A particle travels along the path defined by the parabola y=0.2x^2. If the component of velocity...

1-The velocity of a particle is v = { 6 i + ( 28 - 2...

1-The velocity of a particle is v = { 6 i + ( 28 - 2 t ) j } m/s, where t is in seconds. If r=0 when t=0, determine particle displacement during time interval t = 3 s to t = 8 s in the y direction. 2-A particle, originally at rest and located at point (1 ft, 4 ft, 5 ft), is subjected to an acceleration of a={ 3 t i + 17 t2k} ft/s. Determine magnitude...

.The x and y components of the velocity of a particle are: vx = (2 t...

.The x and y components of the velocity of a particle are: vx = (2 t + 4) p / s vy = (8 ⁄ y) p / s Initially, the particle is located at the coordinates x = 1 and y = 0. Determine the position, the magnitude of the velocity and the magnitude of the particle's acceleration when t = 2 s.

A particle is constrained to travel along a path on the xy-plane. r_x=(4t^4)m and r_y=2(sqrt(x)) where...

A particle is constrained to travel along a path on the xy-plane. r_x=(4t^4)m and r_y=2(sqrt(x)) where t is in seconds(rx and ry are the direction vectors of the particle), determine the magnitude of the particle's velocity and acceleration when t=0.5s

The x and y components of the velocity of a particle are Vx=(2t + 4)ft/s &...

The x and y components of the velocity of a particle are Vx=(2t + 4)ft/s & Vy=(8/y)ft/s. Initially, the particle if found at coordinates x=1 and y=0. Determine the position, magnitude of velocity, and magnitude of the acceleration of the particle when t = 2s

A particle's velocity along the x-axis is described by v(t)= At + Bt2, where t is...

A particle's velocity along the x-axis is described by v(t)= At + Bt2, where t is in seconds, v is in m/s, A= 0.85 m/s2, and B= -0.69 m/s3. Acceleration= -0.53 m/s2 @ t=0 and the Displacement= -2.58 m b/w t=1s to t=3s. What is the distance traveled in meters, by the particle b/w times t=1s and t=3s?

A particle is launched from the origin along the x-axis at an initial velocity of 2...

A particle is launched from the origin along the x-axis at an initial velocity of 2 m/s. If the particle is accelerated according to the formula a(t) = -sin(t) where t is in seconds, what is the particle's position at time t = pi seconds?

the box of negligible size is sliding down along a curved path defined by the parabola...

the box of negligible size is sliding down along a curved path defined by the parabola y=1.800x^2 when it is at A(xa=1.550m,ya=4.325m),the speed is 7.450m/s and the increase in speed is dvb/dt=5.400m/s.Determine the magnitude of the acceleration of the box at this instant

a particle is moving along a ball y = t ^ 2 so at any time...

a particle is moving along a ball y = t ^ 2 so at any time vx= 3 feet / s. Calculate the magnitude the direction of the velocity and the acceleration of the particle at the point x = 2/3

A particle travels along a straight line with a velocity v=(12−3t^2) m/s , where t is...

A particle travels along a straight line with a velocity v=(12−3t^2) m/s , where t is in seconds. When t = 1 s, the particle is located 10 m to the left of the origin. Determine the displacement from t = 0 to t = 7 s. Determine the distance the particle travels during the time period given in previous part.

The velocity-time graph of a particle moving along the x-axis is shown. The particle has zero...

The velocity-time graph of a particle moving along the x-axis is shown. The particle has zero velocity at t = 0.00 s and reaches a maximum velocity, vmax, after a total elapsed time, ttotal. If the initial position of the particle is x0 = 7.29 m, the maximum velocity of the particle is vmax = 11.3 m/s, and the total elapsed time is ttotal = 25.0 s, what is the particle's position at t = 16.7 s? b. At t...