Let [tex]F_{1}=F_{2}=F[/tex].
Normal force equals (using Newton's third law) [tex]N=mg+F\sin30^{o}-F\sin37^{o}[/tex].
[tex]F_{f}\leq \mu N = \mu(mg+F\sin30^{o}-F\sin37^{o})[/tex], but [tex]F_{f}\leq F(\cos30^o+\cos37^o)[/tex] for all [tex]F_{f}[/tex] (in order to start moving the break). Therefore [tex]F(\cos 30^o+\cos37^o)\geq \mu(mg+F\sin30^{o}-F\sin37^{o})[/tex], solving for [tex]F[/tex]: [tex]F\geq \frac{\mu mg}{\cos30^o+\cos37^o-\mu\sin30^o+\mu\sin37^o}\approx 46,91\; \textbf{N}[/tex]
