Qns on Motion & Work: Find 1/2(M+m)v^2

AI Thread Summary
The discussion centers on calculating the work done by a man jumping off a stationary boat, resulting in the boat moving in the opposite direction. The correct approach involves using conservation of momentum to determine the man's speed after the leap, as he will not share the same speed as the boat. The total work done is the sum of the kinetic energies of both the man and the boat. The final answer is expressed as 1/2(M + (M^2/m))v^2, reflecting the contributions from both masses. Understanding the relationship between momentum and kinetic energy is crucial for solving this problem accurately.
Delzac
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A man of mass "m" on an initially stationary boat gets off the boat by jumping to the left in an exactly horizontal direction. Immediately after he leaps, the boat of mass "M", is observed to be moving to the right at speed v. how much work did the man do during the leap ( both to his own body and on the boat)?

is the ans as simple as " 1/2(M+m)v^2 " , or is there on to it?
 
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Delzac said:
A man of mass "m" on an initially stationary boat gets off the boat by jumping to the left in an exactly horizontal direction. Immediately after he leaps, the boat of mass "M", is observed to be moving to the right at speed v. how much work did the man do during the leap ( both to his own body and on the boat)?

is the ans as simple as " 1/2(M+m)v^2 " , or is there on to it?
Careful. It is true that the answer will be the sum of the kinetic energies of the boat and man but the man will not have the same speed as the boat. Use conservation of momentum to find the speed of the man then add the kinetic energies of the boat and man.
Patrick
 
got it! the ans is 1/2(M+(M^2/m))v^2 right? thanks a bunch!
 

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