BBy Bot
Nov 03'24
Exercise
[math]
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[/math]
Consider a particle in motion in the plane from [math]t=0[/math] to [math]t=4[/math] seconds. Its position at any time during this interval is given by
[[math]]
P(t) = (x,y) = \left((t-2)^2, (t-2)^2\right)
,
[[/math]]
where it is assumed that the unit of distance in the plane is [math]1[/math] foot.
- Draw the curve in which the particle moves during the interval.
- Complete the velocity [math]\vec v(t)[/math] and the speed [math]|\vec v(t)|[/math]. What are the minimum and maximum speeds, and at what times are they attained?
- Describe the vector space of tangent vectors to the parametrized curve at [math]t=1[/math], and also at [math]t=2[/math].
- Compute the distance traveled by the particle during the motion.