I'm done discussing this issue with you Carll68....you have no reply but empty attacks.
Thank you for the replies W.D. Clinger and femr2...they are appreciated.
I posted this question on another forum and I got what appears to be a good answer working through the solution to hte differential equation....I dont find any math errors or reasoning errors in the solution (although as femr2 has said there might be some simplifying assumptions when compared to a "real world" example).
My post was on
physicsforums , feel free to add to that thread or confirm/dispute the answer I received.
From a theoretical point of view....it looks good to me.
Ahhh..I see. You posted your question on a physics forum, and, Viola, the answer is the exact answer I stated it was.
Hmmm.....
So, to sum up, as I have been saying over and over...FEMR was absolutley wrong. He failed.
Nice to see others acknowledge this.
So, to refresh everyone, the answer to this question:
A weight is hanging on an elastic thread. An additional stretching force F is applied and is gradually (slowly) increased. When the force reaches value Fo the thread breaks. What should be the minimal size of a force that breaks the thread, if such a force is applied instantaneously and remains unchanged.
Is this:
The answer: The thread will break if F=Fo/2.
Because of this:
Before the force is applied the weight of the object hanging on the thread is balanced by the tension force of the thread. Once the additional force F is applied downwards the TOTAL force becomes F, and the weight starts executing harmonic oscillation under the influence of the forces. It starts the oscillation at the top point of the period. After a quarter of the period it reaches the midpoint of the oscillation at which the total force vanishes. After half of the period it reaches the bottom point of the oscillation, at which, by symmetry, the total force is F UPWARDS. This total force is result of the applied external force F pointing downwards, and the increase in the thread tension, which must be 2F and point upwards. Thus, the maximal thread tension is TWICE larger than the applied force. Consequently, F=Fo/2 suffices to break the thread.
Answered most recently here:
http://www.physicsforums.com/showthread.php?p=2815761&posted=1#post2815761
The answer was not this:
1/1.76Fo
Also, unlike our resident Charlatan FEMR stated emphatically,
it was also not neccesary to know the lenght, weight, or anything else in order to answer the question...look over the physics forum linked above to see how wrong FEMR is (and he still doenst get it)
Looks like a lot of posters just made posteriors of themselves for following the (scoff) 'physics expert' FEMR who failed to answer or understand a High School level physics question, and argued until he was cherry red that his wrong answer was the right answer.
I, on the other hand, have never claimed to be a 'physics expert'..and, gee..I still knew the answer.
Call it a 'hit piece'...it was not, and, you are wrong.
It was a simple question a self proclaimed 'physics expert' should have been able to answer. He did not. He failed.
) that I'm unable to ignore certain individuals brand of *discussion*. Even my ranged answer still includes many assumptions. It only includes the addition of the damping ratio for the elastic thread (assumed to be rubber).
