Κάθε αρχή και δύσκολη
Η παροιμία αυτή σημαίνει πως όταν κανείς ξεκινά κάτι καινούργιο, το βέβαιο είναι πως θα αντιμετωπίσει δυσκολίες τον πρώτο καιρό.
Δείτε τη σημασία περισσότερων παροιμιών εδώ.
Για το e-didaskalia.blogspot.gr
Αποστόλης Ζυμβραγάκης
Φιλόλογος
![Αποτέλεσμα εικόνας για Κάθε αρχή και δύσκολη](data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wCEAAkGBxISEhQUExQWFhUXFxUUFBQUFxgXFRQUFBQWFxcUFBUYHCggGBolHBQUITEhJSkrLi4uFx8zODMsNygtLiwBCgoKDg0OGhAQGywkHyQvLCwsLCwsLC8sLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLCwsLP/AABEIAK8BIAMBIgACEQEDEQH/xAAcAAABBAMBAAAAAAAAAAAAAAAAAwQFBgECBwj/xABDEAABAwEFBQUFBgUDAgcAAAABAAIDEQQFEiExBkFRYXETIoGRoQcyUrHRFEJicoLBFSOS4fAzQ6IkRBZTY3Oy0vH/xAAZAQADAQEBAAAAAAAAAAAAAAAAAQIDBAX/xAAnEQACAgICAgEEAgMAAAAAAAAAAQIRAyESMRNRQQQiMmEU0ZGhwf/aAAwDAQACEQMRAD8A7asrCyEACEIQAIQhAAhCEACEIQAIQhAAmF8Xk2zxl7ujR8TtwT8rk/tKvsukc0HusGEc3HUqMkuKKhHkyIvG/DPOS51STnwA4DgEntBUiM/dBG6nqq9dUUj3VaKc9/grxZrpdKwNIBPE7vBcTezrUdEDd0hZaXNoMMnea7Tx5Ja9GDFm4181aDsqA1tD3mmoPzHRVvaC73g1pTmPohsaiOLmvt8Lh3u7oHA5dCuqXFezZ2fiGvMcQvP0E8jH50IPHRw5/XUK97MXiYpGEHuE/wBJ+Eq4TcWZzhaOtIWkb6gHjmt12nKCEIQAIQhAAhCEACEIQAIQhAGEIQgAQhCABZQhAAhCEACEIQAIQhAAhCEACEIQA2vOfs4pHjVrXEdQMlwq8R9olLfusNHH4nb/AFK7btHIG2aYncx3yXDbttAa0k75B4gnNc+c2xFluGyhtaAZ6ZZ0HNXGxRtaMvFVu4gMIJPmp6Odu5wPQ1XNFHY6H0hUNetixtIUk6WgqVCXltA1mRwsGmOVwaPAalNqxdFHv+x9kauHdGtOGlRzCVsc5hIqasNK/lyo4dFP257LTGcLmSDeWdFSzIGNMEmWDJp/DzSpktnddlreJYRnUt7p58D5KaXGfZ7tH9mlwyGsT6Nxb2HcSOC7K01GS7ccrRxzjTMoQhaEAhCEACEIQAIQhAAhCEABWFkrFUACEm+do1IHikH3jGN5PQJOSQ6HgQgITECEIQAIQhAAhCEACEIQAIQhAELtgCbHMBqW08yFwLaKfs2jCKkuwt6ilT6r0XfMYdBI0/eaW+JyB8yFwu3XLNJKIMPaSxSvBpTMZHFXQDNYZY7s1xvVIcQ2l7YmMbF2spo0B1cDCfvO4BS+zt324Bz5mQtbUUawEO1NSNQW6cNeSm7mBBwuFHDIjgQrCWZLBNdHXxemNGMxR81FWjZmzTVM0eN1QWurRzMiKDkalS9kNQ7glLLmSEoypjlFNbIFmz0UTqxMbG0ANwMrSg3mu9U3bSx0laQNdV1C1CgVOvmw9rLQmjcJJNOHDgq5bslxVUUKxysjIIBpWjhwz1AXoDZOUussRJqaUr0JAXALLGDM4Ad3EcR3U/wL0BsqW/ZYcBq3Drz3+tVtj7ObJ0S6EIW5iCEIQAIQhAAhCEACELSWTCEAaWibCOe4KMfidq4/t5JdwqalYwrN7C6G3YhBjTiibWh9Mhr8kKKFbFhbX8QfBKNtzuA9UwbK3ilg5vELhWWfs6uC9DwW4/CPNbttv4fVMgRxHmtwFfnn7FwQ9FrHArcWtvPyTGiyFSzyJ8aH/wBobxR27eKYoT/kSF40SHajiFnGOIUeFlV/IfoPGSGJFVHlYqj+T+g8ZISMDgQdDkVTLvu+OG0Wl2PFI99S4+9SmTaq5tNQFzTbK1GC1uLTqGk9SFpl/GwxfkTk90OL+0Y7XUHfzqnDJh7rsjwOvUcU22ZvF0w5cU52hhD43N0oKgjUHiCuek1aOtSfTIsWJwca2ijT90AA068U+sETIxk8u5udU9FVLBBKRm3FzEjh6VUnHYM6lmHo4/MFFKrNZRjXZN2yUKg7cvAhxNeRJ2jYyGuIpG4EkkDWpACsl7W8RMJJoAK+Spu1l3yEQzN914AcDxIDgfVVjjds5skqpFce901Y4Wd1jBk3VxBqTXeV37YmwPgsUEbxR+HE4HUFxJoelVxS6sdnGNoOPG12IDQHOhCmz7V7VDJmGSMxZtcKGm+jm+GdFtiowy6O2oUHsrtTZ7fHjhdmKY43e+wniN45qcWxkCEIQAIQhAAhCEAYc6iZPOI1StpdnTxSYWbdsDFFqQlCsEJk0JPUeefVPLS7LqmTj/mv+f2SAa6FOGFQUVgtGIF9oc4A1LQxgryrRSsTl5jo70h6FsB0SDSlAmmJoVAW6RCyCnaJoVqtvNI1QHlOwNnxE6OeOh+tU1ksk33bQ8fmaw/snJcVnEUWhkXJFbh7ssbvzR/Qpu62Xi3VsLhyDh+6mwTx9EYn8W+R+qAscXHbHyR/zGhrhqBouXe1KQCd745GmrRXPutc3Ihx03hSvtXvG0w2BzopOzBexkmCoc5j6igdTu560zXDH3g8xdmSSC7Fnqch+67YffBGDfGVnpfZERizs7NzXNoO80gg86hJbV20RRSOPwn/AALzZdt5SwOxQyPjdrVji3zAyPirK/b21TsbDORJ3m98AB5z900yNcknifSKWZXbLdsztWwtwyVaQTmd2ehVidtHEBk6vQKLtOxItETZYaNkpUVyDqfddwOuarzbvmYcD2lpG4/txSyY+HZtjnyFL8tz7U8Rt++4NA6mhJ8FftrLvw2M0/2wwj9LR9FC7D3DWftZKBsYqK6YjkP3V02sw/Z5a6YQcuGei1wr7GzHM/uSOe3NfUMlkILQDhdiNM6tNMly63vDnnDoDlzCsbpYmAxsNC5rquG80yFPGtVUbTC5jqHwNa1UYlTYsvSLf7MdpxYrY1z/APTkHZSH4Wk5O8DTwqvSzXV003Lxkx69E+xzawWqzfZ5HVmhAAqc3xaA86aHwW5ijoqFGSXmakBo4arT+KH4fX+yy80S+DJZYqov+KDe0+aP4o3gfRPyx9hxkSgciqjP4o3gfT6oN6M4O/zxR5YexcZehaSpcVs1NDerODlob2ZwPko5Q9j4y9D4la1Uc++WfC70+qQ/jGI0bGT1cAEPJBfIcJeiVfTetC4clBz220n3YY/1PJ/ZMZJredBC3xJUPPBeylikSIWjSalVWSG9RpaIz1iH1SEVnvUvAM7AN5EY08VxV+zqRdg8pVrim0ceBmZLnACrjqTxoFhsh4oAfBxWcRTUP5rYFOhDkFbNTYLR8IdqPUpiH1FivNRjrrjOoP8AUfqm8lwRHcfM/VAibLuYWcfMKtybNRnSvmUidmgNCfNAUht7X4y665qZ0dCfKVv1XnrFmuk+1+xPhZZyHOo5z2kVNDQNIqN65k0ru+n1E58v5C7ErANTwBOXGmVEgE5ii7jnbhQeLsltLohdnoX2cX4202APHv8AuSN3tkGTjyqKOVlmuRhyNSKZDWnMbx4Lzz7MNqPsFraXn+RIQ2Xg34ZKct/LovS9nmDgCCDTWnPT9lp2ibp6Idtzkx9n7rK58XnieG7JQe17Hw2OdoJcMBo41Ja0a58OCvD2mmaq3tPtbYbstByq5ojbX4pHBv7k+CNUO23Zx6e6oz2crpA1tWlwGpblp5/NR17XRikDG6Gpaa5ho1J8M0/Zdz32aMsdUkGrXZA9OGSbBoZBIS4iQMwvqKYAdQDv01XBbT0dfaKjNHhJFa5nPipbZW/32G0R2iPVhq4fEw++w9R60URaX5+Zr1KzY3DGyoqMTa9Khdd6OU9UbQs+0QQyQyFgdR7XMNMTXNqK8VU5ILc3S0OPUNP7K2xZNDR7oAAA0ApoBuWphB3LzZ5FJ2dcY8VRURa7e3V7T1YP2W/8Vtg1EZ/SR+6s7rK0rQ2FvFRyL16Kwb/tQ1ij8j9Uk7am0DWFvm5T9tszm5tYHj81D8lBWq8WMP8AMgkbzADh6FPkFL0Nn7YzD/tx/Wf/AKpB+3Mg/wC28pPq1bm9rEdXFv5mkLIfZH+7LGf1AfNOwpDKX2gOH/au8JGrew+0PM/9HOToMOEp625436UPShUjY7ubHoAk5L0FGll20x62aZh4PBB9AU7ZtE52lln/AKcvM0W0Ro9vVTKhz/Q+KMhq3axIMsgGjneZRKwtBIcVVIk3tZo0pCJ6TzcMyUpHCOfmUqGLtctsSTEQSgjaNypIlsBKOPqgyjn4An5JRoCzVOhWaCXkfL6rYS/hPogoRQWbNceA8/7IcXAE5VoVgFKBMR502627kvFrI3wsj7N5cC0uJJphINVUmJe+I8Nomb8Msg8nkJBi9GKSWjllt7FmqXs9hlfZj2YxVfm0a9391DhWnZi0iM0cRhNCQeOinLJpaLxxTeyAFkc3ItIOeo4Lpvs/22dEGWecuGGjYp61wt3RSje0bnbtDxSV4WhvZtMOB7Dk6ubq7weKhLVdGIB7O68ENc3ca6FTjz2VLDXR6RikxxtdxAOXNcW9t+0ge5ljYcoyJJj+Mg4WeANfELrGzEoNmiGXdaGZGoq0UNDvCo3tM2E+2ntoCGzAUcDk2UbqkaOGlV09rRgcuuq+4+y7N5LSKYSNx6p59lnfFK5zSQKBtdCda16UUA/Z6ZszY5onx96hLmkZDWh0zVzvS82xRYBlShIG/ugD/iAuLIlGR1Y22tlLfcUzhUN60PJRksLmHMEUO/cQd66ds/eHaMoKNDTQnfvoeYqoXbu6AwCeMd1w74buJ0NNwo0pwytumTPFStFo9nm21qtTbTHK5r5WNjkhOEN7oeGyAga5OBVpF/WlvvRNPSo+qrGxmxgsEzbQ6V8lWFvZtjAyeBqcW4jgr6LXERmx4/QT8qrmzcXL7TTHaX3EYNq6e9C4dCD8wtm7YQb2yDwB+RTx/wBnd94Dk7unycAkJLnifphPSh+SyL0DNqbIfvkdWu+ixJetkk/3o/E0+aY2jZhnBRdp2VG6qKQD63XXZpdHMPRwVct+yrc8Poi07LOGhUdPc07dHHwJCaS+GPkMbRdMsZq2o6Eg+iQ/i1riOUsgpxcXDyKWmitTfvO/qJ+aYTTzjUE9QCtEmHImbBtZbcQphkz+839xRWKx3hec5zkZE0/AwV8zVUez7RzRf7bD1aR8ipux+0jDk6zjqx37EKZQn8IFOJ2AFaWj3T0UUb0mb71md+l7T86JJ1/5EOgmGXAH5FTQkO43Jdr1F3LLJaMVI3Rgb5N55AJX+YHFpc3I0qB9ShFEm163DlGtYd7nH0+ScRsH/wC5q0Qxw+drdXAdSAmz73hH369AT8kpgG8BBhbwQSM37QMGjJHfpoPVN5b/AJT7kNPzH9gpJ0bBrQLXsq+6xx8KfOiNlJEK68bYfhb0H1VU9o98W2CzxvZO9hMmElhplhcaZdF0X7DKdAxg51cfIZJremyEFqYGWlzntDsQaDgFQKbs95VQ07YSqjzLLIXOLnElxJJJ1JJqSVsxSW1dkjitlojiADGSPawA1o1poMz0Uc1ehdnGzcFXDZTZaWSkjmPLNakED11CjdibD2lrixAloNSaEgZZVC73HKIwA1jpDoCcLWt8CQsslvSN8UVVsq8tj/lhos5dh90NbgaOYaAK9aqAN22hkoeYpAKimQAb4Ak+a6m93HE78IoB0SEIBOcRaK8j/wDElc/Bo3uPVm1yXpFZbMXSva1oJOJzgBT/ACq53e/tAkMpwS9wudh7OmTa92tRworxeN2RvBI8j9Coqz7BWN0omkjxOoP5ekdfic0an0XSsjlpKjnlBQ3dlGtO1Mk1cbpJqZtj173HC0ZqsWuyWx5JME2ZxH+W/wAtF6EjszIwAxoY3c1gDR5BKPjqAf8AKp+PdtkeT4RwO7BOyrRHICRQ1Y4DXmOildsbZ2UBjce9gjYR/wCoXB1PBta/m5rsT4jzTK0WcO99jXj8TQfmp8X3WN5dUUrYHba0W2QwmGPuR4i5rnCtCGgUNeKuz7W5vvxvHMAOHpn6Jo24Iw8SQf8ATvyDnwtYC9la4HAtIIryqFMFrxvB6inqPouXNBRlo2xytbGTbxjdljHQmh8it3Bp3DqP7JSaMO9+OvSjvoUxN3w17jjGeAJb6FZF0Kui4OcOjki8TjSQH8wWr7FaG+7IHjg9v7iibvtczPfhrzjd+xSbYUjae0Tt+6H9KKHt17ub70YH5gQpL+MRfeJYeD2keuiXZM12YId0NUc/aFw9MrP8XiIOJnk4eiSdarO7UEeRVgtN3wv96NpPGlD5hJ2DZKySOJcwmlMsRH7qlLF+yeOReitz2Wzu306hR82z8Lj3Xs8wuoQ7OWNv+y09an5lOGWCFvuxMHRoRzS6sEpfNEnkshgPBa9mP8Kb2ruNJDjluyKONApJjxoA0yUAH1c48z80jar1tLc2hjm8CCD5gqnXje1sBObWDlQZdXJLbNKL7iAGZA6prNfdnZrICeDe8fRUix2d0578j5OTcTv7KyXbdBb7sBHN5A9MynY+JIRXtJJ/pRGnxPOEeWqkrNZ3nOR/6W5DxOpSVnskg1c1vJgrTxKX/hrHe+XP/M408hkmmQ6HH2mJu9vhr6ZoZbwfda8/pIHmVtBZ2Nya0DoE3tt9WaH/AFZo2cnOAJ6NrUo2xaFDLOTkxrRxc6p8gsGxyu96UgcGCnqo1+2FlpVrnO4UY4V5jFTJMLRtm4uY2KId4kVe7SgroAih79DLaz2f2V8Ermt/nuIImObg4uFSQKV36qtXL7NYQcUrnSU3Hutr0GZ81fX2m0SChLacAE6gjoM1vjyKK2Yzi5Mj7uumKEUjja3oKHzUpE01WQFlW/qV8IlYn7HGHNLMamNVsJnca9UL6lfKB4mb2ltaZ0o4HqK6LVr6FBnBB4gVp0zy5KOtFvb23YtcO1piw1za2tMVFq5xS5EJNviTUjgBmaJH7S0AjMpo1nHM8Ssrml9RJ9GyxIdC2D4UjabWwCpafCiTJTa2u7pU+efsrxxHsMvcDmtrUAipoaH0SvbjeCOufySF3n+Uz8rfklyFEm5djVLow2QHQg9FrIkprO050z4jI+YTWVsoNWvy+FwqPA6qKKsWMQGmXNpI+SC5w31/MP3CYS297PfjPVmYHVYbesRNMYB4Oy+eSWyrscTxsd7zAemfzURablgJq12B26hLCpbHXmk5KEUI81Njog5LvtUebJcY4PGL11UjcdonFe0jaK7wTnTktZLIBmxzmH8Jy/pOSQdarSzUMlHLuO+h9EaYUyWltVpLsLAzPT/CnDbptT83TBv5aqGu+/WGQBzJGEbi0kf1DJTNp2oiYM2yHwy81tHM0qpf4Rl4OT7f+SWDuZSVqhxtpWi1OLdTxST7U5urD1aQVDkNRIp9iJJBkdTSjaN9RmtobngBr2Ycfif3j/yUZeu0bYXEdlI46igoPMqCte11qd7kbIxxd3j65JpMvZ0OIAaUHRNbbflmgFZZmN5Fwr/SM1yC8b6tMpo6Z7icsLTQdMsltd2xlqnNXDs2ne7I+WpVqHsTRdry9qVkjyja+U9AweufooI7f3najhskDWDTFhL6dXO7o8lM3NsDZYaF47V34sm/07/FT3bxt7kbMRGWCNunWmQ8U7iuiaspguK8J87XbJP/AG43EDp3aD0S8ez0EGgAPE5vPjqrcLBPJrhiH9TvoE6s2z8Lc3VefxHLyCylOT6NYqMeyiCIuOGNhJ6Fx8hp4qSsmyVoc5rzVhHxu06MH9lfI42MFGgNHAABNLVe0TDQuq7c1vecf0tqUlFhLIvhDVlkdEGh78RJpWlBl4p1jA3qKtF5vl92zzNLHADtA1hdi1cGl1aCm+moUiztaf6R8S0fuqSbM2LArNU0s3aVIcxrRSoo7Ea+QAUXa7zlaaY467xhlPlhYaordCJ6qwoe1XjLGGfyzI5wqRGH5cNW/MhM7RfFsIPZ2RwO7GHUPiBl5KlBsdMkNoLaImCmcrqiJgzc80zAHCmqa7OXK6MvnnOK0Se8dzG1qI28lSLRct5TSulldMx7hT+W2uFu5rTuHknFl2ftzM2TWsdW1HkSteD40mCx3t/8/s6WtXuAFSadVS7P/F2ZVLwP/MhNfNpWL2tF5GN7nRBobG4kgSNzGZOItyyr9VHhkXw1bZP3JehtHbOywNkdHGRq4Myc4/qr5J3atFz+6dkbcImUhJqA6otLm1LsycO7VLTbM3i0ZRzDpaa+hKt/Ty+CVxr8l/v+i0XTfDg58dWvwnJlQHhtBmOIU5Z7wjeaB3e+E5O8t6p+zWx3a2Z5tAeyftSWyOcC9oaBQBzToau0Tq3XRaGUxt7VopR7Ce0FN53lYy+10Qy3lyTcq1Yb0laMj2jRq12T28q/VS9nvJj95afhdkfoVNjQ6c1R1su+N+o8sin5ck3OqmBBm73x+4f2+WSQs9rmYaSUdnvyd4HQqcckZGg6hSykN4bZG/KuE/C7Ly3FbSim9MrVdzdW5ct2fJScezERoXOcchkDQeHBTSHbGg6LR6c35YHwx4rPmW+8x9TiHI7iqrDtZGThlYWHfvH1Rwb6LUjplDxHkg15KtutVujzBilHQsPzosWXaO0ONHWccyJB/dWqMxxtDc0sxBjLBQUo6vHkFWP/AAs9ziJ5K0Pux5DzKupvcAVLDzoQoC8r47xLGE1+IgfJEZV0PYtdt0wwjuMAPxHN3mU7+3NrhYMbuWg6uUPBFLMavd3fhGQVgsVnbGMgnYmObPZyR36H8I0H1TuNoAoAAOAySUDi80YK8zkpay3Xve6vIZBUsbZDyJDWIEmgFTyS32CU/CwcT3j5D6qXiiDRQCgWQ6umfot4YUYyysiP/D8bv9Vz5ORdhb5MpUdSU+s1jjiFI42sH4WgeZTvAd58vqVsAB/fNa+JmfMgJLLI6Vzne654wneKNA8BWqlG2NtN/mnLlrh4VH+c1pGPFUDlZGW6xsyBGROfhnmdyGwhrThGgNFKdkEk+yjgPII4bbCxvYoQxobqdSePNOjGkIH4ThOu48QnlVUUkqQn2M5jhBO7U/VLNakLdm0tBoSCK8OaSMjiAA48yMiSk3T6Ch5I4DU0UTfNmfaY3QsbRkgLJJHfdYfewje4jLkpKGyDV2Z55p6AnthoZR2UAAAZAADoMklaLLUKSosEKhFYs0bm42u3Oy6ELcqcls7XajxGRTKW7z9015H6rhzYJOTaOiGRVTIK3XXFKaub3tz291w8Qo190ubvD2/iADh4jI+inphQ4TkeCSJXL12a67RCdm9mTHfpdn/dYFtGjxhP/HzUjbIA8Z7tCMiPFQVrnfF74D28dHDruKZRIFy0cUwjAIxROIHA6eIP7LBtuE0eKcxmD4apAOZNfEKxsOQVVlfvVjjeaBSxm8orUKq2zZyIvLsIVleU1mI3osZ//9k=)
Η παροιμία αυτή σημαίνει πως όταν κανείς ξεκινά κάτι καινούργιο, το βέβαιο είναι πως θα αντιμετωπίσει δυσκολίες τον πρώτο καιρό.
Δείτε τη σημασία περισσότερων παροιμιών εδώ.
Για το e-didaskalia.blogspot.gr
Αποστόλης Ζυμβραγάκης
Φιλόλογος