[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]

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.

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]

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.

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.

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]

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.

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.

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]