1.1 Variable Acceleration - 1D

A particle moving along a straight line has velocity,  m s⁻¹, at time  seconds according to the equation 

Find the times at which the particle is instantaneously stationary.

Find the distance travelled by the particle during the time it has negative velocity.

A go kart manufacturer is testing out a new model on a straight horizontal road.

Starting from rest, the velocity of the go kart is modelled by the equation

where is the velocity of the go kart at time t seconds and w is a constant.

Given the maximum speed of the go kart is , find the value of w and the time at which the go kart reaches its maximum speed.

A home-made rocket is launched from rest, at time  seconds, from ground level with an acceleration of . The rocket’s acceleration is then modelled by the equation                          

Other than at launch, find the time when the velocity of the rocket is .

Find the greatest height the rocket reaches, giving your answer in kilometres to three significant figures.

A zip-wire running between two trees in a children’s park is modelled as a horizontal line. The velocity-time graph below shows the motion of a child on the zip-wire as it moves from one tree to the other.

The graph has the equation  for , where is the velocity at time  seconds. 

Find the acceleration of the zip-wire after 1 second.

A bullet train has a maximum acceleration of 0.72 m s⁻².

One such train leaves a station at time seconds and its displacement,  m, from the station is modelled using the equation 

Show that it takes 8 seconds for the bullet train to reach its maximum acceleration.

After reaching its maximum acceleration the bullet train continues to accelerate at that rate until its velocity reaches its maximum of 75 m s⁻¹.

How long does it take for this increase in velocity to happen?

Once reaching its maximum velocity, the bullet train continues at this velocity for 10 minutes. Find the displacement of the train from the station at this time, giving your answer in kilometres to 3 significant figures.

The acceleration, , of a particle moving in a straight line at time  seconds is given by for  . Initially the velocity of the particle is 3 m s^-1.

Find the time(s) when the particle is instantaneously at rest.

Find the exact total distance travelled by the particle in the first 6 seconds of motion.

Show your method clearly.

A particle moving along a horizontal path has acceleration  m s^-2 at time  seconds modelled by the equation

The initial velocity of the particle is 42 m s^-1.
Find the times between which the velocity of the particle is positive.

Show that the distance travelled by the particle whilst its velocity is positive is  metres.

A particle moving along a straight line has velocity  m s⁻¹, at time  seconds, and its motion is described the equation

Show that the acceleration of the particle is negative for the first 2 seconds of its motion.

An athlete training for the 100 m sprint is aiming to run according to the model 

where m is their displacement from the starting point at time  seconds. 

Find, according to the model, the time it should take the athlete to complete the 100 m sprint, giving your answer to one decimal place.

Show that the acceleration of the athlete should be constant, if they are to sprint the 100 m according to the model.

A go kart manufacturer is testing out a new model on a straight horizontal road.

Starting from rest, the velocity of the go kart is modelled by the equation

where  m s⁻¹ is the velocity at time  seconds.

Find the maximum velocity of the go kart and the time at which this occurs.
Justify that this is a maximum.

The go kart does not move backwards at any point during the test.
Find the time it takes to complete the test.

A home-made rocket is launched from rest at ground level with time  seconds.

The acceleration of the rocket, measured in metres per square second, is modelled by the equation

A particle moving along a horizontal path has acceleration  m s^-2 at time  seconds modelled by the equation

The particle has a velocity of 42 m s^-1 at time . Find an expression for the velocity of the particle at time  seconds.

In a cheese-rolling competition, a cylindrical block of cheese is rolled down a hill and its acceleration, , is modelled by the equation.

where  is the time in seconds. The block of cheese reaches the bottom of the hill after 20 seconds. 

Find the velocity of the block of cheese when it reaches the bottom of the hill.

Show that the distance down the hill, as travelled by the block of cheese, is 330 m to two significant figures.

A high-speed train has a maximum acceleration of  which, from rest, takes 20 seconds to reach.

One such train leaves a station at t = 0 seconds and its displacement, , from the station is modelled using the equation

 where  is a constant. 

Find an expression for the velocity of the high-speed train for .

Find the minimum distance of track needed in order for the high-speed train to reach its maximum acceleration.

A particle moving along a straight line has velocity,  m s⁻¹, at time seconds according to the equation

Find the times at which the particle is instantaneously stationary.

Find the times between which the acceleration of the particle is negative.

A go kart manufacturer is testing out a new model on a straight horizontal road.

Starting from rest, the velocity of the go kart is modelled by the equation 

where  m s⁻¹ is the velocity of the go kart at time t seconds.

Show that .

Find the maximum and minimum velocities of the go kart in the first 12 seconds of its motion. Write down the acceleration of the go kart at these points.

A home-made rocket is launched from rest at ground level at time seconds. Its acceleration is initially 64 m s⁻² and is modelled by the equation

Find the total distance travelled by the rocket and the total time it spends in the air.

Give both answers to three significant figures and state any modelling assumptions you have made.

In a cheese-rolling competition, a cylindrical block of cheese is rolled down a hill and its acceleration,  m s⁻², is modelled by the functions

where  is the time in seconds and  is a constant. At the bottom of the hill the land is flat. The block of cheese comes to rest when its acceleration is −9 m s⁻².

By first finding the value of the constant , find the distance the block of cheese rolls before it comes to rest.

A high-speed train leaves a station at time seconds and its displacement,  m, from the station is modelled using the equation

where and  are constants.

In the first 10 seconds after the train leaves the station, the average velocity is   and the average acceleration is  .

By first finding the values of and , find an expression for the acceleration of the high-speed train for 0 ≤ t ≤ 12.

The acceleration, , of a particle moving in a straight line at time hours is given by for  0 ≤ t ≤ 24. After 24 hours the particle has returned to where it started.

Show that the velocity, , of the particle at time  hours can be written as

where  is a constant to be found.

Find the exact total distance travelled by the particle in the first 24 hours of motion. 

Show your method clearly.

A particle moves with constant acceleration, , such that its initial velocity is  m s^-1 and seconds later its velocity is   ms^-1 . Show that the displacement of the particle,  m, from its initial position is given by

Clearly explain each stage of your solution.

A particle moving along a horizontal path has acceleration,  m s^-2, at time  seconds, modelled by the equation

The particle has zero displacement from a fixed point after 1 second and 9 seconds. Find an expression for the displacement of the particle from at time  seconds.