In a particular Cartesian coordinate system, the y and z-components of the acceleration are zero and the x-component varies as given by the following function: ax(t) = -8 + 32t, where t is in seconds and ax is in meters per square second. The particle’s velocity at t = 0 was pointed towards the positive x-axis and has a magnitude of 15 m/s. d.)Find the instantaneous velocity, in meters per second, at t = 1 sec. e.)Find the instantaneous velocity, in meters per second, at t = 2 sec. f.)Find the instantaneous velocity, in meters per second, at t = 3 sec.

In a particular Cartesian coordinate system, the y and z-components of the acceleration are zero and the x-component varies as given by the following function: ax(t) = -8 + 32t, where t is in seconds and ax is in meters per square second. The particle’s velocity at t = 0 was pointed towards the positive x-axis and has a magnitude of 15 m/s. d.)Find the instantaneous velocity, in meters per second, at t = 1 sec. e.)Find the instantaneous velocity, in meters per second, at t = 2 sec. f.)Find the instantaneous velocity, in meters per second, at t = 3 sec.

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Question

In a particular Cartesian coordinate system, the y and z-components of the acceleration are zero and the x-component varies as given by the following function: a_x(t) = -8 + 32t, where t is in seconds and a_x is in meters per square second. The particle’s velocity at t = 0 was pointed towards the positive x-axis and has a magnitude of 15 m/s.