tag:blogger.com,1999:blog-38741277145026670012024-03-14T03:41:36.669+02:00Θέματα Φυσικής και ... άλλαΘέματα φυσικής στο γυμνάσιο και στο λύκειο με χρήση των ΤΠΕ. Θέματα εκπαίδευσης, ενημέρωσης και ό,τι άλλο φαίνεται χρήσιμο.Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.comBlogger37125tag:blogger.com,1999:blog-3874127714502667001.post-954087255014644252018-02-01T12:26:00.000+02:002018-02-01T12:27:37.509+02:00<div dir="ltr" style="text-align: left;" trbidi="on">
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Το εντυπωσιακό Βόρειο Σέλας από τον διαστημικό σταθμό είναι εντελώς μαγευτικό.<br />
Το σέλας είναι φαινόμενο διαστημικού καιρού που συμβαίνει όταν ηλεκτρικά φορτισμένα ηλεκτρόνια και πρωτόνια συγκρούονται με ουδέτερα άτομα στην ανώτερη ατμόσφαιρα.<br />
Παρακολουθείστε το εντυπωσιακό φαινόμενο από το κανάλι της <a href="https://www.instagram.com/p/BEeHtnrNPh4/" target="_blank">NASA στο YOUTUBE στο παρακάτω video</a><br />
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<blockquote class="instagram-media" data-instgrm-captioned="" data-instgrm-permalink="https://www.instagram.com/p/BEeHtnrNPh4/" data-instgrm-version="8" style="background: #fff; border-radius: 3px; border: 0; box-shadow: 0 0 1px 0 rgba(0 , 0 , 0 , 0.5) , 0 1px 10px 0 rgba(0 , 0 , 0 , 0.15); margin: 1px; max-width: 658px; padding: 0; width: 99.375%;">
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<a href="https://www.instagram.com/p/BEeHtnrNPh4/" style="color: black; font-family: "arial" , sans-serif; font-size: 14px; font-style: normal; font-weight: normal; line-height: 17px; text-decoration: none; word-wrap: break-word;" target="_blank">This stunning Aurora Borealis from the space station is completely mesmerizing. Watch in full-screen high def on the NASA Johnson YouTube channel. Auroras are a space weather phenomenon that occur when electrically-charged electrons and protons collide with neutral atoms in the upper atmosphere. The dancing lights of the aurora provide a spectacular show for those on the ground, but also capture the imaginations of scientists who study the aurora and the complex processes that create them. #aurora #stunning #space #NASA #SpaceStation</a></div>
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Η δημοσίευση κοινοποιήθηκε από το χρήστη <a href="https://www.instagram.com/iss/" style="color: #c9c8cd; font-family: Arial,sans-serif; font-size: 14px; font-style: normal; font-weight: normal; line-height: 17px;" target="_blank"> International Space Station</a> (@iss) στις <time datetime="2016-04-21T17:26:26+00:00" style="font-family: Arial,sans-serif; font-size: 14px; line-height: 17px;">21 Απρ, 2016 στις 10:26 πμ PDT</time></div>
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Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-59520504923102630652016-12-11T21:05:00.000+02:002016-12-11T21:05:11.586+02:00<div dir="ltr" style="text-align: left;" trbidi="on">
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Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-71355581462050057972016-05-09T21:47:00.001+03:002016-05-09T21:47:47.992+03:00<div dir="ltr" style="text-align: left;" trbidi="on">
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Η διέλευση του Ερμή - 09 Μαΐου 2016.<br />
Transit of Mercury στο youtube από το δίκτυο τηλεσκοπίων SLOOH<br />
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<iframe allowfullscreen="" frameborder="0" height="270" src="https://www.youtube.com/embed/rJwEIAN7UEQ" width="480"></iframe></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-76604591613894117582014-04-16T01:11:00.001+03:002014-04-16T01:11:59.398+03:00Πρόγραμμα Πανελλαδικών εξετάσεων 2014<div dir="ltr" style="text-align: left;" trbidi="on">
Ανακοινώθηκε σήμερα 15 Απριλίου 2014 το πρόγραμμα των πανελλαδικών εξετάσεων για το 2014.<br />
<a href="https://www.blogger.com/blogger.g?blogID=3874127714502667001" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=3874127714502667001" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=3874127714502667001" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a>Για τα ΓΕΛ οι εξετάσεις ξεκινούν την Τετάρτη 28/05/2014 με το μάθημα ΝΕΟΕΛΛΗΝΙΚΗ ΓΛΩΣΣΑ (γενικής παιδείας) και συνεχίζονται σύμφωνα με το πρόγραμμα... Διαβάστε το ολόκληρο το πρόγραμμα καθώς και τις οδηγίες του υπουργείου<a href="https://www.blogger.com/blogger.g?blogID=3874127714502667001#editor/target=page;pageID=5116663436727867416" target="_blank"> εδώ</a>.</div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-53210385512686160882013-10-04T01:07:00.001+03:002013-10-04T01:07:48.106+03:00Από το φως δημιούργησαν μια νέα μορφή ύλης.<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="http://images.sciencedaily.com/2013/09/130925132323.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="292" src="http://images.sciencedaily.com/2013/09/130925132323.jpg" width="203" /> </a></div>
<h1 class="article-title">
<span style="font-size: 14px; line-height: 1.625;">Το επίτευγμα των
ερευνητών των πανεπιστημίων Χάρβαρντ και <a href="http://web.mit.edu/physics/index.html" target="_blank">ΜΙΤ</a>, με επικεφαλής τους
καθηγητές φυσικής <a href="http://lukin.physics.harvard.edu/" target="_blank">Μιχαήλ Λούκιν</a> και <a href="http://web.mit.edu/physics/people/faculty/vuletic_vladan.html" target="_blank">Βλάνταν Βούλετιτς</a>, που έκαναν τη
<a href="http://phys.org/news/2013-09-scientists-never-before-seen.html#inlRlv" target="_blank">σχετική δημοσίευση</a> στο περιοδικό «Nature», ανατρέπει δεκαετίες
συμβατικής σοφίας σχετικά με τη <a href="http://ebooks.edu.gr/modules/ebook/show.php/DSGL-C107/483/3168,12791/" target="_blank">φύση του φωτός</a>. Τα <a href="http://el.wikipedia.org/wiki/%CE%A6%CF%89%CF%84%CF%8C%CE%BD%CE%B9%CE%BF" target="_blank">φωτόνια</a> θεωρούναι
σωματίδια χωρίς μάζα που δεν αλληλεπιδρούν μεταξύ τους, γι’ αυτό π.χ.
δύο <a href="http://www.google.gr/url?sa=t&rct=j&q=&esrc=s&source=web&cd=1&cad=rja&ved=0CC4QFjAA&url=http%3A%2F%2Fel.wikipedia.org%2Fwiki%2F%25CE%259B%25CE%25AD%25CE%25B9%25CE%25B6%25CE%25B5%25CF%2581&ei=U-FNUpKpLsfKsgbJ24GoBA&usg=AFQjCNHIvdE4zac6vKve-68ooNf388vlKg&sig2=pWX7Pn7O1q5H8f0WIr8PGg&bvm=bv.53537100,d.Yms" target="_blank">ακτίνες λέιζερ</a> που θα διασταυρωθούν, απλώς θα περάσει η μία μέσα από
την άλλη.</span></h1>
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<tr><td style="text-align: center;"><a href="http://phys.org/news/2013-09-scientists-never-before-seen.html#inlRlv" style="margin-left: auto; margin-right: auto;" target="_blank"><img border="0" height="138" src="http://cdn.physorg.com/newman/gfx/news/2013/nvjhbkk.jpg" width="320" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;"><a href="http://phys.org/news/2013-09-scientists-never-before-seen.html#inlRlv" target="_blank">Εικόνα από την πρωτότυπη επιστημονική εργασία</a></td></tr>
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<h1 class="article-title">
</h1>
Όμως τα «<a href="http://www.nature.com/nature/journal/v502/n7469/full/nature12512.html" target="_blank">φωτονικά μόρια</a>», που δημιούργησαν οι
ερευνητές, όπως είπε ο Μιχαήλ Λούκιν, συμπεριφέρονται διαφορετικά και
αλληλεπιδρούν...(<a href="http://vaskouvat.blogspot.gr/p/blog-page_4.html" target="_blank">συνέχεια εδώ</a>) <br />
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Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-43849025503696111252013-09-17T00:06:00.001+03:002013-09-17T00:09:37.985+03:00Ο Voyager κατέγραψε ήχους από τον διαστρικό χώρο και είναι πραγματικά... ανατριχιαστικοί<div dir="ltr" style="text-align: left;" trbidi="on">
Η μη επανδρωμένη διαπλανητική διαστημοσυσκευή «<a href="http://el.wikipedia.org/wiki/%CE%92%CF%8C%CE%B3%CE%B9%CE%B1%CF%84%CE%B6%CE%B5%CF%81_1" target="_blank">Voyager 1</a>» εκτοξεύτηκε
στις 20 Αυγούστου 1977 στο πλαίσιο του Προγράμματος Βόγιατζερ για την
εξερεύνηση των εξωτερικών πλανητών του ηλιακού μας συστήματος.<br />
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<tr><td style="text-align: center;"><a href="http://upload.wikimedia.org/wikipedia/commons/thumb/d/d2/Voyager.jpg/350px-Voyager.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="250" src="http://upload.wikimedia.org/wikipedia/commons/thumb/d/d2/Voyager.jpg/350px-Voyager.jpg" width="320" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;">Voyager 1</td></tr>
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Στις 20 Μαρτίου <a href="http://www.blogger.com/null" title="2013">2013</a> ανακοινώθηκε ότι το <i>Βόγιατζερ 1</i>
είναι το πρώτο αντικείμενο κατασκευασμένο από τον άνθρωπο που βγήκε από
το ηλιακό μας σύστημα. "Είμαστε σε μια νέα περιοχή. Και ...<a href="http://vaskouvat.blogspot.gr/p/voyager-1-20-1977.html" target="_blank">συνέχεια εδώ</a></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-11160241980529214112013-04-23T00:17:00.000+03:002013-04-24T00:16:22.649+03:00Επιφανειακή τάση νερού και ... διάστημα<div dir="ltr" style="text-align: left;" trbidi="on">
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<br />
Ο καναδός αστροναύτης της <a href="http://www.asc-csa.gc.ca/eng/Default.asp" target="_blank">CSA</a> <a href="http://en.wikipedia.org/wiki/Chris_Hadfield" target="_blank">Κρις Χάντφιλντ</a> πραγματοποιεί ένα απλό επιστημονικό πείραμα που σχεδιάστηκε από δύο μαθήτριες λυκείου της περιοχής της <a href="http://el.wikipedia.org/wiki/%CE%9D%CE%AD%CE%B1_%CE%A3%CE%BA%CF%89%CF%84%CE%AF%CE%B1" target="_blank">Νέας Σκωτίας</a> στον Καναδά. Η Κέντρα Λέμκε και η Μέρεντιθ Φόκνερ,
κέρδισαν σε έναν επιστημονικό διαγωνισμό της <a href="http://www.asc-csa.gc.ca/eng/Default.asp" target="_blank">Καναδικής Διαστημικής Υπηρεσίας (CSA)</a>. Σχεδίασαν πείραμα για μα μελετήσουν την <a href="http://el.wikipedia.org/wiki/%CE%95%CF%80%CE%B9%CF%86%CE%B1%CE%BD%CE%B5%CE%B9%CE%B1%CE%BA%CE%AE_%CF%84%CE%AC%CF%83%CE%B7" target="_blank">επιφανειακή τάση</a> του νερού στο διάστημα.<br />
Ο αστροναύτης <a href="http://en.wikipedia.org/wiki/Chris_Hadfield" target="_blank">Κρις Χάντφιλντ</a> κλήθηκε από την Καναδική Διαστημική Υπηρεσία να πραγματοποιήσει το πείραμα - υπόθεση των δύο μαθητριών και να επιβεβαιώσει την επιστημονική τους υπόθεση.<br />
<br />
Όπως φαίνεται στο βίντεο που ακολουθεί, η υπόθεση των κοριτσιών επιβεβαιώνεται: Όσο κι αν στύβει την πετσέτα ο Χάντφιλντ, το νερό παραμένει κολλημένο
πάνω της και στα χέρια του αστρονάυτη θυμίζοντας περισσότερο ζελέ και όχι υγρό!
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<iframe allowfullscreen="" frameborder="0" height="252" src="http://www.youtube.com/embed/o8TssbmY-GM" width="448"></iframe><br />
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CSA Astronaut Chris Hadfield performed a simple science experiment designed by grade 10 Lockview High School students Kendra Lemke and Meredith Faulkner. The students from Fall River, Nova Scotia won a national science contest held by the Canadian Space Agency with their experiment on surface tension in space using a wet washcloth. Credit: Canadian Space Agency/NAS.<br />
For more info about the experiment: <a href="http://www.asc-csa.gc.ca/eng/media/news_releases/2013/0416.asp" target="_blank">http://www.asc-csa.gc.ca/eng/media/ne... </a></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-27060636267028596602012-12-11T22:49:00.002+02:002012-12-11T22:51:13.688+02:00Χαρακτηριστική καμπύλη πηγής<div dir="ltr" style="text-align: left;" trbidi="on">
Στο πλαίσιο σεμιναρίου στη χρήση συστημάτων συγχρονικής λήψης και απεικόνησης (db_Lab) μελετήσαμε τη χαρακτηριστική καμπύλη πηγής. Για ...<a href="http://vaskouvat.blogspot.gr/p/blog-page_11.html" target="_blank">συνέχεια εδώ</a><br />
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<a href="http://vaskouvat.blogspot.gr/p/blog-page_11.html" target="_blank"><img border="0" height="237" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiBBVRXQORPwkjts8KwT5f3akUrc16eqDG6G6UTuBEwuDWLf3q-NZnf4-Vnr0y2w67QSBaY7uaD7zeBnvA6QGUVbWlcQs7xTeH8GMQ8QbtxuEBPaVzRIcPYmDQ4TeU5BqkkiTlzpBxfwxg/s320/%CE%A7%CF%89%CF%81%CE%AF%CF%82+%CF%84%CE%AF%CF%84%CE%BB%CE%BF.jpg" width="320" /></a></div>
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Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-74702604414360399432012-12-05T13:00:00.000+02:002012-12-05T13:00:38.674+02:00Χαρακτηριστική καμπύλη πηγής<div dir="ltr" style="text-align: left;" trbidi="on">
Σε σεμινάριο για τη χρήση των συστημάτων συγχρονικής λήψης και απεικόνισης με τη χρήση του db-Lab σχηματίσαμε τη χαρακτηριστική καμπύλη πηγής. Πριν την πραγματοποίηση του εργαστηρίου προβλήθηκε το ακόλουθο εκπαιδευτικό video ως μέρος παρουσίασης (powerpoint).<br />
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<object width="320" height="266" class="BLOGGER-youtube-video" classid="clsid:D27CDB6E-AE6D-11cf-96B8-444553540000" codebase="http://download.macromedia.com/pub/shockwave/cabs/flash/swflash.cab#version=6,0,40,0" data-thumbnail-src="http://i.ytimg.com/vi/4fgn6LrLj_0/0.jpg"><param name="movie" value="http://www.youtube.com/v/4fgn6LrLj_0?version=3&f=user_uploads&c=google-webdrive-0&app=youtube_gdata" /><param name="bgcolor" value="#FFFFFF" /><param name="allowFullScreen" value="true" /><embed width="320" height="266" src="http://www.youtube.com/v/4fgn6LrLj_0?version=3&f=user_uploads&c=google-webdrive-0&app=youtube_gdata" type="application/x-shockwave-flash" allowfullscreen="true"></embed></object></div>
Στη σελίδα του <a href="http://ekfeioa.mixxt.org/" target="_blank">ΕΚΦΕ Ιωαννίνων</a> υπάρχουν <a href="http://ekfeioa.mixxt.org/networks/blog/post.stergios.nastopoulos:72" target="_blank">φωτογραφίες</a> και λοιπό υλικό από το σεμινάριο. Δείτε τις φωτογραφίες <a href="http://ekfeioa.mixxt.org/networks/blog/post.stergios.nastopoulos:72" target="_blank">εδώ</a>.</div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-41781402514924635602012-11-14T00:35:00.000+02:002012-11-14T00:35:27.952+02:00Ολική έκλειψη Ηλίου, 13/11, Αυστραλία<div dir="ltr" style="text-align: left;" trbidi="on">
<div style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="color: blue; font-size: small;"><b>Τρίτη, 13 Νοεμβρίου</b></span></span></div>
<ul style="text-align: left;"><span style="clear: right; float: right; font-size: small; margin-bottom: 1em; margin-left: 1em;"></span>
<li><span style="font-family: arial; font-size: small;"><span style="font-size: small;">Οι παρατηρητές στη βόρεια Αυστραλία θα δουν τη Σελήνη
να καλύπτει πλήρως τον Ήλιο, παράγοντας μια <span style="color: blue;"><b>ολική
έκλειψη</b></span>. Η σκιά της Σελήνης θα πέσει κατά μήκος μιας διαδρομής
στο Νότιο Ειρηνικό Ωκεανό, αλλά πουθενά αλλού δεν θα αγγίξει τη γη.</span><img height="217" src="http://www.ofa.gr/news/TSE2012.jpg" width="320" /></span></li>
</ul>
<span style="font-size: small;"><span style="font-family: Arial,Helvetica,sans-serif;">Συνέχεια <a href="http://vaskouvat.blogspot.gr/p/13.html" target="_blank">εδώ</a><span style="font-size: small;">.</span></span></span></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-11059135451039969582012-10-24T23:36:00.000+03:002012-10-24T23:36:22.095+03:00Σενάριο στο νόμο Coulomb<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="background-color: white; font-family: Arial; font-size: 10pt;"><a href="https://docs.google.com/open?id=0B2m1z6AhBDTAQnNIMGV2NnJDc0k" target="_blank">Σενάριο</a> στο νόμο Coulomb για τη <a href="http://digitalschool.minedu.gov.gr/courses/DSGYM-C201/" target="_blank">Φυσική</a> της τρίτης γυμνασίου με βάση το
<a href="http://digitalschool.minedu.gov.gr/modules/ebook/show.php/DSGYM-C201/531/3516,14424/" target="_blank">εμπλουτισμένο ηλεκτρονικό βιβλίο</a> του <a href="http://digitalschool.minedu.gov.gr/" target="_blank">ψηφιακού σχολείου</a></span><br />
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<b><span style="font-family: Verdana; font-size: 10.0pt;">1. Τίτλος<o:p></o:p></span></b></div>
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<span style="font-family: Verdana;"><b><u><a href="https://docs.google.com/open?id=0B2m1z6AhBDTAQnNIMGV2NnJDc0k" target="_blank">Ηλεκτρικό φορτίο και δύναμη</a></u></b> (Νόμος </span><span lang="EN-US" style="font-family: Verdana; mso-ansi-language: EN-US;">Coulomb</span><span style="font-family: Verdana;">).</span><span style="font-family: Verdana; font-size: 10.0pt;"><o:p></o:p></span></div>
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<a href="http://digitalschool.minedu.gov.gr/modules/ebook/show.php/DSGYM-C201/531/3516,14425/extras/Experiments-Simulations/kef1.5_Coulomb2.swf" target="_blank"><img border="0" height="244" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjmju8bxchqkz93SshtQf0vwxuvrIWnrBNAIRu3yJdhcvNhE2vFwMP12GWF68_XUjn8_7-sWkJLa3UTswuBD7yWmstbStgzmetCxARhk4X24pfaF8_hpe6ahnnj7gpsCVNA3HokHTnaiHI/s320/%CE%A7%CF%89%CF%81%CE%AF%CF%82+%CF%84%CE%AF%CF%84%CE%BB%CE%BF.jpg" width="320" /></a></div>
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<b><span style="font-family: Verdana; font-size: 10.0pt;">2. Εμπλεκόμενες γνωστικές
περιοχές<o:p></o:p></span></b></div>
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<span style="font-family: Verdana; font-size: 10.0pt;">Φυσική Γ΄ γυμνασίου, ακίνητα
ηλεκτρικά φορτία και αλληλεπιδράσεις.<o:p></o:p></span></div>
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<b><span style="font-family: Verdana; font-size: 10.0pt;">3. Γνώσεις και αντιλήψεις των
μαθητών<o:p></o:p></span></b></div>
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<span style="font-family: Verdana; font-size: 10.0pt;">Οι μαθητές πρέπει να κατέχουν τις
έννοιες: του ηλεκτρικού φορτίου και της δύναμης.<o:p></o:p></span></div>
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Εναλλακτικές ιδέες των μαθητών: Ξεκινώντας οι
μαθητές το μάθημα «Νόμος <span lang="EN-US">Coulomb</span>
–Ηλεκτροστατικές αλληλεπιδράσεις»:<br />
έχουν πρόβλημα να κατανοήσουν την εφαρμογή του 3ου νόμου του Νεύτωνα στις
ηλεκτροστατικές αλληλεπιδράσεις (πιστεύουν, ακόμη, ότι το μεγαλύτερο φορτίο θα
ασκεί μεγαλύτερη δύναμη στο μικρότερο φορτίο και αντίστροφα).</div>
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Πιστεύουν σε σχέσεις αναλογίας (αντίστροφα ανάλογων
ποσών) και όχι σε αναλογία αντιστρόφου τετραγώνου.<br />
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<b><span style="font-family: Verdana; font-size: 10.0pt;">4. Στόχοι<o:p></o:p></span></b></div>
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<span style="font-family: Verdana; font-size: 10.0pt;">Οι στόχοι που θα πρέπει να
κατακτήσουν οι μαθητές μετά από αυτή τη δραστηριότητα είναι οι:<o:p></o:p></span></div>
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<li><span style="font-family: Wingdings; font-size: 10pt; text-indent: -18pt;"><span style="font-family: 'Times New Roman'; font-size: 7pt;"> </span></span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Να κατανοήσουν ποια είναι η σχέση
δύναμης – ηλεκτρικών φορτίων.</span></li>
<li><span style="font-family: Wingdings; font-size: 10pt; text-indent: -18pt;"><span style="font-family: 'Times New Roman'; font-size: 7pt;"> </span></span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Να κατανοήσουν την ποσότητα
φορτίου ενός </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Coulomb</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;"> και την ανάγκη χρήσης των υποπολλαπλάσιων μονάδων
μέτρησης (μ</span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">C</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">, </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">nC</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">, </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">pC</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">).</span></li>
<li><span style="font-family: Wingdings; font-size: 10pt; text-indent: -18pt;"><span style="font-family: 'Times New Roman'; font-size: 7pt;"> </span></span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Να κατανοήσουν το νόμο του </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Coulomb</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">, όπως αυτός αναφέρεται στο
σχολικό βιβλίο.</span></li>
<li><span style="font-family: Wingdings; font-size: 10pt; text-indent: -18pt;"><span style="font-family: 'Times New Roman'; font-size: 7pt;"> </span></span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Να διατυπώνει και να εφαρμόζει σε
απλά προβλήματα το νόμο </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">Coulomb</span><span style="font-family: Verdana; font-size: 10pt; text-indent: -18pt;">.</span></li>
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<b><u><span style="font-family: Verdana; font-size: 10.0pt;">Παρατήρηση: </span></u></b><span style="font-family: Verdana; font-size: 10.0pt;"> Σε πρόβλεψη για επέκταση του σεναρίου σε
μεγαλύτερες τάξεις:<o:p></o:p></span></div>
<span style="font-family: Verdana; font-size: 10pt;">Να μπορεί να υπολογίζει την σταθερά του νόμου </span><span lang="EN-US" style="font-family: Verdana; font-size: 10pt;">Coulomb</span><span style="font-family: Verdana; font-size: 10pt;">.</span><br />
<span style="font-size: 10pt;"><span style="font-family: Arial;">Συνέχεια <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAQnNIMGV2NnJDc0k" target="_blank">εδώ</a></span></span></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-28781358468561409822012-06-08T01:37:00.001+03:002012-06-08T01:37:35.926+03:00ΑΝΑΚΛΑΣΗ - ΔΙΑΘΛΑΣΗ ΣΕ ΥΠΟΛΟΓΙΣΤΙΚΟ ΦΥΛΛΟ<div dir="ltr" style="text-align: left;" trbidi="on">
Με αφορμή το Β1 θέμα των Πανελληνίων παρουσιάζονται: η ανάκλαση, η διάθλαση, ολική ανάκλαση σε προσομοίωση μέσα από υπολογιστικό φύλλο ...(<a href="http://vaskouvat.blogspot.com/p/blog-page_08.html" target="_blank">συνέχεια εδώ</a>)</div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-37491306872579150572012-06-06T01:47:00.000+03:002012-06-06T01:47:33.195+03:00Η διάβαση της Αφροδίτης 2012<div dir="ltr" style="text-align: left;" trbidi="on">
<div style="text-align: center;">
</div>
Για δεύτερη και τελευταία φορά αυτόν τον αιώνα, η Αφροδίτη περνάει μπροστά από
τον Ήλιο, όπως φαίνεται από τη Γη. Στο ανατολικό ημισφαίριο στο ημερολόγιο η
διάβαση είναι σήμερα στις 6 Ιουνίου ενώ στο δυτικό ημισφαίριο το ημερολόγιο
γράφει 5 Ιουνίου. Η Αφροδίτη είναι μόλις το 3% του ήλιου σε φαινόμενο μέγεθος
και θα μοιάζει με μια μαύρη κουκκίδα που θα διαπερνά το δίσκο του Ήλιου.
Βεβαιωθείτε ότι παρατηρείτε μέσα<a href="http://vaskouvat.blogspot.com/p/2012_06.html" target="_blank">...</a> (<a href="http://vaskouvat.blogspot.com/p/2012_06.html" target="_blank">διαβάστε τη συνέχεια εδώ</a>)<br />
<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody>
<tr><td style="text-align: center;"><a href="http://www.nasa.gov/images/content/652635main_ToV2012_full.jpg" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="240" src="http://www.nasa.gov/images/content/652635main_ToV2012_full.jpg" width="320" /></a></td></tr>
<tr><td class="tr-caption" style="text-align: center;">Η παρατήρηση της διάβασης στον παγκόσμιο χάρτη από τη NASA</td></tr>
</tbody></table>
<br /></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-68216776831561140702012-05-26T01:45:00.001+03:002012-05-28T01:17:05.045+03:00Το 3ο θέμα στη Φυσική κατεύθυνσης<div dir="ltr" style="text-align: left;" trbidi="on">
Μια προσομοίωση με το Interactive Physics του 3ου θέματος της φυσικής κατεύθυνσης που δημιούργησε το πρόβλημα στις φετινές πανελλήνιες εξετάσεις φέτος.<br />
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<br /><iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.blogger.com/video.g?token=AD6v5dwTYtCCK4WLectWlyWcF9YmRoLBfEXq6wG-r7FuOJ0egHIbY5yWD_ma6hOPDKiNo82caVMetFqk9JvWUTNh' class='b-hbp-video b-uploaded' frameborder='0'></iframe></div>
Το αρχείο του IP μπορείτε να το βρείτε <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAajlPSU4zQl95TjQ" target="_blank">εδώ<span id="goog_434015995"></span><span id="goog_434015996"></span></a>: <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAajlPSU4zQl95TjQ" target="_blank">Αρχείο IP</a></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-25925396220892805362012-05-25T23:45:00.001+03:002012-05-25T23:50:46.023+03:00Φυσική κατεύθυνσης: Θέματα πανελληνίων<div dir="ltr" style="text-align: left;" trbidi="on">
Συνεχίστηκαν και σήμερα οι Πανελλήνιες εξετάσεις με το μάθημα της Φυσικής θετικής και τεχνολογικής κατεύθυνσης. Οι φυσικοί καταφέραμε, πάλι σήμερα, να στρέψουμε τα μάτια όλων πάνω μας. Σίγουρα δεν απογοητεύσαμε τους μαθητές μας με τα θέματα στα οποία τους βάλαμε να διαγωνισθούν. Αρκεί άραγε ένα <u><b>ακόμη</b></u> συγγνώμη από την <a href="http://www.eef.gr/" target="_blank">Ένωση Ελλήνων Φυσικών</a> προς τους μαθητές μας; Τελικά<b> "Ακυρώθηκε, με απόφαση της Επιτροπής των Πανελλαδικών Εξετάσεων, το Γ4
ερώτημα της Φυσικής στην οποία διαγωνίστηκαν σήμερα οι υποψήφιοι στις
Πανελλαδικές και είχε προβλήματα στην διατύπωσή του" </b>Τα <a href="http://vaskouvat.blogspot.com/p/blog-page.html" target="_blank">θέματα</a> και τις <a href="http://vaskouvat.blogspot.com/p/blog-page.html" target="_blank">απαντήσεις</a> τους θα τις βρείτε <a href="http://vaskouvat.blogspot.com/p/blog-page.html" target="_blank">εδώ</a>. <br />
<br /></div>
Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-4890963385760571462012-05-25T01:05:00.003+03:002012-05-25T01:05:29.729+03:00ΘΕΜΑΤΑ ΦΥΣΙΚΗΣ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ<div dir="ltr" style="text-align: left;" trbidi="on">
Πέρασε και η δεύτερη μέρα των πανελληνίων εξετάσεων με τα μαθήματα γενικής παιδείας: Μαθηματικά και στοιχεία στατιστικής, Βιολογία, Ιστορία και Φυσική. Αν και λίγοι μαθητές εξετάζονται πανελλήνια το μάθημα της φυσικής (γεγονός που μας στεναχωρεί, το ποιος φταίει γι' αυτό είναι ένα θέμα που έχει αναπτυχθεί σε πολλά blogs), <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAdHRyVzZDdUNjXzQ" target="_blank">εδώ</a> μπορείτε να βρείτε τα <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAdHRyVzZDdUNjXzQ" target="_blank">θέματα</a> των εξετάσεων και τις <a href="https://docs.google.com/open?id=0B2m1z6AhBDTAVnZodHFPVVJCVVk" target="_blank">απαντήσεις </a>τους.</div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-16237318745296756152012-05-21T23:43:00.001+03:002012-05-22T00:16:57.026+03:00Πανελλήνιες Εξετάσεις 2012<div dir="ltr" style="text-align: left;" trbidi="on">
Ξεκίνησαν σήμερα 21 Μαΐου 2012 οι πανελλήνιες εξετάσεις με το μάθημα της "Νεοελληνικής Γλώσσας" γενικής παιδείας. Πρόκειται για κείμενο της Ελένης Γλυκατζή - Αρβελέρ. Το κείμενο χαρακτηρίστηκε δύσκολο, με ακόμη πιο δύσκολη τη μετάφραση.<br />
Για τα θέματα διαβάστε περισσότερα <a href="http://vaskouvat.blogspot.com/p/2012_21.html" target="_blank">εδώ</a></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-83230152682592681562012-01-29T22:57:00.002+02:002012-01-29T22:57:41.948+02:00ΠΡΟΓΡΑΜΜΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ 2012<div dir="ltr" style="text-align: left;" trbidi="on">
<b>ΠΡΟΓΡΑΜΜΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ 2012 ΗΜΕΡΗΣΙΩΝ ΚΑΙ ΕΣΠΕΡΙΝΩΝ ΓΕΝΙΚΩΝ ΛΥΚΕΙΩΝ</b><br />
<br />
<b>ΔΕΥΤΕΡΑ 21 - 5 - 2012</b><br />
<br />
-ΝΕΟΕΛΛΗΝΙΚΗ ΓΛΩΣΣΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ<br />
<b><br />
ΤΕΤΑΡΤΗ 23 - 5 - 2012</b><br />
<br />
-<a href="http://vaskouvat.blogspot.com/p/2012.html" target="_blank">...(κλικ εδώ για το ολόκληρο το πρόγραμμα)</a></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-25011912222966905652012-01-04T23:36:00.001+02:002012-01-04T23:55:50.153+02:00Πανελλαδικές εξετάσεις 2012<div dir="ltr" style="text-align: left;" trbidi="on">
Σύμφωνα με δημοσιογραφικές πληροφορίες:<br />"Στις 21 Μαΐου θα καθίσουν στα θρανία οι 120.000 υποψήφιοι απόφοιτοι
Γενικών και Επαγγελματικών Λυκείων να διεκδικούν φέτος μια θέση στα
ανώτατα εκπαιδευτικά ιδρύματα, μέσων των πανελλαδικών εξετάσεων.<br />
Βάσει των όσων<a href="http://www.iefimerida.gr/news/31185/%CF%80%CF%81%CE%B5%CE%BC%CE%B9%CE%AD%CF%81%CE%B1-%CE%B3%CE%B9%CE%B1-%CF%84%CE%B9%CF%82-%CF%80%CE%B1%CE%BD%CE%B5%CE%BB%CE%BB%CE%B1%CE%B4%CE%B9%CE%BA%CE%AD%CF%82-%CE%B5%CE%BE%CE%B5%CF%84%CE%AC%CF%83%CE%B5%CE%B9%CF%82-%CF%83%CF%84%CE%B9%CF%82-21-%CE%BC%CE%B1%CE%90%CE%BF%CF%85" target="_blank">...(συνέχεια εδώ)"</a><br />
Πηγή: "www.iefimerida.gr"<br />
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<a href="http://www.iefimerida.gr/sites/default/files/imagecache/node_image660/panelladikes-eksetaseis.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="145" src="http://www.iefimerida.gr/sites/default/files/imagecache/node_image660/panelladikes-eksetaseis.jpg" width="320" /></a></div>
</div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-47010309921662108292011-08-29T00:32:00.000+03:002011-08-29T00:32:39.969+03:00Οι βάσεις εισαγωγής στα πανεπιστήμια και ΤΕΙ<div dir="ltr" style="text-align: left;" trbidi="on">Στη δημοσιότητα δίνει το <a href="http://www.minedu.gov.gr/">υπουργείο Παιδείας</a> τα αποτελέσματα εισαγωγής στην Τριτοβάθμια Εκπαίδευση. <br />
<br />
Οι ενδιαφερόμενοι θα μπορούν από τις 8 το πρωί της Δευτέρας να πληροφορούνται τα αποτελέσματα μέσω της <a href="http://www.minedu.gov.gr/">ιστοσελίδας του υπουργείου Παιδείας</a>...Για περισσότερα, κλικ <a href="http://www.protothema.gr/greece/article/?aid=142080">εδώ</a><br />
Πηγή: "<a href="http://www.protothema.gr/greece/article/?aid=142080">ΠΡΩΤΟ ΘΕΜΑ</a>"</div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-41602374281454717412011-06-21T00:36:00.000+03:002011-06-21T00:36:50.021+03:00Αποτελέσματα Πανελλαδικών εξετάσεων<div dir="ltr" style="text-align: left;" trbidi="on"><h2>Βουτιά στις φετινές βάσεις - Ποιες σχολές πέφτουν πολύ</h2><h2>Πτώση από 300 ως 1500 μόρια θα σημειωθεί φέτος στις βάσεις εισαγωγής σε ΑΕΙ και ΤΕΙ. </h2>Σύμφωνα με το Έθνος της Κυριακής, οι περιζήτητες σχολές όπως η Νομική Αθηνών αναμένεται να πέσει 300 μόρια, η βάση εισαγωγής στην Ιατρική θα διαμορφωθεί στα 19.100 μόρια και οι καθηγητικές σχολές θα έχουν απώλειες 700 μορίων. <br />
Παράλληλα, οι περιζήτητες σχολές του Πολυτεχνείου σε Αθήνα και Θεσσαλονίκη, θα πέσουν μέχρι και 400 μονάδες. <br />
<br />
Αναλυτικά: <a href="http://www.newsit.gr/default.php?pname=Article&art_id=83333&catid=3">Διαβάστε τη συνέχεια εδώ</a><br />
Πηγή: <a href="http://www.newsit.gr/default.php?pname=Article&art_id=83333&catid=3">newsit</a><br />
<h2> </h2></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-41056312603137699832011-06-18T02:08:00.002+03:002011-06-18T02:13:45.193+03:00Να γίνω φίλος σου; - Can I be your friend?<div dir="ltr" style="text-align: left;" trbidi="on">Για να δούμε πως θα ήταν η πραγματική ζωή μας αν ακολουθούσαμε τα πρότυπα των κοινωνικών δικτύων του internet: facebook, twitter, κ.α.<br />
<div dir="ltr" style="text-align: left;" trbidi="on"><iframe allowfullscreen="" frameborder="0" height="295" src="http://www.youtube.com/embed/aDycZH0CA4I?fs=1" width="450"></iframe>javascript:void(0)</div></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-42053485408617303612011-06-01T00:22:00.001+03:002011-06-01T00:25:21.468+03:00Ακτινοβολία κινητών τηλεφώνων<div dir="ltr" style="text-align: left;" trbidi="on">Ένα video από το youtube που αφορά την ηλεκτρομαγνητική ακτινοβολία των κινητών τηλεφώνων. Θα μπορούσε να προβάλλεται στους μαθητές μας, όχι μόνο της Γ΄Λυκείου αλλά όλων των τάξεων.</div><object width="320" height="195"><param name="movie" value="http://www.youtube.com/v/AaV5___DBcs&hl=en_US&feature=player_embedded&version=3"></param><param name="allowFullScreen" value="true"></param><param name="allowScriptAccess" value="always"></param><embed src="http://www.youtube.com/v/AaV5___DBcs&hl=en_US&feature=player_embedded&version=3" type="application/x-shockwave-flash" allowfullscreen="true" allowScriptAccess="always" width="320" height="195"></embed></object>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-65443335786001266922011-05-21T01:29:00.001+03:002011-05-21T01:31:32.966+03:00Πανελλαδικές εξετάσεις Μαϊου 2011 - Φυσική Κατεύθυνσης<div dir="ltr" style="text-align: left;" trbidi="on">Τα θέματα της φυσικής θετικής και τεχνολογικής κατεύθυνσης των ημερήσιων γενικών λυκείων μπορείτε να τα διαβάσετε <a href="http://www.blogger.com/goog_2066701925">εδώ:</a><a href="http://www.minedu.gov.gr/publications/docs2011/them_fis_kat_c_hmer_no_1106.pdf"> "ΠΑΝΕΛΛΗΝΙΕΣ ΕΞΕΤΑΣΕΙΣ Γ ́ ΤΑΞΗΣ ΗΜΕΡΗΣΙΟΥ ΓΕΝΙΚΟΥ ΛΥΚΕΙΟΥ ΣΑΒΒΑΤΟ 14 ΜΑΪΟΥ 2011 ΕΞΕΤΑΖΟΜΕΝΟ ΜΑΘΗΜΑ: ΦΥΣΙΚΗ ΘΕΤΙΚΗΣ ΚΑΙ ΤΕΧΝΟΛΟΓΙΚΗΣ ΚΑΤΕΥΘΥΝΣΗΣ" (από τις ιστοσελίδες του υπουργείου)</a><br />
<div class="separator" style="clear: both; text-align: center;"><span style="font-size: x-small; margin-left: 1em; margin-right: 1em;"><a href="http://www.minedu.gov.gr/publications/docs2011/them_fis_kat_c_hmer_no_1106.pdf"><img height="640" src="http://www.alfavita.gr/2052011bbb1.jpg" width="418" /> Θέματα Φυσικής Θετικής - Τεχνολογικής Κατεύθυνσης</a></span></div></div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0tag:blogger.com,1999:blog-3874127714502667001.post-48134097239834027832011-05-17T00:21:00.000+03:002011-05-17T00:21:44.104+03:00Πανελλαδικές εξετάσεις Μαϊου 2011<div dir="ltr" style="text-align: left;" trbidi="on">Τα θέματα της φυσικής γενικής παιδείας των ημερήσιων γενικών λυκείων μπορείτε να τα διαβάσετε εδώ:<a href="http://ypepth.opengov.gr/panaretos/wp-content/uploads/2011/05/fisiki-geniko-epal-omada-vita_14ma11.pdf"> "ΠΑΝΕΛΛΗΝΙΕΣ ΕΞΕΤΑΣΕΙΣ Γ ́ ΤΑΞΗΣ ΗΜΕΡΗΣΙΟΥ ΓΕΝΙΚΟΥ ΛΥΚΕΙΟΥ ΣΑΒΒΑΤΟ 14 ΜΑΪΟΥ 2011 ΕΞΕΤΑΖΟΜΕΝΟ ΜΑΘΗΜΑ ΓΕΝΙΚΗΣ ΠΑΙ∆ΕΙΑΣ: ΦΥΣΙΚΗ"</a><br />
<a href="http://ypepth.opengov.gr/panaretos/wp-content/uploads/2011/05/fisiki-geniko-epal-omada-vita_14ma11.pdf"><img alt="" height="253" src="data:image/png;base64,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" width="400" /> Δείτε τα θέματα της Φυσικής γενικής παιδείας</a> </div>Anonymoushttp://www.blogger.com/profile/15003120506520726736noreply@blogger.com0