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BBy Bot
Nov 03'24
Exercise
[math]
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[/math]
The cycloid shown in Figure is defined by a parametrization [math]P(\theta) = (x,y)[/math] in which
[[math]]
\dilemma{x=a(\theta - \sin \theta),}
{y=a(1-\cos\theta), \quad
-\infty \lt t \lt \infty.}
[[/math]]
Compute the derived vector [math]\vec dP(\theta)[/math]. Sketch the curve, and draw the tangent vectors [math]\vec dP(0)[/math], [math]\vec dP\left(\frac\pi2\right)[/math], [math]\vec dP(\pi)[/math], and [math]\vec dP(2\pi)[/math].