All AP Physics 1 Resources
Example Questions
Example Question #1 : Calculating Motion In One Dimension
If a 15kg ball takes five seconds to strike the ground when released from rest, at what height was the ball dropped?
50m
250m
100m
75m
125m
125m
Using the equation we can find the distance at which the ball was dropped. Notice that the mass of the ball does not matter in this problem. We are told that the ball is dropped from rest making, , thus we have . When we plug in our values, and assuming that acceleration is equal to gravity (10m/s2) we find that = 125m.
Example Question #2 : Calculating Motion In One Dimension
How far will an object travel after ten seconds if it is dropped into a bottomless pit?
50m
500m
25m
300m
250m
500m
Since the object is dropped, the inital velocity is zero. Gravity is the only acceleration, the time is ten seconds, and the distance at which the object travels is unknown.
The equation can be used to find the distance traveled.
Example Question #1 : Motion In One Dimension
How long does it take an object to travel a distance of 30m from rest at a constant acceleration of 2m/s2?
Using the equation , we can solve for time.
Since the object started at rest, . Now we are left with the equation .
Plugging in the remaining values we can find that t = 5.5s.
Example Question #1 : Motion In One Dimension
A person on top of a tall building drops a rock. How long will it take for the rock to reach the ground? Ignore air resistance.
Use the following kinematic equation: .
We can choose the ground to be the zero distance so that and .
Also, the initial speed is zero.
The kinematic equation simplifies using these values.
Solve to isolate the time variable.
We know that the acceleration is the acceleration due to gravity. Now we can plug in the known values and solve.
Example Question #1 : Motion In One Dimension
You are driving at a speed of and suddenly, a tree falls down on the road blocking your path. You slam on your brakes to avoid hitting the fallen tree and thus, come to a complete stop. You were at a distance of away from the tree when you hit the brakes. Assuming that your vehicle does not skid, what is the minimum deceleration needed to avoid hitting the fallen tree?
Use the following kinematic equation where the initial velocity is , final velocity is , and the distance traveled is .
We can use the values in the question to solve for the acceleration.
We rearrange the equation to solve for the acceleration.
Example Question #2 : Motion In One Dimension
A is dropped from a height of . A picture is taken when the ball is from the ground with an exposure time of . If the actual diameter of the ball is , what will the vertical diameter of the ball appear to be in the picture?
The first step to solving this problem will be to find the velocity of the ball at the point when the picture is taken. We know the initial velocity of the ball (zero), the displacement, and the acceleration. Using the appropriate kinematics formula, we can solve for the final velocity.
Now that we know how fast the ball is traveling when the picture is taken, we can find the distance it travels while the shutter is open. This distance will become a motion blur, making the vertical diameter of the ball appear stretched.
During the exposure period, the ball will travel , or . The diameter of the ball in the vertical direction will appear to be distorted by this distance.
Example Question #1 : Motion In One Dimension
A person stands on the edge of a straight -high cliff and holds a ball over the edge. The person tosses the ball directly upward with an initial speed of . How long will it take the ball to hit the ground at the base of the cliff, below?
Assume for gravitational acceleration.
This is projectile motion in the vertical direction only, subject to the equation of motion: .
For this discussion, one can define the downward direction as negative. For projectile motion, (gravitational acceleration, or ).
In this case, the ball ends up below where is started, so .
The initial velocity, , is (upward, thus positive).
With all this, the projectile motion equation becomes:
This can be solved for using the quadratic formula:
The result is:
(or ).
Only the positive answer option is physically possible, and is thus our correct answer.
Example Question #1 : Motion In One Dimension
A ball is thrown horizontally off a cliff of height of with an initial velocity of . How far from the cliff will the ball land?
First we will find the time required for the ball to reach the ground. Since the ball is thrown horizontally, it has no initial vertical component. We use the following equation to solve for the total flight time:
We are given the change in height, initial velocity, and acceleration. Using these values, we can solve for the time. Note that the change in height will be negative, since the ball is traveling downward.
Finally, we use the horizontal velocity to find the distance traveled in . Remember that the horizontal velocity remains constant during projectile motion.
Example Question #1 : Motion In One Dimension
A hockey puck of mass is sliding across an ice rink. If the puck loses of velocity over a distance of , what is the coefficient of kinetic friction between the ice and the puck?
Since we know the change in velocity of the puck, we can determine the work done by friction by using the work-energy theorem:
The work in this question is done by friction, so we can write:
Substituting in expressions for friction and kinetic energy, we get:
The normal force is from gravity, so we can write:
Rearranging for the coefficient of kinetic friction we get:
Example Question #1 : Motion In One Dimension
A ball is dropped from a height of . How much time will pass before the ball hits the ground?
The equation needed is