Parabolas (Sec 9-4) Answers
When the focus and directrix are used to derive the equation of a parabola, two distances were set equal to each other. = The distance between the directrix and is set equal to the distance between the and the same point on the parabola.
If the equation is further simplified, which equation for a parabola does it become?
Lauren describes a parabola where the focus has a positive, nonzero x coordinate. Which parabola(s) could Lauren be describing? Check all that apply.x2 = 4yx2 = –6yy2 = x y2 = 10xy2 = –3xy2 = 5x
Which graph represents the function y2 = −16x?
The parabola has a focus at (−3, 0) and directrix x = 3. What is the correct equation for the parabola?
Which statements are true for the equation x2 = −4y? Check all that apply.The axis of symmetry is x = 0.The focus is at (0, –1).The parabola opens up.The parabola opens right.The value of p = −1.The equation for the directrix is y = 0.
If the directrix of a parabola is the horizontal line y = 3, what is true of the parabola?
Describe the key features of the parabola y2 = 8x.
The parabola y^2 = 8x is in the form y^2 = 4px, where 4p = 8, so p = 2. Since p > 0 and the equation is in terms of y^2, the parabola opens to the right. The vertex is at the origin (0, 0). The focus is at (p, 0), which is (2, 0). The directrix is the vertical line x = -p, which is x = -2. The axis of symmetry is the x-axis, or y = 0.
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