A particle moves along a line with a velocity v(t)=4t−6, measured in meters per second. Find the total distance the particle travels over the time interval [0,3] .
A particle moves along a line with a velocity v(t)=4t−6, measured in meters per second. Find...
(14 pts.) 3. A particle moves along a line so that its velocity at time t is v(t) = + - + - 6 (measured in meters per second). a) Find the displacement of the particle during the time period 1 st 54. b) Find the distance traveled during this time period.
(1 point) A particle that moves along a straight line has velocity u(t) = te-21 meters per second after t seconds. Find the distance the particle travels during the first t seconds. meters Note: Your answer should be a function of t.
5. The velocity function (in meters per second) is given for a particle moving along a line. Find the displacement and the total distance traveled by the particle during the given time interval. v(1)=1-21-8, OSI56
The instantaneous speed of a particle moving along one straight line is v(t) = ate−4t, where the speed v is measured in meters per second, the time t is measured in seconds, and the magnitude of the constant a is measured in meters per second squared. What is its maximum speed, expressed as a multiple of a? (Do not include units in your answer.) Answer: V= a
For t ≥ 0, a particle moves along the x-axis. The velocity of the particle at time t is given by v(t)=1+2sin(t^2/2). The particle is at x=2 at time t=4. a)Find position of particle at t=0 b)Find the total distance the particle travels from time t=0 to time t=3
A particle moves in a straight line with the given velocity u(t) = 6 cos (t) (in m/s). Find the displacement and distance traveled over the time interval [0,71). (Give your answers as whole or exact numbers.) displacement: total distance traveled:
A particle moves along a straight a) The average velocity on the line with equation of motion interval [3,4] s= f(t) = t? - 60 + 10, b) The instantaneous velocity. Where S is measured in meters and t in seconds. find the C) The instantaneous velocity when following: t = 4 seconds. The growth of a bacterial population is represented by the function f(t) = 1 + 5t - 2t2 Where t is the time measured in hours find...
f(t), where s is measured in meters and t in seconds. Find the velocity and speed when t = 3 A particle moves along a straight line with equation of motion s f(t) = 8030t - 4.5t2 velocity m/s speed m/s f(t), where s is measured in meters and t in seconds. Find the velocity and speed when t = 3 A particle moves along a straight line with equation of motion s f(t) = 8030t - 4.5t2 velocity m/s...
A particle moves along a straight line and its position at time t is given by s(t)= 2t^3 - 21 t^2 + 60 t where s is measured in feet and t in seconds.a) Find the velocity (in ft/sec) of the particle at time t=0:The particle stops moving (i.e. is in a rest) twice, once when t=A and again when t=B where A < B.b) A isc) B isd)What is the position of the particle at time 14?e)Finally, what is...
10. The velocity function of a particle is given by v(t) = 2t - 4 on the interval (0,4), where t is measured in seconds, and velocity is measured in meter per second. Sketch the graph of the velocity function, determine the displacement over the given interval and find the total distance traveled by the particle over the given interval.