It will be (3v-2) 3/ 1. A particle is moving along a straight path such that...
A particle is moving along a straight path such that the acceleration a = (3v-2) m/s2, where v is in m/s. If v = 15 m/s when s = 0 and t = 0, please determine the particle’s position, velocity, and acceleration as functions of time.
1. A particle is moving along a straight path such that the acceleration a (3v2-2) m/s2, where v is in m/s. If v = 15 m/s when s-0 and 1-0, please determine the particle's position, velocity, and acceleration as functions of time
A particle is moving along a straight path such that the acceleration a = (3v2-2) m/s2, where v is in m/s. If v = 15 m/s when s = 0 and t = 0, please determine the particle’s position, velocity, and acceleration as functions of time.
4. A particle is moving along a straight line such that its velocity is defined as v -5s2 m/s, where s is in meters. If s 2 m when t0, determine the particle's velocity and acceleration as functions of time.
The velocity of a particle moving along a straight line is given by v = 0.2s1/2 m/s where the position s is in meters. At t = 0 the particle has a velocity v0 = 3 m/s. Determine the time when the particle’s velocity reaches 15 m/s and the corresponding acceleration. Ans: 600 s, a = 0.02 m/s2
F12-18. A particle travels along a straight-line path y 0.5x. If the x component of the particle's velocity is vr= (2) m/s, where t is in seconds, determine the magnitude of the particle's velocity and acceleration when = 4 s. y =0.5x Prob. F12-18 F12-19. A particle is traveling along the parabolic path y 0.25x. If x 8 m. , 8 m/s, and a, 4 m/s2 when 2 s. determine the magnitude of the particle's velocity and acceleration at this...
The acceleration of a particle as it moves along a straight line is given by a=(2t−1) m/s2, where t is in seconds. Suppose that s = 4 m and v = 8 m/s when t = 0. a)Determine the particle's velocity when t = 4 s . b)Determine the particle's position when t = 4 s c)Determine the total distance the particle travels during the 4-s time period.
The position of a particle along a straight line path is defined by s = (t^3 - 6t^2 - 15t +25) ft, where t is in seconds. What is the particle's initial velocity?
The position of a particle along a straight-line path is defined by s=(t3−6t2−15t+7) ft, wheret is in seconds. Part A: Determine the total distance traveled when t = 8.3 s . Part B: What are the particle's average velocity at the time given in part A? Part C: What are the particle's average speed at the time given in part A? Part D: What are the particle's instantaneous velocity at the time given in part A? Part E: What are...
The acceleration of a particle traveling along a straight line is a=(1/5)*s2 m/s2, where s is in meters. If v = 0, s = 4 m when t = 0, determine the particle's velocity at s = 6 m.