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2.50 kg particle (the function

For 4.95 seconds , a particle moves in a straight line according to the position function: s(t) = e^t(5-t)-5 .a. when id the
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2. asked by Anonymous
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For 4.95 seconds , a particle moves in a straight line according to the position function: s(t) = e^t(5-t)-5 .a. when id the
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2. asked by Anonymous
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The velocity of a particle on the x-axis is given by the differential equation dx/dt= t^2/ 2 and the particle is at x = 4 when t
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2. asked by John
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The one-dimensional displacement, s meters of a particle, after t seconds, is given by the function s=t(t-4)^2.(i) when does the
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2. asked by Anonymous
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At t=0 a particle starts from rest at x=0, y=0 and moves in the xy plane with an acceleration a=(4.0i+3.0j)m/s^2. Determine (a)
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2. asked by Elizabeth
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A particle moves along the y axis according to y(t)=(3.5 m/s^2)t^2 - (9.0 m/s)t + 5.0 m.(a) What is the particle's velocity as a
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2. asked by mitch
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The function ax(t) describes the acceleration of a particle moving along the x-axis. At time t=0, the particle is located at the
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2. asked by Natalie
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A particle moves along a linear path (left/right) and its position, relative to its starting location is given by the function
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2. asked by anonymus
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The velocity function is v(t)= t^2-5t+ 4 for a particle moving along a line. The position function s(t) is an antiderivative of
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2. asked by REALLY NEED HELP!!!!
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The velocity function is v(t)=t^2−5t+4 for a particle moving along a line. Find the displacement and the distance traveled by
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2. asked by Anonymous
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