[size=150]Görüntüde  [math]\left(-2,2\right)[/math] odaklı ve  [math]y=0[/math] ( [math]x[/math]-ekseni) doğrultmanlı parabol gösterilmektedir.  [math]A[/math], [math]B[/math], ve  [math]C[/math] noktaları parabol üzerindedir.[/size][br][img]data:image/png;base64,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[/img][br]Pisagor Teoremi'ni kullanmadan çizilen her noktadan parabolün odağına olan mesafeyi bulunuz.Mantığını açıklayınız.[br]

[size=150]Görüntüde [math]\left(3,2\right)[/math] odaklı ve [math]y=0[/math] doğrultmanlı ([math]x[/math]-ekseni) parabol gösterilmektedir.[/size][br][img]data:image/png;base64,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[/img][br]Belirli bir  [math]\left(x,y\right)[/math] noktasının parabol üzerinde olup olmadığını test etmenize yarayacak bir denklem yazınız.

Yazdığınız denklem parabolü tanımlar ancak çok kolay okunabilir formda değildir. Denklemi tepe noktası biçiminde yeniden yazın: [math]y=a\left(x-h\right)^2+k[/math],burada  [math]\left(h,k\right)[/math] tepe noktasıdır.[br]

Bu bölümde belirli bir nokta ve doğrudan eşit uzaklıkta olan noktaları incelediniz. Şimdi bir noktaya uzaklığı, bir doğruya uzaklığının yarısı kadar olan bir dizi noktayı düşünün.[br][br](5,3) noktasına uzaklığı, x-eksenine uzaklığının [math]\frac{1}{2}[/math]si kadar olan noktalar kümesinin denklemini yazınız.[br]

[size=150] Çizdiğiniz grafiğin neye benzediğini tarif ediniz.[/size]

[size=150] [math]x^2+y^2-8x+4y=29[/math][/size]denkleminin grafiğini sınıflandırınız.[br]

[size=150] [math]\left(x,y\right)[/math] noktasının , [math]\left(4,1\right)[/math] noktasına ve  [math]x[/math]-eksenine aynı mesafede olduğunu belirten bir denklem yazınız.[/size]

[size=150]Odak noktası  [math]\left(-1,-7\right)[/math] ve doğrultmanı  [math]y=3[/math] olarak tanımlanan parabolün tüm denklemlerini seçiniz.[/size]

[size=150]A ve B parabollerinin her ikisinin de doğrultmanı  [math]x[/math]-eksenidir. A parabolünün odak noktası [math]\left(3,2\right)[/math] ve B parabolünün odak noktası  [math]\left(5,4\right)[/math]tür. Doğru olan tüm ifadeleri seçiniz.[/size]

[size=150]Bir parabolün odağı [math]\left(5,1\right)[/math] ve doğrultmanı [math]y=-3[/math] olduğuna göre[br] tepe noktası nerededir?[/size]

[math]x^2+7x+\boxed{ }[/math]

[math]x^2+3x[/math]

[math]x^2-6x-7[/math][br]

[math]x^2+4x+4[/math]

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[/img][br]Izgaradaki her küçük kare 1 metrekareyi temsil ediyorsa 3 boyutlu figürün hacmi nedir?