Turning effect of forces - moments

AI Thread Summary
The discussion revolves around calculating the tension in a rope supporting a uniform board with a man standing on it. The principle of moments is applied, where the sum of anti-clockwise (ACW) moments equals the sum of clockwise (CW) moments about the hinge. The initial calculation yielded a tension of 1750N, but the correct answer is 1812.5N after considering the weight of the board. Clarifications on the notation used for moments were provided, emphasizing the importance of accounting for all forces in static equilibrium. The final tension in the rope is confirmed to be 1812.5N.
INeedHelpPls
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Homework Statement


A uniform board is hinged at A and supported by a vertical rope at P, 6.0m from A. A man of weight 700N stands at the end of the board at point B, which is 15.0m from hinge A. If weight of board is 50N,calculate the tension T in the rope.

Homework Equations


By principle of moments and taking moments about the hinge A, sum of ACW moments= sum of CW moments

The Attempt at a Solution


By principle of moments and taking moments about hinge A,
sum of ACW moments = sum of CW moments
700 x 15 = T x 6
T= 1750N

however, final answer is 1812.5N, can anyone help please? Thanks in advance!
 
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INeedHelpPls said:

The Attempt at a Solution


By principle of moments and taking moments about hinge A,
sum of ACW moments = sum of CW moments
700 x 15 = T x 6
T= 1750N

however, final answer is 1812.5N, can anyone help please? Thanks in advance!


You forgot the weight of the board.

ehild
 
i could not understand what you meant by ACW and CW but this question is not that hard, just take all moments about A, it must be equal to 0 since there is a static equilibrium.
taking upwards +, downwards -
6T-50.7,5-700.15=0
T=(10875)/6=1812.5N
 
Sorry ehild, while i was typing there was no answer
 
okay thanks alot.. but i don't understand sigmaro's working :(
ACW= anti-clockwise and CW =clockwise.. something like taking upwards as + and downwards as -
 
it is nothing but rearranging
ACW=CW as ACW-CW=0 or CW-ACW=0
later on you will see that moment is a vector in fact and you will get used to this notation
 
what does the comma mean?
 
i used "." instead of "*", and so i used "," instead of "."
7,5=15/2
 

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