Respuesta :
1) At the top of the building, the ball has more potential energy
2) When the ball is halfway through the fall, the potential energy and the kinetic energy are equal
3) Before hitting the ground, the ball has more kinetic energy
4) The potential energy at the top of the building is 784 J
5) The potential energy halfway through the fall is 392 J
6) The kinetic energy halfway through the fall is 392 J
7) The kinetic energy just before hitting the ground is 784 J
Explanation:
1)
The potential energy of an object is given by
[tex]PE=mgh[/tex]
where
m is the mass
g is the acceleration of gravity
h is the height relative to the ground
While the kinetic energy is given by
[tex]KE=\frac{1}{2}mv^2[/tex]
where v is the speed of the object
When the ball is sitting on the top of the building, we have
- [tex]h=40 m[/tex], therefore the potential energy is not zero
- [tex]v=0[/tex], since the ball is at rest, therefore the kinetic energy is zero
This means that the ball has more potential energy than kinetic energy.
2)
When the ball is halfway through the fall, the height is
[tex]h=20 m[/tex]
So, half of its initial height. This also means that the potential energy is now half of the potential energy at the top (because potential energy is directly proportional to the height).
The total mechanical energy of the ball, which is conserved, is the sum of potential and kinetic energy:
[tex]E=PE+KE=const.[/tex]
At the top of the building,
[tex]E=PE_{top}[/tex]
While halfway through the fall,
[tex]PE_{half}=\frac{PE_{top}}{2}=\frac{E}{2}[/tex]
And the mechanical energy is
[tex]E=PE_{half} + KE_{half} = \frac{PE_{top}}{2}+KE_{half}=\frac{E}{2}+KE_{half}[/tex]
which means
[tex]KE_{half}=\frac{E}{2}[/tex]
So, when the ball is halfway through the fall, the potential energy and the kinetic energy are equal, and they are both half of the total energy.
3)
Just before the ball hits the ground, the situation is the following:
- The height of the ball relative to the ground is now zero: [tex]h=0[/tex]. This means that the potential energy of the ball is zero: [tex]PE=0[/tex]
- The kinetic energy, instead, is not zero: in fact, the ball has gained speed during the fall, so [tex]v\neq 0[/tex], and therefore the kinetic energy is not zero
Therefore, just before the ball hits the ground, it has more kinetic energy than potential energy.
4)
The potential energy of the ball as it sits on top of the building is given by
[tex]PE=mgh[/tex]
where:
m = 2 kg is the mass of the ball
[tex]g=9.8 m/s^2[/tex] is the acceleration of gravity
h = 40 m is the height of the building, where the ball is located
Substituting the values, we find the potential energy of the ball at the top of the building:
[tex]PE=(2)(9.8)(40)=784 J[/tex]
5)
The potential energy of the ball as it is halfway through the fall is given by
[tex]PE=mgh[/tex]
where:
m = 2 kg is the mass of the ball
[tex]g=9.8 m/s^2[/tex] is the acceleration of gravity
h = 20 m is the height of the ball relative to the ground
Substituting the values, we find the potential energy of the ball halfway through the fall:
[tex]PE=(2)(9.8)(20)=392 J[/tex]
6)
The kinetic energy of the ball halfway through the fall is given by
[tex]KE=\frac{1}{2}mv^2[/tex]
where
m = 2 kg is the mass of the ball
v = 19.8 m/s is the speed of the ball when it is halfway through the fall
Substituting the values into the equation, we find the kinetic energy of the ball when it is halfway through the fall:
[tex]KE=\frac{1}{2}(2)(19.8)^2=392 J[/tex]
We notice that halfway through the fall, half of the initial potential energy has converted into kinetic energy.
7)
The kinetic energy of the ball just before hitting the ground is given by
[tex]KE=\frac{1}{2}mv^2[/tex]
where:
m = 2 kg is the mass of the ball
v = 28 m/s is the speed of the ball just before hitting the ground
Substituting the values into the equation, we find the kinetic energy of the ball just before hitting the ground:
[tex]KE=\frac{1}{2}(2)(28)^2=784 J[/tex]
We notice that when the ball is about to hit the ground, all the potential energy has converted into kinetic energy.
Learn more about kinetic and potential energy:
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Answer:
Quest ions
(Score for Question 1: ___ of 7 points)
1. Does the bowling ball have more potential energy or kinetic energy as it sit on top of the building? Why?
Answer: The bowling ball has more potential energy as it sits on top of the building because the force necessary to take the object from greater height will be more than from a lower height. Potential energy is stored energy, so when an object's height changes, its potential falls and becomes lower.
(Score for Question 2: ___ of 7 points)
2. Does the bowling ball have more potential energy or kinetic energy as it is half way through its fall? Why?
Answer: The potential and kinetic energy are the same as it is half way through its fall. The height is 20m half way through the fall, that also means that the potential energy is half of when the ball was at the top of the building.
E= PE + KE,
E= PE at the top,
E= PE half way + KE half way = PE at the top / 2 + KE half way = E / 2 + KE half way,
PE half way= PE at the top / 2 = KE half way = E / 2,
So when the ball is half way the kinetic energy and potential energy are equal, and each is half of the total energy.
(Score for Question 3: ___ of 7 points)
3. Does the bowling ball have more potential energy or kinetic energy just before it hits the ground? Why?
Answer: The bowling ball has more kinetic energy just before it hits the ground because it’s moving faster, and the faster something moves, the more kinetic energy it has.
(Score for Question 4: ___ of 4 points)
4. What is the potential energy of the bowling ball as it sits on top of the building?
Answer:
PE= mgh
Given:
mass= 2 kg,
gravity= 9.8m/s2,
height (where it’s located) = 40m,
PE= (2) (9.8) (40) = 748J
(Score for Question 5: ___ of 4 points)
5. What is the potential energy of the ball as it is half way through the fall, 20 meters high?
Answer:
PE= mgh
Given:
mass= 2 kg,
gravity= 9.8m/s2,
height (where it’s located) = 20m,
PE= (2) (9.8) (20) = 392J
(Score for Question 6: ___ of 3 points)
6. What is the kinetic energy of the ball as it is half way through the fall?
Answer:
KE= ½mv2
Given:
m= 2kg
v (the speed of the ball when it is halfway through the fall) = 19.8m/s
KE= ½ (2) (19.8)2 = 392J
(Score for Question 7: ___ of 3 points)
7. What is the kinetic energy of the ball just before it hits the ground?
Answer:
KE= ½mv2
Given:
m= 2kg
v (the speed of the ball when it is halfway through the fall) = 28m/s
KE= ½ (2) (28)2 = 784J
