[img]data:image/png;base64,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[/img][br] [math]A[/math] yı yönlendirilmiş bir segmentle [math]\left(0,0\right)[/math] dan [math]\left(0,2\right)[/math]ye çevirin.
[math]A[/math] yı yönlendirilmiş bir segmentle [math]\left(0,0\right)[/math] dan [math]\left(-4,0\right)[/math] a çevirin.
[math]A[/math] yı [math]x[/math]-ekseni boyunca yansıtın.
Orjini merkez alarak [math]A[/math] 180 derece döndürün.
[size=150]Her [math]\left(x,y\right)[/math] noktasının [math]\left(x+12,y-2\right)[/math][/size] dönüşümü altındaki görüntüsünü bulunuz.[br][br][math]A=\left(-10,5\right)[/math][br][math]B=\left(-4,9\right)[/math][br][math]C=\left(-2,6\right)[/math]
ardından koordinat düzleminde [math]ABC[/math] üçgeni oluşturun. [math]\left(x,y\right)\longrightarrow\left(x+12,y-2\right)[/math] dönüşümü nedir?[br]
sonra orijinal ([math]\left(x,y\right)[/math] sütunu) ve görüntüsünü ([math]\left(2x,2y\right)[/math] sütunu) çizin. [math]\left(x,y\right)\longrightarrow\left(2x,2y\right)[/math] dönüşümü nedir?[br]
Verilen kuralları [math]ABCD[/math] dörtgenine uygulayın ve bunların grafiğini çizin ardından dönüşümü etiketleyin.[br][list][*] [math]Q[/math]: [math]\left(x,y\right)\longrightarrow\left(2x,y\right)[/math] dönüşümünü etiketle[br][/*][*] [math]R[/math]: [math]\left(x,y\right)\longrightarrow\left(x,-y\right)[/math] dönüşümünü etiketle[/*][*] [math]S[/math]: [math]\left(x,y\right)\longrightarrow\left(y,-x\right)[/math] dönüşümünü etiketle[/*][/list]
[list][*][size=150]Köşeleri [math]\left(4,-2\right)[/math], [math]\left(8,4\right)[/math], [math]\left(8,-6\right)[/math], ve [math]\left(-6,-6\right)[/math] olan dörtgeni çizin. Bu dörtgeni [math]A[/math] olarak etiketle.[br][/size][/*][*][size=150]Köşeleri [math]\left(-2,4\right)[/math], [math]\left(4,8\right)[/math], [math]\left(-6,8\right)[/math], ve [math]\left(-6,-6\right)[/math] olan dörtgeni çizin. Bu dörtgeni [math]A'[/math] olarak etiketle.[/size][/*][/list][br] [math]A[/math] dörtgeninin koordinatları ile [math]A'[/math] dörtgeninin koordinatları arasında nasıl bir ilişki vardır?
Hangi dönüşüm [math]A[/math] dörtgenini [math]A'[/math] dörtgenine götürür?[br]