Calculating Impact Speed of 4.00kg Cannon Ball Dropped from 55.0m

AI Thread Summary
The discussion focuses on calculating the impact speed of a 4.00 kg cannonball dropped from a height of 55.0 m using energy conservation principles. The gravitational potential energy at the top is converted into kinetic energy at the bottom, leading to the equation mgh = 1/2 mv^2. By substituting the values, the potential energy is calculated as 2200 J, which equals the kinetic energy just before impact. The final speed is derived using the formula v = sqrt(2gh), resulting in an impact speed of approximately 32.8 m/s. This method effectively demonstrates the application of energy conservation in physics problems.
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Homework Statement


Using energy conservation and assuming negligible air resistance, calculate the impact speed of a 4.00 kg cannon ball after being dropped from a height of 55.0 m.



Homework Equations


KE sub total=KE sub 1+KE sub 2
speed=distance/time
gravity=9.8


The Attempt at a Solution


I'm completely lost as to how to get this with energy conservation. Can someone please help?
 
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Welcome to the physics forums! Hope you ask lots of questions here.

As the ball drops, its gravitational potential energy is converted to kinetic energy. Start with:
Potential energy at the top = kinetic energy at the bottom

Fill in the detailed formulas, solve for the quantity you want to find, then put in the numbers you know.
 
Thank you!

TE=KE+PE sub g
PE sub g=mgh
PE sub g=4*9.8*55=2200 J
KE=0
TE=0+2200
2200=KE+0
KE=2200=1/2*4*v^2
4400=4*v^2
1100=v^2
v=33 m/s
 
That's it!
Maybe simpler to write mgh = 1/2m*v^2, cancel the m's, then solve for v:
v = sqrt(2gh) = sqrt(2*g*55) = 32.8 m/s
 

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