A rabbit runs across a parking lot on which a set of coordinate axes has, strangely enough, been drawn . The coordinates (meters) of the rabbits position as functions of time t (seconds) are given by
`x = -0.31t^2 + 7.2 t + 28`
and `y = 0.22 t^2 - 9.1 t + 30`
For the rabbit in the precending sample problem find the acceleration `veca` at time t = 15 s

A rabbit runs across a parking lot on which a set of coordinate axes has, strangely enough, been drawn . The coordinates (meters) of the rabbits position as functions of time t (seconds) are given by x = -0.31t^2 + 7.2 t + 28 and y = 0.22 t^2 - 9.1 t + 30 For the rabbit in the precending sample problem , find the velocity vec v at time t = 15s .

A rabbit runs across a parking lot on which a set of coordinate axes has, strangely enough, been drawn . The coordinates (meters) of the rabbits position as functions of time t (seconds) are given by x = 0.31t^2 + 7.2 t + 28 and y = 0.22 t^2 - 9.1 t + 30 (a) At t =15 s , what is the rabbits position vector vecr in univector notation and in magnitude - angle notation ?

Figure shows the x coordinate of a particle as a function of time. Find the signs of v_x and a_x at t=t_1 , t=t_2 and t=t_3 .

Each of four particles moves along an x axis. Their coordinates (in meters) as function of time (in seconds) are given by Particle 1:x(t) =3.5 -2.7t^(3) Particle :2 x(t)=3.5+2.7 t^(3) particle 3: x(t) =3.5+2.7 t^(2) particle 4: x(t)=3.5-3.4 t -2.7 t^(2) Which of these particles have constant acceleration ?

The coordinates of a moving particle at any time t are given by, x = 2t^(3) and y = 3t^(3) . Acceleration of the particle is given by

Each of the four particles move along an x axis. Their coordinates (in metres) as function of time (in seconds) are given by Particle 1 : x(t) = 3.5 - 2.7 t^3 Particle 2 : x(t) = 3.5 + 2.7 t^3 Particle 3 : x(t) = 3.5 + 2.7 t^2 Particle 4 : x(t) = 2.5 - 3.4t - 2.7 t^2 which of these particles is speeding up for t > 0?

The coordinates of a moving particle at any time t are given by x = ct and y = bt. The speed of the particle at time t is given by

A particle's position as a function of time is described as y (t) = 2t^(2) + 3t + 4 . What is the average velocity of the particle from t = 0 to t = 3 sec ?

A rabbit runs across a parking lot. The path is such that components of rabbit's position with respect to an origin of co-ordinates as function of time are x = R + 10 and y -9t + 5. Here x, y are in meter and t in second. The magnitude of rabbit's displacement during first 5 seconds is