11. A particle \(P\) of mass 2 kg can only move along the straight line segment \(O A\), where \(O A\) is on a rough horizontal surface. The particle is initially at rest at \(O\) and the distance \(O A\) is 0.9 m .
When the time is \(t\) seconds the displacement of \(P\) from \(O\) is \(x \mathrm {~m}\) and the velocity of \(P\) is \(v \mathrm {~ms} ^ { - 1 }\). \(P\) is subject to a force of magnitude \(4 \mathrm { e } ^ { - 2 t } \mathrm {~N}\) in the direction of \(A\) for any \(t \geqslant 0\). The resistance to the motion of \(P\) is modelled as being proportional to \(v\).
At the instant when \(t = \ln 2 , v = 0.5\) and the resultant force on \(P\) is 0 N .
- Show that, according to the model, \(\frac { \mathrm { d } v } { \mathrm {~d} t } + v = 2 \mathrm { e } ^ { - 2 t }\).
- Find an expression for \(v\) in terms of \(t\) for \(t \geqslant 0\).
- By considering the behaviour of \(v\) as \(t\) becomes large explain why, according to the model, \(P\) 's speed must reach a maximum value for some \(t > 0\).
- Determine the maximum speed considered in part (c).
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