Wybory do Bundestagu odbyły się 24 września.
Tabela: Wyniki wyborów z 2017 w porównaniu do 2013 roku
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfYAAAFHCAIAAADcH/k7AAAgAElEQVR4nO2dT4gk133HGyRPQsaxNcaWRwozhMCYZREYrQnCc8hCPLYhzCgFmsQeBeKsEUtigwcmSGYlzLNE3Ea7YQ+CxAlOG+MEikRY8cEHXwKxG4LqIAiIhBxCGx1MoPDFh2YOffjl8Hae3ta/rtfdVe/bv/5+eIfdnp6Zz7yp+nRNVXXVYDQaDQkhhKhjNBoNhsOhEEIIUcdwOGTiCSFEJ0w8IYSohYknhBC1MPGEEKIWJp4QQtTCxBNCiFqYeEIIUQsTTwghamHiCSFELUw8IYSohYknhBC1MPGEEKIW5Yn/8Y9/HFuhGkwxTCuhWDiYYphWolpMeeJhfzRMMUwroVg4mGKYVqJajImPA6YYppVQLBxMMUwrUS3GxMcBUwzTSigWDqYYppWoFmPi44AphmklFAsHUwzTSlSLMfFxwBTDtBKKhYMphmklqsX0J/7jz/wpBwdHm9HD+tj1t1gMxWJMPAcHx4PRw/rY9bdYDMViTDwHB8eD0cP62PW3WAzFYkw8BwfHg9GwKqVpOhgMBoPBycnJbDZzjydJYh/f39+/vLys/JTBYDAajUR1STuCiZ8DE8/B0X7UrUd5np+dnc1ms+l0euPGDdtrEUmS5OLiou5T9vb2JpOJiGRZdnBwcHl5CZsaxWJMPAcHx4PRZp0yxtjE53l+/fr1wpa7g4lfCWucePf3nf27z24duD/r3KZBYTFyy0rL78LEc3C0H3NXKLuejsdjuzIeHh5ubW0V1llHlmX2o24fjuKSdsS6Jt7/+y5N09FoNJ1Oj46O7Gu+XYxs+pl4Do7exr3vvtU8Pnvyhd/77LP23197+fWPPv7Et//2n+99961v3v/+1q/9+le+/q3Ckx/7yEf/4sW/euTRR+1n/eGXLuZ+i65HXSiWrlonrGXiKzPtJ15E8jzf3t4ej8dMPAdHb2Nu369/8ndf//s3y4m/9923nnr6GT/xf3L7wj15+Dfpb+3/zle+/i0mPpS1THyapoWD8lJKvIgkSTIajZh4Do7eRkMZn3r6Gbf9bocLt839b374sTvf/k5l4t02PhMfivLEcyueg6PPUZfFr738+iOPPuoOlT32kY/ajXf/cdt6v/tPPf2M+5Q//tJX73FHTThrmfiWO2rs4Xj/uHzd5zbAxHNwtB/LB/Sb97//8Sf33N6bwkBOvDHGvhrt7Oz425oiYj9kDzL71L1XYIWsZeLt0VR3uDXLsjt37hQSnySJmzX/2GzDebiVMPEcHO3H8gH97MkXCgdd1yLxr7zyij3xX0SMMX5ksiw7PT09Pj4uJL7uvQKrZS0TL1eV998UV3fSZOHJoa+Ww+Ew+iIFu6yvixXF1IghWNWFwv3bHgV08bGbnna/cV1n3HsFVs66Jr43mHgFVhRTI4ZgVRcKt6PG37507W5IvP9egS4KtvxXYOI3dFlfFyuKqRFDsKoLhfu3McbuLfCP/DUkvrBjZ7Uw8XNg4hVYUUyNGIJVXSjcv90pHv5l1PyLqfm414PuCrb8V2DiN3RZXxcriqkRQ7CqDMUXv/hF//325atmVm7Fh579sQBM/ByYeAVWFFMjhmBVGYpXX321cAJI4Qku8W7Pu7sCT8NnraRgy38FJn5Dl/V1saKYGjEEq7pQtExK8/U1Vw4TPwcmXoEVxdSIIVjVhaJlUowxHZ08UwkTPwfYHw1TDNNKKBYOphimlagWY+LjgCmGaSUUCwdTDNNKVIsx8XHAFMO0EoqFgymGaSWqxZj4OGCKYVoJxcLBFMO0EtViTHwcMMUwrYRi4WCKYVqJajEmPg6YYphWQrFwMMUwrUS1GBMfB0wxTCuhWDiYYphWolqMiY8DphimlVAsHEwxTCtRLcbExwFTDNNKKBYOphimlagW05/4fx8MODj6GbGX9/fBXKkxrUS1GBPPwbGyEXt5fx/MlRrTSlSLMfEcHCsbsZf398FcqTGtRLUYE8/BsbIRe3l/H8yVGtNKVIsx8RwcKxsNi6K7hZB/kyD/vkKFOwo13LC+5ZIfurL0AKaVqBZj4jk4VjbqlsM8z8/OzmazmQ23rbm7gZyIZFm2u7tr/21Z8qbPmCs1ppWoFmPiOThWNtosk8YYm/g0Tf1t8yRJ/A15Jr5PFItFTnySJIPBYHD1V2rhj9PKB4P+YmXiOfoccxdIP9zGGH9hdun3nzm4IrT1mM3CtBLVYjETn6ap2y95fn5+eXnprwB5nm9vb4/H4+l0enR0ZP+GtU9of8tzJp6jz/FzY5rH+c2bL3z60+V/2/++/uyzlZ/1xnPPPfnhD//PK6/M/fpu/ONnPlN+sMu1uRWKS9oRehJvKfxxav909RMvXvrbfAsmnqPPMbfvn/nEJ/73G9+oTPznrl2rS/w7L774xIc+9LPzcya+IxSLQeyocX+f+ol3B6AKiZfSXssGmHiOPkdDcz937Zof9J8b86MXXvjYBz9ow+3/m1vx/aNYLP7hVpv1nZ0dW/Py/sfKxHMrngNw1AX3Ry+88IFHHhlc4Xr9xnPPuQffvHXr58b898svP/XEE2/euvXOiy/+xgc+UHg+E98RisXiJ97i9smUzyIo76hxp5rNhYnn6HMEVbhun8zBxz4WGvTlE18+bb/5NAf/jP7BYLC/v395edlmfWyz2vaPYrGYiTfGuO10W/Y2iU+SJOhw6/JrXRejcg2MPjCtNkrs/OZNuznfhVjdalJ52n77szYLZ382r49tntY/isViJt4eOPW3EeoSv8xJk9Er0E8aFFtRbFVibVYZc3XuZsvEB52/r7ikHbHeie8BJl6BFcVWJTZ3ffF73fLE/PJ5cc3rY8jq2x+KxZh4oDUw+sC0otiqxOauL+bhd2M50jSt3Nse+hZc2NQoFmPigdbA6APTimKrEmteWYwxddvjdec41KW/YX1s+cyeUSzGxAOtgdEHphXFViXWsKYkSdJwlKsu5e3foeLWx/ZP7hPFYkw80BoYfWBaUWxVYnWrSZZlW1tbhTMg/bMhXN8Lb048ODhovwkvqkvaEUz8HJh4BVYUW5XY8itUnufXr18PynphfVzeoQsUi+lPfGyFajDFMK2EYuF0JGau3suyGJs2XcvDxM8B9kfDFMO0EoqFgymGaSWqxZj4OGCKYVoJxcLBFMO0EtViTHwcMMUwrYRi4WCKYVqJajEmPg6YYphWQrFwMMUwrUS1GBMfB0wxTCuhWDiYYphWolqMiY8DphimlVAsHEwxTCtRLcbExwFTDNNKKBYOphimlagWY+LjgCmGaSUUCwdTDNNKVIsx8XHAFLNW7oY+9m6LheeUbw/UmxggFAsC00pUi+lP/J/9wSsc5VE3Xf6FR8oXn6q8PVA/v8d+vlEoFAsC00pUizHxGzrqpst4Vwxvvk2uubo9UA/ALqIUCwLTSlSLMfEbOuqmy99yb7jhQ+i9IJYEdhGlWBCYVqJajInf0FE3XSKSJIm7rmzl7nipvz1QR8AuohQLAtNKVIsx8Rs66qbL/2/dlWNN/e2BOgJ2EaVYEJhWolqMid/QUTdd/n8r7wTUfHugjoBdRCkWBKaVqBZj4jd01E2XfwMgl3K3573y9kD9/B57+C4LQLEgMK1EtdgqE7/kHWEsq91IZOJDE1/5+Ep+s8ugeA3sCEwxTCtRLQaX+NXCxK8k8Uve62d5FK+BHYEphmklqsU6T7wxxv+r351MbW/+6+7ze3p6ag/fuSf477F8++233Z2C687xqPvxoscUc9RN1xK//w6hWCiYYphWolqs28T77U6SZDwep2lqT8bIsuzmzZu25v4ZeDbxDW+6cV+hjRITz8R3CsWCwLQS1WLdJt5twltsu+1zjDE//OEP7bvhbf3dp4xGo3LH/S/FxDPxIFAsCEwrUS3WeeIrz7obj8fn5+eXl5fn5+fvvfee/1mVifcvnOL/ZTAXJp6J7xSKBYFpJarFOt9R49LsSNP0+eeft9vvxph79+7duXPHfdQmPsuy3d1dt6PGL36SJEFb8f/6T/8GOP7yz1/t89sVpsUd57B/WvnTZf/h3uDa22mRzSheAzsCUwzTSlSLrTjx5YOibgeLe8Q+zZbFnmftn63hDrcWPtFFx708tPzxotccLfH+cY7Ca7C7gEH/b25qRvEa2BGYYphWolpM/1ufotd8vRIPeOarqF4DOwJTDNNKVIsx8RuXeLn646m8H8a+u/Xw8LD8Bte4wC6iFAsC00pUizHxm5h4Y8z+/v5Pf/rTra0tP+LDh28J4r93IS6wiyjFgsC0EtViTPzGJd4/dl247Hsh8XJ1+lPPv7UysIsoxYLAtBLVYkz8Rie+sJ0+HA796BfOa4oI7CJKsSAwrUS1GBO/cYmXh2/6Yc9fsmW/ffu2eHvqB4MBwia8qF4DOwJTDNNKVIvpT3xshWrQxOyJNK+99lpskWrQpstBsSAwrUS1GBMfBzQxey1JNCsHxULBFMO0EtViTHwcMMUwrYRi4WCKYVqJajEmPg6YYphWQrFwMMUwrUS1GBMfB0wxTCuhWDiYYphWolqMiY8DphimlVAsHEwxTCtRLcbExwFTDNNKKBYOphimlagWY+LjgCmGaSUUCwdTDNNKVIsx8XHAFMO0EoqFgymGaSWqxZj4OGCKYVoJxcLBFMO0EtVi+hP/xn8mHG7MnS6pvyeUxX3U3eOlB2AXUYoFgWklqsWY+M0ac6er4YYhhUfSNO3ttn+wiyjFgsC0EtViTPxmjbnT1Zx4/37r/jO7BnYRpVgQmFaiWoyJ36wxd7qk/p5Q8vCWe+Fa850Cu4hSLAhMK1EtxsRv1pg7XVJ/TyiLfyHi3nbHwy6iFAsC00pUizHxmzXmTlfDPaEK9Hkjb9hFlGJBYFqJarH4iTfGlE/bWBVM/DKJb753a5Ikvd28W/Ea2BGYYphWolpsxYk3xgw8bAKaW7BA4tvHhYkPTbzU3xNqPB77N4Tqre+ieg3sCEwxTCtRLdbVVnz7Y3HcikdLfJk+98lUongN7AhMMUwrUS3WVeL9s+tcxN02vr8B6D7qv+PGvjbYsrz00kuF+4i2f1Vg4leSeHtPqDYT3hGK18COwBTDtBLVYp0kvvCmGFvkLMtOT0/tTt4kSQq9zrJsd3fXnY5t/233BdvXA/9rMvE9Jz46FAsFUwzTSlSLrT7x5WN0tsiF3fSu0fajaZr6m/ZJkoxGI3//gP9vJp6JB4FiQWBaiWqx1Se+fCzUJb7yAF1d4sfjMRPPxFsoFgqmGKaVqBZbceL9U+4cbldM4d3whY9W7qhZPvFv/18KOP76za/2842Cfn2KF/SOoFgQmFaiWmzFiffPtxsMBjb35cOt/rsi5x5uZeK7SHzl5SQLS4L9fcU90GpRvAZ2BKYYppWoFov/1qdOYeIrp6XuWmP+kmAPjx8fHzPxDVAsCEwrUS3GxDPxFYmfTqdHR0eTycQ/9ykisIsoxYLAtBLVYkz8JiZeai4n6ZYEtyuMiW+GYkFgWolqMSZ+QxNfeTnJ4dXFhN12PRPfDMWCwLQS1WJM/CYmvu5yknZJ8I/E1t3er2dgF1GKBYFpJarFmPhNT7z/VrXyksCt+GYoFgSmlagW05/42ArVRBervJzkk08+WQg6E98MxYLAtBLVYkx8HADF8jx//PHHI15OsgHA6bJQLAhMK1EtxsTHAVDMGHP79u3YFtUATpeFYkFgWolqMSY+DphimFZCsXAwxTCtRLUYEx8HTDFMK6FYOJhimFaiWoyJjwOmGKaVUCwcTDFMK1EtxsTHAVMM00ooFg6mGKaVqBZj4uOwvJg769G/AoHFvXepfGHnrq06gmKhYIphWolqMSY+DkuKle+74sjz/OzsbDab2betBr0xVet0dQfFgsC0EtViTHwclhHzL53fTPsL6y9v1SkUCwVTDNNKVIvpT/wf3f+vNR11P1SWZYeHh/Y6kYPBoG5z3r/4TPvpCp7iXqBYKJhimFaiWoyJxx11P5R/JcjyzdAddTfLbZ6u0BnuB4qFgimGaSWqxZh43FH3QxXuglt5GRljTOixVlG9oHcExYLAtBLVYkw87qj7ofw9MP5tzR0NB2PnTtcCn9UDFAsFUwzTSlSLMfG4o+HncvdscrfPdt33P1R5SmXzdK1g0juAYqFgimFaiWoxJh53BP2k7U+zaZ6uZT69OygWCqYYppWoFoucePf+Hbfj2D1iz/YrlKuwG3oum5N4Y8zyF3ZXvKB3BMWCwLQS1WIxE+/vMk7TdDQa+XcjOj8/v7y8ZOL7RPGC3hEUCwLTSlSLRUt8Zaz9xFs2OfH/8h/53LGqX4ebrtV+wVVBsVAwxTCtRLVYtMSXa26xO2rcezKZeCZeKBYOphimlagWg0u8XJ0csrOzM5lMmHgmXigWDqYYppWoFsPaUeOTJMloNMrzfG9vz533zcS3TLy72GTzqZPGGHfapahe0DuCYkFgWolqsWiJt5vq7nBrlmV37txxp4X47+7xj8qGvqlnYxPvk6Zp5aRlWXZ6enp8fMzELwzFgsC0EtViMc+osR33NzPtFVcKV9fyn7bABdDbhLL/8bW7b63k67Sc5PL5lNPp9OjoaDKZ+Nc/ULygdwTFgsC0EtVi+t/6FL3mcRNfd8zDXWeYiV8GigWBaSWqxZh4zYmv24T3D2kw8ctAsSAwrUS1GBOvOfFpmlYeaC0cjHVnqcIuCRQLBVMM00pUizHxmhNvz0qa+xxuxS8MxYLAtBLVYky82sSXTzCt3G/DxC8DxYLAtBLVYky82sSXmXs1StglgWKhYIphWolqMSZ+gxI/92qUsEsCxULBFMO0EtVi+hMfW6EaTDFMK6FYOJhimFaiWoyJjwOmGKaVUCwcTDFMK1EtxsTHAVMM00ooFg6mGKaVqBZj4uOAKYZpJRQLB1MM00pUizHxccAUw7QSioWDKYZpJarFmPg4YIphWgnFwsEUw7QS1WJMfBwwxTCthGLhYIphWolqMSY+DphimFZCsXAwxTCtRLUYEx8HTDFMK6FYOJhimFaiWoyJjwOmGKaVUCwcTDFMK1EttgmJH3AsPaqxFyX2L4rgX6a4cJHLlreTrf89IkKxIDCtRLUYE8+xYOLtfXT9C1X691LPsmx3d9fdV71A3e1kG3+PiFAsCEwrUS3GxHMsmHiLn/hCuOuuVl93L6p5v0dEKBYEppWoFmPiOVaWeGOMn3h3e9gCdbeTnfd7RIRiQWBaiWoxJp6j18QvsAkvqtfAjsAUw7QS1WJMPEdXia/cUVN3O9kWv0dEKBYEppWoFouZeLtB55+AUXjE9aL8zJbfgonvM/H+Ida6w61tbidb83tEhGJBYFqJarHIiT86OvIr4D9is2532vp/3ed5vr293fIvfSa+u8QnSeJedHd2duxvzT8z0v6O/N9d+XayLVG8BnYEphimlagWw028eDUv7MBtvyXIxHeX+JbMvWFs698jIhQLAtNKVIsB7aixKS9E39a8sCXYcMJ1ASY+euLn3jC29e8REYoFgWklqsWgt+Llaldv+cWg5bdg4qMnfiUoXgM7AlMM00pUi0En3r1bcrEz7WTdEm+MfQF76MGH3/Y/2N8fXF4y8ShQLAhMK1EtBp34JEnKh1uDWKPEZ9ng9HRwfFxMfCH3FxdR9CKjeA3sCEwxTCtRLQaX+IaTJhdNvEEavljFVPjnIBZYeBLao3hB7wiKBYFpJarFNuGtTwZp+GLv494I2pD4Bd73HwrskkCxUDDFMK1EtRgT3/PwxR7gny1el/geNuFF9YLeERQLAtNKVIsx8T0PX+wBhQupV759d7H3/YcCuyRQLBRMMUwrUS3GxPc8fLEK6rbiF3vffyiwSwLFQsEUw7QS1WJMfM/DF6vAJX4l7/sPBXZJoFgomGKYVqJajInvefhiTazkff+hwC4JFAsFUwzTSlSLbULiEZkrtpL3/YeyvtMVC4oFgWklqsWY+DhgimFaCcXCwRTDtBLVYkx8HDDFMK2EYuFgimFaiWoxJj4OmGKYVkKxcDDFMK1EtRgTHwdMMUwroVg4mGKYVqJajImPA6YYppVQLBxMMUwrUS3GxMcBUwzTSigWDqYYppWoFmPi44AphmklFAsHUwzTSlSLMfFxwBTDtBKKhYMphmklqsWY+DhgimFaCcXCwRTDtBLVYvoT//S3/oEj1ljh73FVX2q1UCwITCtRLcbEczDxi0OxIDCtRLUYE8/BxC8OxYLAtBLVYkw8BxO/OBQLAtNKVIsx8RzREm9vd+VfUNPdAKtwl1q3iCZJYp/Qwz2w2gC77mCKYVqJajEmniNO4pMkubi48O9ylef52dnZbDazt0Px73JlF1H7KZ0uMKHArjuYYphWoloMN/FZlm1tbe3s7Ewmk4W/CBMPm3hL3Y0MjTGFxEe5R8pcMNcdQRXDtBLVYhCJz/N8e3u7sIHm7lZqt+ncrauDtuOY+HVMvH9TQ/d7zLLs8PBwa2trgcWgO6KvO3VgimFaiWoxiMQbY27dulW4Pal/F9OjoyO7LW9X/sKO2gaY+HVMvDGmUHCbeLeE2G2C/u+KVSb6ulMHphimlagWi594W/B3333X33BzR9VOTk5+9atfucRL4OrNxK9d4o0x5ZfwQuIrPzEKitPQBZhWolosfuKzLDs9PZ3NZmma+ttulVvx7kP+jtoGmPj1SnzdAdXhcOjvvcmybHd3d5mDNKtCcRq6ANNKVIvFT7w7sJbn+d7enltvmxPPrfi1GA2/GveH2mAwsAfV7QF296A9LdKW/fbt23J1BN5+FGETXlSnoQswrUS1WOTE270uAw+3eV6X+MIrQTPrlfjd3392MBgc3P66/+Bvf+G2Pz9bj33kk69+J7rq8olvv4Rcv379tddeW/5LdYHiNHQBppWoFouc+DRN/R2v/n/rEp8kSdDh1r/72Ts4wxcrqNodVsfHxw3bp4V9WSsHcEE3xozHY0AxC8WCwLQS1WKRE1/Yq+5vofuJX+akyehZb5N49zLWsA+qfCrhylG8oHcExYLAtBLVYvH3xXfKuiTeHZBoSHzhL56Opqu7L74MFAsFUwzTSlSLMfHxE++fDliX+B424UX1gt4RFAsC00pUizHx8RPvrr1VPubsP6eHC2/BLgkUCwVTDNNKVIsx8fET71O3Fd/+rQDLALskUCwUTDFMK1EtxsSDJr7wTp/C1R26m66uv8ViUCwUTDFMK1EtxsRjJd4R5cKKsEsCxULBFMO0EtVi+hMfW6GauWL2fPB+ZBzrO12xoFgQmFaiWoyJjwOmGKaVUCwcTDFMK1EtxsTHAVMM00ooFg6mGKaVqBZj4uOAKYZpJRQLB1MM00pUizHxccAUw7QSioWDKYZpJarFmPg4YIphWgnFwsEUw7QS1WJMfBwwxTCthGLhYIphWolqMSY+DphimFZCsXAwxTCtRLUYEx8HTDFMK6FYOJhimFaiWoyJjwOmGKaVUCwcTDFMK1Etpj/xBhLMOce0EoqFgymGaSWqxZj4OGDOOaaVUCwcTDFMK1EtxsTHAXPOMa2EYuFgimFaiWoxJj4OmHOOaSUUCwdTDNNKVIsx8XGonPNlbkS+qunq+Tu2hGKhYIphWolqMSY+Dg2J7/8awg7YJYFioWCKYVqJajHoxC9/WwwmPgjYJYFioWCKYVqJarE5iS/sOljt7UOn0+nR0dFkMql7wmYm3s02bwnioFgomGKYVqJarFXibWvyPN/e3l5hd9okfnt7e39/f+HKr1fifdI0XeYHXwzFC3pHUCwITCtRLRaQeBFJksRuyKdpWtjY9B+pe46/lbqzs3Pt2jX775OTk9lsZoPuPjqZTLIs293dda8BxpjQ45Drm/g8z/f29hpe/7pA8YLeERQLAtNKVIsFJN4F1y9vocIuTJXPSdPUr3PDVnyapp/61KcODw8PDg7slmyWZaenp7PZTESSJGn5x8T6Jp5b8T4UCwVTDNNKVIuF7Yt3G+x+qd2mvTy8mV9+TmHHSznx5mo73W7a/+IXv3D74v0PtT8qsF6J9/+O6b/vonpB7wiKBYFpJarFwnbUWMr5Lqe/7jni7WH/5S9/6Sc+y7LCNnsh8QucJ75eiY8OppVQLBxMMUwrUS22SOIrd8L4ga57TuHL/uQnP/ETn6ap3SkvIkmSFLbiC1+//Y8X9PzewBTDtBKKhYMphmklqsUWSbxUHUo13o4Uu7nd5jn2Eb/s9qPPP//82dmZn3j/0+3B2JY/3iKz0j2YYphWQrFwMMUwrUS1GPRbn5YH9kfDFMO0EoqFgymGaSWqxZj4OGCKYVoJxcLBFMO0EtViTHwcMMUwrYRi4WCKYVqJajEmPg6YYphWQrFwMMUwrUS1GBMfB0wxTCuhWDiYYphWolqMiY8DphimlVAsHEwxTCtRLcbExwFTDNNKKBYOphimlagWY+LjgCmGaSUUCwdTDNNKVIsx8XHAFMO0EoqFgymGaSWqxZj4OGCKYVoJxcLBFMO0EtViyhN/9+7dISGErCd3795dsoFD3YknhJBNhoknhBC1MPGEEKIWJp4QQtTCxBNCiFqYeEIIUQsTTwghamHiCSFELUw8IYSohYknhBC1MPGEEKIWJp4QQtTCxBNCiFrUJj5N08EVo9Eots4DptPpjRs3nNjFxUVsowcTNR6PC49En7qCGMjUuck5OTmZzWaFB2PNWNkKZLqMMVZgZ2dnMpkUbCMuYGUxkBnz9dzCv8yM6Ux8nud7e3v2N5dl2e7urlu84mIXI7+ncUmS5OLiIkkSpwQydWUxhKnL8/zs7Gw2m1kZu7JFn7FKK6jpEhFjjI1m9OmqE0OYMUuWZaenp8fHx1ZmyRnTmfg0Tf0X4SRJQDbkcRYjH7+kUFOHlngfY4ydGagZc1Zo0+WmBWq6fAGQGZtOp0dHR5PJxC38S86YzsS7V2b3X6jEu7+5oi9PFr+kUFNXTjzI1Pk5wJkx3wpkutz+EDdFINNVFsOZMTshbuVlYAUAAAQfSURBVOFfcsaY+Gikabq/v395eRlbZD0S7xN96vxZwpmxgokj+nSJiDHGHifAma6CmP9grBnLsuzg4MB+Xya+icKkRP9jsBJ/F1tcGhKPs6PGJ+7UFaIAMmOVqbIgLGnOAWS6ymJzH+wB/7CqO7i65IzpTLx/UALqcKsPwraVxS8p1NQBbsXb48D+IwgzVrbyiTVd/k5k54AwXZVihSdEXzfdwr/kjOlMvDz8egiyy1tE8jzf3t62VtGXIRFJksTNkjt7DGHqymIIU5dl2dbWlhNzGnFnrNIKYbr8vdu+Q/QFrFIMYcZ8CidBLDxjahNPCCGEiSeEELUw8YQQohYmnhBC1MLEE0KIWph4QghRCxNPCCFqYeIJIUQtTDwhhKiFiSeEELUw8YQQohYmnhBC1MLEE0KIWph4QghRCxNPCCFqYeIJIUQtTDwhhKiFiSeEELUw8YQQohYmnhBC1MLEk/7I8/z69evRb3yMBqeFdAcTv7l8ogr3UWPMxcWF/be9Of1oNHL/3dvbm0wm7b9XkiQXFxeVLbMf8h9x95s/OTmZzWaFBweDgTNxj9vb0vvPGQwG+/v7C3TzjSrcR9dxWqy2fc7Ozk6QIVl3mPjNpTnxWZadnp7alGRZtrW15YqTpqlfmfa02VzN8/zs7Gw2m02n0xs3bths+fXMsmx3d9f+23YwSRLXMkeapoVEtqQ58es4Le5z5eGXKLIJMPGbS3Pi/XwYY4bDocuQMcYmJkkSt+Vo22Fr9dJLL9ltRn8rcjQauZbZ7V/7UffVyrgPFXrtf1/730LibQfL3W9Dc+LXelrKzyHqYeI3l+bEi5eDL3/5y++++66N5nQ6PTo6so1z263uQRsp2500Td2uEr9l7733nguZ1LfMz3Rh27PwKeWWLbxBLfMSv6bT4nbUcBN+02DiN5e5ibcbiW4b0xYky7KDgwNbKLdJ63Zf+Psc/H+7lm1vb/ubsVLfMr9fQYlfZhNeWiR+TafFPWfhFz+yjjDxm8vcxNsYfe9737MdscH6wQ9+UM6Ki8vcltkv6B8IrWxZoUSFljXvkfA3kxdgbuLXdFqcfOgxYbLWMPGby9zE283hw8ND/+DetWvX/HBkWfb5z3/+5s2bthptWma3fF2qyi0rn0ziH0v0/+2e7ystubt5buLXblr8XfZLvv6RtYOJJ00YY/zT7JIkKQTC9s6FqWXLxAtxoWX2NJXyiY/+2YEupkmSuAetp7/DhNNip8UeMFjmRFKyvjDxZFkqdwgQTgtBgIknS9HPVvPawWkhIDDxhBCiFiaeEELUwsQTQohamHhCCFELE08IIWph4gkhRC1MPCGEqIWJJ4QQtTDxhBCiFiaeEELUwsQTQohamHhCCFELE08IIWoZDoeD+/fvDwkhhKjj/v37/w//RVIu8bmO+AAAAABJRU5ErkJggg==)
Źródło: Bundeswahlleiter.
Współpraca: Aleksandra Kozioł
Tabela: Wyniki wyborów z 2017 w porównaniu do 2013 roku
Źródło: Bundeswahlleiter.
Współpraca: Aleksandra Kozioł