Με δικά σου λόγια, να περιγράψεις τις σημαίνει ότι δύο γωνίες είναι [b]παραπληρωματικές[/b].

[color=#000000]Στην προηγούμενη εφαρμογή, η [b][color=#0000ff]μπλε γωνία[/color][/b] είναι [b]παραπληρωματική [/b]της[b][color=#ff00ff] ροζ γωνίας[/color][/b] και αντιστρόφως. [br]Μπορείς να βρεις πόσες μοίρες είναι η παραπληρωματική μιας γωνίας 130 μοιρών; [/color]

Πόσες μοίρες είναι η [b]παραπληρωματική[/b] μιας γωνίας μιας μοίρας;

Ποιας γωνίας η παραπληρωματική είναι ίδια με την γωνία; (έχει ίδιο μέτρο)

Πόσες είναι οι γωνίες που βλέπεις να σχηματίζονται;

Οι γωνίες του διπλανού σχήματος είναι [img]data:image/png;base64,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[/img]

Οι γωνίες του διπλανού σχήματος είναι [img]data:image/png;base64,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[/img]

Οι γωνίες του διπλανού σχήματος είναι [img]data:image/png;base64,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[/img]

Οι γωνίες του διπλανού σχήματος είναι [img]data:image/png;base64,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[/img]

Οι γωνίες του διπλανού σχήματος είναι [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANAAAAEECAYAAABZfLr5AAAgAElEQVR4Ae1dB1RVxxZFjRL1R40mJuabqCEmkWgAFWMN2GJBFESFqAiiFEEELIgICir2XhCxgAgqiigWbGCPii323pVg7xr7/utM8viAdB68e+87sxaL+26ZO7PP2fecmTkzowNOjAAjkG8EdPL9JD/ICDACYAKxEjACBUCACVQA8PhR7UPg6dOn6SrNBEoHB/9gBLJGIDExEZ06dcL+/ftTb2ICpULBB4xA1gi8efMGrVq1QqlSpeDo6Jh6IxMoFQo+YASyRiAmJgalS5dGsWLFsH79+tQbmUCpUPABI5A5An///Tfq168PHR0dmJmZ4fnz56k3MoFSoeADRiBzBBYuXIiSJUtCV1cXe/fuTXcTEygdHPyDEUiPwIMHD6Cvry+sT+/evfHq1at0NzCB0sHBPxiB9AhMnDgRJUqUQIUKFXDmzJn0FwEeSP0AET7BCPyLQEpKCqpVqyasj4+PD969e/cBNmyBPoCETzAC/yDg6+sret2IRDdu3MgUFiZQprDwSW1H4OXLlzAyMhLWZ+bMmXj//n2mkDCBMoWFT2o7Am/fvsWuXbsQGBiIe/fuZQkHEyhLaPgCIwDcvn07WxiYQNnCwxcZgewRYAJljw9f1QACj148wvlb57Hnwh5EH4zGjMQZGL56OLxXemNk3EiM3zgesxJnIWxPGFYdXoWE0wnYd2kfjt04htdvXxdpiZlARQo3vywjAvee3cOW01swIm4E7BfZo+Osjmg7vS06zOyQ+tdxdkdYzLFA15CusAq2gmWwpfjdaXYnqP4s51iK+9tMawOXJS6CYLvO70Lyw+SMr1TrbyaQWuHkzHKDwMnkkwj/Ixyuka5oPbU12k1vJ5Tfaq4VrOdZw3ahLRzCHeAU4QTXKFd4LPfAoBWD4B3jjcErBmNg9EBxzn2pO9yi3OAS6QLnJc7ou7ivIBgRsMXkFmg+uTlMJprAbpEdgjYEYf2x9Xj1Jn0kQW7Km909TKDs0OFrakMg6XISJm2ehB7ze4CsBP21m9EO3ed3F0TxivbCsNhh8I/zR8DagHz/+a/xF2TrF9kPDmEOMJ9lDtNJpmg6vikajW2E30N/x6I9i3D/2X211I0JpBYYOZOsECDiEDF+nfircM3MZpqhd1hvkIKTNaE2TUEIk9Oz1HYii0Xv67mgJ5pNaIaGYxui1ZRWwipdv39dFJ2mKCQlJWVVjSzPM4GyhIYvFAQBFXHoy0/k6TK3C9yXuWNozNBCJUx2hKJ2Flk6cvXIxWs4rqFw8QYvGQxDI0MxZSFjtHVOGDCBckKIr+cJASKOb6yvcJeajG8Catz3X9offqv9NEaczEg1JGaI6GwgF69G+xooXrw4Kn9ZGcnJeet0YALlST345qwQuPnwJkatG4UGQQ3QaFwjdJjVQTTwyYXKTIGlcs59vjs+rvCxCNkZM2ZMliE7WdWbCZQVMnw+1wjsPL8TnYM7o+6ouqJjgHrOqN0jFZJkV47GnRsL8lT5pgoo+jqviQmUV8T4/nQILNi1AHVH1xXkcVzsCJ9VPrIgDpHKbY4bylYoKwg0O3h2unrl9gcTKLdI8X0fIDBk5RAYBhqKni1q52T3pZfitTrN6wjy1KpTC/fv569bmwn0gVrwiZwQuPPkjhjwJPJQ7xp1R0uRINmVqe+kvtAtoyvm+0SvjM6pylleZwJlCQ1fyAyBcynnRPRA/TH1xQCo1DsJMiMRjT3VbFBTWJ9GzRoh42qjmdU7q3NMoKyQ4fMfIHDt/jX8OuFXNB7XGAOWDZCd1VGRyTbQFiV1S6JY8WLYuGnjB/XMywkmUF7Q0uJ7iTwUW/bL2F8wcMVA2ZKHSGQ52hI6VXVgbmEOWvOtIIkJVBD0tORZIg+N3JPbRiP5qi+5XP83Gt0I1mOtcfzE8QJLkAlUYAiVnQGRh0brjUYZwXO5p+zJYx9mj8+9PseZlA+XqMqPJJlA+UFNS56hQEuKlibLI+c2T1pLSR8Cmi+krsQEUheSCsvn+evnYoIbtXkoCDStEsr1mD4G1YZWw6U7l9QmLSaQ2qBUVkahu0Lx04ifRCCoXAmTttwUWvSD3w/wW+OnVkExgdQKpzIyO3r9KH70+1HEt6VVQjkfU6ye/gh93HiQ+QKJ+ZUcEyi/yCn4uV4Le+HngJ8xdJXm5u6ok6wDIgbgv0P+KxYnUbfYmEDqRlTm+S07sAw/DP9BMa5bv5n98K3xt6jSsQooBEndiQmkbkRlnB8tJVV7ZG20n9FeEZ0GFLKj30xfxLs1atOoUCTDBCoUWOWZqccyD9TyrwWKslanC6WpvOyC7FCqdClBoJjYmEIRChOoUGCVX6aJZxJFr5tjhKMiyOMf64/qBtVFwKhJCxM8e/asUITCBCoUWOWXKY2RNB7fWCxwqCmLoc73dhvaDSVKlhCbY21J2FJoAmECFRq08sn46I2j+Mb7GzgtcVKE9fGN9sWXel8K62NlZVXggNHsJMkEyg4dLblGK35S5wENMqrTCmgqLzMXMzFVQbe0br7WesuL2JlAeUFLgffSwCJZH5tQG0WQZ9DiQaj4VUVhfRz6OOD168JdbJ4JpEBS5KVKwTuCBYHktBhIdpatmXUz6BTTQdlyZXHq1Km8QJGve5lA+YJNGQ+9eP1CLIColHEfItZ/6/5XWB+vQV6ZbgqsbskxgdSNqIzy23B8A2r41BCLsWf3VZfLNVoD+5Nun8DGyQZXrlwpEkkwgYoEZmm+hLYGoeV35UKQnMpJltQg0ACnLhW+66aSKBNIhYQW/jcKNILNPGV0HtC6dJ95fgZa6LEoExOoKNGW0LtuPb6FCgMqKMZ9azGlhbCm6tr3J7eiYgLlFimF3bf55GZUHVK10PfnycntUsd12snuU49PEXc0rsilxAQqcsil8cIRa0aInRTUocCazoPWqWs7rS2evSyceLfsJMYEyg4dBV9rNbWV2KhX08pf0PfTKjvl3ctj38V9GpEWE0gjsGv+pbS0E/XCFVSBNfm85UBLfNf1O3Sc0hFv373VCKhMII3ArtmXXrl7BRU9Kso69m3IkiH47OvPULJiScyJmqMxQJlAGoNecy9OOJ0AvWF6srY+zW2bi5CdTyt/WmSDpplJjAmUGSoKPxd9MFqsUKNJ96sg7/Za5IVyn5cTITsBowM0Ki0mkEbh18zLQ3aGiNmnBVFiTT77i8Uvgjxff/s1/vrrL82A+O9bmUAahV8zLw/aECSWrdIkCfL7btdZrihTvowgUPC8YM0AmOatTKA0YGjL4aAVg8SepvlVYk0+p9qWUd9QHw8ePFC7yN6/f4+XL1/iyZMnuHfvnrBw165dw/nz58X0iD///FNM0tu9ezcSExPBBFK7CKSfoUO4A34J+kWynQgj146E32o/sdO390pveEZ5wi3cDVZ+VihV5p9VdoImBAmFPnr0qFDoPXv2YNu2bdi4cSPWrl2LmJgYLF26FOHh4QgNDcWcOXMwdepUTJgwAaNHj4a/vz+GDh0KLy8v9O/fH05OTrC3txd/ffr0gaOjI5ydneHq6iquDxgwQNw7aNAgDBkyRDzr6+vLBJK+uqu/hFbBVmgyLn9R2P5x/vBZ6YOBUQPhHuYO53nOcJjtANtptrCZaIOuQV1hEWCBDsM7oN3Qdvht4G9o4dECpq6m+NX5VzTt0xSN7RujYc+GaPB7Axh3M0Y9q3qoa1EXRuZGMGxvCIO2BqjTqg5+av4T9E308f2v30OvmR4+/+5z4br95z//EQpOyp9Rof38/DBixAgEBARg1KhRCAoKwrhx4wRxJk2aJEg0ffp0zJw5E7Nnz0ZwcDDmzZuH+fPnY+HChYiIiBDEi46OxqpVq7BmzRqsW7dOEHPLli3C6uzcuRNE2H379jGB1K+eRZ/jq1evxLJN5NLcunUL169fx8WLF3HmzBnQF/rgwYP4448/sH37dmzevBl1+9aFvq0+TPuZwsTRBE17N0XjXo3RsEdDNLBuAOMuxqhnWQ91O9aFkZkRDNsawuA3Axi0NMDPLX4Wiv2j6Y+oaVITeiZ6qGFSA9VNqqO66T9/NVrUQI2WNaDXWg/ft/ketcxqoY55HRhZGIm8G9s0hklPE7Syb4X2ju1h6WoJGw8b2A22g7OvMzwCPOAz1gejpozCpNmTMD1kOnq79Bbd1h9//DFC54ciPj4eKoXesWNHqkIfOHAAR44cwbFjx3Dy5EmcPXsWFy5cwOXLlwUuycnJAiNyzx4+fChctRcvXoAwfPs274Ox7MIVgr7TPHxah4wERAp948YNXLp0SSg0CfbQoUNCoUnwpAQbNmxAbGws6Ku3ZMkS8SWcO3eu+ErSV3Ps2LHii0ouA7kPHh4ewrXo27cvevfuDfpPLoiLiwvc3Nzg7u4u7lF9ob29veHj4wN6nr7QJtYmaGDVAI27NYZJdxO07tUa7fu0h4WzBaz7W6OXVy84eTvB3c8d3qO8MWL8CIyfNh4z58zEgoULELY4DOFLwhEeGY7wpeGIWB6BiBURiIyJRFRsFJbFLUP0umisjF+J2M2xiEuIw/rt67Fx10Zs3bsV25K2YdfhXdh7dC8OnDqAI2eP4MTFEzh77SwuJl/E9TvXkfIgBfef3seTv5/g+avnOHfhnKgTuVYF3ZZRnSLXCgK9efMGz58/Fwp9+/ZtodD0RaKv0/Hjx4VC7927F6TQW7duFQq9evVqodCRkZFCoUNCQoRCT548WSh0YGAghg8fLhTa09NTKDQJl/xo8qFVCk0+dEaFVvnQw4YNEwqd1uUYM2aMyH/8+PEg8kyZMgXTpk0DuR2zZs0SvjyRi9yOBQsWICwsDFTGZcuWYeXKlYKI1AYgUm7atAkJCQnC8lCjl+qYlJSExN2J2LxrMxL+SMCOpB3Yc3gP9h/dj0OnDuHY2WM4fek0Lly7gKvJV5F8Jxl3H97F42eP8ferv4tkmnRWCk6W9dy5c1ld1sh5jRCIFJrMJn2h79y5g5s3bwoTSwp94sQJodDkX5KvqVJo8kVXrFghlGXRokVQKTQpGPm4pND0daWvLSk0fYnTKnTGRiF9xVVf6LQKTaSgBqbKh06r0BMnTgQRiBR6xowZqQpNZaGGqkqhyYqQQlN5ybLExcWlKjTVh1ypXbt2pSo0WSRytajup0+fFj0+ZLGo94ewSUlJETiRi/b48WNh3ainiHDkpFkEBIHI9yOFfvToEe7evQvyE2lOObGd/MjDhw9j//79Quj0RSP/k5SCvnhRUVHiK0gKRI0y6umgr6eqp4Nch4EDB4qeDOrVIJcjL19olUKPHDlSNAopX3Jp6B0qhaZ3pm0Yqr7QmTUMqXeGyLh+/frUhiH13hBZqZ1A9aQ2A3VXknUihSYcSKGvXr0qrBcrtGaVVkpv13FwcBAKTV9o8qFVLkdm3XbkcqRVaPrqk0Lntadj8eLFgnjk86sUOqueDpVCU8OQFJqWKiKFpkaySqFpNJos2f3791O/0OQn0xea+vU5MQKFhYAOuR3UV57Wjyb/X+VHU68NWR1qH5AfTa5V2p4OUmhVTwdZLfJTSaGprUEKTVaNGtSk0NS4ZoUuLFFyvppAQOfdu3eaeC+/kxFQBAIa6URQBHJciUJFgNrdckhMIDlIScvKSD2SLVu2FO1tqVedCSR1CWlZ+aiNbGtrK0J22rVrJ/naM4EkLyLtKiB1VJUvX15sjEXDDVJPTCCpS0iLyke9tJ06dRLWp02bNqL3VurVZwJJXUJaVD4a3C5btiwoYJSGTuSQmEBykJIWlJHGCU1MTIT1sba2FpPa5FBtJpAcpKQFZaTJb6VKlUK5cuXEQL1cqswEkoukFFxOCiquX7++sD4UxZ6feTmagocJpCnk+b2pCNB06xIlSuCLL74QwbupF2RwwASSgZCUXkSaflKyZEkx4U9usZJMIKVrpwzqR5P8aEoKRdfLLTGB5CYxhZaX5qPJMTGB5Cg1LrNkEGACSUYUXBA5IsAEkqPUuMySQYAJJBlRcEHkiAATSI5Sk3GZaXkxJSUmkJKkKYO60BoctD41rZmhhMQEUoIUZVIHIo2+vj4qV64s1suTSbGzLSYTKFt4+KI6EaAFMIsVK4aKFSuKxTPVmbem8mICaQp5LXsvLUxZvXp1ETBKq8IqZTUoJpCWKbKmqkvLKOvo6ODrr78WuyVoqhzqfi8TSN2Icn4fIEA7UlC7hwhEyzIrKTGBlCRNCdaFXDXasYLIY2hoKBbKl2Ax810kJlC+oeMHc4MA7eRWoUIFMd+Hdq1QWmICKU2iEqpP2lV2WrRoIRb+l1Dx1FIUJpBaYORMMkOAtlb89NNPoaurK7aSyeweuZ9jAsldghIuP+3SQRuSUQ+clLZlVCdkTCB1osl5fYAA7aRHe8QqNTGBlCpZrleRIMAEKhKY+SVKRYAJpFTJcr2KBAEmUJHAzC9RKgJMIKVKlutVJAgwgYoEZu14Ce2ucPfuXe2o7L+1ZAJplbgLr7K0LaOxsTH69OkDpU3bzg41JlB26PC1XCFAAaN2dnYiYLRRo0aQ6yKJuapshpuYQBkA4Z95R0C1LSNtT7Jq1aq8ZyDjJ5hAMhaeFIr+6tUrmJubC+tDmwI/e/ZMCsUqsjIwgYoMamW+iDoOaEvGMmXKYNu2bcqsZDa1YgJlAw5fyh6Bp0+fwtTUVFifbt26gaYvaFtiAmmbxNVY38jISLGvD62yc+DAATXmLJ+smEDykZWkSnr//n3Uq1dPWB8XFxfFrLKTV5CZQHlFjO8XCNC2jLTG25dffim7bRnVKUImkDrR1KK8Zs+ejW+//RY+Pj5aVOsPq8oE+hATPpMLBFJSUhAVFYUrV67k4m7l3sIEUq5suWZFgAATqAhA5lcoFwEmkHJlyzUrAgSYQEUAMr9CuQgwgZQrW65ZESDABCoCkOX+ClqailPmCDCBMseFz6ZBYN26dWJbxhMnTqQ5y4eEABOI9SBbBJ48eYKmTZvik08+QURERLb3auNFJpA2Sj0PdV60aBGKFy+OSpUq4fDhw3l4UjtuZQJph5zzVcvk5GTUrl1bBIzStozv37/PVz5KfogJpGTpFrBugYGBgjw1atRQ1LaMBYQl3eNMoHRw8A8VAmfOnEHVqlUFgSZNmqQ6zf8zIMAEygAI/4SY2+Pq6irIQ9sy3rlzh2HJAgEmUBbAaPPp/fv3g2aZfvTRR9zzloMiMIFyAEjbLtO6BlZWVsL6NG/eHNSNzSlrBJhAWWOjlVdoaV4DAwOxys6GDRu0EoO8VJoJlBe0tODeR48eiYlyAQEB4BCenAXOBMoZI628Q5vWty6IgJlABUGPn9V6BJhAWq8CDEBBEGACFQQ9flbrEWACab0KMAAFQYAJVBD0+FmtR4AJpMUqQNHV4eHhoMiDt2/fajES+a86Eyj/2Mn+ySNHjqBatWro0KEDHjx4IPv6aKICTCBNoC6Bd7558wa9evUSITuNGzfG48ePJVAq+RWBCSQ/mamlxLt27UK5cuWgq6uLNWvWqCVPbcyECaSFUqcQnY4dOwrr07ZtWw7ZKYAOMIEKAJ5cH42PjxeWp2zZskhISJBrNSRRbiaQJMRQdIWg6Qk0TUFHRwe0LSO1hTjlHwEmUP6xk+WTy5YtExPlaMJcUlKSLOsgpUIzgaQkjUIuC23LaGxsLKyPk5MTr7KjBryZQGoAUS5Z0MKItC3jV199hZMnT8ql2JIuJxNI0uJRb+FiYmLQsmVL+Pr6qjdjLc6NCaRlwt+9e7fWb8uoTpEzgdSJJueldQgwgbRO5FxhdSLABFInmpyX1iHABNI6kXOF1YkAE0idaHJeWocAE0ihIqdlqVJSUhRaO+lUiwkkHVmotSSrV68G7enDwaJqhfWDzJhAH0Ai/xM0u7RJkyYiZGfMmDHyr5CEa8AEkrBw8lu0BQsWiG0ZP/vsMxw8eDC/2fBzuUCACZQLkOR0S9ptGd3c3DhgtJCFxwQqZICLOnty2WiuDwWM0i5znAoXASZQ4eJbpLmfPXs2dVtGPz+/In23tr6MCaQQyb979w7kspH1qVmzJm7cuKGQmkm7Gkwgacsn16Wj2aU0y5Tm+8yYMSPXz/GNBUOACVQw/CTx9KtXr9C1a1dhfWh3uXv37kmiXNpQCCaQAqT87NkzmJiYoFSpUggLC1NAjeRTBSaQfGSVZUlpXWvaz5QiD3hT4CxhKpQLTKBCgVUzmfK2jEWPOxOo6DHnNyoIASaQgoTJVSl6BJhARY85v1FBCDCBFCRMrkrRI8AEKnrMC/xG2l2BkzQQYAJJQw65LgWF7ISEhCAxMRGvX7/O9XN8Y+EgwAQqHFwLLVfalrFSpUqgXeVo6gInzSLABNIs/nl6O1mcnj17ipAdfX19/PXXX3l6nm9WPwJMIPVjWmg50rK8ZcqUQYkSJRAaGlpo7+GMc48AEyj3WGn0Tuo46NSpk7A+DRs25JAdjUrj/y9nAv0fC0kfbdy4UQSLli5dGrTiDidpIMAEyoMc3r19i78fPsTjGzdw98wZJB88iL8OH8ato0dx++RJce7++fN4cOkSHl29Ku57+eRJHt6Q+a20Bb2pqamwPh06dABNX+AkDQSYQFnIgUhw/Y8/cD4+HieXL8eRhQuRNHMmdo4ejURfX2zy9MQ6Z2esc3IS/9f364cNrq6I798fGwcMwCYPD2z09MTOMWNwdPFiXNq6VRDsxf37Wbwx69O0LWPx4sVRvnx50Pb0nKSDABMojSweXbuGSwkJOBwaivUuLoi2skJEq1ZY0KgRQoyMMPfnn7GgYUMsad0ayy0sENujB1Z27SqOl3bogMi2bcX94aamWNSkCeY3aIDgn35CiIGBuEZ5bvP3x9GICFzcvBm3jx/Hszt30pTgw0PalrF+/frC+tjZ2fEqOx9CpNEzWk8gIs2V7dvxZ1gYNg8ahKj27TG7Vi2h/EvNzARB4nr3FpYlwccHOwIC8vRHecY5OGC5pSUiWrZEiKEh5tWrB8qbrFbi8OG4EB+Ph5cvZ6oImzZtEuShVXZOnDiR6T18UnMIaCWB3r58KdouxyMjQaSI7twZ84yMEPbrr1hhZSVcsbwSJbf3E2E29OuHVT16YJmFhSBUZLt2grynVq4Ubl5addi2bRusra3h7++f9jQfSwQBrSLQ+/fvcevYMeGixfXpg4WNGwuXK8baGvHu7nmyLLklTE73bfX2RmzPnljcooUgMLWhqM2UcuRIqorcunWLB01T0ZDWgdYQ6N7Zszi+dCnW9u0r3DNq31BDPycFL8rr1EYi147aWdQ5cSgkBK/U0IsnLZVTVmkUT6AHly/jTGwsNri5CcUkBY13c5MUcTKSlNpN5E4GFi+O57zCjqQZp1gCvXr6FBc3bRLdzYuaNhU9Z2sdHSVNHBWRtvv7Y76xMajcnKSNgCIJRAOdB+bMEb1e1J28ulcv7Bg5UhbkIRKt7dMHkypXxuWEBGlrD5cOiiPQ7RMnsNHDQ4zbUI9awrBhsiEOkYcGaefUro3lnTqxesoAAUUR6OrOnVhpbY2ZNWv+Y3XyOGajcqE09X/T8OGY0rEjxn/xBW4mJclAfbiIiiHQ2TVrRJf03Dp1JN9JkBVBg7p1Q+0KFdCvVi3WTJkgoAgCHVuyBPPq1gWF0MjNZVORacOwYahdpYqIOuhtaysT9eFiyp5AxyIjMVNPDxSLplJGOf4f1rEjiunooGKFCjh8+DBrpkwQkDWBzq1bh6lVqyLGxkbW5Fk9ZAhqVKworI+zo6NMVIeLSQjIlkDXdu8GtXeizMxkTR6yli4tWwryVP3qK1y4cIE1U0YIyJJAFCcW0bq1iB+To7uWtszRXl74vGxZQaCRHDAqI+r8U1TZEYhmgq7o2lXM0UmriHI97tGkiSAPbcuYkpIiOwXS9gLLikA0S5Tm5tDEtoShQ2XvukW4uaGCri6KFyuGmbwtoyy5KBsCvXz0SEw5mP3DDyIwVK4WR1XubSNGwNzISFgfw59/xoMHD2SpQNpeaNkQ6FR0NKbXqCHWH1ApoZz/b/bxgb6uLsqXLYslS5Zoux7Ktv6yINDj69dFhwFNi5YzadKWPdbWFgO+/BI+Xl548eKFbBVI2wsuCwLtCAzEHH19Mf06rRLK9Zjab7O//x6r7e21Xf9kX3/JE4iiq4Nr18YampIgs+DQrMpLK/lM+eorpBw9KnsF0vYKSJpALx8/FusF0NoFWSmj3M5vGTwY06tXB/3nJH8EJE2gUzExmFa1qljFRm5Eyaq8S83NBYGoS56T/BGQLIGe3LwpOg6i2rVTjPXZ7OUlYvf2TJwof83hGggEJEugQ6GhmF6tmnB1svqay+n8Fj8/sS4DdYY8z2E1UtZN+SAgSQK9f/dOBInSgoNyIkl2ZfW3sIDLl19i+7Rp8tEOLmmOCEiSQNQ+mFyliiIiDohUyzw88HmZMqhUogSOc89bjkoppxskSSBqI5Crk90XXS7Xto0ciS7GxiJk58cff8Qddt/kxI8cyyo5Ar17/VosgLjM3FwRBJrv5ISyJUviI96WMUdllOMNkiPQ3dOnMbFSJcktu5sfi7fV3x8ta9US1ucXY2M8ffpUjjrCZc4CgTdv3khvRurOUaPEjgX5UVipPTPN1halihfHx6VKYc2aNVmIgU9LDQHahOD58+e4e/curl27hjNnzuDIkSPYs2cPtm7diri4OCxfvhwRERHSItC7N28w18AAK7p0kb37Fj9sGOp9842wPm1at8bbt2+lpidaWR7arPnhw4dITk4W0+ePHTuG/fv3g7aRWb9+PVauXImoqCgsWLAAs2bNwoQJEzBy5Eh4e3vD3d0dffv2Rffu3dG5c2f06tVLWgR6mpyMoNKlsXnwYNkTaETnzihWrBjKf/KJ+HJppbYWYaXpA/XkyRPQVjBXrlzBqVOncPDgQezcuRO0SRltzLx06VKEhYUhODgYU6ZMwejRo+Hr6wtPT084OzvD1tYWXbt2FX+urlFkDkMAAAlZSURBVK4YPnw4Jk2ahPnz5wtiJdDuhYcP49KlS6CdA8lSSaoNRNsrzvj2W9mTJ87bGzU/+0xYH17jreAsouke9+7dw40bN3Du3DkcPXoUe/fuBSn0unXrsGLFCjGnKpQG36dPx7hx48SGZIMGDUK/fv3Qu3dv2NjYwMLCQhzT+TFjxmD27NnC2mzYsEHkd/r0aTGtnqxUbpOkCLR36lSEGhvLnkBTbWygq6ODKl98gfPnz+dWFlp3H+02/ujRI7F5GH3VaQvLpKQk7NixA/Hx8YiNjQVtsLxw4UKh7GQNAgMDMXToUAwYMCCdO0UEIReLdvKbOnWqsDRkdbZv3y4IR20Z2u1c3UlSBKJNe5UQ+za+USOY16qFQD8/dctLFvm9e/dO9DjSmFdmjfC1a9ciOjoaixcvRkhIiFB4sgjkMnl5eaVzp6it4ejoKNogZFnmzp0rGvCbN2/GgQMHxAeKGvvUI6aJJCkCzTM0xBo7O1lboE2enphRo4bYtJh8cqWlv//+W6zfcPPmzQ8a4eQKxcTEIDIyUrQbZs6cifHjx2PEiBEYPHgwqF1hb28v9nzt1KmTaHNQ+yMgIAAzZswQvVpErt27dwtrRO+g3jApJ8kQ6O2rV5hQqZK8g0dHjhTrc4eZmIA2+JJToi84uTjUCL98+bJohB86dEgoM33tqRuerIaqET558mSMGjUKPj4+6XqnLC0tRQ+Vi4sLhg0bhokTJ37QCKf8lbKIimQIRNu8T/j0U1lbH9o6coaeHmjJYakk1ZgGNcKvX78uGuF//vlnaiNc1XVLYxrz5s3DtGnTEBQUBD8/PwwcOBBEBOqd6tKlC8hqkAWhRjj1YKVthO/bt0+MlxAB89IIlwpO+S2HZAh0bu1aMXVbaoOhuS3PNj8/LPjlF0R37pxfWeT5OdWYxl9//YWLFy8Kt4faBWm7bslqLFq0SCi7akxjyJAhcHNzS3WnOnbsKNwqOkfEoS5earhTI5wa9NTrRW0ZJbqkeQY9wwOSIdC+adOwqFkz2VqgOAcHYX2u7tiRAeK8/6QxDQr7uX37Nq5evfrBSLiq65Ya4dSoVo1pkDvl4eGRrneKum779OkDIs3YsWMzbYSTdeKB3rzLiZ6QDIF2BQUh3MRElgRKHDZMrJa6tm/fHKVAYxo0CJexEU7draquW9VIODXCqecpM3eqQ4cO6NGjh+jOpZFyGv8gQqka4SdPnhSj7bxkVo4iKdANkiHQ3smTZbne9SZfXwR16IARVarg7LZtYiAuYyN8y5YtQrEpTITcqTlz5ogRbup9ohCRtO4UtTOoIe7k5CQa4eR20QAhPasaCaf8KRyFk+YRkAyB9s+YgdAGDSRngRKHD8f6QYMQ4+6OKGdnLHJwwNxevTCjRw9MsrHBQDMzVNbVhdl336VrhFOISEZ3ytzcPLXrlnqwKNaKunxVI+EUtEhu2+vXrzWvGVyCXCEgGQIdCglBSN26RUqgzb6+WOPlheWurljcty9C7e0xu2dPTO3eHRNsbDDG2hp+5ubo36QJehsYwLpmTXSqVg1tv/4arapVQ6NvvkGJYsVEyE7Tpk1F2AgNBlKbhCyNaiScAhapB4ynM+RKJ2V1k2QIdDQ8XLQjctvrld19iSNGYIOPD2I8PRHVrx8W9unzf6vx++8Ya2ODUdbW8G7XDi4NG6LnTz/BSk8PZtWr47fq1dFCTw+mtWqheb16aGNqim5mZuhjZQWP33+Hn4MDJnl6YkFAABzMzAR5KlWqxNsyykrt1VdYyRDo5IoVCM5hGvf2gABsHj4ccUOGINrdHYudnRHq4IBZtraY0qMHxv/++z9Wo3NneLZujT4NGsBGXx+d9PTQrkYNtNbTQ3MihqEhWjZtis7t28PO0hJu3brBx84OY/v3x9zhwxE9ZQoSIiNxLCEBt86dAy3wmDGRq1WnTh1BIApY5KSdCEiGQCdWrcKk77/HqkGDEOXmhoWOjgi2t8d0W1tM6t4dQTY2COzWDd7m5nAzNYVd3broUqsWOtSsiTbffYeWP/6IFgYGaNGoEcx++w09LCzg1KULBvbogUAnJ8zw9saSCRMQv2gRDsbH4+qxY3hBW4q8f58vydNIvI6ODqpWrSrGYPKVCT8kewQKnUCqMQ1VYOHZs2fFwByNXNMkpo0bN4qo28mDB8O6cmU4NWuG7kZGsKxVC+1/+AGtiRh16qCFsTHatGiBbh07wt7SEu7W1vC1t8cEDw/MDwxEbHAw9sTG4lxSEh6npOB9IU5go7D6atWqifk+FB3MSXsRKBCBaIyBYppodl/GkXCKn6KprxSOTrP7KFiQBvJoTIMibqmblsYxKNq2bdu2IlSkp6UlXLp2xeCePTG6Xz/M9vXFsqlTsTUqCsd27MCdK1fwVsM9VBRpTB0FZH309PRE7Jj2qg/XPFMCUTeqKrCQZvep5oT/8ccfSExMFAN+1MMUHh4uZvfRPA0a06DRbmoP0FRXmtlnZmYGGvCzs7MT8VMUY0WzAWk+uSocnXalVs3uk4M4aELXF198gRIlSoiPghzKzGUsPAR0qItVNYmJpr6S1aCxCVVgIc3TUEXcOjg4iJl9NNjXrl07cUyDgBSunnEknKbUUowWhb8rKfXv319YHwMDAx7MVJJg81kXHYq4VblTNAJO7hQFF1L8FI2S03wOIhONhJP1odVJyCrRTEJtTLSgBLluFL3MiRHQIWtDMVjUqKcGPjX2ObAwa8WgNh8NknKMWdYYadOVTNtA2gQA15URKAgCTKCCoMfPaj0CTCCtVwEGoCAIMIEKgh4/q/UIMIG0XgUYgIIgwATKBj3qqlfaOFY21eVL+UCACZQNaLQmMk2TpgFhToxAZggwgTJDBRCr0FCkNS0QT1tacGIEMkOACZQJKjSQTBEaFDBas2ZNsbB5JrfxKUZAOqvySEkWx48fR4UKFfDRRx+JBUCkVDYui7QQYAuUQR60YwBNsyDrY2hoyIsJZsCHf6ZHgAmUHg+xFnSpUqWgq6srNmTKcJl/MgLpEGACpYGDVs1p06aNsD60yg5ZI06MQHYIMIHSoENbc1CvW+nSpcVabWku8SEjkCkCTKB/YaFZsfXq1RPWh+ZE0dRtToxATggwgf5FiDak/fzzz1GuXDnRDsoJOL7OCBACTKB/9YDWmqb9NWl2LidGILcIMIEyIKWtU9UzwMA/c4nA/wC7XQR6qAj/6gAAAABJRU5ErkJggg==[/img]