[b]Κλίμακα[/b] ενός σχεδίου ή ενός χάρτη ή μιας φωτογραφίας ονομάζουμε το [color=#980000][b]λόγο[/b] [/color]της απόστασης δύο σημείων του [u]σχεδίου[/u] [b][color=#980000]προς [/color][/b]την [u]πραγματική [/u]απόσταση των αντιστοίχων σημείων, εφόσον οι αποστάσεις μετριούνται με την ίδια μονάδα (Η απόσταση στο σχέδιο και η πραγματική απόσταση πρέπει να είναι στην ίδια μονάδα)[br][img]data:image/png;base64,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[/img]

[b]Σημαντική σημείωση:[/b] Η κλίμακα ενός χάρτη [img]data:image/png;base64,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[/img] σημαίνει ότι 1 cm στο σχέδιο αντιπροσωπεύει 400.000 cm στην πραγματικότητα[br][br][b]Παράδειγμα 1[/b][br]Σε έναν χάρτη του οποίου η κλίμακα είναι [img]data:image/png;base64,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[/img], η απόσταση μεταξύ δύο πόλεων είναι 3,5 cm.[br]Ποια είναι η πραγματική απόσταση μεταξύ αυτών των δύο πόλεων;[br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAN4AAAArCAYAAAAXODYdAAAK1UlEQVR4Xu2ddahVTRfGl2J3d2B3oNgBKiYqtqjY+oeBhdiBnRiICnZiFzZ2JxZ2B9gtGBjf9/3mY/a7z7nn3r19r3u/59x3BgSvd/baM2vmmbXWs9Zs4/3nf01MMxowGvBVA/EM8HzVt3mZ0YDSgAGe2QhGA/+ABiIGeO/fv5eNGzcqFbVo0ULSpEnjWl0HDhyQVKlSSbly5dQzx48fl9evX0uTJk1cy4htx61bt0r27NmtMWh5zGvZsmVSokQJqVWrVsjXMP5bt25J8+bNJXPmzFH6+CUjtjowz/+lgYgAXo8ePeTu3bvSq1cv2bFjh6xYsUIWL14s7du3d7WWBQoUUM/Hjx///2Y+XjxZvXq1tG7d2tXzse309etXSZcunUycOFH69etniRs6dKicPn1aAW/JkiWybt06OXLkiAUuAFWmTBkZM2aMVK9eXerWravmPHz4cF9lxHb+5vmoGgh74L148UJy5Mghs2fPlp49e6oZpE2bVhInTizPnz93tably5eX9OnTy+PHj6VgwYIya9YsyZ07t6tn/0Snjh07qsNi5syZFvCwurVr15Z3795JkiRJ1GsqVaokP3/+lLNnz6qfS5UqJaVLl5bly5ernx89eiR58+aVixcvSsmSJZXl9kPGn9CBkRGogbAH3u3bt9VpP23aNMvCAbxv377J58+fXa1njRo15NChQ6766k4PHz6ULFmyWKCwP/zjxw/h9/nz53eUiRXD2o4YMSIAeIwJIN2/f9+SwYEwcOBAQT7Wjnnu378/wAXl3xo3bqzA6IcMxwmaDn9LA2EPvOBZ6Q1JfLZlyxZXk9bAY6MDWKyeUzt//ryMHDlSNmzYIClSpLC6AwrcPaxYvXr1YhSDi9mmTRs1Ttxbu8XDAufLl8+ybggiDmzatKn6t3PnzinXGqtuj+ty5swpyZMnl5s3byor7rUMHRc76cv8/vc0EDHAw+XklMcq4ILt3r3b9UxxNdm8xYsXl1evXsmuXbtkz549yl2LqeHKTZgwwQKfBh0kBwSPU2vVqpWy1Li1wcADPIUKFZILFy5YYnbu3CkNGzZUbvWTJ09k+vTpyrLa3eI8efIoS48+/JDRp08fp2ma3/8NDUQM8LAAuIuQImy8TZs2OQJH62Pq1KnKQmnLQVyExWBzOzUNvjVr1ggkj1vQ4WJeunRJJk2apF4RDLyECRNK0aJF5fLly9YQeFe1atWUZbx69aoikGAz7RYaoghGltjQDxl2MshJV+b37jUQMcCzTwl3C5cT66WJCfdTFmU1BwwYIG/fvnWVljh8+LByAQFEp06dHF+Fi9moUSPZt2+f1TcYeKQ3mMe1a9esPtrVnDFjhrx8+VImT54suLxly5a1+mD9vnz5on7vh4z+/fs7ztd0+H0NhD3w2MQnTpwIIBjq16+vXMWFCxdKt27dYpw1LhlgwWLp3B/AY0PNnTvXYkqjE4J72b17d+Xe7t27N0rMF+o5xpcgQYKA2AzrVbFiRSlWrJgsWrRIxWekGO7cuWOJWLlypXTo0EGOHTsmV65cUTEef69atarVB8InZcqU6jk/ZNjf/fvbyzwRnQbCHngQI1gcCAcd6GNNyOeNHz8+IKcVapIAkxzZs2fPLCAQt8EyBjOGwc9r0HXt2lVt/uCYLzqlwsRikXTTICJeatmypZKFu4sritXWDZd42LBhFqsJMBcsWBBwuKROnVol/ol3/ZBhoOONBsIeeNDruGz2WIhcFgzl06dPFZiI/wAj8V9w9Qcg6Nu3bwAZQ1Ka59+8eROtVoNBpzu6BZ9dsI7d7AcF1Sh16tRRY9CWmEMGS6ldVOI5UhaaSMK9zpgxo3JPifv8kuHN1vt3Sw174OFqVq5cWYoUKaKsBdT82rVrlZuo3UxcNKwSlR3bt2+PsqLEZwAJlnHz5s3KcuG+xpRWIN7KkCFDgJtnBx/kjJObS3/czgcPHsi9e/dUXjBr1qxWCgHChxgOlhWrTEmcPebDUpKyGDRokNSsWVOlJnCR7e/1Q8a/GyLezD7sgaenzeY8ePCgqtzo0qVLSFIF1nH+/PkhNYV1wLWkEsSvUjE3S4a15jBo1qxZlDpOntc1qhBBuKqhyCQ/ZLiZS2z7zJs3TzhET506FaMoYuQ5c+YEeEE8QAkeB1yuXLmUC68rfuwuP14Hhx+eEKV3wTGsHzIYT8QAz2lRdboB62BaZGmAA5NCgTNnzijGllRJdA0PiDgXcNmJKcIJcqKQUTS8G1IxOkThAKPYgJQU+VtIN3KieEg6PPFDhp5XnAEeil6/fn1k7Tgz2gANEBLAHMdUCsg6Hz161GJ2tVcAEQVwNQEH0GB9b9y4oUIK7fITIujGvwFAAEt/P2TEKeBxCn748CHklRmztyNHA07A00UJ+nqYtniwwYMHD5bgjykkSpRIxcW4nFhJKpjsuVUsLSkp4n+/ZLgGHoP7/v27GjClTNQufvz4UZ0Uuoo+cpbWjDScNRAT8OxFCbC9NA08YnbAyM0OeyPfSd6Uq1ewxVQdAV7dRo8eLWPHjlVleYQofshwBTxAxx98YtgzAl8YulGjRimXILprOQS/U6ZMcbXGbdu2VffNTIssDeCawbR++vTJceCwuRzcTlVGMQEPJhdw4DYGA480DEw1BsLeuMkBMw1AqRyC+WZv6qYLKYgLKYj3Q4Yr4JFo1pcuqSHkPhv5L78aTB5/TPtnNICrBonhV4sOeDDaxG/6gA4GHoUEFFnEBnjI9kOGK+AFnx4NGjRQSWq/Gkyl9uf9eqd5z18aAHjjxo3zTSWhgIeLSf7Wnp8NBh7WkDguGHjEdXhrWDQKyvHa7BZPx3Uwqb179/ZFxm8BT9+BI3mtv1OCQqJzHTihuA7jprVr185VItqNLNPHPw2wJzp37qzYQKeWLVs2Vwd2KOCRf6W8z77XKH4gZqtQoYI6GE6ePBmSXAFsyITtBoRULNkvRAPYpUuXqtgwOnLlT8twBB7A4koLJphBDRkyRH79+qWeI0Cl9jG6KyMQLxQlu2nECU734tzIMX381wAxf0xld3pEJKzdFC04sZpaHkDmLqImV9ir/Kw/iUG/4PQAskma2yuDcFG5GkaKwS8ZjsCDVMF8k1MhvqOa4Pr16+rk4KQIVZrl/9KbN8YFDeiiciwon8Lgg098Uyf49jsHOmCjxjVp0qSybds2dbmZWldAREpJM+14UhSq6/QB76AvJXo6gV64cGH1Ln3w+yHDEXhMkhIevhfC/TCAxkQp2YKxdGKo4sKG+BNzgIzy88NKf2LMfsvQZVrcL6QRq5GyCv60B57WqlWrrHwte5T8nS77Amy4oMmSJVNygssH4QwouyOfh0XkClZwUb0fMhhbnKlc8XuzxPQ+aGniDlx1akN/90NL4TQXMxZvNGCA54Feqfkjt4TrZIDngYLjgEgDPA8XERKA5LH9g0Yevs6IjiANGOB5uFgGeB4qN8JFG+B5uIAGeB4qN8JFG+B5uIAGeB4qN8JFG+B5uIAGeB4qN8JFG+B5uIAGeB4qN8JFG+B5uIAGeB4qN8JFG+B5uIDcB6NMSX8HxMNXGdERpgEDPA8WjG+BUkTOZwgpYeI/OKlSpYrjV6s9GIoRGaYaMMDzYGGoCeS/A7O3TJkyufrvwTwYjhEZhhowwAvDRTFDivsaMMCL+2tsZhiGGjDAC8NFMUOK+xowwIv7a2xmGIYa+C+Ia6n4aCmdrQAAAABJRU5ErkJggg==[/img][br]Η πραγματική απόσταση μεταξύ αυτών των δύο πόλεων είναι 1.400.000 cm, δηλαδή 14 km.[br][br][b]Παράδειγμα 2[/b][br]Η απόσταση μεταξύ δύο πόλεων είναι 89 χιλιόμετρα. Ποια είναι η πραγματική απόσταση μεταξύ αυτών των δύο πόλεων;[br]σε χάρτη της οποίας η κλίμακα είναι [img]data:image/png;base64,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[/img];[br]Μετατρέπουμε 89 χλμ. σε εκατοστά. 89 km = 8.900.000 cm[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALUAAABvCAYAAACq9oHgAAATgUlEQVR4Xu2dBZRdNRPHszgUd3eH4lqkOAco1oNDcWspFHcoxd3dtbgc3K24FKd4Ka5FihTdr7/hmz1377PcvGTbt2/mnJ7dtknuzT//TCbJzNyW1lHiTAyBToRAi5G6E42mdUUQaOnfv3/rNNNM477//nv377//Gix1INClSxc3cuRI988//9TRilUNQQDuDhkyxF188cWuZbLJJmtdcskl3SuvvGKkDkEzU2eGGWZw3333nfvrr7/qbMmqF0Vguummc++9954bOnSoE/Ojb9++7qKLLrLBKIpkrvwSSyzhunbt6q666qo6W7LqRRG49tprXa9evcTiMFIXRa9KeSN1RDALNmWkLgiYb3EjtS9S8csZqeNjKi0aqRMB69GskdoDpJAiRuoQ1OLUMVLHwbGkFSN1ImA9mjVSe4AUUsRIHYJanDpG6jg4mqZOhGNIs0bqENQ86pim9gApUREjdSJgjdSJgPVotoTUe++9t9yC/fDDDx7VrUglBLp16+YWXnhh8T8w6VgEBg4c6HbbbTc3bNgwu1GMCb1p6phoFmvLzI9ieHmXNlJ7QxW9oJE6OqT/NWikTgSsR7NGag+QQooYqUNQi1PHSB0Hx5JWjNSJgPVo1kjtAVJIESN1CGpx6hip4+BomjoRjiHNGqlDUPOoY5raA6RERYzUiYA1UicC1qNZI7UHSCFFjNQhqMWpY6SOg6PZ1IlwDGm24UhNyoGVV17Z/fjjj+7qq692Sy+9dEi/k9cxTZ0c4ooPaChSb7vttpKT5M0335QOPf7446579+6jD70qTzZSj75haShSL7LIIu7nn38W7ysjdVzSDBo0yF1//fXS6BFHHOFIxkNCmDPPPNO1tLS4Pn36uIUWWijuQxO11lCkBoNvvvnGkYHHSB2XESgL3GXfeust+XnXXXe5Hj16uGeffVZWw0ceecSNPfbYcR+aqDUjdSJgG9H8GD58uJtjjjlkNZxtttlkRZx33nmF6OOMM04ipOI3a6SOj6m02Iik5r0h8GKLLeb+/vtvN/7440uiRYjeSGKkTjRajUhq0pOfc845rl+/fm2onH322W7PPfdMhFKaZhuK1J988olkEiUzK3LTTTe5ZZZZxpF+eKKJJkqDUGCrjUZqCD148OC2I9JtttnGQQ7MjjfeeEPMEDaMjSANRepJJ53UjRgxogTXW2+91fXs2XOMwrvRSP3hhx+6eeaZx0Hu8847z/Xu3Vv+kAEX3L/99ls33njjjVEYV3qZhiL1l19+KaDnZYoppnATTjjhGAV4o5EaZaEKg9MlTjr++OMPSYeLjMpd7kgk3wjSUKRuBED1HRuN1I2Eba13NVLXQijw/43UgcBFqGakjgBiuSaM1ImA9WjWSO0BUkgRI3UIanHqGKnj4FjSipE6EbAezRqpPUAKKWKkDkEtTh0jdRwcTVMnwjGkWSN1CGoedUxTe4CUqEhTkpqv0P755581IeUGLdTd0khdE95kBZqS1L/++qt4nnH1W0nGGmss98UXX7T5bhcdgXpIjYfcJptsIi6g1WSjjTZye+21V9FX6/Tlm5LUjOozzzzjVlhhhYoDTJQHjjyhTjz1kBpXgFNPPdUdeOCBFd9vqaWWEgf+RvJz7qjZ1LSkhjgE7m6//fYlWEOUjz/+2M0000zB41APqXkoH42fa6655D3ygln0/vvvu1lnnTX4/TpzxaYlNYPKMr/zzjuXfD8c0vBFhRNOOMFhhoRIDFKvu+667oEHHih5PKFVq622WshrNUWdpiY1I/z777+Ly+Xnn38uAz7uuOO6HXfcUVwu8f7Dr/joo492k08+eSFChJIaO/rQQw+VIFg+UTLJJJO0s61PP/10mXChZlGhTjRo4aYnNePGhnG++eYTEm233XbuyiuvdAQkXHjhhe6MM86QsKbNN9/cHXLIIW722Wf3GuqipMat9vjjj3fXXHON++WXX9wBBxzgdt99d/fYY4+5HXbYQZ5JvpOHH35YJp5JZQSM1P/H5u6773ZbbLGF5BVBc6t8/fXX4jR/wQUXCNm23nprd9BBB7UrUw5eH1Jj13/00UfutNNOE/sesvbt21c08VRTTSXNYiIR6UPyHuzoRnHUH52TzkidQf/55593yy67bNnxgFTnnnuuO//88x1atVevXm7//fd35CIpSmrI/Prrr0s8IF9Cwyl/l112ETLjjJ8XbGjK8LUvk9oIGKlrY9SuBJc2Z511lmjuoUOHOs6KsYHz6c/KaWrIzEpw8sknuxtvvFFOL/g02r777usmmGCCgm9ixSshYKSugxt8IxGCEt/HmTdkJ70At5BZUkPmV199VexktO6cc84pWrnRorTrgKpDqxqpI8B9++23C0nZXM4///zuiiuukE3eggsuKETeaqut3DvvvCOa+ZRTTnGbbbZZhKdaE16aetQGqJWTAHKoVbttMzjLI8CxIGYFmVm5wOHYjd/5CbFnnnlmg64DECBgmP3RPffc40jq0Lriiiu65557TnbdJoZAIyJALpgXXnhBIuFbRnmvteIgw8UDbDfxQwCb+YYbbnB77LGH++mnn+RE5LfffpN8dDhPoSTIncHRHRc7JmkRuO666xxpn4XUowanlXNSSM2yaVIdAcjMDR/OR1999ZVcjnBhQzYjTkO6du0q9jX+G9jcZBKddtppZYN4+OGHG7yJELCNYgCwkPmwww6Tm0fOrLltPPLII2VjqFLuSI+9ykknneQuv/xyITcXOfiXcGNpEg8BI3UBLLlGP+aYY+TChN854UDrLrDAAiWtVLtR/OCDD+SWkoTm6l9ConNyAprUj4CR2gPDzz77TI7iIPPIkSOFyNjP1fxAfK7JaZdbRQiONyB2IP4llVxecUfl8scuaqoPWtOTmu/H4N653377lSCFLczlCmYGROIqm3KYDrXEh9TaBl9H4AqevQzX8ThV8RycrLKCn8imm24q37rBe8+kPAJNTWo2d9jBmBI4LilZSTyOBoVk008/vZxYcIlSxP20CKl1aHA7JR80z0WL4/bKFfriiy8uG3faZBKymef2MtTXu7NPhqYlNWbEhhtu6B588EEZ4wEDBrj111/fnXjiiZL3muM4XD4PPvjgoI1cCKmVbJgZuLxCcG4p11tvPbflllsKyVXYbKpLamcnadH+NSWpOb1gY3bccceV4AWZ0Y71BrTWQ+rsS3FEyAkJ5M4KbqpcMOBrYtIegbKkxlHHJ4VAo4J5yy23iG2aFw0QiNEvfKA5p8Yer1c4395ggw1KmsExiuDgMe0rCvX2t976kJpNN1+daIrLF26ZOLXA4b+c4E7qG91SDfxYmhpTZNFFF237IGr+mcsvv7x7+umnLbwrA0zTmR9zzz23uIpWEqLLuQWsV2KRmmPEchHv2fcjEoe9gMl/CDQVqfHcevHFF6uOPbYqEeahmZm08Vik5mQG/5FqwikIX6i1YNwmJHVHarJYpO7Id+4sz2oqTd2Rg2ak7ki02z/LSJ0IeyN1ImA9mjVSe4AUUsRIHYJanDpG6jg4lrRipE4ErEezRmoPkEKKGKlDUItTx0gdB0fT1IlwDGnWSB2Cmkcd09QeICUqEp3UuEiq3wjfC8+6R3Lly/U0ZbjcmHjiiUuShuNsRNAqgb9cJtAG4U61LhaIfueSgp+kJ6Dt/AUKbevzeS98JsrlpuPzGZSr1lat8QglNc/UZ+s71goKoF/gRQZXfqd8OX+QmBjl+8+Ygj/YcYGFv3d+zFKOf/Z9opIaQFdddVX3xBNPSIc+/fTTtigOfIUJXX/33Xfbnk9+OG74ZpllFvk36uNOydWwCgNLVqPu3btXJDa+0GTWxwdZhc9f0LYmWgT0VVZZRb4goALxuWUkHEsHYPjw4RI0i0O+CpEotMWtna+EkBo/bp4NObNC1A1BA+UmNpjddtttkiAH0qhQnnpapx6M8AYkSU8lxTJs2DDx+eb2UwU/9ZdeekmUEjJixAjJUzhkyJC2Mviv0zaekTr+hMjhUKfCMwniWGONNWoqNq0TldS9e/eWaGokT+p11lnH3X///aK5+ewD/sBEfBB5rUTHp/moo46S+iRgJPJk0KBB0hbO8dnA1uygAyhpvaacckqJG2QwITEJeZ566ikpuuuuu7pLLrlEfu/Tp49MPEiERuE9VBsyeZ588kkZDBJA4tNM2gOciniGrxQlNZOeSY6fN4kgydVHoAK+3fQfgtBmXkjtu+aaa8o/EwpGIAO+INQhTIwxQerFiCRHlQKEmewEXOA1iDchsZcI/up33HGH/I6vOpllEcYf4vFNHeqoLw4utuQlRAhKRkmpgiQHIWPgI9FITW5lwv5x6dSBUE1NClrIi5A1hwz5kBTXTITwJAg444wzSq5ofC8gIAOtWUAhe//+/Uv6xGBrcka0MF5rfAulW7duUva1116T1YKgVrQahIesAKYrxMCBA8UJH5JrZlHIsvrqq0tCRyUT7S633HI+uLbLpedTAQ2mk1YxguCYEbw3E22llVYqaWqttdZyDz30kEwIMkRhcpF0Em039dRTS7Q7k7FejEgCT6rjvLCKokUR+oBGB09IicABzFE+9YHceeedQvBsf8GaFR6Nzbig0EhtjBmmYWuQvZz/ezlso5D63nvvdT179hRvMggJgFlNTUeYtQBOB9HWDBRaBeKioZm9DAJ2GRoGbUoZOgowaCONUsl2BE3ar18/0SLY4to2mhY7kw7i26wR35gbmEG0TagWWhpCMxAKBjYhhNK2AJb3QgPxLB8pqqmxRZlEaCZw4h2ZiGBHONmll15advllEpMsh75Aat5ZMenSpYv0j7r1YkTaNJLE5GWfffYRXJh8kJBxx3RTEqMIiLtkpebdWEEVVyLpWQVJNwEHGH/KkkcF84kxwg2YAAk+B8IE8pG6SY0mQAsDLksNMxD7NktqwCAUCeJBFhUGAluPKBOWHjqFPYnrp7pb6rIJMdHKeUGDAwgaHUBUICIgk08ara0RImhe/Z3k6qQrUMCYTMT/MUBZzzjscmxtVgo1j2qBW5TUtIe5xYrFsqxCZidyhWBWlRMlMP+HxmQvAZFYCZXUBA/Hwij/DigEslOxUmCCINjY6pPOlxBw1mcFZ1OezfzFygx/WFnAHiWnY6ZmE+M+ePBgMZ/46SN1kZqZBBEZcABl8NksqEbFvmIm829ocjRQNkcfnWCmElqFPYhmgkzY5XQUARxAYnl69NFHS/pEhiRmNTZxdoPF3wGQTSeTjE/IIWz4+Duik0pNJvVdRlNnI390gpA2jFAvHylKalYjJh+DjHYGJ4Jr6TOaDYXBsp0X8AJj9ihoe0wt+vXyyy/LRMecwzaPhVH++SgBCMmmm80gQqAFtjKCSQg/evToUTL+aGoUEXsATAv4Ax8YU/qEMEmZ7GS/YhXzkbpJXc7vGLIjaOvLLrtMdr1KKjZuaCM2BzjsI/fdd58svWw4iEwhrwYaKGtTEQCLNs8LUR8ktUSwn8ljR5Z+3VRAYlLookkQNmBoPVYIBh/BfsdsytrP7Moxo0jBq6YLtj8bSR8pSmomMtopv+JoUAP2LHZtJYHQKA+0IXY/KyYhTUzUGBgxjuXyALL508mmUUNMwI033riN4CgXbG1E9wZZ4tMG5gl7HFYpUlGwJ8CcZLVBmJSYJT5SF6nLPQANkTc/KAexIQramM0aZgF/ZwlCS6GN9PQEexgCY5tBbgTTg6WonOjAQ2g6z4aVNtl4EcNH27r7RuuyHGOfEauIRmd5VPCYDEwKVgiyMbH0s5SjMTBVfNMSFCU1q9vaa68t3cP0woaFmGxqsUOxi3faaaeS7rMnYZPOe6MRSa9An1EQKA49UqsXI9rWtvIvoRqX9+dLvWheymdDzViFMIsoy4rHJGGyZfcC5BtkdeI59Albmqh6RA8BxihSo/EwQbLnlORrZhA4DUHQ8JgsHP2pmQLZyLlBrrpK56QsS5xvM/tVGMSbb765zX5macREYnLoeS7L3bHHHiumjraNtiY3Hic2KhCcAFpfLU29oqSmDnYvm6783gAy6+DmBxXzIptch0mKpub0QE93qFMPRpgGHIlWwp/TLjaialNTjlMkPZXh+SgEPiXCCZMKphLKTYOKGX84wumPJijVo1WwqXUBp+1G19QQRjeDvFD+RZh9dBANrUtSfqBYRuk8A6T2r88MpV3dpOjuO18Ps4MJhsao9BEi6jBBWCkghh5H+ryDlgkhNXUxI5hY2NaQlXaqfWIOvNHILNuYLphK1RJOxsQoj8fbb78tpy0olEoJ5llBURisJOVyENImdjWrTdHxT0bqIgPfmcuGkrozY9JRfYuuqTvqxcf05xipR98IGakTYW+kTgSsR7NGag+QQooYqUNQi1PHSB0Hx5JWjNSJgPVo1kjtAVJIESN1CGpx6hip4+BomjoRjiHNGqlDUPOoY5raA6RERYzUiYA1UicC1qNZI7UHSCFFjNQhqMWpY6SOg6PZ1IlwDGnWSB2Cmkcd09QeICUqYqROBKyROhGwHs0aqT1ACilipA5BLU4dI3UcHM2mToRjSLNG6hDUPOqYpvYAKVERI3UiYI3UiYD1aNZI7QFSSBEjdQhqceoYqePgaDZ1IhxDmjVSh6DmUcc0tQdIiYq0I/WonBitRB2TOoAEKCbhCIAfwb1kpjLpWATIWEBqDYKX/wcQiNRw0Nmz5QAAAABJRU5ErkJggg==[/img][br][img]data:image/png;base64,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[/img][br]Η απόσταση μεταξύ αυτών των δύο πόλεων στον χάρτη είναι 22,25 εκατοστά.