The maximum allowable tensile force in the members of the truss is $\left(F_{t}\right)_{\max }=5 \mathrm{kN},$ and the maximum allowable compressive force is $\left(F_{c}\right)_{\max }=3 \mathrm{kN} .$ Determine the maximum magnitude of load $\mathbf{P}$ that can be applied to the truss. Take $d=2 \mathrm{m}$
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The maximum allowable tensile force in the members of the truss is $\left(F_{t}\right)_{\max }=5 \mathrm{kN},$ and the maximum allowable compressive force is $\left(F_{c}\right)_{\max }=3 \mathrm{kN} .$ Determine the maximum magnitude $P$ of the two loads that can be applied to the truss.
The maximum allowable tensile force in the members of the truss is (F_t)_max = 5 kN, and the maximum allowable compressive force is (F_c)_max = 5 kN. (a) Determine the maximum magnitude P of the two loads that can be applied to the truss. Express your answer to three significant figures and include the appropriate units.
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