Answer:
w = 11.211 KN/m
Explanation:
Given:
diameter, d = 50 mm
F.S = 2
L = 3
Due to symmetry, we have:
[tex] Ay = By = \frac{w * 6}{2} = 3w [/tex]
[tex] P_c_r = 3w * F.S = 3w * 2.0 = 6w [/tex]
[tex] I = \frac{\pi}{64} (0.05)^4 = 3.067*10^-^7 [/tex]
To find the maximum intensity, w, let's take the Pcr formula, we have:
[tex] P_c_r = \frac{\pi^2 E I}{(KL)^2} [/tex]
Let's take k = 1
[tex] E = 200*10^9 [/tex]
Substituting figures, we have:
[tex] 6w = \frac{\pi^2 * 200*10^9 * 3.067*10^-^7}{(1 * 3)^2} [/tex]
Solving for w, we have:
[tex] w = \frac{67266.84}{6} [/tex]
w = 11211.14 N/m = 11.211 KN/m
Since Area, A= pi * (0.05)²
[tex] \sigma _c_r = \frac{w}{A} [/tex]
[tex] \sigma _c_r = \frac{11.211}{\pi (0.05)^2} = 1.4 MPA < \sigma y[/tex]. This means it is safe
The maximum intensity w = 11.211KN/m
