Fokus: Discipline now, greater later - Easy now, suffer later

Discipline now, greater later - Easy now, suffer later
Opsomming:
[size=200][b][color=#ff00ff]Discipline[/color] [color=#00ff00]now[/color]  =  [color=#ff00ff]Greater[/color] [color=#0000ff]later[/color][br][color=#ff0000]Easy[/color] [color=#00ff00]now[/color]    =  [color=#ff0000]Suffer[/color] [color=#0000ff]later[/color][br][br]Ask yourself:[br][list=1][*]What would you [color=#ff00ff]want[/color] from life?[/*][*]What are you willing to [color=#ff0000]sacrifice[/color] to get it?[/*][/list][/b][/size]
Tyd om te reflekteer:
Wat is dit wat jy wil bereik in die lewe en hoekom is dit so belangrik?
Verdere refleksie
Wat is jy bereid om op te offer om dit te bereik?

Bekendstelling van die werkboek

Die metodes wat gevolg word in die werkboek
Kans vir terugvoer
Vertel my 'n bietjie wat is die beste manier wat jy volg om te leer? Hou jy daarvan om dinge te skryf, lees, hoor, om dit self te doen of selfs ander maniere? Of verkies jy 'n kombinasie van die metodes?[br](Jy kan jou antwoord in tik in die spasie hieronder.)

Hoekom is dit belangrik?

Video verduideliking: Hoekom dit belangrik is?
Geskrewe verduideliking: Hoekom dit belangrik is?
Wat ons moet leer word bepaal deur hoekom ons dit moet leer. Ons gaan kyk hoekom ons sekere dinge moet leer en dan daaruit sal ons sien wat daar geleer moet word. Tydens die matriek eindeksamen sal jy die volgende moet kan doen met betrekking tot funksies en hulle grafieke:[br]•      Jy sal die verwantskap tussen die veranderlikes van 'n vergelyking moet kan beskryf.[br]•      Jy sal moet bepaal of 'n vergelyking wel 'n funksie is.[br]•      Jy sal funksie notasie moet kan verstaan en deurmiddel van algebraiese manipulasie funksies moet kan evalueer.[br]•      Jy sal die grafieke van funksie moet kan teken indien jy voorsien word van die formule van die funksie.[br]•      Jy sal die formule van 'n funksie moet kan aflei van die grafiek van die funksie.[br][br]Al hierdie kennis word ook verder ge-eksamineer deur twee verskillende grafieke wat vir jou voorsien word en dan moet jy bepaalde intrepretasies maak. Byvoorbeeld: [br]·       Die formule van die funksies.[br]·       Translasies van die grafieke.[br]·       Die lees van Definisie- en Waardeversamelings.[br]·       Bepaling van snypunte[br]·       Afstand tussen punte.[br]·       Funksie berekeninge soos byvoorbeeld: f(x) - g(x) =1 of selfs f(x) x g(x) ≥0 en nog meer.[br][br]Dit is nogal belangrik om kennis te neem dat hierdie intrepretasie tiepe van vrae al hoe meer 'n fokus is van die eksaminatore. Al hoe meer van die vrae begin hierop fokus omdat jou kennis baie meer geïntegreerd getoets word. So al die vooraf kennis is belangrik in die geval. [br][br]In al die bogenoemde gevalle sal die volgende funksies getoets word: [br]•      Reguit lyn funksies[br]•      Parabool / Kwadratiese funksies[br]•      Hiperbool funksies[br]•      Eksponensiele funksies[br]•      Die Trigonometriese funksies (Sin, Cos en Tan)[br][br]En wat nog?[br]•      Jy sal die inverse van hierdie funksies (uitsluitende die Trignometriese funksies) moet kan bepaal en ook aandui hoe die definisieversameling beperk moet word om die inverse 'n funksie te maak. [br]•      Dit bring ons dan by die Logaritmiese funksie wat deel is van dit wat getoets word.[br][br]Hierdie werkboek gaan deur al die areas werk soos hierbo aangedui.
Kom ons kyk hoeveel het ons geleer

Fokus: Discipline, the one word that makes a big difference

The one word that separates the greats from the average
Discipline: The one word that makes a big difference
Life do not gives you what you [color=#ff0000]want[/color], but rather what you [color=#0000ff]deserve[/color].[br][b][size=100][size=150][color=#9900ff]If:[/color][/size][/size][/b][br][list=1][*]you haven't [color=#ff00ff]work [/color]for it[/*][*]you haven't [color=#ff00ff]sacrifice[/color] for it[/*][*]you haven't [color=#ff00ff]give[/color] your all[/*][/list][b][size=150][color=#9900ff]then:[/color][/size][/b][br][list=1][*]you don't [color=#ff00ff]deserve [/color]it[/*][*]you won't [color=#ff00ff]get [/color]it[/*][/list][br]Nothing can stop you if you don't stop for anything:[br][list=1][*]Show your [color=#0000ff]character[/color][/*][*][color=#0000ff]Never break[/color] your discipline[/*][*]Remain [color=#0000ff]faithful [/color]to yourself and your vision[/*][*]When it gets painful, [color=#0000ff]push [/color]harder[/*][/list][br]Don't ask "[b][size=150][color=#ff0000]Why me?[/color][/size][/b]" rather say "[b][size=150][color=#0000ff]Try me![/color][/size][/b]".[br][br][center][b][size=200][color=#ff0000]Your time will come[/color][/size][/b][/center]
Tyd om te reflekteer:
Wat is dit wat jy wil bereik met wiskunde einde graad 12 en hoekom?
Nog refleksie
Wat is jy bereid om op te offer en te doen om dit te bereik?

Wat is die verskil tussen vergelykings en formules?

Dinge is nie altyd soos dit lyk nie.
Voor ons op die ontdekkingstog gaan moet ons eers stop en 'n paar konsepte vasle. Die eerste konsep is die verskil tussen 'n vergelyking en 'n formule. Kom ons bestudeer eers die volgende twee voorbeelde:[br][list=1][*]Vergelyking: [math]3x+6=0[/math] [/*][*]Formule: [math]y=3x-6[/math][/*][/list][br]Albei voorbeelde het die "=" teken en mag onmiddelik gesien word as vergelykings. Maar daar is duidelike verskille. Kom ons ondersoek die verskille in die volgende werksopdrag.
Kan jy oplos vir x in beide gevalle?
In beide gevalle, kyk wat gebeur as jy x=5 instel.
Opsomming van die ondersoek: Formules is spesiale vergelykings
Geskrewe verduideliking: Formules is spesiale vergelykings
Formules is spesiale tiepe vergelykings en word soms Leterlike vergelykings genoem. Waar gewone vergelykings slegs een veranderlike het, het formules twee of meer veranderlikes. Uit die vorige oefeninge kan ons die volgende afleidings maak:[br][list=1][*]Formules is nie gesik om op te los vir x nie. In 'n poging om dit op te los maak ons maar net x die onderwerp van die formule wat uitgedruk word in terme van y. ([color=#0000ff]Vergelykings met een veranderlike los maklik op vir x.[/color])[/*][*]Formules is meer geskik vir die instel van waardes wat dan 'n waarde toeken aan die ander veranderlike. Ons verwys na invoergetalle wat uitvoergetalle op lewer. ([color=#0000ff]Vergelykings met een veranderlike lei tot vals wiskunde indien ons probeer om enige waarde in te stel vir x. Die rede is dat daar net een moontlike waarde van x is wat die stelling waar maak.[/color])[/*][/list]Dit is die tweede eienskap van formules wat aandui dat daar 'n [color=#0000ff]verwantskap [/color]bestaan tussen die veranderlikes van formules. In die volgende afdeling gaan ons dit verder ondersoek.
Kom ons oefen om te onderskei tussen vergelykings en formules
In die volgende oefening gaan daar verwag word om te kan ondeskei tussen:[br][list=1][*][color=#00ff00][b]Normale vergelykings[/b] [/color](Onthou dit sal net een veranderlike hê)[/*][*]Vergelykings wat spesiaal is en geklasifiseer word as [b][color=#0000ff]formules of leterlike vergelykings.[/color][/b] (Onthou hulle sal twee veranderlikes hê.)[/*][/list][br]Om die oefening te doen moet jy die volgende doen:[br][list=1][*]Klik op die geel knoppie [b][color=#9900ff]"Begin die oefening" [/color][/b]en die program sal 10 verskillende vergelykings laai.[/*][*]Bestudeer die vergelykings en besluit of dit 'n Normale Vergelyking of 'n Formule (Leterlike Vergelyking) is.[/*][*]Langs die vergelyking is 'n [b][color=#9900ff]blou kolletjie[/color][/b]. Indien jy met die linker muis knoppie op die kolletjie klik en dit inhou, kan jy die kolletie met die vergelyking sleep in die korrekte spasie.[/*][*]Sleep nou alle Formules [b][color=#0000ff](Letterlike Vergelykings) [/color][/b] binne die [b][color=#0000ff]blou raam[/color][/b] en alle [b][color=#00ff00]normale vergelykings[/color][/b] binne die [b][color=#00ff00]groen raam[/color][/b].[/*][*]As jy alle vergelykings geplaas het waar jy glo dit moet wees, klik op die geel knoppie "[b][color=#9900ff]Merk jou werk" [/color][/b]om te sien of jy dit reg het.[/*][*]Indien jy weer die oefening wil doen kan jy bloot net die geel knoppie [b][color=#9900ff]"Probeer weer"[/color][/b] en begin van voor af.[/*][/list][size=150][center][b][color=#ff0000][size=200]Geniet die oefening![/size][/color][/b][/center][/size]
Oefening: Onderskei tussen vergelykings en formules
Kom ons kyk of ons die werk reg verstaan
Hier volg 'n paar vergelykings. Merk al die vergelykings wat funksies is.
Hier volg 'n paar stellings. Merk al die stellings wat waar is.

Fokus: Struggle makes you stronger

Struggle makes you stronger
Opsomming
You cannot grow without struggles. You cannot develop strength without resistance[br][br]Pain and struggle is your friend, maybe not for the moment but:[br][list=1][*]for the evolution of your soul[/*][*]for the long term benefit of you as a stronger human being.[/*][/list][br]You became what you are because of your struggles and it became your story.[br][br]You story of struggle and growing from it, inspire others. If he/she could do it then I have the strength to do it too.
Tyd vir refleksie:
Dink aan iemand wat 'n inspirasie is vir jou. Vra jouself die volgende vrae:[br][list=1][*]Wie is die persoon?[/*][*]Wat was die uitdagings wat die persoon moes oorkom in die lewe?[/*][/list]
Verdere refleksie
Dink terug in jou verlede. Watter uitdagings moes jy tot dusver oorkom?
Nog refleksie
Wat kan ek hieruit leer indie wiskunde 'n uitdaging is of word vir my?

Inleiding

Basiese bewerkinge
Ons gebruik twee basiese bewerkinge met funksies en dan meer komplekse bewerkinge. In die afdeling gaan ons die volgende basiese bewerkinge ondersoek en oefen:[br][list=1][*]Evaluering van funksies.[/*][*]Wortel bepalings[/*][/list]Die meer komplekse bewerkings sal later in die ondersoek verder bestudeer word.
Hersiening van funksie notasie
Tydens die bewerkinge van funksies gebruik ons die funksie notasie. Kom ons bestudeer weer die samestelling van funksie notasie:[br][br][img]data:image/png;base64,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[/img]

Informace