[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?