What is the Escape Speed Formula and How Do I Use It to Solve Problems?

AI Thread Summary
The discussion focuses on calculating the potential energy of a 118.0-kg object at Earth's surface, yielding a value of -7.374E09 joules. It explains the concept of escape speed, defined by the equation sqrt(2gRe), which results in an escape speed of 11.2 km/s. The escape speed is the minimum velocity needed for an object to break free from Earth's gravitational pull without additional propulsion. The kinetic energy of the object must equal its gravitational potential energy to escape to infinity. Understanding this relationship clarifies how to apply the escape speed formula in problem-solving.
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problem:
Taking the potential energy to be zero at infinite separation, find the potential energy of a 118.0-kg object at the surface of the earth. (Use 6.37E+6 m for the Earth's radius.)
I did this and got -7.374E09.
It then asks Find the escape speed for a body projected from this height.
I do not understand the concept of escape speed. In my book it gives this equation: sqrt 2gRe
It then goes on to solve the equation to be 11.2km/s.
How do I use this equation or the concept of escape speed to solve this problem.
Thanks for the help.
 
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It's just the simplification of (1/2)mv^2=[G(Me)m]/(Re). For the object to escape to infinity, its kinetic energy must at least equal to its potential energy on the Earth because that much of work has to be done to bring the object to the infinity.
 
Thank you very much that makes a lot of sense!
 

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