Answer to Question #280909 in Molecular Physics | Thermodynamics for dandan

Question #280909

If the velocity of a particle which moves along the S-axis is given by V= 2 - 4t + 5t^3/2 , where t is in seconds and V is in meters per seconds. The particle is at the position So = 3 m, when t = 0 1.) Compute the position S when t= 3 sec 2.) Compute the velocity of the particle when t = 3 sec. 3) Compute the acceleration of the particle when t =3 sec. (note: This is a problem under Rectilinear motion with variable acceleration use our Formula V= dS/dt, a=dV/dt, adA= VdV)

Expert's answer

1. The position is the integral of velocity:

"s(t) = \\int_0^t5t^{3\/2} - 4t + 2dt = 2t^{5\/2} - 2t^2+2t+3"

where the last term comes from the given condition: the particle is at the position So = 3 m, when t = 0.

At "t = 3s" have:

"s(3s) = 2\\cdot (3)^{5\/2} - 2\\cdot 3^2 + 2\\cdot 3 + 3 \\approx 22m"

2. "v(3s) = 2 - 4\\cdot 3 + 5\\cdot 3^{3\/2} \\approx 16m\/s"

3. The accelration is the first derivative of velocity:

"a(t) = -4 + 7.5t^{1\/2} \\\\\na(3s) = -4 + 7.5\\cdot 3^{1\/2} \\approx 9.0 m\/s^2"

Answer. 1) 22m, 2) 16m/s, 3) 9.0m/s^2.

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