|
|
(267 mellanliggande sidversioner av 4 användare visas inte) |
Rad 1: |
Rad 1: |
| == [[Matte på öppet hus]] ==
| | __NOTOC__ |
|
| |
|
| == Ämnesövergripande samarbete matematik engelska == | | {{sway | [https://sway.com/myUNCB8ZIICKh9jn?ref{{=}}Link Inledning] }} |
|
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|
| [http://www.khanacademy.org/video/algebra--slope?playlist=Algebra exempel på film] på Khan där man kan välja och editera undertexter.
| | == Taluppfattning, aritmetik och algebra == |
|
| |
|
| == Allmänt ==
| | [[File:algebraic equation notation.svg|thumb|right|Algebraic expression notation:<br/> 1 – power (exponent)<br/> 2 – coefficient<br/> 3 – term<br/> 4 – operator<br/> 5 – constant term<br/> ''x'' ''y'' ''c'' – variables/constants]] |
|
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|
| * Miniräknare? [http://www.prim.su.se/matematik/kurs_1/lararinfo_kurs1c.pdf Instruktionen till Nationella provet] säger att digitala hjälpmedel (dator) är tillåtet på provet.
| | === [[Tal och talmängder]] === |
| * Ma 1c.[http://www.skolverket.se/forskola_och_skola/gymnasieutbildning/2.2954/amnesplaner_och_kurser_for_gymnasieskolan_2011/subject.htm?subjectCode=MAT&courseCode=MATMAT01c#anchor_MATMAT01c Kursplan]'
| |
| * Matte A kursen finns på [http://sv.wikibooks.org/wiki/Matematik/Matematik_A Wikibooks].
| |
|
| |
|
| == Grovplanering == | | === [[Negativa tal]] === |
|
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| TEINF11 Matematik 1c, period 1, 2 (4 lekt/vecka)
| | === [[Tal i bråkform]] === |
|
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|
| Vi använder Libers matematikbok Matematik M1c, av Sjunnesson, Holmström, Smedhamre. Innehållsrubrikerna nedan är kapitel i boken.
| | === [[Faktorisering]] === |
|
| |
|
| '''Vecka Innehåll'''
| | === [[Primtal|Primtal]] === |
| 34-36 Taluppfattning och aritmetik
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| 37-40 Agebra och ekvationer
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| 41-42 Geometri
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| 43 MD+ Geometri
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| 44 Höstlov
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| 45-47 Samband och förändring
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| 48-50 Sannolikhet och statistik
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| 51-1 Jullov
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|
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|
| == Extramatte == | | === [[Delbarhet|Delbarhet]] === |
|
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| '''Mål'''
| | === [[Potenser]] === |
|
| |
|
| Repetera det som hänt under veckan så att du hänger med.
| | === [[Positionssystemet och olika talbaser|Talbaser]] === |
|
| |
|
| '''Hur'''
| | == Algebra == |
|
| |
|
| Lösa alla svarta uppgifter. Prata om de svårigheter som kan ha varit.
| | === [[Begrepp inom algebran]] === |
|
| |
|
| '''Mål'''
| | === [[Algebraiska uttryck|Algebraiska uttryck]] === |
|
| |
|
| Repetera grunder
| | === [[Skapa uttryck]] === |
|
| |
|
| '''Hur'''
| | === [[Algebra och modeller]] === |
|
| |
|
| Testerna i boken
| | === [[Omskrivning av formler]] === |
| * Jobba metodiskt med ett avsnitt i taget.
| |
| * Interaktiva uppgifter finns på denna sida.
| |
|
| |
|
| == Miniräknare == | | === [[Ekvationer]] === |
|
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|
| <html><script type="text/javascript" src="http://cdn.widgetserver.com/syndication/subscriber/InsertWidget.js"></script><script type="text/javascript">if (WIDGETBOX) WIDGETBOX.renderWidget('e63a9ee1-4e1c-4319-a84e-8ddf84e945d5');</script><noscript>Get the <a href="http://www.widgetbox.com/widget/whizz-scientific-calculator">Maths-Whizz Scientific Calculator</a> widget and many other <a href="http://www.widgetbox.com/">great free widgets</a> at <a href="http://www.widgetbox.com">Widgetbox</a>! Not seeing a widget? (<a href="http://support.widgetbox.com/">More info</a>)</noscript></html>
| | === [[Grafisk ekvationslösning]] === |
|
| |
|
| | === [[Linjär olikhet]] === |
|
| |
|
| Vi behöver inte skaffa räknare. Allt man kan göra på räknaren gör man lika bra eller bättre på datorn och datorn har vi alltid på lektionerna.
| | === [[Potensekvationer]] === |
|
| |
|
| Tidigare var miniräknaren nödvändig på nationella provet men från och med i år är det tillåtet att använda datorn på nationella provet.
| | === [[Problemlösning med ekvationer Ma1c |Problemlösning med ekvationer]] === |
|
| |
|
| Vi behöver göra vissa begränsningar av datorns kommunikationsförmåga under provet:
| | === [[Repetition av Ma1C Aritmetik och Algebra|Repetition]] === |
| * Nätverket stängs eller får nytt lösenord den aktuella dagen.
| |
| * Du stänger skype, msn, facebook.
| |
| * Du stänger ner nätverket och Bluetooth på din dator.
| |
| * Du ser till att inte öppna anteckningar eller sådant som kan uppfattas som fusklappar.
| |
| * Du sitter med skärmen fullt synlig och provvakten sitter bakom eleverna så det blir fullt synligt vad som görs på datorn.
| |
| | |
| Om vi gör på detta sätt har vi begränsat möjligheterna till otillåten datoranvändning på de sätt vi kan. Om vi trots detta misstänker fusk kan vi analysera datortrafiken på skolans nät.
| |
| | |
| Miniräknare i datorn:
| |
| | |
| * kalkylatorn i Windows, start - program - tillbehör
| |
| * WolframAlpha.org
| |
| * GeoGebra
| |
| * Excel
| |
| * Google Docs - kalkylark
| |
| * http://www.widgetbox.com/ som du ser ovan
| |
| | |
| = Kapitel 1 - [[Taluppfattning och Aritmetik]] =
| |
| | |
| = Kapitel 2 - Algebra =
| |
| | |
| == Lektion 11 - Räknelagar ==
| |
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| == Lektion 12 - Algebraiska uttryck ==
| |
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| == Lektion 13 - Formler == | |
| | |
| '''Genomgång:''' Gör uppgifterna 2303, 2310 och 2312.
| |
| | |
| == Lektion 14 - Förenkling av uttryck ==
| |
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| Fredag v 37
| |
| | |
| Uppgift 2409 hade en fråga om koefficient som vi inte hittade förklarad i boken. Därför en [[Media:Koefficient.xls|Excelfil]] som förklarar och visar med hjälp av taxiexemplet.
| |
| | |
| == Lektion 15 - 2.5 Faktorisering ==
| |
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| Fredag v 38
| |
| | |
| '''Genomgång'''
| |
| | |
| * 15/20 =
| |
| * (4x+8) / 4 =
| |
| * 2cd<sup>2</sup> - 6c<sup>2</sup>d =
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| * (6a<sup>2</sup> - 18ab) / 12a
| |
| | |
| '''Gör någon gruppuppgift.'''
| |
| | |
| # Uppgift 38 fr kapitel 1 i boken. Storleksordna talen utan hjälp av miniräknare eller dator: 2<sup>24</sup>, 3<sup>18</sup>, 4<sup>15</sup>, 5<sup>6</sup>
| |
| # Är det så att hälften är lika med två tredjedelar av tre fjärdedelar? Förklara på lite olika sätt. var beredda att redovisa en förklaring.
| |
| | |
| '''Gallup: är vi hjälpta av dessa?'''
| |
| | |
| http://www.matteboken.se/lektioner/matte-1
| |
| | |
| http://www.matteguiden.se/
| |
| | |
| == Lektion 16 - Ekvationer ==
| |
| | |
| ''Ekvationer är ett omfattande avsnitt som vi kommer ägna mestadelen av veckan åt.''
| |
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| Måndag - Fredag v 39
| |
| | |
| == Lektion 17 - Omskrivning av formler ==
| |
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| Måndag v 40
| |
| | |
| == Lektion 18 - Olikheter ==
| |
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| Tisdag v 40
| |
| | |
| * handuppräckning, vem har pluggat matte i helgen?
| |
| * histogram för klassen
| |
| * har jag gått för fort fram
| |
| * titta på snittet
| |
| * Åtgärder:
| |
| ** alla på extramatten
| |
| ** fem elever schemalagda på mattestugan (Ja det blir tre extratimmar på onsdag
| |
| ** typuppgifter
| |
| ** en bunt filmer och länkar
| |
| | |
| == Lektion 19 - Repetition ==
| |
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| Onsdag v 40
| |
| | |
| == Prov - Kapitel 1 och 2 ==
| |
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| Provet är på fredag i vecka 40
| |
| | |
| jag rekommenderar att du löser så många "blandade uppgifter" som möjligt. jag har även ett övningsblad med facit som du kan hämta på mitt rum. Missa inte att bläddra igenom boken och plugga på alla definitioner, satser och bevis.
| |
| | |
| '''Filmer att repetera aritmetik med:'''
| |
| | |
| <youtube>8Kug5yke9TY</youtube>
| |
| | |
| <youtube>dd7MB-s_7Ec</youtube>
| |
| | |
| <youtube>urwq1tCL3GU</youtube>
| |
| | |
| <youtube>GRwod6hAJe8</youtube>
| |
| | |
| <youtube>6Z0y3NyPNkw</youtube>
| |
| | |
| <youtube>aM053jcgxBM</youtube>
| |
| | |
| <youtube>3VhdcnEUHAk</youtube>
| |
| | |
| <youtube>MEz_hMAuLDs</youtube>
| |
| | |
| <youtube>ioFfCg9MwtY</youtube>
| |
| | |
| <youtube>FMo_CLyI8wU</youtube>
| |
| | |
| <youtube>maG853NggF4</youtube>
| |
| | |
| <youtube>fja5pPmLoLY</youtube>
| |
| | |
| <youtube>2Wd9MILAtzI</youtube>
| |
| | |
| '''Filmer att repetera algebra med:'''
| |
| | |
| <youtube>6JBVYoNmUJw</youtube>
| |
| | |
| <youtube>ok4gAxSWPQM</youtube>
| |
| | |
| <youtube>dwzEVOvIUBU</youtube>
| |
| | |
| <youtube>L2IzmTn0io0</youtube>
| |
| | |
| <youtube>qdoptxLkz5M</youtube>
| |
| | |
| <youtube>pBVsypHrWrU</youtube>
| |
| | |
| <youtube>fm-UO6ECUm8</youtube>
| |
| | |
| <youtube>BpDBmZou1jA</youtube>
| |
| | |
| = Kapitel 3 - Geometri =
| |
| | |
| 14 delavsnitt på två veckor?? Vi behöver mer tid.
| |
| | |
| Prov efter kapitlet?
| |
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| Nåväl, vi siktar på att göra kapitel 3.1-3.2 under vecka 41 och 3.3-3.4 under vecka 42.
| |
| | |
| == lektion 20 - Geometriska satser och bevis ==
| |
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| Första delen av Kapitel 2.1: Första lektionen gjorde vi sidorna 112-117 och arbetade till och med uppgift 3122.
| |
| | |
| Vi kommer att behöva mer tid för satser och befivis och även för definitioner och begrepp, ex likformig, biskektris mm.,
| |
| | |
| '''Definition:'''
| |
| En rak vinkel är 180<sup>o</sup>
| |
| | |
| '''Definition:'''
| |
| Två linjer är parallella om de likbenägna vinklarna är lika stora.
| |
| Alternatvinklar
| |
| Sidovinklar
| |
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| '''Satser:'''
| |
| Vertiklavinklar
| |
| Likbelägna vinklar
| |
| Alternatvinklar
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| Sidovinklar
| |
| | |
| '''Övning:''' Titta på alla [http://www.geogebra.se/ma_a/geometri/vinklar/vinklar/vinklar_t_vl.html filmer om vinklar] på Geogebra
| |
| | |
| '''Sats:'''
| |
| Vinkelsumman i en triangel är 180<sup>o</sup>
| |
| | |
| '''Begrepp:'''
| |
| Likbent triangel
| |
| Liksidig triangel
| |
| Bisektris
| |
| | |
| == Lektion 21 - Geometriska figurer ==
| |
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| Kvadrat
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| Romb
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| Parallelltrapets
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| Triangel
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| Cirkel
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| Cirkelsektor
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| Prisma
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| Cylinder
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| Pyramid
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| Kon
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| Klot
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| '''Cirkelns area'''
| |
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| [http://www.geogebratube.org/student/m279 EN mycket bra GGB]
| |
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| '''Triangelns area'''
| |
| | |
| Triangelns tyngdpunkt ligger i skärningspunkten för bisektriserna. Testa på [http://www.geogebra.se/ma_b/geometri/triangel_tyngdpunkt_t.html geogebra].
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| | |
| Arean för en triangel är basen * höjden / 2. Det gäller även om höjden faller utanför basen. Se exempel i geoGebra nedan:
| |
| | |
| <ggb_applet width="858" height="500" version="3.2" ggbBase64="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" framePossible = "true" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "true" showToolBar = "true" showToolBarHelp = "true" showAlgebraInput = "true" allowRescaling = "true" />
| |
| | |
| All bilder i galleriet nedan är CC [http://commons.wikimedia.org/wiki/Main_Page Från WikiMedia Commons].
| |
| <gallery>
| |
| Fil:1000px-Isosceles_triangle_area.svg.png
| |
| Fil:Triangle_area.gif
| |
| Fil:1000px-Triangle.Right.svg.png
| |
| Fil:1000px-Triangle.Isosceles.svg.png
| |
| Fil:1000px-Triangle.Equilateral.svg.png
| |
| Fil:Bisectrices.png
| |
| Fil:1000px-Square_definition.svg.png
| |
| Fil:1000px-Square_-_geometry.svg.png
| |
| Fil:1000px-Scale_one_to_thousand_volume.svg.png
| |
| Fil:1000px-CubeLitre.svg.png
| |
| Fil:1000px-Circle_area_by_reassembly.svg.png
| |
| Fil:Equation_in_circle_proved_by_the_method_of_indivisibles.gif
| |
| Fil:1000px-Volume_cylindre_parallelepipede_rectangle.svg.png
| |
| Fil:640px-PSM_V54_D324_Optical_illusion_with_cubes.png
| |
| Bild:640px-Fractal heptahedron.png | Fraktal figur
| |
| </gallery>
| |
| | |
| '''Bevis: Vinkelsumman i en triangel är 180<sup>o</sup>'''
| |
| | |
| * GeoGebras hemsida har ett [http://www.geogebra.se/ma_a/geometri/triangel_vinkelsumma_bevis/triangel_vinkelsumma_bevis/triangel_vinkelsumma_bevis_t_vl.html bevis att vinkelsumman är 180<sup>o</sup>]
| |
| *[http://www.mathopenref.com/triangleinternalangles.html testa vinkelsumman i praktiken]
| |
| | |
| '''Bevis:'''
| |
| Gör bevisen på sidan 116.
| |
| | |
| '''Läs mer:'''
| |
| | |
| * [http://www.webbmatte.se/display_page.php?id=150&on_menu=802&page_id_to_fetch=2026&lang=swedish&no_cache=1209563336 Webbmatte om geometriska figurer]
| |
| | |
| == Lektion 22 - Pythagoras sats ==
| |
| | |
| '''Bevis:'''
| |
| | |
| [http://www.webbmatte.se/display_page.php?id=150&on_menu=802&page_id_to_fetch=2027&lang=swedish&no_cache=8585192 Webbmatte om Pythagoras sats]
| |
| [http://www.walter-fendt.de/m14e/pyththeorem.htm Fendt nr 2]
| |
| | |
| [http://www.walter-fendt.de/m14e/pyth2.htm Pythagoras, Walter Fendt]
| |
| | |
| <Gallery>
| |
| Fil:1000px-Pythagorean_theorem.svg.png
| |
| Fil:Pythagorean_theorem.jpg
| |
| Fil:443px-Perigal_TdP.gif
| |
| Fil:1000px-Pythagorean.svg.png
| |
| Fil:Pythagorean_Theorem_Proof.gif
| |
| Fil:1000px-Pythagorean_proof.svg.png
| |
| Fil:Pythagoras-2a.gif
| |
| </Gallery>
| |
| | |
| Även här kommer bilderna från commons.wikimedia.org
| |
| | |
| '''Uppgift:''' Titta själv igenom Geoegebras [http://www.geogebra.se/ma_b/geometri/pythagoras_sats_geometrisk_motivering_t.html film om pythagoras sats].
| |
| | |
| '''Uppgift:''' Hitta ditt eget favoritbevis på nätet och visa för oss andra.
| |
| '''
| |
| Bra övning:''' [http://www.geogebratube.org/student/m503 Upptäck Pythagoras] i GeoGebra.
| |
| | |
| == Lektion 23 - Likformighet ==
| |
| | |
| == Lektion 24 - Trigonometri ==
| |
| | |
| [[Fil:1000px-Trigono_sine_en2.svg.png|thumb|CC [http://commons.wikimedia.org/wiki/User:Dnu72 By]]]
| |
| [[Fil:1000px-Sinus.svg.png|thumb|CC Wikimedia.org]]
| |
| | |
| [http://www.geogebra.se/ma_a/trigonometri/sinv_ratvinklig_trigonometri_t.html GeoGebra om Sinus]
| |
| | |
| [http://sv.wikipedia.org/wiki/Sinus Läs mer om sinus på Wikipedia].
| |
| | |
| [http://en.wikipedia.org/wiki/Sine Engelska Wikipedia är ännu bättre på sinus].
| |
| | |
| http://www.walter-fendt.de/m14e/sincostan_e.htm Walter Fendt om trigonometri
| |
| | |
| [http://www.wolframalpha.com/input/?i=sine Detta svar får du om du skriver in sine på Wolfram Alpha]
| |
| | |
| '''Definitioner:'''
| |
| | |
| * Motstående katet
| |
| * Närliggande katet
| |
| * Sin v = motstående katet / hypotenusan
| |
| * Cos v = närliggande katet / hypotenusan
| |
| * Tangens v = motstående katet / närliggande katet
| |
| | |
| '''Digitalt'''
| |
| | |
| * Grader och radianer
| |
| * Miniräknare eller dator
| |
| * Datorns räknare
| |
| * [[Media:Sinus.xls|Excel - så här kan det se ut]]
| |
| | |
| '''Definition: Ta reda på vinkeln'''
| |
| | |
| Om y = roten ur x så är 'y''<sup>2</sup> = ''x''. Dessa två hänger ihop och den ena kan ses som den omvända av den andre. Detta kallas inversen, den inversa funktionen.
| |
| | |
| På samma sätt som det finns en invers funktion till kvadraten på ett tal, nämligen roten ur så finns det en invers funktion till sinus och cosinus.
| |
| | |
| Om sin v = a/h då är v = arcsin(a/h) eller sin<sup>-1</sup>(a/h)
| |
| Om cos v = b/h då är v = arccos(b/h) eller cos<sup>-1</sup>(b/h)
| |
| 0ch på samma sätt för tangens
| |
| | |
| == Lektion 25 - Vektorer ==
| |
| | |
| '''vad är vektorer och vad ska man ha dem till?'''
| |
| | |
| http://sv.wikipedia.org/wiki/Vektorgrafik
| |
| | |
| [http://www.walter-fendt.de/m14e/vector3d.htm Walter om vektorer]
| |
| | |
| Vad är det för likhet mellan rebubbled och bilspelet xx?
| |
| | |
| Hur räknar man på kulans väg i CS?
| |
| | |
| Fysikerna ritar pilar för kraft och hastighet men inte för area eller temperatur.
| |
| | |
| Titta på Physics.fla
| |
| | |
| '''Den vetgirige''' tar en titt på [http://en.wikipedia.org/wiki/B%C3%A9zier_curve engelska] och [http://sv.wikipedia.org/wiki/B%C3%A9zier-kurva svenska] wikipedia om Bezierkurvor vilka används frekvent inom datorgrafiken.
| |
| | |
| Kolla vektorerna på fysiksidan.
| |
| | |
| === Vad är en vektor? ===
| |
| | |
| Sid 144-147.
| |
| | |
| Definition: vektor
| |
| | |
| '''GeoGebra:''' [http://www.geogebra.org/en/upload/files/UC_MAT/christybredestege/vector_for_dummies.html "Basic Vector Addition and Subtraction for Dummies"]
| |
| | |
| Definition: motsatta vektorer
| |
| | |
| Sats: Parallella vektorer
| |
| | |
| Definition: storleken av en vektor
| |
| | |
| '''''Mån 10.05-10.55'''''
| |
| | |
| === Addition av vektorer ===
| |
| | |
| Sid 148-150.
| |
| | |
| Sats: Kommutativa lagen för vektorer
| |
| <br>
| |
| <ggb_applet width="960" height="490" version="3.2" ggbBase64="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" framePossible = "true" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "true" showToolBar = "true" showToolBarHelp = "true" showAlgebraInput = "true" allowRescaling = "true" />
| |
| <br> | | <br> |
| | [[File:Commutative Addition.svg|300px|Commutative Addition]] |
| | {{clear}} |
|
| |
|
| | == Geometri == |
| | [[Fil:Chinese pythagoras.jpg|300px|höger]] |
|
| |
|
| === Subtraktion av vektorer === | | === [[Definition sats och bevis Ma1c|Definition, sats och bevis]] === |
| | |
| Sid 151-154.
| |
| | |
| Definition: Subtraktion av vektorer
| |
| <br>
| |
| <ggb_applet width="679" height="385" version="4.0" ggbBase64="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" framePossible = "true" showResetIcon = "false" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" />
| |
| <br>
| |
| Ovanstående GGB är skapad av Håkan Elderstig fria att använda enligt Creative Commons. Den finns att laddas ner från [http://www.geogebratube.org/material/show/id/2368 GeoGebratube].
| |
| <br>
| |
| | |
| === Vektorer i koordinatsystem ===
| |
| | |
| Sid 155-158.
| |
| | |
| Definition: Basvektorer | |
| | |
| Sats: Räkneregler för vektorer
| |
| | |
| Sats: Storleken av en vektor
| |
| | |
| '''''Fredag: Diagnos på hela kapitel 3'''''
| |
| | |
| === 3.4 Vektorer och trigonometri===
| |
| | |
| Sid 159-163.
| |
| | |
| == [[GeoGebra]] ==
| |
| | |
| Länken går till min sida med GeoGebra-grejor.
| |
| | |
| Jag vill att ni ska ladda ner programmet och börja lära er det. Vi kommer att lära oss tillsammans för jag är själv ingen fena på det.
| |
| | |
| Här finns [http://www.geogebrainstitut.se/resurser/resurser.asp en GeoGebrafil med addition av vektorer]. Lek med den och försök göra något med vektorer och trigonometri.
| |
| | |
| == Kunskapskontroll kapitel 3 ==
| |
| | |
| Tyvärr var inte resultaten på Diagnos 6 och 7 tillräckligt bra för att vi ska kunna känna oss helt klara. Ni kommer därför att få en uppgift som ni ska göra individuellt och lämna in. Ni får göra den hemma eller i skolan på er lediga tid. Det är lämpligt att ni samarbetar. Uppgiften är att du ska lämna in snygga fullständiga lösningar på diagnos 6 och 7. Detta ska vara klart senast fredagen den 11 november.
| |
| | |
| Ni kan få papper på måndag men [[Media:Veckodiagnos_6_i_matematik_1c.pdf|Diagnos sex finns här]] och [[Media:Veckodiagnos_7_version2.pdf|Diagnos 7 finns här]] om du vill börja med en gång.
| |
| | |
| Detta är en kombination av hemtenta och samarbetsövning.
| |
| | |
| '''Uppgiften:''' Du ska göra om diagnos 6 och 7. Du kan jobba hemma eller på rasterna i skolan. Du ska jobba själv men ni får gärna samarbeta. Det är inget problem om det kommer in liknade lösningar men jag accepterar inga exakta kopior.
| |
| | |
| '''Krav för godkänt:''' Minst åtta poäng på varje diagnos. Extraberöm för snygga lösningar.
| |
| | |
| '''Mål:'''
| |
| * Ni ska kunna geometrin
| |
| * Ni ska öva er på att samarbeta och repetera med hjälp av boken.
| |
| * Ni ska upptäcka fördelarna med att plugga tillsammans
| |
| | |
| '''Snygga lösningar:'''
| |
| * Skriv alla dina lösningar på rutade papper i A4-format.
| |
| * Skriv ditt namn på varje blad. Skriv lösningens nummer.
| |
| * Använd luftiga marginaler.
| |
| * Ha luft mellan uppgifterna.
| |
| * Skriv av det viktiga från uppgiften.
| |
| * Använd figurer.
| |
| * Förklara vilka satser och formler du använder
| |
| * Redovisa dina beräkningar
| |
| * Stryk under svaret eller skriv "Svar:"
| |
| | |
| = Kapitel 4 - [[Samband och förändring]] = | |
|
| |
|
| = Kapitel 5 - Sannolikhet och statistik = | | === [[Geometriska satser och bevis ma1c|Geometriska satser och bevis]] - Vinklar och vinkelsumma === |
|
| |
|
| Kapitel 5 handlar om Sannolikhet och statistik och består av nio delar (en del har teori, exempel och uppgifter).
| | === [[Grupparbete Geometri Ma1c]] Pythagoras sats === |
|
| |
|
| == 5.1 Hur stor är chansen? == | | === [[trigonometri_Ma1c|Trigonometri (sinus, cosinus, tangens)]] === |
|
| |
|
| '''Intro'''
| | === [[Vektorer|Vektor och dess representation (skalär/vektor)]] === |
|
| |
|
| [http://www.khanacademy.org/video/basic-probability?playlist=Probability Khan Academy] om Probability | | === [[Addition och subtraktion av vektorer|Addition, subtraktion och multiplikation av vektorer]] === |
|
| |
|
| <html><script type="text/javascript" src="http://s3.www.universalsubtitles.org/embed.js">
| | === [[NP muntligt övning]] === |
| (
| |
| {"base_state": {}, "video_url": "http://www.youtube.com/watch?v=uzkc-qNVoOk"}
| |
| )
| |
| </script>
| |
| </html>
| |
|
| |
|
| Här har jag börjat skriva undertexter (subtitles) på svenska. Det är enkelt, bara att skaffa ett konto på Universal Subtitles och sätta igång. Vi kommer att göra övningar på detta så småningom, där ni får en film var att översätta.
| | === [[Problemllösning med trigonometri och vektorer]] === |
| | |
| | [[Fil:TrigonometryTriangle.svg|250px|vänster]]<br /> |
| | <br /> |
|
| |
|
| === Sidorna 244-248 ===
| | {{Gleerups|[[Media:Kapitel_2_Gleerups_Ma_1c.pdf|Lösningar till Gleerups kapitel 2 (pappersboken)]]}} |
|
| |
|
| fre - hemdiagnos denna fredag.
| | {{clear}} |
|
| |
|
| '''Definition:''' | | == Förändring och procent == |
| | [[File:Proportional variables.svg|thumb|Variable ''y'' is directly proportional to the variable ''x''.]] |
|
| |
|
| Sannolikheten för en händelse = antalet gynnsamma utfall / antal möjliga utfall
| | === [[Procent Ma1c|Procentbegreppet, promille, ppm, procentenheter]] === |
|
| |
|
| med P(A) menas sannolikheten för att händelse A ska inträffa.
| | === [[Förändringsfaktor]] === |
| A kan bestå av flera händelser, exempel vis att slå över tre på en tärning.
| |
|
| |
|
| P(A eller B) = P(A) + P(B)
| | === [[Index, lån, amortering]] === |
|
| |
|
| == 5.2 Oberoende händelser == | | == Funktioner och samband == |
|
| |
|
| === Sidorna 249-251 === | | === [[Funktionsbegreppet|Funktion, definitions- och värdemängd]] === |
|
| |
|
| fre
| | === [[Representationer av funktioner]] === |
|
| |
|
| '''exempel 1, sid 249'''
| | === [[Skillnaden mellan ekvation, olikhet, algebraiskt uttryck, funktion]] === |
|
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|
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| | === [[Proportionalitet]] === |
| <br>
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| Kolla gärna Mikael Bondestam som förklarar kast med två tärningar = sannolikhet vid oberoende händelser:
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| <Youtube>EANNJSjare</Youtube>
| | === [[Linjära funktioner|Egenskaper hos linjära funktioner]] === |
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| <br>
| | === [[Potensfunktioner]] === |
| Här kommer en bild som är lämplig att projicera och sedan rita på om man diskuterar sannolikheter vid två tärningsslag:
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| <br>
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| <br>
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| == Khan Academy == | | === [[Exponentialfunktioner Ma1c|Exponentialfunktioner]] === |
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| Däremot får alla gå in en kort stund på '''[http://www.khanacademy.org/ KhanAcademy]''' på slutet av lektionen. Alla ska välja mig som coach så jag kan se hur det går. När du gör övningarna kan du klicka på Add coach längst ned på sidan. Gör det och adda mig.
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| Mitt ID är hakan.elderstig@gmail.com
| | === [[Mönster och talföljder]] === |
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| == 5.3 Händelser i flera steg ==
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| === Sidorna 252-255 ===
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| må
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| Khan om oberoende händelser i flera steg:
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| <youtube>xSc4oLA9e8o</youtube>
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| Sedan en kul grej bara.
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| Rulla tärning från http://www.geogebratube.org/student/m712:
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| <br>
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| Mikael Bondestam om träddiagram för händelser i flera steg:
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| <br> | | <br> |
| <youtube>qN64hazQ5-Q</youtube>
| | [[Fil:Doubling time vs half life.svg|400px|vänster]] |
| | | {{clear}} |
| === Beroende händelser i flera steg, 256-258 ===
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| ti
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| MB
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| === Komplementhändelse, 259-260 ===
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| ti
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| [http://sv.wikipedia.org/wiki/De_M%C3%A9r%C3%A9s_problem De Meres problem]
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| <ggb_applet width="835" height="381" version="4.0" ggbBase64="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" framePossible = "true" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" />
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| | |
| == Repetition inför provet ==
| |
| | |
| onsdag
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| [[Media:Lösningar_till_några_uppgifter_vi_övade_på_inför_provet_på_geometri,_funktioner_och_sannolikhet.pdf|Några lösningar till uppgifter vi gjorde på sista lektionen]]. | |
| | |
| '''Khan Academy'''
| |
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| * [http://www.khanacademy.org/exercise/trigonometry_1 Khan Academy om Trigonometri]
| |
| * [http://www.khanacademy.org/exercise/probability_1 Khan uppgifter om Sannolikhet]
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| * [http://www.khanacademy.org/exercise/probability_1 Khan om vektorer]
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| * [http://www.khanacademy.org/exercise/linear_equations_1 Khan om funktioner]
| |
| | |
| '''Veckodiagnos 10'''
| |
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| Detta är en lösning till uppgift 4 på [[Media:Veckodiagnos_10.pdf|veckodiagnos 10]].
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| == Prov kapitel fyra samt mindre delar av 3 och 5 ==
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| fredag
| | == Sannolikhet och statistik == |
| | [[File:Svg-cards-pair.svg|thumb|Tre exempel på pokerhänder med ''ett par'']] |
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| [[Media:Prov_Matte_1c_kapitel_3,_4_och_5,_version_1_2-facit.pdf|Lösningar till provet]] | | === [[Statistik i samhälle och vetenskap|Statistiska metoder i samhället]] === |
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| '''Provgränser'''
| | === [[Oberoende händelse]] === |
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| * Betyg E krävs 12 poäng
| | === [[Beroende händelse]] === |
| * Betyg C krävs dessutom 6 C-poäng
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| * Betyg A krävs 11 C-poäng och 3 A-poäng
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| == 5.4 Hur ofta inträffar en händelse? == | | === [[Spel, risk- och säkerhetsbedömningar]] === |
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| === Relativ frekvens === | | === [[Valet 2018]] === |
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| Sid 262-264
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| Intro från: [http://www.geogebratube.org/student/m784 GGBtube]. Dub'''Fet text'''belklicka för att se hela simuleringen.
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" 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| <br> | | <br> |
| <br>
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| <br>
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| <html><iframe src="http://phet.colorado.edu/sims/plinko-probability/plinko-probability_en.html" width="800" height="600"></iframe></html>
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|
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| === Sidorna 261-266 ===
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|
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| ons
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| Här är det lämpligt med några laborationer. Kanske olika uppgifter som gruperna får redovisa på nätet.
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| == 5.5 Statistik i samhälle och vetenskap ==
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| === Sidorna 267-275 ===
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| fre
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| Här kan man tänka sig att eleverna gör egna undersökningar och redovisar...
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|
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| '''Medelvärde och standardavvikelse'''
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|
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| Fri att använda. Från [http://geogebrainstitut.se/resurser/resurser.asp#MaA GeoGebraInstitutet]
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|
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| === Gapminder - övning ===
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|
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| www.gapminder.org
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|
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| samtidigt som vi kör muntliga nationella prov får elevernas uppgifter på gapminder att jobba med.
| |
|
| |
| === Film - undertexter ===
| |
|
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| En tanke är att eleverna får en film var från Khan Academy och att de gör en översättning till svenska av den engelska undertexten.
| |
|
| |
| == Monty Hall ==
| |
|
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| Lös det teoretiskt eller leta rätt på en lösning på nätet.
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|
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| Praktiskt experiment för att testa om det stämmer.
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|
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| Redovisa
| | [[File:Mikemoral-time stats.jpg|300px|left|Mikemoral-time stats]] |
| | {{clear}} |
|
| |
|
| http://sv.wikipedia.org/wiki/Monty_Hall-problemet
| | == Problemlösning == |
|
| |
|
| == 5.6 Vilseledande statistik == | | === [[Strategier för matematisk problemlösning inklusive användning av digitala medier och verktyg]]. === |
| | === [[Matematiska problem av betydelse för privatekonomi, samhällsliv och tillämpningar i andra ämnen]]. === |
| | === [[Matematiska problem med anknytning till matematikens kulturhistoria]]. === |
|
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| === Sidorna 276-277 === | | == [[Repetition av Ma1C]] == |
|
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|
| må
| | Mest gamla prov, länkar till Khan Academy, etc. |
|
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| == 5.7 Några statistiska lägesmått == | | == Relevansförmågan == |
|
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| === Sidorna 278-282 ===
| | : Vi jobbar på olika sätt med den [[Intro till Global uppvärmning|globala uppvärmningen]]. Vad kan vara mer relevant? |
|
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|
| ti
| | '''Huvuduppgift''': |
| | : [https://wikiskola.se/index.php?title=Intro_till_Global_uppv%C3%A4rmning#Se_filmen_Before_the_Flood Uppgiften som ska lämnas in finns här.] |
|
| |
|
| == [[Nationellt prov Ma1C]] - Onsdagen den 14 december ==
| | '''Alternativ uppgift''': |
| | : [[Relevansuppgift: Globala temperaturavvikelser från 1880 till och med 2014]] |
|
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|
| Behovet av repetition gör att vi kan senarelägga avsnitt 5.6 och 5.7
| | == [[Julemys]] == |
|
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|
| == Muntligt Nationellt prov ==
| | För den händelse du vill öka dina kunskaper och vässa dina förmågor avslutar vi Ma1c med dessa övningar. Det är nyttigheter för var och en men ett måste för er som vill höja era betyg (ni vet om ifall ni ligger nära gränsen). Om ni vill höja er kommer det att komma ett test när skolan börjar i januari. |
|
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| Egna undersökningar och gruppövningar
| | Gå in på denna sida så hittar ni uppgifterna och övningarna: [[Julemys]] |
|
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|
| * Sannolikheterna bakom "Kasta gris"
| | Övningarna består av texter och uppgifter i skön förening. Jobba med ett undersökande arbetssätt. Det kan hända att du har nytta av dina anteckningar, program eller resultat vid bedömingstillfället. |
| * GapMinder
| |