwwfTVv17UBs3FuuqKujujxfT+S99Q+35Hn5cWWnooKKD123DwypuRHZVwsiUvxYQjdeuSr5e/GLUqOsSRuK8zh7qZ23EtaxGLC+9XuMVrnWtv97MEK7v8tJbjU5JGeuM8O2C5wj+VnMnLNQFC5OWLo/nFzOd/L9rnyM584d6I+1zBL76+jpqbGwSo5hPcxtw//33N8aHad0HiWOR8WmnnU633norDeg/gB586EFabdXVxOYQKOKrI24I0dLNr6/Ay1yA3h/vRc6bGt56602xQPOcc/5IRx11FKiYn1eDYF7bA0UeGVTa+CvuNdYhSgSd98ICD24MQRO4ludiJuBgX47pRr05is444wz69ckn08mn/JqnsFmZRYfnEvCKXXlroMbTAJcZstkFQvYL/p5zzjl06KGH8ZqCs1Dqh4u1ew4LPzC8z/I8z0Ak/nED0K7Dk+VZo/1lOa+99hpdcskltMMOO/BIwlWsE9MWLFTYrFGLcr9EoIVgkHpGiLiDlxMsFBEXhF7sxZoEcZ2J/X2Dzj33POKdnPTPf14nlgqI68MKdB2QrcTXQ+Z1wFLgOBuKr3dNpR/wq7blO1r1nX9S9cIpVFFVRw1bHEVL1t9N2OnpyMsR8nwrojqgD6PjcFWsexagRy8My//xr3v112NptY9up6qWJVBAizc5hBo32YcdxQvfj1pUn3rdoQuhE5eHM1huwUXavQW7YBYS4Jqpb9PqH99FFZ1YApKjBVv+glo22F3g/HseG7cg2PdDTFqxDPDzP+bS/wodUCBo+I/459GguKKiimonvEj9Pr2HJ8BQEedo3o5nUNs62wpY3BWCXJcrNLFw2O/pgGD1ujN93jlfmx9fYSMX9l48lfq+dBELqKS2ql604MB/Umel36jK6/MdgDhhvKoDJubp8taCCiViABOAyMFG5mYTvXxOHPt11u9/T3X19fTwww/zCBl3nuFPXgfYuPedF2/WAU1G36Emn3xO0MGAGTO/oj/+8RxRgT/22KPcca+BxsAPjy3PBXv8kVhR5JULR0T9oVELW4AL7BKCPd9nzfqazjrrLPriiy/ECIrWaGY6jKQEvgsJvkl5W2CiiCX/hV3gYZTPE9QpotBTDM5Fi7+lY489mkeKGvkYsAdowIC1mRcY5ge3EC/++NIZU0iHIIEIjUcUcAlMwGwJ7+wXI8w33XwTDV53CKN9uzxf/fsRDNIPkEXt8u8n31LPTchT78cKamlqpiN/fiRPkOTo6quvpqFDh3ryYKmodyGBQdyPAPL3L8DAG9jDSOiI1FueASq1oKviCuGYY4+jefPm0t///nde77axp0MoUZg4jyL5/kEeVxbbJfJXWJB7PKa/wndYwIJqa6vpzDN/J46Yue2222jIkCGIiHDFj6+QqvoOjTYdiu8iQkwo7y1PJ1RjScblPAOH9+F9993Hs6eD8kgIRuyYO+Q77BK++g4wqa8j7DveP0IS103CUfxlec3NTXTNNdfQo48+Sp+O/ZRrTP5atJAnlAkeQL7vDCg6EBbWqPjOpKDm//nYM+yZx1IU3xtZ75V/vVIclwR/hw8fIXjEverzeCYYfYcOyMUM4umnn0bffDObzr/gArqIN01j8NCU2Af1IPEoSU1NLV188cWiJYoz/s4++2yeJ7+LNt1kU77BELj4adZXXwmH+bgGds69czO+1MKUs3jYHherH08VwO6uSjNnzuCeXiVPjazWhf7maOrUqay3WkwFDR/etf6i0unTZyXiI0jKH2Z+WtsmvU3LWhvEyh4+w4dWa51Dg9YfJA7zLpcBOd6ks+yL+6iNG4/TeKRzYN9aWm3WKBq859FUtfq65VIrDhNf9sFHPPrWRrMa2mit3lW05vRXqM9PT+CNJb3Kp5fP1Vz65vvUwVXF3GXttHqPSlp78kjqs/thvGGofHrRsm58/kVqFpUnN57bl9KGlXyg+oi9yuarKrhnr55U36MH9eD/4iWvIssIo8EKnRjFGL7pcKqtM1fepTahV6/ePPLgbYjalOvnrho9mT+fr2lNHbXWtNFGGw2lwYMHl9o1ozw0IOFjLf8fuuFQ1r2Rka7UhY18BmOP2npxfTE12JXvwl69enFjoE5MSY4Y0XXvYKyjw6gYnqONN9641CE1ysOU7qqrriquMa4tHwVmpCt1IU4/gV6kEcM3EwMDpdZhkodlayvzND2amvA1zbsfSxUvufQSXm6wlC666CLR9hMNXZPCfJmzFYgG61prrSXWAB1zzDHiEGGMbi3kw7mTJrTkMSK4QiXRleh6j3ETcbjLlMyCzaVlMgHutSyllg+fpBzvTH5pUgM1tvHmrAlvUPu0D8unlCW3TXlPNFxbK+voF49Ppw++buRdyrOp6dWb2SglCgpYtEHcmGr78nXvYPS6PvTHl+fR2DnNvEN5JjU+ew3rFeOMRasJC8jxDETLp8/wJprpVNVrZbpi9FKasqiFDzSfSk381R1rSuK7hbZ9+sfUwruuW3loZ9yCdm44EzXyYe2di7+xqi0lQt+xmkCyxR+jBAeteIbFHyNn9yx0+BMxWKVdXu8Ffl5VMyI2lqhA1YERJm9EqUTCE4jBqNv/2i2VwL1uQ6pe7640yhu9THeF582fR8cffzxNnTJFzDqfeeaZYuCtkP1KAzLqtm8KGpFYWH3+eefTBty6reHehJeiPKLcUuysJyw8xbaErGK1yMSj0lhsVY8iKnb1pPDE0qETKbn8FeOfSM+hpDqiwvx7RTEmHhgVleezIPLFbRPeoraJb9G3bVV02siZ9Pi4BsIGFxz9ErlnLKIidDEsbn7jTnEG5cJBP6Sxs5fRE1P4vMDqXtT6xSvUxv+DFCcgMe3qXPYtNb9zP+VaG6lpiyPo3VnN9PSkZmqvrBFfx2mb+HagNgLE1BHh44LOhTOo5aOnKcefcqz40Wn01qxWem7iMmrjjhGOTMIxSiKFdcTx3VcYoeWnhkd5mz94jHJN31Fzn8F03ZgOmrSghTqXzqcm/iJP7OsWtsvXaXt2AzyAMHM4nycOF0f80YTqmQhtWJhFhy7FnLOIivplZtdLLcLCxRF/dClaTqUNy1EJXTiVToWtPDpCz6kCVNhCZSk2xVd1FY3H6HvBIsxSrFoXgV08/NxGdUckKAUWYZZik++KMAtoEWYptgjxitPwOAUakFYdUYR+3Q2yInVMniYqysSsl+V5vCusClBhnUXN1fHINEaHLzj/Qjqbl9wZNx0ZRHkNSIFwu7vaaqvRpX+5lK7461+VnXIWHkNxT56W6clD6JieMSYDj0dnRUTFGBys4ykgbAIK7+4LmGP4HtACCHRY7MoXYzoIvlr1qkItohL1VPN29eKpN6xZQKNfSyYdJfQd/lbXVFPfPn00tTJeenGQM9klkBYEF+faW3nk7Wpu4fB07po70uJmXuu6dDXx/en2OeN5NBCNSCWZRCX1ncU1vXAdf7pvElWvOZR68PewMS3T3G9Tal9rE7aFD7rm70fnmpUD3IN7RbFFBU12CbyOaH71VjEKWD1wM6rf9iDq0bM3LV5jc2pdaSC/jjqp+a17uFHbqEqWsC5KlscYi2jGAeLffk01g7ehuu0OpNr6HjSj7whqre1LnWjc8ffBc238WTSTjkK+K5YIMKCvoLYZY6ht/Osc007qte+5NHFZDb0+i48/wVpI7jS0T3nf4w54wsLyeZNdAmVFBIKqeWoTU37+dJTZSSY3iSpkV6AlDwT0FfwM8bQqV+YrrdRbdgLT6DDxCHVmBKbKe/bsKY7twAYAkRS78pbqPyZRAY9OasuhrvLfC/4UukabRoeJRwiVCCzBwrVFHW1c4xX4IXni2WWhzzOjY9+H60i8sHvw8+QlC4+pOLBLs0ZmTDx5LBoF0Gn0V0qI/Y5TWbx63qy8L++sX4mXNmnLIgI/zDypnitFFOLcs6fX3tD0akYbMoFdBhyKFB0BheDxELivenO9gV39/ma4gM4HAh0mYS4dvoDobyUvl+vRg8/IraunlXrzUR1BsugI8B6AZQb//ve/6dw/nSumwkNoL2sQpezChlcGCqMkvzA+T2NTI30x7gsxP29s3foiI7/xdURYuUAcacMnq2MdhL0xl0aHm2dZYyN99tlnYt3HqnGOEDAZL57KZNeEP5UltvNjvYl8+RmF5wvdfpg5ozz4Yge+k4z1F8UcESH1RXUIHBpqI6/k7zA/xl8k2ZTqD/4Ljfp8Gq03aCCvCXyJmt6+T9zFfX51Lx+CPUyKM0IWHQba9pljqOH248SB3T33+C3Vbn8YjX7vA9FQH9g6i5Y9fgFvg2ul+l1Poh47H4etuwYpcYukXW1TP6Ald/9KHFDea7/zqGbET/j6fkZ9+IHv/+0XtOyx88Saz557nUl1Wx/Aq9+x0SVOkjpM1G0T36GlD5xOxOsrex/2V6rZcCdxP6/EHxFYa8571PjMFVTRc2Xx5ZjajXfjqiPZfWrSiTKMsi6591Rqn/kJ1W9/JNXtcy59yUdS1Xc20eqv/IWnsL+m2uE/5obln1h/+IMGNqnhcrfvoMY5ahMmjBcvoSFDhnBJYZ6wluR5b2cwztxFY4o/O5dcREEOsx/YhOV/gWLECCzAV5OZR6UoBh772VhxfupWW20lG83FCLTy6n5gwwDqy8033zzxmn6rihiIadOmEY6y24zj7G1W0u2KISIVCX+mjhYuXCjWXRZsRKbSYGb6+uuvCWtdN9lkE0PjtTy+437+hvUuYH+xJr/8Jxp4fkCv7++WW25pDkhQWlrf+VOgYvPfjjvuqDxHpdURmM4AN9J5VQQ8/h9K5QuHDEJX6JDa4kNdYVdX6IjvsaT07cJ07bJH/8TL/tqp5x6nUt0ORwaNpo7502jpQ2eJ0braEXtTr/3PF18ukVLckK8jTIVRRTQQW798jb8IsyX1PvJvVNmnnyRjW5Y+dhG18pq9qn4bUO8j+Py+NTeQ+JRQrvE7WvLAmaIxVTP0h9Tr4EuospdynhmPxC697wxqnTqaqgeMoN4/u4ZHYe3nyrnMUH3PLVlIDXccTx3cWKvbfF/q+dOzuZGq9Gp5SrvhHm7kTf+Av8yzA/U++jqqKPBFGpduFdf86m28DOEW/iLNIJZ7PVXxl2n81Db+DVryIH/tp7YH9TroYqrddE8fVdSv6ntRgkrM3BV2dYWONGHprnal8SUpT1f43hU6kvrdVfSZ76WJNNqPxQyTlMaKhFJKM87hVtoVOtwWmLFdYVdX6DB75y6FXWhQtfDauE4+VLt6rY2odit9xK1qjSFUy5+5a3rxWp7mHE3tMz7mb0Tv7BasYK2+83mAVfz95foeq7D8n+qNR/Dz0TI99z6LP+/HU1J87E1xo4/SoFxHG9UM2szzFXrVxiPIqnn675BLqfK1W1gn79aNPfoodfiQ6juWCFSvtz3ViM8G7qs3HoXeOh55vICaR93rfUKxRKOPHXOnUCM3HnFsT93WB1HVKv1988RvzbBdqXbYj3i96X+p+c27S9aAVH3XFC7nTFfY1RU60oSxu9qVxpekPF3he1foSOp3V9Fnvpcu0vkRSK9NrrfM9Zyu0oazlYPbw7kodB0yp/PoOUkFyIXTKWXO49E59ZykBWTD2colj4tC1yFzOo+ek1RSh14WL6dL1XO6BBvOVi7t0in0nK5D5nQqXv7d0sRr417jdXnzqGajH1DVWkPzxJIy19ZCLaMf5HI+EJkbG1X91pMCDZDkBFLPGcgNRS4eD6dT6DmDQFEUjwqk8SnDunROPafTunA6pcx5PDqnnpO0HtT57Rxq/WQkVay0OjcUd6WK3jgOQ+fBLuzWMc+Jo4vqdvyZYNQpwlLNeZ1Hz+kcNpytHNweTqfQc7oOmdOp9JykAuThXBQ6vczpPHpOUgGy4Wzlkken0HM2HTqVnjPxuCh0epnTefScpAJkw9nKJY9OoedsOnQqPWficVHo9DKn8+g5SQXIhdMpZc7j0Tn1nKQFJHES0st1eonT6aNUphKdR8/p9C6cTilzHo/OqeckLSCJk5BertNLnE4fpTKV6Dx6Tqd34XRK5DAC2S2msJOZHXXEXiIlS8hOvTww5bNLSpbQ8vDQrrMr7CqfjuIkF8dtj6m9cnLxJMUVZ31x3C5bpWQJuejT4IqTXBy3y14pWUIu+jS44iQXx+2yV0qWkIs+Da58ktNYI3mkXRKS2NJA5ZNcnH3SLgkVJzHKXT7JUV1JSqRdEkrCH4fWLRntR+UYn0ICWRjklSFpQ8qJ1biMkpIlxA6k0eFSU0RMirbLqltKltCK4rsMSvl81yRLhV6ItbwpI7m9m7F0t5eULCHPqGQ6PLtMtnPf01zsYlE4JLfHkNguRZYOSskSYoqYdklZLgZNcjwWSaVELvO9W1535VrpYHHXXcrqxtddGhmCVgDfrTdj5nvoZtDq07KPQOJICNNXazr5gOC21mb+VJh/lEHEzJIV4FR6pK7ceQZ92MaPLx7U8zFClfgO6AqQ4C8+p1fPxwlwB2UF8LjrXcR91caf6jIee1JGc1pa8Bzxd6n5fl4eCTujy7+bcnl4lunMIpBFIIvA/1YEMAJZ8k00aDBOmjSJZsyYTiOfeYa22HwLccI5PuCO1M4vvyefeILuuece/m5kM62xxhriG6z4hnKp07y5c+ka/u7np59+Khoz22+3PZ1x5hmEMy3LmdBgfYS/n/s4+4ljInCe3MEHHyz+46y1cqXzzjuPpk+fLsT7jTccY3TCCSfQfvvtVy614sPx+Ibu7bffTpMmTuRYV9KBBx5IJ5x4grHzUApDEGN8XvO///1vcLYo7r2f/exn9JOf/KQUKgrKwAEG7777Ln/7+590Gn8/dKcddyrIUwzBvHnzxHPzzjvvcMeklXr37kW//e1v6Yc//GFZG+uTJ0+ma6+9lsbzsSfL+FNdOF7m/PPP44NnNynGnVi8E/l+wuc5n3rqKf5+7zD+ru6ZsfiKJVq8eLE4tui7776jgQMHikN2y91gx/2EjgF0Tpw4ib9nvz1/lrT8HU/UwziyCMe8VPJGLBy3su6665ZdN/zFsTI4tgjH2qBexmHG/ifZir2GcfiXLFlCs+fMoYEDBohzMOPwpKXBPYVnGPWUd/ZJjs/7XIm/0yxPGkgruxAf6kvvvTxDkA7nI4QGlVEvru3s2bPFvRy2De9DPFOmgaUwbdr8gvkLaNwX44R+tDHwyUjEutwJ13fcuHHi+MAhfPwXjtNLdA5lTAPVumL8+PGE9pNaP2EgB9d7GtedPTjeI9h/xKHUMS9ZAxIjwBhv6uBz+t56602aOGESjXprFA0ZPEQLyfvvv08nn3yyeBFuueVW9PDD/6bjjjuO3nzzTXH4pkZcRKaJvzmKj7jX1NbQDTfcyJI66dRTf0sr37synX7GGVRdworZ9903F+c/3s0NZDTocMbY2LFjxAt4Q/7m6vbbb+eTlfx3p512EuddovGIGwXnUT355JN8sGjvkuvyBcL36dOn0RX84fptttlGfC/df2D8RqxPW8pfVMJotOIA1H333VeIxkOF78t2VcKL91//uo9ee+1VOuyww8qu9oUXnqdF/BnRv/Jh/jhL9ZZbbhF6cb+tyd96L0fCc4TGI15yv//d72nxt4vp8ssvp1//+hR6/PHHS/rMmux/6623uHEzgV5++WVChdwVCffRFVdczs/PN9S//wA+H/EzOuKII+jYY48ta6NqLnd4b7n5ZprMnxPDS2HUqFFl1efH8qmnn6JnRj4jzo3FSx+NqgsvuJB23GnHkr9wfJ34xbl1N9xwg5ilWXWVVWnKtKk0mBuu5/7pT9SrjB1t1YY777yT30EP03XXXUfbbVe+uhn31DPPPEt33XWnaJwjj/9bbLEl/f73v1NNKjncyp3NO1nva6+9Jjp/eDd0su5yNiAxS4K4vvrqq8If/520aNFCGsYdzxuuvz4yIxh+j6YNBJ6js//wB57drKc111qTpk+dRgMHDeIv6Z1X1kbkggULuGN9Ac88tlO/fv3o6quv5mv7ezrgAD4tpEBK6jvOEsUAypTJU2j0u6NFXeE3IPFuRH35r3/9S9xr6JBi0O5P5/6JBq4zsIAlydDVYl0jWn6G5HZKx/oiMMV0JI8Ctbe105y5cyJSH3v0Udpll11on332EZXjr07+Ff2dRwlfffUVOvzwI0L0ug4faSwNCj0AIxcP/fshcQMPHeodyPurX/1KjJIdffTR4gKX2nffPvRAcIg3/KytqaWtt96GX7Rr0NezviJSGpCByT6j9mvGGkvzhfvuuw9L8K8E0aWXXMqjnofQDnywaCQZBXlUDhQThLBcEb344kui9/6LX/xC/wQSSC0pJCVEZcaaStGz9BqQJmxIrJ91kDpQzK1jR44cSXPmzBYVYqSxrJP6msWvAxXRoTLuuceedNCBB4uvOqB8xIjNxAG9GNkINyCtOqyIsHeeZvRk0XM9++w/8PRxjSg8//zz6Ye77kpjxo6lPXbf3SNU/ybUIVmjjGi4tfKoHBrJWgpIAyBAR0vyKCtC9/0ZnjkZNeptuo87B/3796ePPv6ILr74Etp5550LH+4dU0dgbADwqQE1NbQFHz68bFkjffLJJ8qTHBB5QKAjAAKCaEkeZUEs5RHlu+68i/785z+Lzi46RRdccAHdcusttPEmG3M9hnNHZZ0SKDIBFh0gNaFw3+IDDwccsD9/naUvjR49WsxGHX/88eKDBCYVUlBUYrQkL8GCwMjnI488Ihpy8DuaLIxRQrODinqAeJHjfkIHECPNSD161IvfWH8CcwIgYIuWeKgcLxV75tln6IEHHqDrudGGUXw/2XjynPyT/rpj5ByzQT/l9zykoNGK633SSSfRnnvskR+V0y1wagtIA8B3Q94S+ZJ//etemsoNLMxa9ObBE3S6Dz30UNpphx1o/3xjLiqFmYPCAAh0WAGFFIMo6IDdfvttYmDjxRdf5I7JP8XoIK67nhRGRsTzXUrAF5S25IP3cd8uXvytRDCEDuCDDz5IP937p3ToYYcK/y/kZ/rlV14mPFu65jxrUBgAmkxbptJlecQpyA5SBCswFSywd6/eokERHi6FsxhWRUXsT830WamPmLb4mCtMkWLpCIyQPIE5HvDVV9xY4zSIex5+wsOziKdM0EMRKeDxKeRvBBXDLp8bX1T4lh+WWbNm8cXKUUNDA1ce39IAHrZXUxodRp6gMADEC+il/75ERx55hDa0Le4eGCFJVZMEHEE5fM9xb+eVV16hoTy6ih4XvkRz0EEHiaHzUunwDTTZhZ70woWLaPKkyaKh4dMaf30/IoIkdQTl8wgSicWU26mnnsojgIfTqqusLAX4kCT1S4LfCMqiI2DIA/15mg2fBMPIBUYGH3vsUfHs4CUcTlYdEYTkjKDYLny96ZJLLgkaj6AezLMKuO5NvDzDmCKCJFUEVcB3vAAwGiXqEp8Wv4GgAAiUREp8vggiYJHiuAgvAIxGbbDhBvyZvZ6iI9ijR13wpRbJZYBi6hCcvl0iUyGmcLH0Y+iwjYS//OniaCqx76iHf7znnvSDH/xAvGzxCTYst/lyPE8rc52lBDpqi1/i+2GyN08TQTHPFltsQSeeeCJ3UPqJdbWItb9e3Rcd+Q0EBUBAEilx2NXB62lP4VH0XfhdpH05y+cRUiMSA10B4NM7SCUqJ5YzQR/eS/gP32OnQFAABKyRkrxdDUsaxEjVz3/+c9qSRzur+QtZ2AuABoiNxxMawQa6AsDhOzrU+JzuRjyFi2nc9dZbnx5+5GHCu/Hwww/PL7mJocNXFpAGgI+J+DF1yjTR0cO9jFE5NN7QCZ7NnX0/RaTAl6AwAHzy6G/Id6zPvuOOO2j33XcT9xOWquE9uHDRAllv+DxCWgwdvlYDKe6h/XjmbdhGw8SSiGAAg3XM4SUZaOPssOMO4n6D/9tssy299957Zs1pfWdpyi5szTvfdP3X4IhOkM9ZRGE9IP6H1yDiJYVegkgRHRZhquIID9Gq+XWOC/gTSn7C55QauHWOl6+e0unQZeRzLAoN1QP4RYAGxu9+9zvR69ptt91ED9/GI8ojfqSzC40bjLbiZRQ0oH1RER1Gi/RCB08bT1WgU/DkU09yw2KwWA/Y2dFJl1x6aeGXgaolosM3WCXS4YrKCrr7rrvo6GN+Tr897TQ6hitJ/3NsGqUvKqJDozJnDDwYlcMo3B784v3xj/fk6SAza+zSiA67QEwNoaG+//77C19H/uc/7vWPvqiIjhjWGXgwPfIIvwiwTg5LFkTydcQQGSGJ6HAI82n934iwUIEvKkLvI0L0nEXjfOyYsfK5yZP04k4xKmbgtRTKarhCGZtdeR0Vvmz/F/IiPBYlPk+E3kd4fGhInH3OOZoQ1NGrrLwK1dXU5ct1noDYL47oCCjsgMKD6Ti83O65+x7CMhw0PILk6wgKYgA+j6LD4/IQuIfv5xE5fF73aF6WgHyQIjwBRgesOnSycA7TnOj4Yer++eefF2vlvKGvMCXnfR0GlLXI58n7gUGMb3hUDKN/Z/D64f/b+//EevgxY8ZERZTJd4yCvvzyf+njjz6mK6+8MqTXNzhecYhKz+ZFHXvcsTSFl4G8xOvjMRv4BE/fYqBhD57BsaYifW/iewmjyujwqgmbSYN6I6KjeN8xQIUUVEusA/eYtCUnOqOrrrYq+YNqqn0CjtgVofAKfHMVemUNpFKq8KPCRONuCfdkAiMVvA+iERh841oR5esEHWThf9BazjODHI2OQgkjeVh0bUvQhSmBtddam1vmG4nRMAzlrsejYpiquf6G6wMbdBmKwTpC5GAzbgLzNIfHgBGSNbjH05MXrMLOybw2Yeutt+bFqyN4eqYPTZ8xU8QxOpTN/Bb1iPfXX88KpjsMplE1T3v1496VujMW6x/QqMOwfZAsOgK8ArS3t4n1k9gpb0vo2aFXh5EojBpAF4bHvd5tT7EGBZXXeuu5D/JW5aNhjzi7Eh5Q9CwRbzRiAGNapLGxic7jtVO33nqrmKrRZBTwHY0yPHR4cbrSWmuvJXbUY+MONmZh+gtxh/jwPe2S4+PwkM+bP4+wRsmWIHcAjzyq60rRcEMZ1g3//e/X0pVXXSnuMaMMg+/NTc1CL/y2pQqOL9ZIqbMIeNFiWua5556jf/zjH/JFb9Bhk4vnt6HhO0bbmfC8hDuZNnnOcrsKKxuecXzHHgv91YT7GhvSIvVXCh2qXBccjECm0ZGGJ28Mpv724GlGeQ0swizFLp9MOIzc4HlCfXEpdzzRqA1SGh0FeNC4wPqxy3gt72r8Yk3VUiugI7BfAfCyR8MNy27wvvz7NX8X9fTpp/M3500phY7wY4V30Xze2IF1xH/gdYEYcb7sssvEWvWneH083leJU0K7vuPn/VFeurb33nt7S8fiKEyoQ4jM8+Bb0EceeSRdwJ18LO3BxlKs2y7J+niLXagvUCdjw6GfMJU8i9/fjY2GesMnMv1adJhIUeaRy3c11qlXVlUG7wzQoP5qjAycAZMgGexSGpBmQXjJvPveu/QBb36RDQpIkgaDEztB9+QRmXBSdeIlCEcwQqam7/gmX2ddOdWs4vzwoAy9iWefe5Yqg+MrdTtg0ZDBg8lfi3fvvfeKRs0rvJAXo2O7so0zuSGXdDcWXpzPPvss885gczBoq/sO2+q54br//gfQcP5w+wMPPMg9oMl09913i0oYw8moJF544QX65S9/CfJYCQ2Mxx9/THwQHksDxJ0SqOY824FGOzZwYFcbUltrGz3Li7Ux4hmMPgpM/D8NDUvo/vvupxZuGOrJ04myQYPWocMOPYx68FA9XjTYmes3cvr3X5vDVCEaoUkakF/zC+S++x/gl7ShM5FXvdnmm9EBHGesLcUaGzSw0Ijr06edttp6K7HWp5VHCGu5LG5CowHT8OMnjOeQSh9VfjSkjjn6GOq7cl+xOLkfTz09//xz3DFZRtN5BOXFl17kKd0mXmOzf6TxocpRYayJ+s/T/xHrZsxaScT0lFNOCTarwI7ded0hGjLb8akCWN+7zbbbJLqvvpn9DT3x+BM8Gt8g7ylhgLQC8TuLF4CrL3Ns6sC64r/85S+0Ja/VS5Pefvtt+uCDD7QGt9TqScSOwvCpAcFtn0ZphAca7Qn3lDYqxaQ4mipNJ8GuxYQJ2xXOm3iSltllor7BzAWm3/CLOq0r0llnnSU20qBjduONN/LU9ua8+H9wGVRXiM44Nndglmh3riPRccRDgPqq3GnHHXakta5am+uv/UXHDPsFMBL5858fxXXo6mVRj/u4pqZabFQdwTuvkbAHABs7ZvAmJux6L3dCAw4bHjEjF02ljzvWL1/PJ2PgBBb4/Prrr9Pf/vY3cc0xnV6OhNMLTuNZMKwz3W333Wjw4MFcf55FHe0dYvmPue4oje/+KKTvF9Yl4v2A/34FLzq+PkEJf60NSF81bvJ9frqP+F9Ir89jo0PDDaN0n42VC+KxdgDr1zAlVyihZ4H/cRPW9eDIE1QS2EV63333iV/jKKAiNOwHem1YqxM3ffThh6JRhdExJPjdj3tCWLSdJKGxfcYZZyZh4TUXC+nzcZ+JHefq6FFcIfAdG4DO50W3cRJ23Q/myh6jSqisECu8iJDUUVFVVji+Pm4DboRecsnFftb5iwcCDVboQ8IDWsWNK3R4MF2RJKH3eNRRR8ViwWg8GjhffvEljeLGEEbz5nAHYcL4CbxWr5eYIgqPXqmCVd9xf6BxWCiBB/7iWcHLQLzw2N/11/dGdz/77PNCIjQ8GvV/4E0xcRNiipGTm266SexkHLHZZoJV9SWOLNDjOY/zrPvywIMkqlo/4xWV7K/qBxrMuH6Y8lMTNrZgZNR/plQelc4GJ6UXchLexzbdrnLfLviLTQDokF515VXi9Aobn89jw4fLC9GjvkH6KY9QPfTQg3TbbbeLEaOwnFLkMRP19NNPiw43dsgu49EhbNC67h/X0RuvvyE2ELn0FPIlzOvTo37CzEGw7IMJsXa5gTuRE8ZPpJ1+IBuQPk9YVpo8OgNonGK2yE9YIoC6JHyP+/hS/fp+jB07Vjw72lpTixKfx4KOVXz55ZfRFlttKTbqggGnJ9zLp6I89NBDYrNYKXSYDMGRahN4EOI3XKevs84gHun9C+/CPkuMupobkLqUtHZBNv8LEpbvtfM7uKXF2xiGdwdmT1KNNgdSzQCG04xJsceINxX6PFgjhunANt6JjelND24TL/nd9tid/jPyP4ReCRocr/HoIIZcf/SjH5lEFlWGER5MeeJBxVlymCrBaB2OfnEl3w8XjQu3He+0xplq8BEXDyOQU3loG1Ou5U7ffPON2MWJxcppUlLfMRqMxbrvvfe+GFnGjlnsIMVLAaOSppRUh0kGGnI4ogjnbqEHhqnRjz7+mCvorfVNQybmIsrg19lnn0133X2XWLN1Ay+LwHmIGGG+5ppr5DIOi440voMHo6RPPPE4H+8yQTTQ8ezgiBskjNiUK0HP83x8EEYPMC3Uh58drFnD/d3IlVKSlMb3Nq5LUPnhhdfaJuuSJHoL0YbtQsdz3Lgv8j14EqNji/l+wyYmP4V5/HLbb1J6yInz0rHpi1sOu7A2HCN/mLHAkU04+syVkvpio1+0eJGIra+rgjuDNTyz4I0K+qWl/UUHAQ1HTKcOH74pbcDLmzBIMnjIYGt9pVpg80WlUWGfHp0wTGni10+YAcBSkT59+/hF4tfn0QpTZtBwRMdHXf+G9xFmcPyGe0rRBdl8P7C+Fe+C8PpAkwCfx4SLU4b4Ll26hI+u0898rOfrjs4D6rNiddjswGDGTTfdzMsxxohRT9zLKMOShTgplV3MhIanmnDNq6pq+LnG6Dqfvc1151czv6IhgweLfCn/WEcgfSXxWsWSChfozjvvoLd4ugs9u2nTporRC+wCw3ErBx90ML3y8is88vJrbtgNE42NCy44P3aQfbsK/cIinPHl935wqOjh3HjEzqi4FbP0yqUtSoVG6ieffExn8ughjsLAmW4DBq5De+31k7wgySMhl474OLE8gEugQeIAAA2vSURBVLsjK/NUq5/S6IjH461nRWX8Lp9FhakoVFZYb4MpMKzziSYpWUJRqkIlqHg/+ugjeozPItyQz35EBwFrKC+66CKNtRgdmqBIxpOMZR040DveuaLSGglFBBsLang0uiePcOK4FYwSYQ0qKubf/OYUsWFLMknJEpLYpBDWUN3OI0IYrbjpxptEYx0yMDp+Dm++2JWP84mXpDUSKsx5H69Vw9QmGq2wZRqfOXo473zfa6+9gtFAKUVKlpDExoUwFXXiiSeJs9XQEbuPl3NgtHtzMfIqJUsormSvsre9KPDyw9mIaEBhKQp8xjO0Or8QCt9f0hoJFbYLZ9Zh3SHqjQMOPICe440dsA+jsBgt0z98ICVLqLAOnyLM8+orr4rGK3Z9455+l4/xwXMcZ1Tel+n9SskS0in8HJ4bLH3x03T+4MXzz78gppV34SVO9iQlS8hOHcbg+bmVz23dnmfQsPMbHd6nnnyKNw3tKAY4PPo0kiWPhKR2nEeIEwXu4RG47XjmBB/ywBQ+jncZHLtBISVLSOooBGE9PpbdIPb2lEay5PEhNNj2229/MVsyhjfDbbTRhnxO4rviAxd4J/kzCHY7whhfsvvZBdcSbqDO+momx3WIWKZz/C+OFwMLOJTfnaQON53EYpAO+wXmz5vP+0fauUM/kzu8JJY6Yd3n+usNEZu0NuZBq+lcj+CIrF+e8EspIBYk7ZKQzuh9ylDBKqBOqSJUWKcSTmBUCJtugsQ10mqrrhaMzmCK8RXe6IEKEjc3jnMQySWXCYwVr8qjwAAxQoKXD3rYO/OoAoIZSSGeJDoispSCRp7yemf0OzydPI5GbDqcpyh2EuvJFHUKNYNWhE6m5VSePLyIK6opPNq5Gb/sbFPIgQyFXwEDtABUhAIroCBDBfnSSy+JhsYeu+9B62+wvvewKoQKaNehY+w5FtbMQ/QY7cTh9OsOXpfX4e4q7jHjNQxLUoxRQJ1KRSiwAooRBfToMaotpq5VpAIroF2HjonmWAiWKLzxxhti5BWNm+223S54MKw6wpIUQgXUqfIINGowqo0KS02oiPFy0kYVVGEKrICqCP2etxChgkTDEWgwQC/qkmAWIX+xLey6vlDOxYOROJxPW9+zBzXxOtcHefrrR65ZElWYAiugrl1F5GE0HLfffnsx8olRg7r6Otp5p53pqr9dFT23VuFXQF2HI+fzYFQGHzvwl52INcC8/Xv99dfjEfZ7xXMFMT69UaSKVGAF1NnyiLn8ArzgwgvFoce4jzCrcNppp4uDtdFB0ZIqTIEVUCN3ZVQebNxBR//sc87mI3q3D54l1WGV3iXXxYPnCJvPzvvTeeJjG+jsYmbsdp4VWyd0vFtEh2qAAiugzhJCLFywkH7JXwX7kNceV1VXia/DYRMROvtBUnkUWAEDUiOgECqgIMW7CEvATudrG7zEw0RGoVyo0imwAkY4cUTTH889VyxZW5nr5Xn8/r+M123/hmdRjINHqjAFVsCIDq0gT4iD2rEUCvcyZk3OOeeP3IA8LfIe1HzSBIUyqgEKDPBzHpw7nM/IbeGZqTb2t762jn6814/FGaO4rpiNO+XXv6albEcTL9M49JDDeHDlQjGDpGlR5Kp2qcUavZLhWFYk+BY2i+QNBthjEOsFrShKBHpqEuhIzCBuymR+pPGdeRJ44RuVxq4UahKwpIgve57M+66Ir2dU2eOb+Z743kp8TRJo4MvhP1oJuPBJwXZxFAg6Rph+W311fP7UXfMVe89juQuW3YiXXF4Yplcx7eqNnCTTEMd36EQDXSYsvuf1xLyLEx0iT6/E2qBkljE168B1xxInLPWZ/fXX/JWMdcSoGHyOpmQaBL+nxnnVMGOGJVYYHavmxlWaF1xcyxBrjDxivTQ6JsM2Gsox1o99ifqNkrgaFO6Q71gCgyPOYAM2EEU3koYYFFEuMI5lGClDowozNf51dz9JqsY4GlR6hpmlndfmT+Xd9ujcDx48WKx5Fc9ViNTLlsZ3xBYzCFgugE2t0CuTp6NUdZ03Vb9UimcIz03PHvypZGwIY1vQIcXmJXzEZMMNNxCzRhqDyKT3vTJZAzKqOivJIpBFIItAFoEsAlkEsghkEVixIoD2Y2WpXOZ2bNlTGh1peJI60l11dFe7uiK+me9Jo5yMvrvGN6ldSekRpTQ8yaKbTkdSu5LSd2ffu2N8k9rUneOb5l5J6n931dFd7eqK+BbyPcEUdlJzM/osAlkEsghkEcgikEUgi0AWge9bBLwRSEcT04HiWLixWrAcpA6UVUcaHs0eP+MQ5EBZ7fLFar8OQQ6UVYeRJygMAM0EY8ZB6kBZ7eoKHUa7gsIAMJqiFTpIHajl6rtmv58JjA0AH2P/dZA6UCzPjdUUOkgdqJQ63BKXn12aZpFxW+rGatIC0gAI0NGSPMqKKHRlHYyB1uWhI2pXtGR52BUOynKOrzUoy9kuESaHceEwOkgdqLCUIO/mcWMDIQAcpA6Um1FT4CZNoyMNT9gkP1/kCCRMMSyHtRT7SpP9llBYCUV5d86K6rvlCnZFfC2qncUltcuiqaQ6SiishKIsnlsfBSu9E1FCg62irAinZUZkCUWVNJBWu6wIo3vOwhKKKqnvVqNLaHAJRWW+G96j1muYBlHCi1VCUdbr3hU6ShBGuQYSBidJAb3lwpuKA54kikBrEmaRUUiHSVQhnrCqgN4kzGJuwBMWVihv0WFiK6QjgSiTeFGWRkchHquyBAYX0pFAlNWcNDoK8ViVJTC4kI4EoqzmpNFRiMeqLIHBhXRYRVkRUavS6CjEE9WSLymzXUJLmXUk9T2gL6Fdyyu+gS9WA3REQJ/5rgfGkgviZcFbi0sYX5OopHYF9CZh7ISpOOCxOmlBmIRZSAvpMIjyNtEIRCFuRWkgKA2PIicWWGYdK7LvIv5p4puGJ9bFVoi6q47uapcSulhgGj/S8MQyRiHqrjqS2pWAPvA+AU9QBwfMMYE0OpLyJKWH6Wl4YrockKXRkZQnKX3me3B5CgHZPV8oQgZ8ee/HIqewDfZmRVkEsghkEcgikEUgi0AWgSwC39sIyCns762LmWNZBLIIZBHIIpBFIItAFoEsAqWOQP4cSG+YUx/s1HO6YomTECj0nIlHp9BzOr3M6VR6TlIBcuF0SpnzeHROPSdpAUmchPRynV7i4tNLCfF5dEopwQV5PDqnntO5bThbObg9nE6h53QdMqdT6TlJBcjDuSh0ehuPS4INZytPo0NaqUvVc5LKpkOnsOV0qXpO57HhbOU2uwrTS07fgsI8LgpfSvhX59FzOq0NZysHt4fTKfScTYdOpedMPC4KnV7mdB49J6kA2XC2csmjU+g5mw6dSs+ZeFwUOr3M6Tx6TlIBsuFs5ZJHp9BzNh06lZ4z8bgodHqZ03n0nKQCZMPZyiWPTqHnbDp0Kj1n4nFR6PQyp/PoOUkFyIazlUsenULP2XToVHrOxOOi0OllTufRc5IKkAunU/q5glPYEFl46UE8Kl+p9yt5JKRTFJ+TkiUUX2o8nnhUulbJIyGdoviclCyh+FLj8cSj0rVKHgnpFMXnpGQJxZcaj0dSSaiQDkkpoUI8SfFSsoTiy4jHI6kkVEiHpJRQIZ6keClZQkllFKKXkiVUap74kqVmySMhiS0NJCVLqJBkSSkhF088Kl2C5JGQTlF8TkqWUHyp8XjiUelaJY+EdIric1KyhOJLjccTj0rXKnkkpFMUn5OSJRRfajyeeFS6VskjIZ2i+JyULCEpNdYUduHGIwRaqKDVkLxiySMhJrbwGMR4RU56KVlC8XVoPFYDLFQWuzLfZbwkFP+aBJdBja8KCwIpWULxdWg8gcIwIKkkZNdRtuuewPcIadglzmu+GPBekaSSEGOcCiSlhArxGAxQdaiwIJWSJeTpiJAaRAdF/B1Ze5KSJcTULhYlqvF4NCppiqpDhQWF5JGQZ1eEVEqMQv8Lvkeslh5LqDv4Lg0N2yUxKqRRSYTzAkoeCTGrk0eKDqCSX/dAsnL3y7IopFkv0U4/JI+EmNXJI0UHkJNeSpZQfB0aT6AwDFioymhXYEGROgqOQAaKMiCLQBaBLAJZBLIIZBHIIpBFYIWPQKwRyBU+SlkAsghkEcgikEUgi0AWgSwCWQS0COQ30WhlqTLOkdBUEqNMaXSk4Ylqdpd0Vx3d1S53NKPYNH6k4Ylqdpd0Vx3d1S53NKPYrvAjqrVwSVfY1RU6CnsapegKu7qrju5qV/QquUvS+JGGx21FFNtddXRXu6IRdJek8aMQT6VrvYCbWcdaZvE9j3RSzUsHSqNDxqkjoNYlOnl00kACAAcqgi2PDs2czHc9HAVz5bkm+l1RHh26a04dOmmQS8MDZt27QFwe0LFOHTqpJsiB0uiQceqIUBdX4LZLxzrt0kk1oxwoptOxTh2a1OIzuuawPB3rtEsn1QQ5UEynY9Pq0BQWyPg6dM1hJh3r84SpRF4n1UgcKKbTsWl1aAoLZJw6At7S2KVLCYTnAR3rtEsnDQuKnXfqCKToypw8OmkgAYADFcGm1aEpLJBx6gh4dasL8SRbAwnZhSQGhqQE0uhIypOUHq6k4UkagjQ6kvIkpc98z+75pPdxEvo092MS+Wnv3+5qV+Z7/AikuYZpeOJb5FF2Vx3d1a6uiG9S35PSw4c0PN3Yd6yB/H/3obXxLCOgMQAAAABJRU5ErkJggg==[/img]
Welche Aussagen treffen auf die Zahlengerade/die ganzen Zahlen zu?[br][br][img]data:image/png;base64,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[/img]
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