Experimental data for the motion of a particle along a straight line yield measured values of...
A particle moving along a straight line has an acceleration which varies according to position as shown. If the velocity of the particle at the position x = -4 ft is V-6 ft/sec, determine the velocity v when the acceleration is zero. (Note: there are several instances when acceleration is zero). a, see Sude=adso r -) = area under as curve)
A particle moving along a straight line has an acceleration which varies according to position as shown. If the velocity of the particle at the position x = -6 ft is v = 7 ft/sec, determine the velocity v when x = 13 ft. a, ft/sec2 -6 0 0 11 13 x, ft -5
A particle starts from rest and travels along a straight line with an acceleration a = (30 – 0.2v) ft/s?, where v is in ft/s. Determine the time when the velocity of the particle is v = 30 ft/s.
Chapter 2, Problem 2/024 Multistep A particle moving along a straight line has an acceleration which varies according to position as shown. If the velocity of the particle at the position x when 10 ft. -3 tis v 4 ft/sec, determine the velocity a, ft/see? 10 --- Part 1 Calculate od a, ft/sec 10- Part 1 Calculate adx. a, ft/sec Answer: adx the tolerance is +/-29 Click if you would like to Show Work for this questions Open Show Work
The position of an object moving along a straight line is given by where s is measured in feet and t in seconds. Find the velocity v(t) and acceleration a(t) of the object after 3 sec. (Round your answers to three decimal places.) ft/sec ft/sec2 a(3) The position of an object moving along a straight line is given by where s is measured in feet and t in seconds. Find the velocity v(t) and acceleration a(t) of the object after...
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?
Problem #1 (35 Points) Given The velocity of a particle as it moves along a straight line is given by v (-12+36t-6t2) ft/s, where t is in seconds. At the initial condition ( 0), so 2 ft. Find a) The acceleration of the particle as a function of time. b) The acceleration of the particle when -6 seconds. c) The position of the particle as a function of time. d) The position of the particle when -6 seconds. e) The...
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
Velocity versus displacement curve of a particle moving in a straight line is shown in the figure. From a point P, a line PQ is drawn perpendicular to displacement axis and line PR is drawn normal to the curve at P. The magnitude of acceleration of particle at point P is options: a)1 m/s^2 b) 3 m/s^2 c)2 m/s^2 d) 2.5 m/s^2 v(m/s) \ R s (m) (2,0) (3,0)
show all your working, please. particle moves along a straight line with an acceleration a= (1 + 02) m/s2 v=0 when s = 0. 1.1) [1] Determine the acceleration of the particle when v= 1 m/s. 1.2) (5) Determine the velocity as a function of position