tag:blogger.com,1999:blog-12972248201328807202024-02-18T20:35:20.232-08:00Το 5ο Θέμα της ΧημείαςΧρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.comBlogger54125tag:blogger.com,1999:blog-1297224820132880720.post-80799155289786877592017-11-14T03:17:00.001-08:002017-11-14T03:17:17.792-08:00Ολες οι ασκήσεις Χημείας του 5ου Θέματος...<div dir="ltr" style="text-align: left;" trbidi="on">
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Νέα έκδοση του 5ου Θέματος Χημείας με την βοήθεια του Βάιου Βαιτσόπουλου που κάνει την πρακτική του άσκηση στο φροντιστήριο Σύγχρονο.<br />
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<a href="http://sygxrono.com/cloud/index.php/s/WKNUINCGRcAzAa6">Η ΝΕΑ ΕΚΔΟΣΗ</a></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-41599080581268694152017-11-02T06:00:00.001-07:002017-11-02T06:00:25.083-07:00Φτιάξε μου έναν καφέ και μη βάλεις ζάχαρη...<div dir="ltr" style="text-align: left;" trbidi="on">
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-71355651039059536292017-10-24T02:02:00.002-07:002017-10-24T02:05:06.862-07:00Γρίφος με PH...<div dir="ltr" style="text-align: left;" trbidi="on">
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Πριν ανοίξει η βρύση του παραπάνω σχήματος έχουμε διαλύματα στα δοχεία 2,3,4,5,6 και 7.Ολα τα διαλύματα είναι στους 25 C και το νερό της βρύσης είναι απεσταγμένο και σταθερής θερμοκρασίας 25 C.Στα δοχεία υπάρχουν τα εξής διαλύματα ΗCl 1M, CH3COOH 1M, NaOH 1M, NaCl 1M, CH3COONH4 1M και ΝαClO4 1M.Την χρονική στιγμή t=0 ανοίγουμε την βρύση και παρατηρούμε:<br />
a)Tα PH όλων των διαλυμάτων σε όλα τα δοχεία από το 1 έως και το 7 δοχείο παραμένουν σταθερά όση ώρα και αν αφήσουμε την βρύση ανοιχτή χωρίς φυσικά να πέφτει νερό έξω από τα δοχεία και να μπαίνει σε άλλα δοχεία.<br />
β)Ισχύει η σχέση PH4<PH5<PH6.<br />
γ)Με την πάροδο του χρόνου αυξάνονται ο αριθμός των ιόντων Να^+ αλλά και ClO4^- στο δοχείο 7.<br />
α)Τι είδος διαλύματος περιέχει το κάθε δοχείο.<br />
β)Να γίνουν τα διαγράμματα του PH-t για κάθε δοχείο από το 1-7.<br />
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Δίνονται Κα=Κβ=10^-5 για το οξικό οξύ και την αμμωνία αντίστοιχα. <br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-60697947340552714802017-10-02T05:41:00.002-07:002017-10-02T05:44:26.556-07:00Φτου φτου σκόρδο...<div dir="ltr" style="text-align: left;" trbidi="on">
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" /><br />
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";"><div class="MsoNormal">
<span style="font-family: "tahoma" , "sans-serif"; font-size: 10.0pt; line-height: 115%;"> <span style="mso-spacerun: yes;"></span><span style="mso-spacerun: yes;"></span></span></div>
</span></span><br /><span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";"></span></span><br />
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";">Αr As=75.</span></span><br />
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";"><br /></span></span>
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";">Ολες οι παραπάνω αντιδράσεις βρίσκονται <a href="http://195.134.76.37/chemicals/chem_aceticacid.htm">εδώ</a>.</span></span><br />
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";"></span></span><br />
<span style="font-size: x-small;"><span style="color: black; font-family: "tahoma";"><span style="color: black; text-decoration: none;"></span></span></span></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-76808301644174002712017-09-19T02:56:00.002-07:002017-09-19T03:02:04.453-07:00Με το διαβολοοξύ...<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="color: #93c47d;">ΘΕΜΑ Δ2</span>.<br />
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A)Ποσότητα 0,224 l STP διοξείδιου του θείου αντιδρά με περίσσεια χλωρίου και πραγματοποιείται η αντίδραση<br />
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Cl2+SO2--> HCl +H2SO4<br />
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i)Nα γραφεί ολοκληρωμένη η παραπάνω αντίδραση.<br />
ii)Nα βρεθεί το στοχείο που οξειδώνεται και το στοιχείο το οποίο ανάγεται.<br />
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Β)Οι συνολικές ποσότητες των παραπάνω οξέων διαβιβάζονται σε νερό και δημιουργείται διάλυμα Δ1.<br />
i)Ποιος ο όγκος του διαλύματος Δ1 αν το PH του διαλύματος Δ1 είναι 0.Δίνεται το Κ2=10^-2<br />
ii)Ποιος ο αριθμός των ιόντων οξωνίων που προέρχεται από τον αυτοιοντισμό του νερού.Κw=10^-14 και ΝA=6.10^23μόρια/mol<br />
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Γ)Αν όλη η ποσότητα του άεριου HCl διαβιβασθεί σε δοχείο όγκου 2l πραγματοποιείται η αντίδραση σε ορισμένη θερμοκρασία 2ΗCl<-->H2+Cl2.Aν η χημική ισορροπία επέλθει μετά από 10min και η Κc=1/4 για την συγκεκριμένη θερμοκρασία να βρεθούν<br />
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i)H απόδοση της αντίδρασης<br />
ii)H μέση ταχύτητα της αντίδρασης<br />
iii)Οι γραφικές παραστάσεις των συγκεντρώσεων όλων των σωμάτων που μετέχουν στην αντίδραση σαν συνάρτηση με το χρόνο.<br />
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Δ)Στο διάλυμα Δ1 προσθέτουμε σταδιακά διάλυμα ΚΟΗ 1Μ.<br />
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i)Nα γίνει το ποιοτικό διάγραμμα του PH του διαλύματος που προκύπτει σε συνάρτηση του όγκου του διαλύματος ΚΟΗ που ρίχνουμε.<br />
ii)Nα βρεθεί η συγκέντρωση όλων των ιόντων την στιγμή που έχει συμβεί η πλήρης εξουδετέρωση του Δ1.<br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-64535465980575060982017-08-31T00:51:00.001-07:002017-08-31T00:51:56.649-07:00ΘΕΜΑ Δ (1)<div dir="ltr" style="text-align: left;" trbidi="on">
Φέτος θα προσπαθήσω να γράψω θέματα συμβατά(αλλά πολύ πιο δύσκολα) με τα θέματα των φετινών πανελλαδικών εξετάσεων της Γ Λυκείου.Δηλαδή το θέμα Δ θα έχει τέσσερις ανεξάρτητες ασκήσεις το θέμα Γ να έχει το κλασσικό δεντράκι μαζί τις διερευνήσεις το θέμα Β θα έχει γραφικές παραστάσεις και φυσικά το θέμα Α θα έχει τα κλασσικά πολλαπλής επιλογής...<br />
<br />
Καλή χρονιά να έχουμε και ας ελπίσουμε ότι η δουλειά μας θα μείνει και για το νέο σύστημα...<br />
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<span style="background-color: red;"><span style="color: #ffd966;">Θέμα Δ1.</span></span><br />
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α)Διάλυμα 100ml FeCl2 0,1M αναμιγνύεται με διάλυμα 50ml SnCl4 0,1M oπότε πραγματοποιείεται η αντίδραση FeCl2+SnCl3--> FeCl3 +SnCl4.<br />
Nα γραφεί η αντίδραση με τους συντελεστές και να βρεθεί το οξειδωτικό και αναγωγικό σώμα της αντίδρασης.<br />
Ποιες οι συγκεντρώσεις όλων των διαλυμένων ουσιών στο τελικό διάλυμα;<br />
<br />
β)Βαρέλι όγκου 1000l είναι γεμάτο με μούστο που περιέχει σάκχαρα (C6H12O6).Μετά την αλκοολική ζύμωση παίρνουμε κρασί 11%v/v.<br />
ι)Να γραφεί η αντίδραση της αλκοολικής ζύμωσης.<br />
ιι)Να βρεθεί η αρχική συγκέντρωση των σακχάρων στον μούστο.<br />
iii)Πόση μάζα έχασε το βαρέλι με το μούστο εξαιτίας της ζύμωσης;; <br />
Δίνεται η πυκνότητα της αιθανόλης ρ=0,8g/ml.<br />
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γ)Διάλυμα ΚΜnO4 όγκου 400ml και συγκέντρωσης 1Μ βρίσκεται στο κάτω μέρος της γνωστής κλεψύδρας.Στο πάνω μέρος της κλεψύδρας υπάρχει διάλυμα οξαλικού οξέος με συγκέντρωση 1Μ. Την χρονική στιγμή t=0 ανοίγουμε την κάνουλα που έχει σταθερή παροχή 5ml/s.<br />
Την στιγμή που αποχρωματίζεται πλήρως το κάτω διάλυμα κλείνουμε την κάνουλα.<br />
i)Να γραφεί η αντίδραση που πραγματοποιείται κατά την ανάμιξη των δύο διαλυμάτων.<br />
ii)Να γίνει η γραφική παράσταση της συγκέντρωσης του KMnO4 σε συνάρτηση με το χρόνο και να εξηγηθεί η μορφή της γραφικής παράστασης.<br />
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δ)Ποσότητα αιθυλένιου πολυμερίζεται πλήρως και παράγεται πολυμερές με μοριακή μάζα 28.000 και μάζας 2,8kg.<br />
i)Nα γραφεί η αντίδραση πολυμερισμού του αιθυλένιου και να βρεθεί η ποσότητα (mol) του αιθένιου που πολυμερίστηκε.<br />
ii)Ποιοι καταλύτες απαιτούνται αν θέλουμε να γίνει γρήγορα η αντίδραση;<br />
iii)Ποια τα στάδια του πολυμερισμού του αιθυλένιου.<br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-11583285536023053322017-05-18T05:54:00.003-07:002017-06-11T03:21:06.043-07:00Kάθε μέρα και ένα Νέο θέμα Χημείας μέχρι την ημέρα των εξετάσεων για τις εξετάσεις....<div dir="ltr" style="text-align: left;" trbidi="on">
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<br />
<b>18-5-2017</b><br />
<br />
<b>ΘΕΜΑ 1ο</b>: <br />
<br />
<div>
Διάλυμα Δ1: ΝΗ4Cl 1,5M NH3 0,5M όγκου 1000ml</div>
<div>
<br /></div>
<div>
Διάλυμα Δ2:HCl 0,5M όγκου 1000ml</div>
<div>
<br /></div>
<div>
Διάλυμα Δ3:NaOH 0,5M όγκου 1000ml</div>
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<br /></div>
<div>
Ποιος
<span style="color: #fff2cc;"><span style="background-color: blue;"> ο μέγιστος όγκος διαλύματος</span></span> που μπορεί να προκύψει αν ανακατέψουμε δύο
από τα παραπάνω διαλύματα αν θέλουμε να προκύψει ρυθμιστικό διάλυμα με
<span style="color: red;"><b>μέγιστη ρυθμιστική ικανότητα.</b></span><br />
<br />
<span style="color: red;"><b><span style="color: black;">19-5-2107</span></b></span><br />
<br />
<span style="color: red;"><b><span style="color: black;">ΘΕΜΑ 2ο:</span></b></span><br />
<br />
<span style="color: red;"><span style="color: black;">Nα βρεθούν οι οργανικές ενώσεις του παρακάτω σχήματος αν είναι γνωστό ότι σε κάθε αντίδραση παράγεται μόνο ένα οργανικό προιόν.</span></span><br />
<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiBlGuHmnvo5misAY0zvvu0vf30EzMGme1TzdC6BX35FXorFsNtEv7udvwXphxIWtSxRtdDJCH9fT_c0U883jyammJlFKrWUO6y6oGoTMge3Bjtel-nfoBnF5RL7uSIck2c4-i61RYVgHj7/s1600/%25CE%25B4%25CE%25B5%25CE%25BD%25CF%2584%25CF%2581%25CE%25AC%25CE%25BA%25CE%25B9...png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="108" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiBlGuHmnvo5misAY0zvvu0vf30EzMGme1TzdC6BX35FXorFsNtEv7udvwXphxIWtSxRtdDJCH9fT_c0U883jyammJlFKrWUO6y6oGoTMge3Bjtel-nfoBnF5RL7uSIck2c4-i61RYVgHj7/s640/%25CE%25B4%25CE%25B5%25CE%25BD%25CF%2584%25CF%2581%25CE%25AC%25CE%25BA%25CE%25B9...png" width="640" /></a></div>
<span style="color: red;"><span style="color: black;"> </span><b><span style="color: black;"> </span></b></span><br />
<span style="color: red;"><b><span style="color: black;"> </span></b><span style="color: black;">Να βρεθούν <b>όλοι </b>οι δυνατοί τρόποι που με <b>διαδοχικές αντιδράσεις</b> να ξεκινάμε από μία οργανική ένωση του παραπάνω σχήματος και να καταλήγουμε στην τελευταία χωρίς κάθε φορά να <span style="color: red;">παραλείπουμε</span> κάποια από τις παραπάνω <span style="background-color: yellow;">οργανικές ενώσεις.</span></span></span><br />
<br />
<b><span style="color: red;"><span style="color: black;"><span style="background-color: yellow;"><span style="background-color: black;"><span style="background-color: white;">20-5-2017</span></span></span></span></span></b><br />
<br />
<span style="color: red;"><span style="color: black;"><span style="background-color: yellow;"><b><span style="background-color: black;"><span style="background-color: white;">ΘΕΜΑ 3ο </span></span></b></span></span></span><br />
<br />
<span style="color: red;"><span style="color: black;"><span style="background-color: yellow;"><span style="background-color: black;"><span style="background-color: white;"><span style="color: cyan;"><span style="color: red;">Ισομοριακό</span> </span>ομογενές </span></span><span style="background-color: black;"><span style="background-color: white;">μίγμα συνολικής μάζας 44g που αποτελείται από <span style="background-color: yellow;">φορμαλδεύδη</span> και <span style="background-color: #cc0000;">ακετόνη </span>αναμιγνύεται με 149,4g <span style="background-color: #6fa8dc;">μεθυλομαγνησιοιωδίδιου</span>.Το νέο μίγμα υδρολύεται με περίσσεια νερού οπότε το τελικό μίγμα διαβιβάζεται σε περίσσεια διαλύματος Ι2/ΝαΟΗ.Να βρεθεί η συνολική μάζα του <span style="background-color: yellow;">κίτρινου ιζήματος</span> που θα παραχθεί τελικά.</span></span></span></span></span><br />
<br />
<br />
<b>21-5-2017</b><br />
<br />
<b>Θέμα 4ο</b><br />
<b><br /></b>
1mol <span style="background-color: lime;">κορεσμένης μονοσθενής αλκοόλης</span> A που δεν μπορεί να παραχθεί με τα αντιδραστήρια Grignard οξειδώνεται με διάλυμα <span style="background-color: cyan;">Κ2C2O7 1Μ παρουσία ΗCl</span> και παράγεται μίγμα ενώσεων οργανικών ενώσεων 0,4mol B & 0,5mol Γ και 0,1mol αερίου Δ που διαχωρίζονται κατάλληλα μεταξύ τους.<br />
Ολη η ποσότητα του σώματος Β εισάγεται με ισομοριακή ποσότητα Η2 σε δοχείο Δ1 όγκου 1l και προκύπτει χημική ισορροπία σύμφωνα με την εξίσωση Β(g)+H2(g) <--> A(g) με Κc=5. Όλη η ποσότητα του Γ διαλύεται σε νερό και προκύπτει διάλυμα Δ2 όγκου 0,5l με PH=2,5 στους 25 C.<br />
Να βρεθούν:<br />
a)H συγκέντρωση του διαλύματος Κ2Cr2O7/HCl.<br />
b)Ολες οι συγκεντρώσεις των αερίων στο δοχείο Δ1.<br />
γ)Η σταθερά ιοντισμού του Γ.<br />
δ)Η <span style="background-color: magenta;">συνολική εξίσωση οξείδωσης</span> της αλκοόλης Α.<br />
<br />
<br />
<b>22-5-2017</b><br />
<br />
<b>Θέμα 5ο</b><br />
<br />
<span style="background-color: yellow;">Yδατικό διάλυμα 10^-3M ΗF όγκου 900ml έχει </span><span style="background-color: cyan;"><span style="background-color: yellow;">βαθμό ιοντισμού 0,1.Πόση ποσότητα διαλύματος ΝαF 0,01M πρέπει να προσθέσουμε στο παραπάνω διάλυμα για να μ</span></span><span style="background-color: yellow;">ην μεταβληθεί ο βαθμός ιοντισμού του ΗF;</span><br />
<span style="background-color: yellow;">Ισχύουν οι γνωστές προσεγγίσεις.</span><b> </b><br />
<br />
<span style="background-color: red;">Παραλλαγή χωρίς προσεγγίσεις</span><br />
<br />
Διάλυμα ασθενούς οξέος ΗΑ έχει συγκέντρωση C και βαθμό ιοντισμού α.Πόσα λίτρα διαλύματος ΝαΑ συγκέντρωσης C΄ πρέπει να προσθέσουμε στο παραπάνω διάλυμα για μεταβληθεί ο βαθμός ιοντισμού του οξέος ΗΑ β%.<br />
(Προσοχή δύο περιπτώσεις να αυξηθεί ή να μειωθεί ο βαθμός ιοντισμού του ΗΑ).<br />
<br />
<b>23-5-2017</b><br />
<b><br /></b>
<b>Θέμα 6ο</b><br />
<b><br /></b>
Σε ένα <span style="background-color: lime;">εργαστήριο χημείας</span> διαθέτουμε τα παρακάτω υδατικά διαλύματα:<br />
<br />
Δ1 1000ml NH3 0,5M<br />
<br />
Δ2 1000ml NH4Cl 1M<br />
<br />
Δ3 1000ml NaOH 2M<br />
<br />
Δ4 1000ml HCl 1M<br />
<br />
α)Ποιος ο <span style="background-color: magenta;">μέγιστος όγκος ρυθμιστικού διαλύματος</span> με PH=9 που θα μπορούσε να προκύψει χρησιμοποιώντας μόνο δύο από τα παραπάνω διαλύματα.<br />
β)Ποιος ο <span style="background-color: yellow;">μέγιστος όγκος ρυθμιστικού διαλύματος</span> με PH=9 που θα μπορούσε να προκύψει χρησιμοποιώντας όσα διαλύματα από τα παραπάνω χρειαζόμασταν.<br />
Για την NH3 Kb=10^-5 και Κw=10^-14.<br />
<br />
<b>24-5-2017</b><br />
<b><br /></b>
<b>Θέμα 7ο</b><br />
<br />
Σε ένα <span style="background-color: lime;">εργαστήριο Χημείας</span> διαθέτουμε τα παρακάτω υδατικά διαλύματα:<br />
<b> </b><br />
<b> </b><br />
Δ1 1000ml CM σε <span style="background-color: cyan;">CH3COONH4</span> στους 25 C <br />
<br />
Δ2 1000ml CM σε <span style="background-color: yellow;"> ΝαΙ </span> στους 40 C<br />
<br />
Δ3 1000ml CM σε <span style="background-color: #f9cb9c;">ΚClO4</span> στους 10 C<br />
<br />
Δ4 1000ml CM σε <span style="background-color: #9fc5e8;">ΝαΝΟ3</span> στους 5 C<br />
<br />
Δ5 1000ml CM σε <span style="background-color: #674ea7;">CaBr2 </span> στους 45 C<br />
<br />
Αν ΚαCH3COOH=ΚβNH3 και Kw25=10^-14 <br />
<br />
α) Να χαρακτηρισθούν τα παραπάνω διαλύματα σαν <span style="background-color: #f4cccc;">όξινα ουδέτερα ή βασικά</span> καθώς και η περιοχή του PH στην οποία ανήκουν (μεγαλύτερο μικρότερο ή ίσο με το 7)<br />
<br />
β)Ποιες πιθανές αναμίξεις των παραπάνω διαλυμάτων θα μπορούσαν να δώσουν διαλύματα με <span style="background-color: red;">PH=7</span> ποιες αναμίξεις θα μπορούσαν να δώσουν διαλύματα με <span style="background-color: red;">PH<7</span> και ποιες αναμίξεις να δώσουν διαλύματα με <span style="background-color: red;">PH>7</span><br />
<br />
Nα υποθέσουμε ότι όλα τα διαλύματα είναι αραιά με πυκνότητα ρ=1g/ml.<br />
<br />
<b>25-5-2017</b><br />
<br />
<b>Θέμα 8ο </b><br />
<br />
<b> </b>Σε ένα <span style="background-color: lime;">εργαστήριο Χημείας</span> διαθέτουμε τα παρακάτω υδατικά διαλύματα:<br />
<br />
Διάλυμα Δ1 ΗCl 0,1M<br />
<br />
Διάλυμα Δ2 ΝαΟΗ 0,1M<br />
<br />
<b> </b>Διάλυμα Δ3 ΚΜηΟ4 1Μ παρουσία ΗCl συγκέντρωσης 0,1M<br />
<br />
Διάλυμα Δ4 Κ2Cr2O7 1M παρουσία ΗCl συγκέντρωσης 0,1M<br />
<br />
και σε δοχείο Δ5 Καθαρό νερό<br />
<br />
Αν ρίξουμε σε κάθε ένα από τα παραπάνω διαλύματα και στο καθαρό νερό λίγες σταγόνες του δείκτη ΗΔ (κίτρινο χρώμα η όξινη μορφή -κόκκινο χρώμα η βασική μορφή) με Κα=10^-7 να βρεθούν:<br />
a)To χρώμα κάθε διαλύματος και το χρώμα του νερού στο Δ5.<br />
β)Ο βαθμός ιοντισμού του δείκτη σε κάθε διάλυμα καθώς και στο δοχείο με το νερό στο Δ5.<br />
<br />
Ολα τα διαλύματα και το νερό είναι στους 25 C καθώς και η Κw=10^-14. <br />
<br />
<br />
<b>26-5-2017</b><br />
<br />
<b>Θέμα 9ο </b><br />
<b></b><br />
<br />
<b> </b>Σε ένα <span style="background-color: lime;">εργαστήριο Χημείας</span> ανακαλύψαμε διάλυμα δείκτη ΗΔ (κίτρινο χρώμα η όξινη μορφή -κόκκινο χρώμα η βασική μορφή) συγκέντρωσης σε δείκτη 0,01Μ και PKaHΔ=5.Με ένα ειδικό σταγονόμετρο που ρίχνει σταγόνες όγκου 1ml αρχίζουμε να ρίχνουμε το διάλυμα δείκτη σε 99ml καθαρό νερό στους 25 C.Να βρεθούν:<br />
a)To χρώμα του διαλύματος του δείκτη.<br />
β)Το χρώμα του διαλύματος που θα προκύψει αν έχουμε προσθέσει μία σταγόνα και 101 σταγόνες του δείκτη.<br />
<br />
<b>27-5-2017</b><br />
<br />
<b>Θέμα 10ο </b><br />
<br />
Koρεσμένη μονοσθενής αλκοόλη <span style="background-color: red;">ROH</span> αντιδρά ποσοτικά με νάτριο και παράγεται οργανική ένωση Β και αέριο Γ.΄Όλη η ποσότητα του αερίου Γ αντιδρά ποσοτικά με το νιτρίλιο RCN <b> </b>και παράγεται ένωση Δ. Οι ποσότητες των Β και Γ διαλύονται σε νερό και προκύπτει διάλυμα Δ1 με <span style="background-color: cyan;">PH=13</span> όγκου 1l .Nα βρεθούν:<br />
a)Οι ποσότητες σε mol των ROH ,Β,Γ,RCN &Δ.<br />
β)Ο βαθμός ιοντισμού και η<span style="background-color: #ffd966;"> σταθερά ιοντισμού</span> της ένωσης Δ στο διάλυμα Δ1.<br />
<br />
Κw=10^-14.<br />
<br />
<br />
<b>28-5-2017</b><br />
<br />
<b>Θέμα 11ο </b><br />
<br />
Nα βρεθούν οι <span style="background-color: #ffe599;">συντακτικοί τύποι</span> των παρακάτω οργανικών ενώσεων.<b> </b><br />
<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiOS9ll07E-Z7uOWFAE661wuy-1r1u2MIdTzJYOXBlK5VSIbmrxdKHJdXqglJh8051bIRtsQ889HRlyhsJas-KmDEWzVPiqGG5IgdGuP3PiayiBXY9AxYVMWtin2FkvxUNdXyqklfisbbgB/s1600/organ.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="72" data-original-width="616" height="73" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiOS9ll07E-Z7uOWFAE661wuy-1r1u2MIdTzJYOXBlK5VSIbmrxdKHJdXqglJh8051bIRtsQ889HRlyhsJas-KmDEWzVPiqGG5IgdGuP3PiayiBXY9AxYVMWtin2FkvxUNdXyqklfisbbgB/s640/organ.png" width="640" /></a></div>
<br />
<b></b><br />
<b></b><br />
<b></b><br />
<b></b><br />
<b></b><br />
<b></b><br />
Διαλύουμε 35g της ένωσης Δ σε νερό και προκύπτει διάλυμα Δ1 όγκου 1l.Nα <span style="background-color: #b4a7d6;">βρεθεί το PH </span>του τελικού διαλύματος αν Κw=10^-14.<br />
<br />
<br />
<b>29-5-2017</b><br />
<br />
<b>Θέμα 12ο</b><br />
<br />
Iσομοριακό μίγμα δύο <span style="background-color: lime;">αλκινίων</span> Α και Β μάζας 6,6g αντιδρά με περίσσεια Να και παράγονται 0,15mol αερίου.Το μίγμα των οργανικών προίοντων που δημιουργείται αντιδρά πλήρως με 0,3mol μεθυλοχλωρίδιου <span style="background-color: #ffd966;"></span>οπότε παράγεται μία μόνο <span style="background-color: #f4cccc;">οργανική ένωση Γ</span>.Να βρεθούν οι τύποι<b> </b>Α Β και Γ.<br />
<br />
<b>30-5-2017</b><br />
<br />
<b>Θέμα 13ο</b><br />
<b><br /></b>
<span style="background-color: yellow;">ΠΕΙΡΑΜΑ 1:</span> Σε υδατικό διάλυμα οινοπνεύματος 200ml με <span style="background-color: #d9ead3;">περιεκτικότητα 4,6% w/v</span> σε οινόπνευμα προσθέτουμε 4,6g Νa οπότε προκύπτει διάλυμα Δ1 και αέριο Β.<br />
<span style="background-color: cyan;">ΠΕΙΡΑΜΑ 2</span>; Σε 23g καθαρό οινόπνευμα προσθέτουμε 11,5g καθαρό Να και προκύπτει οργανική ένωση Α και αέριο Β,<br />
Να βρεθεί ο συνολικός όγκος του αερίου Β μετρημένος σε STP που παράχθηκε συνολικά στα παραπάνω πειράματα.<br />
Αν στο διάλυμα Δ1 προσθέσουμε όλη την ουσία Α που παράχθηκε στο δεύτερο πείραμα και το τελικό διάλυμα αραιωθεί με νερό μέχρι τελικού όγκου 2l να βρεθούν το <span style="background-color: #cc0000;">PH</span> και οι συγκεντρώσεις όλων των ουσιών που θα υπάρχουν στο τελικό διάλυμα.<br />
<div>
<b><br /></b>
<b><br /></b>
<br />
<b>31-5-2017</b><br />
<br />
<b>Θέμα 14ο</b><br />
<b><br /></b></div>
Εκτός από τους συνηθισμένους <span style="background-color: yellow;">χρωματικούς δείκτες,</span> στους οποίους η αλλαγή
του pH μεταβάλλει το χρώμα, υπάρχουν και δείκτες των οποίων αλλάζει η
οσμή όταν μεταβάλλεται το pH. Τέτοιοι δείκτες είναι το κρεμμύδι ή βανίλια.Αν υποθέσουμε ότι ο δείκτης "κρεμμύδι" έχει PKa=5 με την όξινη μορφή του δείκτη να έχει οσμή έντονη <span style="background-color: #ea9999;">κρεμμυδιού </span>ενώ η βασική μορφή του δείκτη να είναι άοσμη να βρεθούν σε ποια από τα παρακάτω διαλύματα θα πέσει το μεγαλύτερο κλάμα:<br />
<br />
a)Διάλυμα ΝαΟΗ 1Μ<br />
β)Καθαρό νερό<br />
γ)Διάλυμα ΗCl 1M<br />
δ)Διάλυμα ΗF 1M<br />
ε)Διάλυμα Η2SO4 1M.<br />
<br />
<b>1-6-2017</b><br />
<br />
<b>Θέμα 15ο</b><br />
<b><br /></b>
Ογκομετρούμε 50ml διάλυμα ασθενούς οξέος ΗΑ με την βοήθεια <span style="background-color: yellow;">πρότυπου διαλύματος</span> ΝαΟΗ 1Μ. H oγκομέτρηση γίνεται με την βοήθεια δύο δεικτών των οποίων αλλάζει η οσμή τους όταν μεταβάλλεται το PH του διαλύματος.Οι δείκτες αυτοί είναι το <span style="background-color: #ea9999;">κρεμμύδι</span> και η <span style="background-color: #fff2cc;">βανίλια</span>.Αν υποθέσουμε ότι ο δείκτης "κρεμμύδι" έχει PKa=5 με την όξινη μορφή του δείκτη να έχει οσμή έντονη <span style="background-color: #ea9999;">κρεμμυδιού </span>ενώ η βασική μορφή του δείκτη να είναι άοσμη ενώ για την βανίλια αν υποθέσουμε έχει PKa=8 με άοσμη την όξινη μορφή του δείκτη και έντονη γεύση βανίλιας η βασική μορφή του δείκτη.Παρατηρήθηκε ότι το <span style="background-color: #e06666;">"κλάμα" </span>σταμάτησε μετά από την προσθήκη 25ml NaOH ενώ το άρωμα βανίλιας εμφανίστηκε μετά την προσθήκη 50ml NaOH.<br />
Nα βρεθούν:<br />
a)H συγκέντρωση του διαλύματος του ΗΑ<br />
β)Η σταθερά Κa του οξέος ΗΑ.<br />
Όλα τα διαλύματα βρίσκονται στους 25 C και Κw=10^-14.<br />
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<b>2-6-2017</b><br />
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<b>Θέμα 16ο</b><br />
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Σε 200ml <span style="background-color: yellow;">φορμόλης</span> περιεκτικότητας σε μεθανάλη 30% w/v προσθέτουμε 1000ml υδατικό διάλυμα Δ ΚΟΗ με PH=14 όποτε πραγματοποιείται η παρακάτω ποσοτική αντίδραση:<br />
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<img alt="{\displaystyle \mathrm {2HCHO+KOH{\xrightarrow {}}CH_{3}OH+HCOOK} }" aria-hidden="true" class="mwe-math-fallback-image-inline" src="https://wikimedia.org/api/rest_v1/media/math/render/svg/e8b3a1ad71a90c725567fdeb669faee305d880c0" style="border: 0px; display: inline-block; height: 3.009ex; margin: -0.431ex 0px 0px; vertical-align: -0.671ex; width: 38.587ex;" /></div>
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<span style="background-color: white;">Το τελικό διάλυμα που προκύπτει </span><span style="background-color: blue;">αραιώνεται</span><span style="background-color: white;"> στα 10l oπότε προκύπτει τελικό διάλυμα Δ2.</span><br />
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Να βρεθούν:</div>
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<span style="background-color: white;">α)Eίναι η παραπάνω αντίδραση αντίδραση </span><span style="background-color: red;">οξειδοαναγωγής</span><span style="background-color: white;">;Αν ναι ποιο το οξειδωτικό και ποιο το αναγωγικό σώμα.</span><br />
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β)Το pH του διαλύματος Δ2 αν ΚαΗCOOH=10^-4 Kw=10^-14</div>
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<span style="background-color: white;">γ)O όγκος του </span><span style="background-color: #fff2cc;">αερίου</span><span style="background-color: white;"> που μπορεί να εκλυθεί αν προσθέσουμε στο παραπάνω διάλυμα Δ2 περίσσεια διαλύματος ΚΜnO4/ΗCl.</span></div>
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<b>3-6-2017</b></div>
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<b>Θέμα 17ο</b></div>
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<span style="background-color: white;">Σε ένα </span><span style="background-color: blue;">ε</span><span style="background-color: #6fa8dc;">ργαστήριο χημείας</span><span style="background-color: white;"> διαθέτουμε:</span></div>
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<span style="background-color: white;">Διάλυμα Δ1 </span><span style="background-color: yellow;">ΗCOONH4</span><span style="background-color: white;"> CΜ </span></div>
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<span style="background-color: white;">Διάλυμα Δ2 </span><span style="background-color: #e06666;">RCOONH3R</span><span style="background-color: white;"> CM</span></div>
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Να χαρακτηριστούν τα παρακάτω διαλύματα σαν όξινα βασικα ή ουδέτερα:</div>
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α)Το Δ1</div>
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β)Το Δ2</div>
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<span style="background-color: white;">γ)Διάλυμα Δ3 που θα προκύψει από την ανάμιξη </span><span style="background-color: lime;">ίσων όγκων</span><span style="background-color: white;"> των διαλυμάτων Δ1 και Δ2.</span></div>
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Για τα οξέα και βάσεις δίνονται οι σταθερές ΚαΗCOOH=10^-4 KbNH3=10^-5 KaRCOOH=10^-5 και ΚbRNH2=10^-4 & Kw=10^-14.</div>
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<b>4-6-2017</b></div>
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<b>Θέμα 18ο</b></div>
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<span style="background-color: white;">Ας βάλουμε και 20 </span><span style="background-color: lime;"> Σ-Λ</span><span style="background-color: white;"> μιας και εκεί γίνονται τα περισσότερα λάθη:</span></div>
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<span style="background-color: white;">Oι κορεσμένοι υδρογονάνθρακες όπως και όλες οι </span><span style="background-color: red;">κορεσμένες οργανικές </span><span style="background-color: white;">ενώσεις έχουν μόνο δεσμούς σ.</span></div>
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<span style="background-color: white;">Διάλυμα ΚCl έχει pH=7.H </span><span style="background-color: cyan;">θερμοκρασία</span><span style="background-color: white;"> του διαλύματος είναι οπωσδήποτε 25C.</span></div>
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<span style="background-color: white;">H αλογονοφορμική </span><span style="background-color: #a64d79;">αντίδραση</span><span style="background-color: white;"> έχει πάντα 4 στάδια.</span></div>
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<span style="background-color: white;">Η </span><span style="background-color: yellow;">μεθανόλη</span><span style="background-color: white;"> είναι η μοναδική πρωτοταγής αλκοόλη που δεν αφυδατώνεται σε αλκένιο.</span></div>
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<span style="background-color: white;">1mol HCl βρίσκεται σε αέρια κατάσταση και σε όγκο 1l.Aρα το </span><span style="background-color: #cc0000;">pH του αέριου</span><span style="background-color: white;"> ΗCl στους 25 C είναι 0.</span></div>
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<span style="background-color: white;">Σε αραιό υδατικό διάλυμα </span><span style="background-color: yellow;">αιθανόλης</span><span style="background-color: white;"> προσθέτουμε Να. Θα παραχθεί αέριο Η</span><span style="background-color: white; font-size: xx-small;">2</span><span style="background-color: white;"> μιας και θα αντιδράσει ποσοτικά το Να με την αιθανόλη.</span></div>
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<span style="background-color: white;">Σε υδατικό διάλυμα ΝΗ<span style="font-size: xx-small;">3</span> προσθέτουμε διάλυμα ΝαClO<span style="font-size: xx-small;">4</span>.O </span><span style="background-color: #3d85c6;">βαθμός ιοντισμού</span><span style="background-color: white;"> της αμμωνίας θα αυξηθεί ενώ το pH θα ελλατωθεί.</span></div>
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<span style="background-color: white;">Η </span><span style="background-color: #274e13;">δεύτερη ενέργεια ιοντισμού</span><span style="background-color: white;"> οποιοδήποτε ατόμου είναι πάντοτε μεγαλύτερη από την πρώτη ενέργεια ιοντισμού του ίδιου ατόμου.</span></div>
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<span style="background-color: white;">Ένα διεγερμένο άτομο Η μεταπίπτει από την Μ στην Κ στιβάδα και εκπέμπει </span><span style="background-color: #a64d79;">ορατό</span><span style="background-color: white;"> φωτόνιο.</span></div>
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<span style="background-color: white;">Το άτομο το Η απορροφά όλα τα φωτόνια που έχουν ενέργεια </span><span style="background-color: #b45f06;">μεγαλύτερη</span><span style="background-color: white;"> από 2,18x10^-18 J</span></div>
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<span style="background-color: white;">Σε όλους τους κορεσμένους υδρογονάνθρακες όλοι οι δεσμοί που σχηματίζουν οι άνθρακες με τα Η είναι δεσμοί που προκύπτουν από επικάλυψη </span><span style="background-color: magenta;">υβριδικών ατομικών τροχιακών</span><span style="background-color: white;">.</span></div>
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<span style="background-color: white;">Η υδρόλυση ενός </span><span style="background-color: #b45f06;">εστέρα</span><span style="background-color: white;"> μπορεί να γίνει είτε σε όξινο είτε σε αλκαλικό περιβάλλον.</span></div>
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<span style="background-color: white;">Η υδρόλυση όλων των αλκινίων παρουσία κατάλληλων καταλυτών οδηγεί </span><span style="background-color: #c27ba0;">πάντα</span><span style="background-color: white;"> σε παρασκευή κετονών ή της αιθανάλης.</span></div>
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<span style="background-color: white;">'Oταν σε αντιδραστήριο </span><span style="background-color: #ffd966;">Grignard</span><span style="background-color: white;"> προσθέσω κάποια ένωση θα έχουμε οπωσδήποτε ανοικοδόμηση ανθρακικής αλυσίδας.</span></div>
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<span style="background-color: white;">Στο </span><span style="background-color: #073763;">ισοδύναμο</span><span style="background-color: white;"> σημείο ογκομέτρησης ισχυρού οξέος από ισχυρή βάση τα mol του οξέος είναι πάντα ίσα με τα mol της βάσης.</span></div>
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<span style="background-color: white;">Οι </span><span style="background-color: #38761d;">δείκτες</span><span style="background-color: white;"> μπορεί να είναι και ισχυρά οξέα ή βάσεις.</span></div>
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<span style="background-color: white;">Σε κάθε </span><span style="background-color: #a64d79;">ρυθμιστικό διάλυμα</span><span style="background-color: white;"> υπάρχει επίδραση κοινού ιόντος.</span></div>
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<span style="background-color: white;">Το <span style="font-size: xx-small;">57</span>La είναι </span><span style="background-color: #cc0000;">λανθανίδα</span><span style="background-color: white;">.</span></div>
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<span style="background-color: white;">Το F-Be-F έχει δύο σ δεσμούς και το <span style="font-size: xx-small;">4</span>Be </span><span style="background-color: yellow;">παρουσιάζει</span><span style="background-color: white;"> υβριδισμό sp στο ΒeF<span style="font-size: xx-small;">2</span>.</span></div>
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<span style="background-color: white;">Oταν η Κc μιας ομογενούς χημικής ισορροπίας δεν έχει μονάδες μέτρησης τότε ο όγκος και η πίεση δεν αποτελουν παράγοντες που θα επηρεάζουν την θέση της χημικής ισορροπίας.</span></div>
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<b>5-6-2017</b></div>
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<b>Θέμα 19ο</b></div>
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<span style="background-color: white;"><span style="font-family: "times new roman";"><span style="background-color: white;">Ποσότητα a mol </span><span style="background-color: yellow;">νιτριλίου</span><span style="background-color: white;"> RCN χωρίζεται σε δύο ίσα μέρη.Το ένα μέρος </span><span style="background-color: #d5a6bd;">υδρολύεται</span><span style="background-color: white;"> και παράγεται οργανική ένωση Α και αέριο Β οι οποίες διαχωρίζονται κατάλληλα.Το δεύτερο μέρος του νιτριλίου ανάγεται με την απαραίτητη ποσότητα υδρογόνου και παράγεται ένωση Γ.Αν οι ποσότητες Β και Α διαβιβασθούν σε ορισμένη ποσότητα νερού προκύπτει </span><span style="background-color: cyan;">ουδέτερο</span><span style="background-color: white;"> διάλυμα Δ</span><span style="background-color: white; font-size: xx-small;">1</span><span style="background-color: white;">. Αν οι ποσότητες των Γ και Β διαβιβασθούν σε νερό τότε προκύπτει διάλυμα διάλυμα Δ</span><span style="background-color: white; font-size: xx-small;">2 </span><span style="background-color: white;">όγκου 1l με pOH=2 με τον βαθμό ιοντισμού της ένωσης Γ να είναι διπλάσιος από τον αντίστοιχο βαθμό της ένωσης Β στο διάλυμα Δ<span style="font-size: xx-small;">2</span> . Nα βρεθούν:</span></span></span></div>
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<span style="background-color: white;">α)Η σταθερά ιοντισμού της </span><span style="background-color: #f1c232;">οργανικής ένωσης Α</span><br />
<span style="background-color: white;">β)Η σταθερά ιοντισμού της </span><span style="background-color: #e06666;">οργανικής ένωσης Γ</span><br />
<span style="background-color: white;">γ)Tα a mol του νιτριλίου</span><br />
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<span style="background-color: white;">Δίνεται ΚbB=10^-5 και Κw=10^-14.</span><br />
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<b>6-6-2017</b></div>
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<b>Θέμα 20ο</b></div>
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Το στοιχείο <span style="font-size: xx-small;">26</span>Χ αντιδρά πλήρως με διάλυμα ΗCl όγκου 1l που έχει pH=0 και προκύπτει ουδέτερο διάλυμα Δ<span style="font-size: xx-small;">2</span> και ελευθερώνεται αέριο όγκου 11,2l STP.Το διάλυμα Δ2 απαιτεί 100ml διαλύματος ΚΜηΟ<span style="font-size: xx-small;">4</span> 1Μ οξινισμένο με ΗCl για να οξειδωθεί πλήρως.Να βρεθούν:</div>
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α)Η ηλεκτρονιακή δόμηση του <span style="font-size: xx-small;">26</span>Χ σε στοιβάδες και υποστιβάδες .</div>
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β)Oι αριθμοί οξείδωσης του στοιχείο Χ.</div>
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<span style="background-color: white;">Ηταν το </span><span style="background-color: red;">τελευταίο θέμα</span><span style="background-color: white;"> για την χρονιά 2016-2017....</span><br />
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<span style="background-color: white;">Καλή τύχη και </span><span style="background-color: yellow;">καλά θέματα</span><span style="background-color: white;"> στις εξετάσεις μας...</span></div>
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-59449491126946497922017-05-01T05:13:00.000-07:002017-05-01T05:18:43.762-07:00Και αν τα οξέα έχουν την ίδια σταθερά Κα;;;<div dir="ltr" style="text-align: left;" trbidi="on">
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Τρία ασθενή οξέα ΗΑ ΗΒ και ΗΓ βρίσκονται σε ένα υδατικό διάλυμα Δ1 αλλά έχουν διαφορετικές συγκεντρώσεις. Aν στο διάλυμα Δ1 και τα τρία οξέα παρουσιάζουν όλα τον ίδιο βαθμό ιοντισμού να αποδείξετε ότι με αραίωση (στα πλαίσια της οποίας να μπορούν να γίνουν οι προσεγγίσεις) οι βαθμοί ιοντισμού των τριών οξέων θα παρεμένουν συνεχώς ίσοι. <br />
H θερμοκρασία του διαλύματος παραμένει σταθερή στους 25 C.</div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-7710840074905712232017-04-27T03:35:00.001-07:002017-04-27T03:35:33.399-07:00Ήρθαν τα χελιδόνια στο "Σύγχρονο"...<div dir="ltr" style="text-align: left;" trbidi="on">
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Σήμερα το πρωί και ενώ έκανα μάθημα με μία ανιψιά μου την Ελένη μπήκε ένα χελιδόνι...Την τελευταία φορά είχε συμβεί αυτό ήταν πριν πολλά πολλά χρόνια στο μάθημα της Τούλας μία μέρα πριν τις εξετάσεις και το συγκεκριμένο θέμα που εκείνη την στιγμή δίδασκε έπεσε στις πανελλαδικές εξετάσεις της επόμενης μέρας ...<br />
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Σήμερα εκείνη την στιγμή έκανα μία παρόμοια περίπτωση με την παρακάτω άσκηση...Λέτε να ήθελε να μας πει κάτι το χελιδόνι;;;<br />
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Η γνωστή κλεψύδρα έχει στο κάτω της μέρος ασθενές οξύ ΗΑ με Kα=10^-5 όγκου 50ml και άγνωστης συγκέντρωσης.Η παροχή της κλεψύδρας δίνεται από το πιο πάνω διάγραμμα. Παρατηρήσαμε ότι την στιγμή που ο ρυθμός μεταβολής του PH ήταν μέγιστος ακριβώς εκείνη την στιγμή μηδενιζόταν η παροχή της κλεψύδρας.Να βρεθούν:<br />
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a)Ο η συγκέντρωση του αρχική διαλύματος ΗΑ καθώς και η αρχική τιμή του PH του διαλύματος.<br />
β)Το τελικό PH του τελικού διαλύματος μόλις σταματήσει η ρέει η κλεψύδρα.<br />
γ)Ποια χρονική στιγμή ο ρυθμός μεταβολής του PH του κάτω διαλύματος είναι ελάχιστος και ποιο το PH του κάτω διαλύματος της κλεψύδρας εκείνη την στιγμή.<br />
Η Κw=10^-14 και θ=25ο C. <br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-39888561712399830792017-04-26T02:03:00.001-07:002017-04-26T02:03:31.739-07:00Γ και Δ θέματα από τον Παύλο Μπασδάρα...<div dir="ltr" style="text-align: left;" trbidi="on">
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O φίλος μου Παύλος Μπασδάρας είναι συγγραφέας πρωτότυπων ασκήσεων Χημείας...<br />
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Μου έστειλε να δημοσιεύσω δύο πανέμορφα θέματα που θα ήταν "κουκλίστικα" για εξετάσεις...<br />
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Φίλε Παύλε σε ευχαριστώ για την προσφορά σου...<br />
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<a href="http://sygxrono.com/cloud/index.php/s/JgjDKedpVBfz65i"><b>OI AΣΚΗΣΕΙΣ</b></a></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-38161854154136005782017-04-23T02:39:00.001-07:002017-04-24T00:02:58.312-07:00Tελικό διαγώνισμα Χημείας 2017<div dir="ltr" style="text-align: left;" trbidi="on">
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Oπως και κάθε χρόνο έτσι και φέτος λίγο πριν τα επαναληπτικά εξάωρα που θα γίνουν σε όλες τις Κυριακές του Μαίου δίνω το τελευταίο μου Γενικό Διαγώνισμα στην Χημεία.Είναι ένα ιδιαίτερο διαγώνισμα όπως κάθε χρόνο...<br />
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Ιδιαίτερα αφιερωμένο στους φίλους μου Χημικούς που όλη τη φετινή χρονιά με συμβούλευαν <b>"χημικά"</b> στις αναρτήσεις μου :<br />
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<b>Βαφειάδη Τάσο </b><br />
<b>Λαντζώνη Πολυνίκη </b><br />
<b>Μπαλτζόπουλο Αντώνη</b><br />
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Καλή επιτυχία σε όλα τα παιδιά και τους εύχομαι να μην τους "πέσουν" τέτοια Θέματα...<br />
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<a href="http://sygxrono.com/cloud/index.php/s/vgfBwyO3HYvMhRe"><b>ΤΟ ΔΙΑΓΩΝΙΣΜΑ</b></a></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-54570505119732291712017-04-21T11:55:00.002-07:002017-04-21T13:20:46.904-07:00Τι γίνεται με τη απόδοση του αυτοιοντισμού του νερού;;;<div dir="ltr" style="text-align: left;" trbidi="on">
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Διάλυμα Δ1 όγκου 1l έχει συγκέντρωση 1Μ σε ΝaCl.Στο διάλυμα αυτό προσθέτουμε σιγά σιγά διάλυμα Δ2 που περιέχει ΝΗ3 συγκέντρωσης 1Μ.Όταν ο λόγος των βαθμών αυτοιοντισμού του νερού στο αρχικό διάλυμα προς τον βαθμό αυτοιοντισμού του νερού στο τελικό διάλυμα γίνει 10^4 να υπολογιστούν:<br />
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a)Το PH του τελικού διαλύματος<br />
β)Ο όγκος του διαλύματος Δ2 που προστέθηκε στο αρχικό διάλυμα<br />
γ)Οι συγκεντρώσεις όλων των σωματιδίων που υπάρχουν στο τελικό διάλυμα.<br />
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Δίνεται η σταθερά ιοντισμού της αμμωνίας Kb=10^-5 καθώς και ότι όλα τα διαλύματα είναι στους 25o C όπου η Κw=10^-14. <br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-43416573153389325442017-04-17T00:40:00.000-07:002017-04-17T00:57:41.977-07:00Ενα δεύτερο θέμα "δηλητήριο"...<div dir="ltr" style="text-align: left;" trbidi="on">
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Τρία δοχεία ίδιου όγκου και ίδιας θερμοκρασίας περιέχουν αέριες ισομοριακές ποσότητες μεθανάλης ακεταλδεύδης και ακετόνης.Στο κάθε δοχείο προσθέτουμε ίση ποσότητα από αέριο υδροκυάνιο και για κάθε δοχείο καταγράφουμε τα παρακάτω διαγράμματα C-t.<br />
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uQAr+ULsnKSW6ox1vt1p886GO5qRDzFi065w2S71GDWFfQEPFR8+sZQdbd12Do/bBqLjAh9oD6sCNSHjohCfdwnf/RoryfzvXBXrmuiz/fVyZF1JzgRcDyUPYPjD8paxwMeNt6d23G2erjRMDNtf6yk2tjcFa6bI0MC9aEjNlsfOesXj9KT9pbi2fBZ0vqVm5qfzmjIiUp3NiLWj2n7st4wk1tr2pffvf6YcWb1cFXnpGHigeNh4IM42tjcFa6bI0MC9aEjNlUf+fqfHp3hSn499JWbeGAt76uK++KQtzv1I00O13K4KxCE8BvzDklvnDlZaVz/5szDJf0lzZbB8QfrX3oTFhGtgfqwIlAfOiLy+ngsLZLuxdVjPQe/HvBYT8CVG5wa8r5DYneprrirPFoX7lt//22Lrtq+6dTyQb/ifHyhI7fW1Gm2zYf5DiltbO4K182RIYH60BGR1kd2SvvX3rOue0m5fzeUlXO5XcVd5d6nWqfqs8btk+GucXBC/cLukGp6ptYf0Nmb332pwWycnI/4XJU2NneF6+bIkEB96IgI6+POeGftOdeL8rWdofxJ60C7960Se8oPtFk6w13XJ45R01jryFxG1ZDf06uEwt6rdyyjUwubJ7SxuStcN0eGBOpDR0RSn5XSWClu7TnXmXef+PvLruUaY/3uK6vvlrjQUjg6Yw53RYOPYev8pQbz9owG3+gcKxu83jYxEelrjgMObWzuCtfNkSGB+tAR4dfHOS+vfZCWfDDmiYd7llyOzMbz6uUvdpfqaoz1Hk/UrqE3OrX4RcfEsbXDOuoLkZNL+8tbx4cm56Ol+A5tbO4K182RIYH60BFh10c6+573OZdnojv4L99bmPU+29pbciCUd0uEMhaXpTtDs2erhz/6vM33mE5aaXv76NzSBifLozK0sbkrXDdHhgTqQ0eEVx9Zn/noE0Qv/EfwXx6eMXlfvpzfXjxiHgl35daPRadc3W3d+/hLdY6VDTYaZpZdbp5THO5AfVgRqA8dEWZ9Ur6zmp5DfxP8esz1o00JlUd2lsZ9ev1AtaFWcsubvP8TNselBrPvm8s/vtBR1jru+1pknlMc7kB9WBGoDx0RRn1WSmPXLp3xortq30a/5nA5vuiv3n1Nt7M07lD18TtjbRGvnKIoC8tSk3Em68uRD7MfdSejaqhh8N76y+XwnOJwB+rDikB96IhQ6+OZNrgSv76643P8+xv9msvt+rwpT322FV+Z7PtynnBXzu1ZaR6a9X3b54fZrdk1I0FOnPOc4nAH6sOKQH3oiFDr4778vvcTjTf6THSX23WqPsv75okHzsfOOoW+cmp3vJfU8T7JeuInN/Cc4nAH6sOKQH3oiNDqIzvl+LWz7LmBDzb7pudUfVZklz2VZE9t37RvdxIKe/XGmRA/6I7nFIc7UB9WBOpDRwiiKIqiKAhCbGysuMFYyPzX1fQkvGJtq1r/C13GnlPVZ3fk79qRvyv95pkOQ9f639Hr9RvdviiKo6axwq96P8q8/X56vbrs+ryprKHfZB4L8ldhEVEZW0AkJSVRE6JW5kobD4c2JioCIoR9nwcT3o8DlLN/sf7nc0v389uKva9jnpq/F1YaJdlT0zPl+xFXCYW9zUOzEbwVayMiimMLCOz7sCKw70NHPLk+7su/Wz3iE/+yx9zo91Ob4/7l9qtqenJbCqbmp8NaudaROd8X70TcnSBEdIc2NndFK3OljYdDGxNFUB+H3XXgr1brc/pn63+epb8Q5FhPkJUbnVo4Ujrg7U5i0aa6E5CgGNrY3BWtzJU2Hg5tTFT06+Mu+l/vJwJ6jDf9flo1UBNienxXbsS6kH97LHbtdYMpZQMNg/ecLne4qx6EoBva2NwVrcyVNh4ObUxU9OsjJby69l72d/x+1GbpVNOT/GVaKB87IYrilN1Z1jruvaRpQmFvZcfE7MLDcFc6CBGtm3qKBOrDikB96Ihg9VkxVHovnOqZHvD9kXlOVD9fNK7i0OySLRSppL7f9xPN8+pM4V5X8ImD5xSHO1AfVgTqQ0cEq4+U9sPVp11H/t73+6Oz5uO3Tu8sjdtfdbRrvPeJhm3RlVZh8H4OX1qFIbrX3PEOnlMc7kB9WBGoDx2xYX08E92S7uXV+pR85P3+9Py97Ka8naVxu6/p6keagt+627NS0zOlvjX0/fR6XUFPpzmkHaXIBs8pDnegPqwI1IeO2LA+j95asf9Vxb562WaPx+M9yVXWWxX8pidsjmNlg963aJ253hnKh0ZsZvCc4nAH6sOKQH3oiA3r4zr0t2vHmx+daK8x1qvpydJfCHKJQkn2VHZMei+ufLC4b+zeIs/7z5BAfVgRqA8dEbg+nqYsad/aBQzbL6rftNjG1SPNwU9yjd1b9H4C+h9y2io7JtVX8fC8/wwJ1IcVgfrQEYHrI33247XjzX+nfmd6Yeb07ZydpXGJVSn9VkPA25JkT0HjmHeXJ7V8UHuX/tLG5q5oZa608XBoY6KiVh/vdePd1QfV75T2VKjPub4y1ge8oWm70/v5WbtzO+oH/N/txfP+MyRQH1YE6kNHBKjPSnP22jUMX1I/sqLJ3LqrVKdentkpB3hxYPPQ7B/Pt6vpOVlpDHghHp73nyGB+rAiUB86QvDc7VQer4+U9k+r9TnxA0VRTLNjR2tO7SyNO37rtGjz/8zSabuzUC+q3dlzsetGl3V5g/dM8Lz/DAnUhxWB+tARgqcuVfGtj8MuJbyi1melSufxeLzXDOuzDvr9ca9oP1lpVNNz4rqh03w/uisX7tAGgfqwIlAfOkKQz/+74lOflZqk1Zf5JLysLFjrhhvV9BR3lfv+mUv2fNlt9b5jK79hbNK2HPWVC3dog0B9WBGoDx0hyKnfVXzq4z71o9X6nPj+fYd9T/kB9TyX7yn2Rad8+saQ95x6oyHYR+tsZuXCHdogUB9WBOpDRwhy4muKtz4uh7R/9WmXfP1PBR0l6o5Pq9jp/YNpu9N73eXEot7Q37HF8/4zJFAfVgTqQ0cIku5Fz7RBrY/n1lHv1Xw6eirV9BR1XvP+9uD4A++5rbw6U1jvnOB5/xkSqA8rAvWhIwQp7oWVnitqfdwZP1Hr8/DoGyfrs9SXNY/NWRRF8aysfNlt/SSvU305z42uSdkd3pu2eN5/hgTqw4pAfegIQYp7Qb74W7U+3s9oHyjYoe741A43KorywCFdbb7rfbalN4Z0oGfzK/d8EqgPKwL1oSMEKe4F+cjrgiDkxa9ePd4V98L+LxJ3lsbl3Lm05HKMzznO3Rr1nlbvtdi3bOWeTwL1YUWgPnSEIMW9IOleEgRhKO5NtT6O/a/uLI3bXaobt08O3H2Q/sXqK3o+rxkR7y1u5co9nwTqw4pAfegIQS3Omy/+2ZJu9WxXf8o/qJfvGZ1a8D3GjA+c2BoC9WFFoD50xGp9cn755661SzhnXfjv47dO1w2Mqun5MLu1utv6VFbu+SRQH1YE6kNHrNZncc9frL7IUPfiztK48/qb6oUyPsxujda1UHnef4YE6sOKQH3oCMH7qRXqMnfg6x8VHvogq+mDrNY/nm8fts4/xZV7PgnUhxWB+tARgpj685oLKdcuZd88f2wk9Zc1Kf/8n2cuq+kZnVp4uiv3fBKoDysC9aEjhKLHx5UrhR+cbTl6baBXDPaG9a1ZueeTQH1YEagPHeFfn6KiokuFxb5XRH2KK/d8EqgPKwL1oSMC1KeoqIjJyj2fBOrDikB96IjA9RkfH+ewcs8ngfqwIlAfOiJwfd544w0BAwMDg3QErE88wYiNjaW4We0R27ZtoybitTJX2ng4tDFRERAB6nP16lUmO2bPJ4FnXqwIPPOiI9afcb9CsWYK1/vPkEB9WBGoDx0hNDc3FxcXFxUVFRYWNjY2UqyWOnjef4YE6sOKQH3oCGH1fx7/LFOKwfP+MyTq6wN/Wmx0hzbmaguIvLw8akIbE4X6aIHYmqGNudoCYmlpiZrQxkShPs884Xs6khTSwFxtDaEoyu3btwVBMJlMRLevjYlCfZ5tIiYmJjk5Wf06OTmZNEDP+lxtGaEoSkxMDOpDQaA+XAj1H1hFUZzO1TfZCYJw+/ZtIu6ZnqutJJKTk7dv3476UBCoDztieHhYURSTyYQt/qkTt2/fjomJwWNBRKA+7AibzaYoSkxMzPbt2+kUbcwVNaGmB/UhIlAfdoRCnx5FK3NFSiQnJ6uH4VAfIgL14UWoG7r32DPd0MBckRImkykmJsb7NepDQaA+jAj1wDPdkWbf8azPFTWhnnP0G5cvX6awnumJ2gyB+nAh1H9gtyY9yjM+V1tJKNj3ISNQHy5EwH9sccb9qRMK6kNGoD7siK0Z2pirLSAWFqL5yS4BhzYmCvXRAlFbW0tNKFqZqy0gzp07R01oY6JQHy0QuMIGKwJX2KAjUB92BOrDikB96AjUhx2B+rAiUB86AvVhR6A+rAjUh45AfdgRqA8rAvWhI1AfdgTqw4pAfegI1IcdgfqwIlAfOgL1YUegPqwI1IeOQH3YEagPKwL1oSNQH3YE6sOKQH3oCNSHHYH6sCJQHzoC9WFHoD6sCNSHjkB92BGoDysC9aEjUB92BOrDikB96AhBFEVRFAVBiI2NFSmHXq8nvX3NEElJSdSEqJW50sbDoY2JioDAvg87Avs+rAjs+9ARqA87AvVhRaA+dATqw45AfVgRqA8dgfqwI1AfVgTqQ0egPuwI1IcVgfrQEagPOwL1YUWgPnQE6sOOQH1YEagPHYH6sCNQH1YE6kNHoD7sCNSHFYH60BGoDzsC9WFFoD50BOrDjkB9WBGoDx2B+rAjUB9WBOpDR6A+7AjUhxWB+tARqA87AvVhRaA+dATqw45AfVgRqA8dgfqwI1AfVgTqQ0egPuwI1IcVgfrQEagPOwL1YUWgPnQE6sOOQH1YEagPHYH6sCNQH1YE6kNHoD7sCNSHFYH60BGoDzsC9WFFoD50BOrDjkB9WBGoDx2B+rAjUB9WBOpDR6A+7AjUhxWB+tARqA87AvVhRaA+dATqw45AfVgRqA8dgfqwI1AfVgTqQ0egPuwI1IcVgfrQEagPOwL1YUWgPnQE6sOOQH1YEagPHYH6sCNQH1YE6kNHCKIoiqIoCEJsbKxIOfR6Penta4ZISkqiJkStzJU2Hg5tTFQEBPZ92BHY92FFYN+HjkB92BGoDysC9aEjUB92BOrDikB96AjUhx2B+rAiUB86AvVhR6A+rAjUh45AfdgRqA8rAvWhI1AfdgTqw4pAfegI1IcdgfqwIlAfOgL1YUegPqwI1IeOQH3YEagPKwL1oSNQH3YE6sOKQH3oCNSHHYH6sCJQHzoC9WFHoD6sCNSHjkB92BGoDysC9aEjUB92BOrDikB96AjUhx2B+rAiUB86AvVhR6A+rAjUh45AfdgRqA8rAvWhI1AfdgTqw4pAfegI1IcdgfqwIlAfOgL1YUegPqwI1IeOQH3YEagPKwL1oSNQH3YE6sOKQH3oCNSHHYH6sCJQHzoC9WFHoD6sCNSHjkB92BGoDysC9aEjUB92BOrDikB96AjUhx2B+rAiUB86AvVhR6A+rAjUh45AfdgRqA8rAvWhI/4faSoh5oOonT0AAAAASUVORK5CYIIA" /><br />
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Να βρεθεί ποιο χρώμα καμπύλης αντιστοιχεί το κάθε δοχείο καθώς και το όνομα του κάθε προιόντος που αντιστοιχεί το κάθε χρώμα της παραπάνω καμπύλης.<br />
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Υ.Σ.Η ασκήση αφιερώνεται στην Μαίρη και στον Πολυνίκη που έρχονται σήμερα από τον Αλμυρό για να συναντηθούμε με παλιούς μαθητές μας στο Βελβεντό...</div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com2tag:blogger.com,1999:blog-1297224820132880720.post-28929132000591465142017-04-03T12:54:00.001-07:002017-04-03T14:00:56.033-07:00To 10 το καλό της ομάδας της ΝΗ3...<div dir="ltr" style="text-align: left;" trbidi="on">
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Στο υποτιθέμενο εργαστήριο Χημείας του "Σύγχρονου Φροντιστηρίου" στο Βελβεντό (στην παλιά κουζίνα του σπιτιού του Τάσου Βαφειάδη όταν έμενε στο Βελβεντό) υπάρχουν δύο πάγκοι Α και Β.Στο κάθε πάγκο υπάρχουν δύο ίδια διαλύματα Δ1 και Δ2.Το Δ1 περιέχει ΝΗ3 1Μ και έχει όγκο 200ml ενώ το Δ2 περιέχει ΝΗ4Cl 1M και έχει όγκο 200ml.Με ανάμιξη μέρους των διαλυμάτων Δ1 και Δ2 στον κάθε πάγκο δημιουργούμε δύο νέα διαλύματα Δ3 στον πάγκο 1 και Δ4 στον πάγκο 2 που το καθένα από τα διαλύματα αυτά έχει όγκο 300ml.Παρατηρήσαμε ότι τα διαλύματα Δ3 και Δ4 παρουσιάζουν την μέγιστη μεταξύ τους δυνατή διαφορά στην τιμή του PH.<br />
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Να υπολογιστούν:<br />
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a)To PH των διαλυμάτων Δ1 &Δ2 <br />
β)To PH των διαλυμάτων Δ3 &Δ4<br />
γ)To |ΔΡΗmax| των δύο διαλυμάτων Δ3 και Δ4.<br />
δ)Το PH του διαλύματος που θα προκύψει απο το ανακάτεμα των διαλυμάτων Δ3 και Δ4.<br />
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Δίνονται όλα τα διαλύματα ότι βρίσκονται στους 25C και η Κβαμμωνίας=10^-5 και Κw=10^-14.<br />
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Y.Σ.Έχω υποσχεθεί ότι φέτος η ομάδα της αμμωνίας που θα παίξει μπάλα θα έχει 22 παίκτες...<br />
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H παλιά εντεκάδα <a href="http://ylikonet.ning.com/profiles/blogs/3-30">ΕΔΩ</a></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-81590181865371577372017-03-29T23:48:00.000-07:002017-03-30T05:37:40.805-07:00Ενα διαφορετικό Β Θέμα Ιοντικής Ισορροπίας.<div dir="ltr" style="text-align: left;" trbidi="on">
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-59525661837252351902017-03-23T04:07:00.001-07:002017-04-08T02:06:05.453-07:00Δοχείο μεταβλητού όγκου και χημική ισορροπία<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCdXkAgnE85v7a4VjBi0nIgA5gK-P-_hi91p6lzforsMTBQZOevCqq6kCHFd8yir5cMK0qGn6ozSBacUJ1DHaEfZ4pfzwE-nWGJZHBqAfjTKzPrNphVdDLyMgLdsilwK90UYwI6DXAgnhv/s1600/%25CE%25B1%25CE%25BD%25CE%25B8%25CF%2581%25CE%25B1%25CE%25BA%25CE%25B9%25CE%25BA%25CF%258C.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="267" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCdXkAgnE85v7a4VjBi0nIgA5gK-P-_hi91p6lzforsMTBQZOevCqq6kCHFd8yir5cMK0qGn6ozSBacUJ1DHaEfZ4pfzwE-nWGJZHBqAfjTKzPrNphVdDLyMgLdsilwK90UYwI6DXAgnhv/s640/%25CE%25B1%25CE%25BD%25CE%25B8%25CF%2581%25CE%25B1%25CE%25BA%25CE%25B9%25CE%25BA%25CF%258C.png" width="640" /></a></div>
Σε ένα κυλινδρικό δοχείο μεταβλητού όγκου αλλά αρχικού όγκου Vo τοποθετούμε n1 mol CaCO3.H θερμοκρασία του δοχείου είναι διατηρείται συνεχώς σταθερή.Ενώ έχει αποκατασταθεί η παραπάνω ισορροπία την χρονική στιγμή t=0 και ενώ ο όγκος είναι σταθερός και ίσος με Vo αρχίζει το έμβολο εμβαδού Α να μετακινείται με μικρή αλλά σταθερή ταχύτητα u.Να βρεθούν:<br />
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a)H απόδοση της αντίδρασης μέχρι την στιγμή t=0<br />
b)H γραφική παράσταση της συγκέντρωσης του CO2 σε συνάρτηση με το χρόνο.<br />
γ)Ποιο χρονική στιγμή καταστρέφεται η ισορροπία. <br />
δ)Η τελική απόδοση της αντίδρασης.<br />
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Δίνεται η Κc της παραπάνω αντίδρασης στους Τ Κ.<br />
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Y.Σ.Ισχύει ο ορισμός της ταχύτητας αντίδρασης για το σύστημα;;Μήπως το u=dC/dt δεν ισχύει στην περίπτωση της άσκησης;;;Mήπως όταν δεν υπάρχει σαφής ορισμός της ταχύτητας γίνονται τραγικά λάθη;;;<br />
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Y.Σ.Ο Θρασύβουλος έχει και πάλι δίκιο για τον ορισμό ενός μεγέθους.... </div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-7717899916350016002017-03-18T16:33:00.001-07:002017-03-18T16:51:39.600-07:00Σωκράτης και οι μαθητές αυτού σε πειράματα Χημείας...<div dir="ltr" style="text-align: left;" trbidi="on">
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Ο Αλκιβιάδης ο Πλάτωνας αλλά ο Ξενοφώντας μαθητές του Σωκράτη προσπαθούσαν να καταλάβουν την χημεία της εποχής κάνοντας πειράματα...<br />
Ο Αλκιβιάδης στην δικιά του κλεψύδρα είχε ένα διάλυμα οξέος ΗΑ συγκέντρωσης 0,1Μ και όγκου 100ml.<br />
Ο Πλάτωνας στην δικιά του κλεψύδρα είχε ένα διάλυμα οξέος ΗΠ συγκέντρωσης 0,1Μ και όγκου 100ml.<br />
Ο Ξενοφώντας στην δικιά του κλεψύδρα είχε ένα διάλυμα οξέος ΗΞ συγκέντρωσης 0,1Μ και όγκου 100ml.<br />
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Ολα τα πάνω δοχεία περιέχαν πρότυπο διάλυμα ΝαΟΗ συγκέντρωσης C M και η παροχή της κάθε κλεψύδρας ήταν 2ml/s.<br />
Αν γνωρίζουμε ότι μόνο ένα από τα τρία οξέα είναι ισχυρό και ότι ο μέγιστος των μεγίστων ρυθμός μεταβολής του PH του κάθε παραπάνω διαλύματος συμβαίνει την χρονική στιγμή t=50s στο διάλυμα του Πλάτωνα να βρεθούν:<br />
α)Ποια η συγκέντρωση C του διαλύματος ΝαΟΗ<br />
β)Ποιο οξύ είναι το ισχυρό το ΗΑ το ΗΠ ή το ΗΞ;<br />
Αν το PH του Αλκιβιάδη την χρονική στιγμή t=25s είναι μεγαλύτερο από το PH του Ξενοφώντα την ίδια στιγμή<br />
γ)Ποιο από τα οξέα ΗΑ και ΗΞ είναι ισχυρότερο;<br />
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Η εξίσωση Η-Η να μην θεωρηθεί γνωστή γιατί την εποχή του Σωκράτη δεν είχε ακόμη γραφτεί...<br />
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Ολα τα διαλύματα να θεωρηθούν στους 25ο C.<br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-49364759087748079982017-03-15T13:54:00.000-07:002017-03-15T13:54:29.639-07:00Σωκράτης και Χημεία...<div dir="ltr" style="text-align: left;" trbidi="on">
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Ο Σωκράτης πριν πιεί το <a href="https://el.wikipedia.org/wiki/%CE%9A%CF%8E%CE%BD%CE%B5%CE%B9%CE%BF">κώνειο</a> είπε να παίξει λίγο με την παραπάνω κλεψύδρα...Χρησιμοποίησε στο πείραμα την δικιά του μέθοδο...Την Σωκρατική...<br />
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Γέμισε την κάτω κλεψύδρα με μεθανικό ασβέστιο και δημιούργησε διάλυμα συγκέντρωσης 0,05Μ και όγκου 200ml.Tην χρονική στιγμή t=0 άνοιξε την κάνουλα της πάνω κλεψύδρας η οποία είχε παροχή 5ml/s και περιέχει διάλυμα ΚΜnO4 συγκέντρωσης 1M οξινισμένο με Η2SO4.<br />
Να βρεθούν:<br />
α)Ποιο το PH του διαλύματος της κάτω κλεψύδρας για t<0 αν γνωρίζουμε ότι το μεθανικό οξύ έχει σταθερά ιοντισμού Κα=10^-4<br />
β)Ποια μέγιστη χρονική στιγμή πρέπει να σταματήσει ο Σωκράτης την παροχή της πάνω κλεψύδρας αν θέλει να πιει άχρωμο διάλυμα διάλυμα από την κάτω κλεψύδρα.<br />
Δίνονται ότι όλα τα διαλύματα είναι στους 25ο C.<br />
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H άσκηση αφιερώνεται στον Μήτσο Γκενέ αλλά και στον Γιώργο Φασουλόπουλο γιατί μου έδωσαν <a href="http://ylikonet.gr/2017/03/15/%cf%80%cf%89%cf%82-%ce%bc%ce%b5%cf%84%cf%81%ce%bf%cf%8d%cf%83%ce%b1%ce%bd-%ce%bf%ce%b9-%ce%ba%ce%bb%ce%b5%cf%88%cf%8d%ce%b4%cf%81%ce%b5%cf%82-%cf%84%ce%bf%ce%bd-%cf%87%cf%81%cf%8c%ce%bd%ce%bf/">το έναυσμα</a> να την γράψω.</div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-66748583955843655142017-02-11T09:14:00.000-08:002017-02-11T23:58:15.903-08:00Δεντράκι με προχοίδες...<div dir="ltr" style="text-align: left;" trbidi="on">
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" 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Μία τριπλή <b>πατέντα</b> προχοίδα έχει τα σώματα-διαλύματα που φαίνονται στο παραπάνω σχήμα.Ανοίγουμε την κάνουλα του δεύτερου ορόφου της προχοίδας και παρατηρούμε ότι μόλις έχουν πέσει 50ml διαλύματος ΝαΟΗ έχουν σχηματισθεί 19,7g κίτρινου ιζήματος τα οποία αφαιρούνται σταδιακά από την κάτω προχοίδια ενώ η παραπέρα πτώση του διαλύματος ΝαΟΗ δεν σχηματίζει επιπλέον κίτρινο ίζημα.Μόλις τελείωσει η ποσότητα του διαλύματος του μεσαίου ορόφου της προχοίδας ανοίγουμε την κάνουλα του τρίτου ορόφου και σιγά σιγά το διάλυμα του ΚΜnO4 πέφτει στον άδειο δεύτερο όροφο και στην συνέχεια στο κάτω όροφο της προχοίδας.Παρατηρούμε αποχρωματισμό του διαλύματος ΚΜnO4 και ταυτόχρονη έκλυση αερίου.<br />
Να βρεθούν:<br />
a)Ποιος ο συντακτικός τύπος της οργανικής ένωσης Cν+2Η2ν+1ΟΙ3.<br />
β)Να βρεθεί ο όγκος του αερίου που εκλύθηκε μετρημένος σε STP<br />
γ)Πόσος όγκος διαλύματος ΚΜnO4 έχει χρησιμοποιηθεί από την πάνω προχοίδα μέχρι την στιγμή που αρχίζει το διάλυμα να μην αποχρωματίζεται φτάνοντας στην κάτω τελική προχοίδα.<br />
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-28623385761182690452017-01-26T01:40:00.000-08:002017-01-27T04:03:36.079-08:00Η5Ο2^+ & Η9Ο4^+ τι είναι αυτά;;;Yπάρχουν στο βιβλίο;;;<div dir="ltr" style="text-align: left;" trbidi="on">
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" /><br />
H διπλή προχοίδα του παραπάνω σχήματος περιέχει τα διαλύματα που φαίνονται στο σχήμα με τα διαλύματα να περιέχουν την ακριβώς απαραίτητη ποσότητα ΗCl.Το δοχείο ζέσεως περιέχει υδατικό διάλυμα ακεταλδεύδης όγκου 500ml και συγκέντρωσης 0,1Μ.Tην χρονική στιγμή t=0 ανοίγουμε ταυτόχρονα και τις κάνουλες.Παρατηρηρούμε ότι την χρονική στιγμή t=80s αν κλείσουμε τις κάνουλες ταυτόχρονα το διάλυμα πλέον δεν αντιδρά με αντιδραστήριο Τollens.Nα βρεθούν:<br />
a)Ποια η παροχή Π2;<br />
β)Ποιο το χρώμα του τελικού διαλύματος<br />
γ)Να γραφεί η συνολική αντίδραση που πραγματοποιείται. <br />
γ)Ποιο το PH του τελικού διαλύματος αν Κα=10^-5 για το οξικό οξύ.<br />
δ)Αν τα οξώνια μετατρέπονται με δεσμούς Η σε Η5Ο2^+ & Η9Ο4^+ σε ποσοστά 60% και 30% αντίστοιχα ποια η τελική συγκέντρωση των [H3O^+] ,[ Η5Ο2^+ ] &[ Η9Ο4^+].<br />
Η Κw=10^-14.H θερμοκρασία όλων των διαλυμάτων είναι 25 C.<br />
<br />
Υ.Σ.Όλα τα έχει το "ευαγγέλιο" σχολικό βιβλίο.Απλά δεν του δίνουμε και πολύ σημασία...<br />
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" /></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-37257081534765643372017-01-19T14:23:00.000-08:002017-01-19T22:51:51.684-08:00Tι να ρίξω o φτωχός ; <div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhQoa516S-AZHQyjAIcz9m0CItAJC1DJ9fQaFwQW47j4wsPhb0zLg86HvF4itRxiZqJEskS_eUjBMw7LI-OQ8RwFU_zd9Vad1qju1MCx89Ln86vJ5S0e4aC7O0pYCgE4oQrTVM1UjkABisD/s1600/050-92020.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhQoa516S-AZHQyjAIcz9m0CItAJC1DJ9fQaFwQW47j4wsPhb0zLg86HvF4itRxiZqJEskS_eUjBMw7LI-OQ8RwFU_zd9Vad1qju1MCx89Ln86vJ5S0e4aC7O0pYCgE4oQrTVM1UjkABisD/s320/050-92020.jpg" width="148" /></a></div>
Ένα μπουκάλι όγκοu 500ml περιέχει ουίσκι 46 % w/v. Μερακλώσαμε κάποιο βράδυ με την μοuσική τοu <a href="http://www.mic.gr/thema/tragoydia-gia-toys-proedroys-ton-ipa-2">Tάσου</a> και ήπιαμε τα 400ml. την επόμενη μέρα νηφάλιοι πια στο εργαστήριο Χημείας προσπαθούμε να οξειδώσουμε πληρως το ουίσκι ποu περίσσεψε.Aν στο εργαστήριο (λόγω κρίσης) δεν έχουμε άλλο εξοπλισμό (oυτε μπουκάλι) εκτός από δύο διαλύματα ΚΜnO4 2M παρουσία H2SO4 και Κ2Cr2O7 4/3 M παρουσία H2SO4.Ποιο από τα δύο διαλύματα θα πρέπει να χρησιμοποιήσουμε αν θέλουμε να οξειδώσουμε πλήρως το ουίσκι;</div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-87864872489278608522016-12-30T23:04:00.001-08:002016-12-31T06:42:22.787-08:00Οξαλικό καλιονάτριο<div dir="ltr" style="text-align: left;" trbidi="on">
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" /> <br />
Η γνωστή κλεψύδρα έχει στο κάτω μέρος της διάλυμα όγκου 400ml σε οξαλικό καλιονάτριο σε συγκέντρωση 1Μ και το πάνω μέρος της κλεψύδρας έχει διάλυμα ΚΜnO4 1M όγκου 1l οξινισμένο με Η2SO4.Aν η παροχή της κλεψύδρας είναι 10 σταγόνες/s να βρεθούν:<br />
a)To aρχικό PH του κάτω διαλύματος<br />
β)Η αντίδραση η οποία πραγματοποιείται<br />
γ)Ποια χρονική στιγμή θα σταματήσει η έκλυση αερίου<br />
Δίνεται για το οξαλικό οξύ Κα1=10^-2 και Κα2=10^-5 καθώς και ότι η κάθε σταγόνα έχει όγκο 0,1ml.<br />
Η θερμοκρασία των διαλυμάτων είναι 25 C και η Κw=10^-14. <br />
<br />
H άσκηση αφιερώνεται στον Γιώργο Γιωργαντά που μου έδωσε την ιδέα με τις σταγόνες. </div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com2tag:blogger.com,1999:blog-1297224820132880720.post-32441861661535440212016-12-26T06:31:00.002-08:002016-12-27T09:39:34.879-08:00Πολλαπλής επιλογής....<div dir="ltr" style="text-align: left;" trbidi="on">
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1)Η ενέργεια πρώ<span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px; text-align: left;">τ</span>oυ ιον<span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px; text-align: left;">τ</span>ισμού <span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px; text-align: left;">τοu 14Sι είναι 786,5Kj/mol.</span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px; text-align: left;">Για </span></div>
<span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">την ενέργεια </span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">της αντίδρασης P(g)-->P(g)^+2 +2e^-1 E=;; </span></span></span><br />
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">μπορεί να ισχύει:</span></span></span><br />
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span></span>
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)E=1000Kj/mol ii)E=1573Kj/mol iii)E=2917Kj/mol.</span></span></span><br />
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="background-color: white; font-size: 12.8px;">2)Eνα ά</span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">τομο H βρίσκε</span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">ται σ</span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">την δε<span style="font-family: "arial" , sans-serif;">ύ</span></span></span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">τερη </span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">διεγερμένη </span></span></span><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">κατασ</span></span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ταση. Για να ιοντιστεί ο άτομο πρέπει:</span></span></span><br />
<span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;"><br /></span>
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)Nα απορροφήσει ένα φωτόνιο ιι)Να απορροφήσει οποιοδήποτε φωτόνιο υπέρυθρων </span></span></span><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ακτίνων</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ιιι)Να εκπέμψει ένα φωτόνιο ιv)Nα απορροφήσει οποιοιδήποτε ενέργεια.</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">3)Η πιο φτωχή ενεργειακά uποσ</span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">τ</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">ιβάδα είναι :</span><br />
<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;"><br /></span>
<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">i)4s ii)3d iii)4d iv)1p</span><br />
<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;"><br /></span>
<span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">4)</span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">το πιο φτωχό ενεργειακά ηλεκτρόνιο είναι </span></span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">τ</span><span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ο ηλεκτρόνιο ποu έχει κβαντικούς </span></span></span><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">αριθμούς:</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)(4),(0),(0),(0,5) ii)(3),(2),(2),(-0,5) iii)(4),(1),(0),(0,5) iv)(4),(0),(0),(-0,5)</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">5)Ο ισχυρότερος δεσμός σ υπάρχει σ</span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">τ</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">ο οξu</span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)HCl ii)HI iii)HF iv)HBr </span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">6)O υβριδισμός του ατόμου 5Β στην ένωση (CH3)3B είναι:</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)sp^2 ii)sp iii)sp^3 iv)άγνωστος</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">7)Παραμαγνητικό στοιχείο μπορεί να είναι το:</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ι)30Ζn ii)15P iii)18Ar iv)12Mg</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">8)Περισσότερους π δεσμούς έχει</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)οποιοδήποτε νιτρίλιο ii)ακεταλδεύδη iii)το PVC iv)μεθυλαμίνη</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">9)το 1Η δεν μπορεί να έχει δομή:</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">ι)7s^1 ii)5g^1 iii)2d^1 iv)2p^1</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">10)Ποιο ατομικό τροχιακό από </span></span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: x-small;"> </span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: x-small;">τ</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">α παρακάτω είναι αν<span style="font-family: "arial" , sans-serif;">υ</span>πάρκ</span><span style="background-color: white; color: #222222; font-family: "arial" , sans-serif; font-size: x-small;">τ</span><span style="color: #222222; font-family: "arial" , sans-serif; font-size: 12.8px;">ο :</span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;">i)3px ii)3d ιιι)6s iv)6sx</span></span><br />
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span>
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span></span>
<span style="background-color: white;"><span style="color: #222222; font-family: "arial" , sans-serif;"><span style="font-size: 12.8px;"><br /></span></span></span></div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-35050662811982337992016-12-14T01:00:00.001-08:002016-12-14T02:44:00.000-08:00Γερό στομάχι...<div dir="ltr" style="text-align: left;" trbidi="on">
<b>Για να μαθαίνουμε και λίγο διαφορετικά πράγματα:</b><br />
<br />
<b><a href="http://www.esophagus.gr/%CF%86%CF%85%CF%83%CE%B9%CE%BF%CE%BB%CE%BF%CE%B3%CE%AF%CE%B1-%CF%83%CF%84%CE%BF%CE%BC%CE%AC%CF%87%CE%BF%CF%85">Ο βλεννογόνος του στομάχου έχει διαφορετική σύνθεση κυττάρων αναλόγως με τις μοίρες του. Έτσι, τα τοιχωματικά κύτταρα βρίσκονται στον θόλο και την κεντρική μοίρα του σώματος και εκκρίνουν υδροχλωρικό οξύ (HCl) και ενδογενή παράγοντα, τα κύρια κύτταρα (chief cells) βρίσκονται στο περιφερικό σώμα και εκκρίνουν πεψινογόνο, τα κύτταρα G βρίσκονται στο άντρο και εκκρίνουν γαστρίνη, ενώ τα βλεννοκύτταρα βρίσκονται στο άντρο και το θόλο και εκκρίνουν βλέννη και πεψινογόνο. Η γαστρική έκκριση κατά τη νηστεία ποικίλει μεταξύ 500 και 1500mL την ημέρα. Μετά από κάθε γεύμα περίπου 1000mL εκκρίνονται στον αυλό</a>.</b><br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgDIGz8EAB-OI88myto4Ahckq5YuHsuQB13q-4qDs569-OxMnkxzz414wAZnwWpz5yvb-XqIwE800N9HlTmzccrm9XOsD7a_75Ewt1v53SJXu2C960oVpcS3cOrQzXSKx4YgtIVXghnQoyh/s1600/%25CF%2583%25CF%2584%25CE%25BF%25CE%25BC%25CE%25B1%25CF%2587%25CE%25B9.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgDIGz8EAB-OI88myto4Ahckq5YuHsuQB13q-4qDs569-OxMnkxzz414wAZnwWpz5yvb-XqIwE800N9HlTmzccrm9XOsD7a_75Ewt1v53SJXu2C960oVpcS3cOrQzXSKx4YgtIVXghnQoyh/s320/%25CF%2583%25CF%2584%25CE%25BF%25CE%25BC%25CE%25B1%25CF%2587%25CE%25B9.png" width="241" /></a></div>
Σε ένα άδειο στομάχι φυσιολογικής όμως θερμοκρασίας που έχει τοποθετηθεί δαχτυλίδι για να μην υπάρχει διαρροή υπάρχει γαστρικό υγρό όγκου 2l και συγκέντρωσης σε ΗCl 2M.Λόγω κρίσης και μη έχοντας να κάνει κάτι άλλο ο ασθενής πίνει νερό ζεστό νερό θερμοκρασίας 36,6 C με σταθερή παροχή 10ml/s.Αν είναι γνωστό ότι το συγκεκριμένο δαχτυλίδι μπορεί να αντέξει γαστρικό υγρό μέγιστου όγκου Vmax=4l να βρεθούν:<br />
a)Για πόσο χρόνο μπορεί να πίνει νερό ο ασθενής.<br />
β)Η ποιοτική γραφική παράσταση του PH-t του γαστρικού υγρού.<br />
γ)Ο ρυθμός που πρέπει να παράγει υδροχλώριο το στομάχι αν θέλουμε να ισχύει ΔΡΗ/Δt=0<br />
Μόλις κατάλαβε ο ασθενής ότι κάτι δεν πάει καλά σταματάει να πίνει νερό και καταπίνει ασπιρίνες <img alt="" height="135" src="data:image/png;base64,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" width="200" /> οπότε μετά από λίγο διαλύονται οι ασπιρίνες στο πρισμένο στομάχι του ασθενούς έχοντας τελική συγκέντρωση σε ασπιρίνη 0,001Μ.<br />
Αν η ασπιρίνη συμπεριφέρεται σαν μονοπρωτικό οξύ με Κα=10^-4 στους 36,6 C να βρεθεί ο βαθμός ιοντισμού της ασπιρίνης στο τελικό διάλυμα αν συνεχίζει να ισχύει η σχέση ΔΡΗ/Δt=0.<br />
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H άσκηση αφιερώνεται στον φίλο μου και συνάδελφο Γιάννη Λαμπρόπουλο που φέτος κάνει και Βιολογία Κατεύθυνσης Γ Λυκείου.</div>
Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0tag:blogger.com,1999:blog-1297224820132880720.post-25254695902268261792016-12-13T14:25:00.001-08:002016-12-13T15:11:52.399-08:00Ρυθμιστικό ή όχι;<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiLuxTtSRdywtTkMnh9QHO0Y_6IKnG26KrYoQCWJ_n0uiupnJW-kl8vdAvIg_OTN9drCgVePQ25SaR0VUWzCVR_5fQzfmUUmeIpjc2BYyuWaA_KRaSyrXj8pPCSuDNE83nbavMRQgB9aOb/s1600/%25CF%2581%25CF%2585%25CE%25B8%25CE%25BC%25CE%25B9%25CF%2583%25CF%2584%25CE%25B9%25CE%25BA%25CE%25AC.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiiLuxTtSRdywtTkMnh9QHO0Y_6IKnG26KrYoQCWJ_n0uiupnJW-kl8vdAvIg_OTN9drCgVePQ25SaR0VUWzCVR_5fQzfmUUmeIpjc2BYyuWaA_KRaSyrXj8pPCSuDNE83nbavMRQgB9aOb/s320/%25CF%2581%25CF%2585%25CE%25B8%25CE%25BC%25CE%25B9%25CF%2583%25CF%2584%25CE%25B9%25CE%25BA%25CE%25AC.png" width="192" /></a></div>
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Το Α στην παραπάνω κλεψύδρα μπορεί να είναι το:</div>
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a)ΟΗ β)F γ)CN δ)ClO4 ε)CH3Ο στ)HS ζ)ΗSO4</div>
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Να γίνει το ποιοτικό διάγραμμα του PH-t του κάτω διαλύματος της κλεψύδρας σε κάθε περίπτωση και να εξηγηθεί ποιο διάλυμα είναι τελικά ρυθμιστικό.</div>
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Για το ΗF Ka=10^-4 για το HCN Ka=10^-10 ενώ για το Η2S K1=10^-7 και Κ2=10^-12 για το Η2SO4 K2=10^-2 η θερμοκρασία των διαλυμάτων 25 C και Κw=10^-14.</div>
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Χρήστος Ελευθερίουhttp://www.blogger.com/profile/14387403369103398277noreply@blogger.com0