Question 21.P.8: In the experimental determination of the buckling loads for ...

a. The Euler buckling load for a pin-ended column is given by Eq. (21.5) P_{\mathrm{CR}}=\frac{\pi^{2} E I}{L^{2}}. The second moment of area of a circular section column is \pi D^{4}/64 which, in this case, is given by I = π × 12.5^{4}/64 = 1198.4 mm{4}

The area of cross section is

A=\pi \times \frac{12.5^{2}}{4}=122.72 \mathrm{~mm}^{2}

i.

P=\pi^{2} \times 200000 \times \frac{1198.4}{(500)^{2}}

i.e.

P = 9462.2 N

Therefore the test result conforms to the Euler theory.

ii.

P=\pi^{2} \times 200000 \times \frac{1198.4}{(200)^{2}}

i.e.

P = 59 137.5 N

Therefore the test result does not conform to the Euler theory.

b. From Eq. (21.27) P=\frac{\sigma_{S} A}{1+k\left(L_{e} / r\right)^{2}} and considering the first test result From Eq. (21.27) and considering the first test result

9800=\frac{122.72 \sigma_{\mathrm{s}}}{\left[1+\frac{k L^{2}}{\left(\frac{11984}{122 / 2}\right)}\right]}

which simplifies to

79.86+2.05 \times 10^{6} k=\sigma_{\mathrm{s}}

Similarly, from the second test result

215.12+0.88 \times 10^{6} k=\sigma_{\mathrm{s}}

Solving gives

k=1.16 \times 10^{-4}, \quad \sigma_{\mathrm{s}}=317.2 \mathrm{~N} / \mathrm{mm}^{2}