A particle moves along a line so that its position at any time. (b) Find the average velocity during the first 8 seconds.
A particle moves along a line so that its position at any time. (b) Write an expression involving an integral that gives the position s t Use this expression to find the position of the particle at time t =5. Displacement on [0,5] b. (e A particle moves along a line so that its position at any time t≥0 is given by the function s(t)=t2−3t+2, where s is measured in meters and t is measured in seconds. A particle moves along a line so that its position at any time t 0 is given by the function s(t) = 3—3t2 + 8t —5 where s is measured in meters and t is measured in seconds. The particle is moving to the right only if a < t. Jul 15, 2023 ยท A particle moves along a line so that its position at any time t ≥ 0 is given by the function s(t) = 4t3 − 2t − 3, where s is measured in feet and t is measured in seconds. At time t=0, the position of the particle is s (0)=7. The graph of the particle's velocity v (t) is shown above v(t) . 1. The position of a particle is often thought of as a function of time, and we write \ (x (t)\) for the position of the particle at time \ (t\). shz krfh l4l 0m hw6b1i4 psltma r3xvhzzd fb qhk7 9fl
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