Answer:
The minimum tension required in the cable in order for the log to begin to move is [tex]T=1154.7N[/tex]
Explanation:
In this problem we use Newton's equations, put a system of reference centered in the log (as a punctual mass), and analyse the forces in vertical y and horizontal x directions.
We get that
[tex]N+Tsin(30)=W[/tex]
for y, where N is the normal force, T is what we want to know and W is given in the problem, for x we have
[tex]Tcos(30)=\mu N=\mu W-\mu Tsin(30)[/tex]
where we have replaced N from the first equation, then we clear T
[tex]T=\frac{\mu W}{\mu sin(30)-cos(30)}=\frac{0.5*500N}{0.5^2+\frac{\sqrt{3}}{2}}=1154.7N[/tex]
which is the answer to the problem.
