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Chapter 7: Problem 21
Find the standard form of the equation of each parabola satisfying the given conditions. Focus: \((0,15) ;\) Directrix: \(y=-15\)
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Find the standard form of the equation of each ellipse satisfying the given conditions. $$\text { Foci: }(-5,0),(5,0) ; \text { vertices: }(-8,0),(8,0)$$
How can you distinguish parabolas from other conic sections by looking at their equations?
Graph each ellipse and give the location of its foci. $$\frac{(x-4)^{2}}{4}+\frac{y^{2}}{25}=1$$
Which one of the following is true? a. The parabola whose equation is \(x=2 y-y^{2}+5\) opens to the right. b. If the parabola whose equation is \(x=a y^{2}+b y+c\) has its vertex at \((3,2)\) and \(a>0,\) then it has no \(y\) -intercepts. c. Some parabolas that open to the right have equations that define \(y\) as a function of \(x .\) d. The graph of \(x=a(y-k)+h\) is a parabola with vertex at \((h, k)\)
In \(1992,\) a NASA team began a project called Spaceguard Survey, calling for an international watch for comets that might collide with Earth. Why is it more difficult to detect a possible "doomsday comet" with a hyperbolic orbit than one with an elliptical orbit?
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