[b][i][u][color=#ff0000]អនុគមន៍ ដឺក្រេទី២រាង[/color][/u][/i][/b][math]y=ax^2+bx+c[/math][br][b]* [color=#0000ff]ករណី[/color][/b][math]D=\mathbb{R}[/math][b][color=#0000ff]អនុគមន៍មានអតិបរមា ឬ អប្បបរមានៅលើ[/color][math]D[/math][/b][br][table][tr][td][list][*]បើ[math]a>0[/math] នោះអនុគមន៍មានតម្លៃអប្បបរមាស្មើ [math]y\left(min\right)=-\frac{b^2-4ac}{4a}[/math]ត្រង់[math]x=-\frac{b}{2a}[/math][br][/*][*]បើ [math]a<0[/math]នោះអនុគមន៍មានតម្លៃអតិបរមាស្មើ[math]y\left(max\right)=-\frac{b^2-4ac}{4a}[/math] ត្រង់[math]x=-\frac{b}{2a}[/math][/*][/list][/td][/tr][/table][b][color=#ff7700]ឧទាហរណ៍១[/color] [/b]រកតម្លៃអតិបរមាឬ អប្បបរមានៃអនុគមន៍ [math]y=-2x^2+3x+4[/math][br][b][br][color=#ff00ff]របៀបក្នុងការរកតម្លៃអតិបរមា ឬ អប្បបរមា ដោយប្រើ[/color] [/b][math]Geogebra[/math] [br] ជំហានទី១ : ចូលកម្មវិធី រួចយកមុខងារ Graphing[br] ជំហានទី២ : បញ្ជូលអនុគមន៍ f(x)= ...ដែលអ្នករកក្នុងរបា input រួចEnter[br] ជំហានទី៣ : ប្រើកូដ Extremum (...f(x)...) រួច Enter នោះតម្លៃនៃអតិបរមា ឬ អប្បបរមាត្រូវបានបង្ហាញ[br][br][img]data:image/png;base64,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[/img][br] ដូចនេះ អនុគមន៍មានតម្លៃអតិបរមា [math]y\left(max\right)=5.13[/math]ត្រង់ [math]x=0.75[/math][br][br][b][color=#0000ff]* ករណី [/color][/b][math]D=\left[m,n\right][/math][b][color=#0000ff] អនុគមន៍មានតម្លៃអតិបរមា និង អប្បបរមា នៅលើ[/color][/b][math]D[/math][br][b][color=#ff7700]ឧទាហរណ៍២[/color] [/b] រកតម្លៃអតិបរមាតម្លៃអប្បបរមា[math]y=x^2-2x-2[/math][math]D=-1\le x\le-4[/math][br][br][b][color=#ff00ff]របៀបក្នុងការរកតម្លៃអតិបរមានិងអប្បបរមា ដោយប្រើ[/color][math]Geogebra[/math][br][/b]ជំហានទី១ : ចូលកម្មវិធី រួចយកមុខងារ Graphing[br]ជំហានទី២ : បញ្ជូលអនុគមន៍ f(x)= ..ដែលអ្នករកក្នុងរបា input រួចEnter[br]ជំហានទី៣ : ប្រើកូដ Max ( f(x) , m , n ) រួច Enter នោះតម្លៃនៃអតិបរមាបានបង្ហាញ[br] ប្រើកូដ Min ( f(x) , m ,n ) រួច Enter នោះតម្លៃអប្បបរមាត្រូវបានបង្ហាញ[math]x=1[/math][br]

ដូចនេះ អនុគមន៍មានតម្លៃអតិបរមាស្មើ[math]y\left(max\right)=6[/math] ត្រង់[math]x=4[/math][br] អនុគមន៍មានតម្លៃអតិបរមាស្មើ[math]y\left(min\right)=-3[/math]ត្រង់[math]x=1[/math]

សូមប្រើកម្មវិធី[math]Geogebra[/math] ដើម្បីរកតម្លៃអតិបរមានិងអប្បបរមានៃអនុគមន៍

១.រកអតិបរមាឬអប្បបរមានៃអនុគមន៍ ដោយប្រើកម្មវិធីខាងលើ[br]ក.[math]x^2+14x-14[/math][br]ខ.[math]x^2-6x+17[/math][br]គ.[math]x^2+7x+11[/math][br]ឃ.[math]2x^2+12x+16[/math][br]ង.[math]-3x^2+6x+1[/math][br]ច.[math]-\frac{1}{2}x^2-x+\frac{3}{2}[/math][br]ឆ.[math]-2x^2+8x-3[/math][br]ជ.[math]-x^2+2x+4[/math]

២.រកតម្លៃអតិបរមានិងអប្បបរមានៃអនុគមន៍ទៅតាមដែនតម្លៃរបស់វា[br]ក.[math]-x^2+4x+1[/math] កំណត់លើ[math]D=\left[0,5\right][/math][br]ខ.[math]x^2-6x+5[/math] កំណត់លើ[math]D=\left[1,6\right][/math][br]គ.[math]-2x^2+8x-3[/math] កំណត់លើ[math]D=\left[0,4\right][/math][br]ឃ.[math]x^2+2x-8[/math] កំណត់លើ[math]D=\left[-3,2\right][/math][br]ង.[math]-x^2+6x-5[/math] កំណត់លើ[math]D=\left[1,5\right][/math][br]ច.[math]x^2-4x[/math] កំណត់លើ[math]D=\left[0,5\right][/math][br]