Chapter 10: Problem 5
What is the polar equation of the vertical line \(x=5 ?\)
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Slopes of tangent lines Find all the points at which the following curves have the given slope. $$x=2 \cos t, y=8 \sin t ; \text { slope }=-1$$
Find an equation of the following hyperbolas, assuming the center is at the origin. Sketch a graph labeling the vertices, foci, and asymptotes. Use a graphing utility to check your work. A hyperbola with vertices (±1,0) that passes through \(\left(\frac{5}{3}, 8\right)\)
Eliminate the parameter to express the following parametric equations as a single equation in \(x\) and \(y.\) $$x=2 \sin 8 t, y=2 \cos 8 t$$
Graph the following equations. Then use arrows and labeled points to indicate how the curve is generated as \(\theta\) increases from 0 to \(2 \pi\). $$r=\frac{3}{1-\cos \theta}$$
Find parametric equations (not unique) of the following ellipses (see Exercises \(75-76\) ). Graph the ellipse and find a description in terms of \(x\) and \(y.\) An ellipse centered at the origin with major axis of length 6 on the \(x\) -axis and minor axis of length 3 on the \(y\) -axis, generated counterclockwise
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