Two inertial frames of reference, denoted by S and S', are in
uniform relative motion such
that the origin O' moves at constant velocity V = V0(êxcosβ +
êysinβ) relstive to O. In frame
S, a particle moves along the space curve prescribed by the
vector position r = êx4(3t^2 – t^4) +
êy(t^3+2t)+êz(2t^2 +3t)^2.
(a) Find the velocity of the particle relative to O′.
(b) Show explicitly that the acceleration of the particle is
the same in both frames...