Show that the acceleration (t) = of the parameterization in r(t) = r(t)r(t), is always given by ā(t) = (r(t) — r(t)ė(t)²)ŵ(t) + (r(t)ö(t) + 2r(t)ė(t))ô(t). (ï—rÖ²)î+(rÖ+2řÖ)ê. How might you define a radial and angular acceleration? What about a radial and angular jerk? Is it possible to feel an acceleration when r and are constant? If yes, give a parameterized curve where this occurs. Again this has an abbreviation a =
Show that the acceleration (t) = of the parameterization in r(t) = r(t)r(t), is always given by ā(t) = (r(t) — r(t)ė(t)²)ŵ(t) + (r(t)ö(t) + 2r(t)ė(t))ô(t). (ï—rÖ²)î+(rÖ+2řÖ)ê. How might you define a radial and angular acceleration? What about a radial and angular jerk? Is it possible to feel an acceleration when r and are constant? If yes, give a parameterized curve where this occurs. Again this has an abbreviation a =
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Transcribed Image Text:Show that the acceleration (t) = r of the parameterization in r(t) = r(t)ô(t), is always given by
ā(t) = (r(t) — r(t)ė(t)²)ŵ(t) + (r(t)ö(t) + 2r(t)ġ(t))ô(t).
(ï— rġ²)î+(rÖ+2r0)ê. How might you define a radial and angular acceleration?
What about a radial and angular jerk? Is it possible to feel an acceleration when r and are constant? If yes, give a
parameterized curve where this occurs.
Again this has an abbreviation a
=
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