Problem 7.8. Lateral-torsional buckling

A simply supported beam with fork support is subjected to uniformly distributed load, p = 81.9 N/m. Its profile is given in Problem 7.7 a), length of the beam is, L = 4 m. Check the resistance for lateral-torsional buckling.

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Critical bending moment, M_cr[kNm]=

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Steps
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Step 1. Calculate the section properties.

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Section properties were calculated in the previous Problem.

A = 2 \times 100 \times 3 + 150 \times 3 = 1050 {mm}^{2} I_{z} = 2 \frac{100^{3} \times 3}{12} + \frac{150 \times 5^{3}}{12} = 5.003 \times 10^{5} {mm}^{4} i_{o}^{2} = \frac{I_{z}}{A} + \frac{I_{y}}{A} = \frac{5.003 \times 10^{5}}{1050} + \frac{4.356 \times 10^{6}}{1050} = 4624.6 {mm}^{2} I_{ω} = \frac{b_{f}^{3} t_{f}}{24} d^{2} = \frac{100^{3} \times 3}{24} 153^{2} = 2.926 \times 10^{9} {mm}^{6} I_{t} = 2 \frac{100 \times 3^{3}}{3} + \frac{150 \times 3^{3}}{3} = 3150 {mm}^{4}

Step 2. Give the buckling loads of the beam.

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Results of the previous problem are modified by the different buckling length

N_{y, cr} = \frac{π^{2} E I_{z}}{L^{2}} = \frac{π^{2} \times 210 \times 10^{3} \times 5.003 \times 10^{5}}{{(4.0 \times 10^{3})}^{2}} = 64.81 \times 10^{3} N = 64.81 kN N_{ω, cr} = \frac{1}{i_{o}^{2}} (\frac{π^{2} E I_{ω}}{L^{2}} + G I_{t}) = \frac{1}{4624.6} (\frac{π^{2} 210 \times 10^{3} \times 2.926 \times 10^{9}}{4.0 \times 10^{3}} + 87.5 \times 10^{3} \times 3150) = 141.6 \times 10^{3} N = 141.6 kN

Step 3. Determine the critical bending moment.

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Eq.(7-158) and Table 7.6.

$M_{cr} = 1.13 N_{y, cr} \sqrt{i_{pt}^{2} \frac{N_{ω, cr}}{N_{y, cr}}} = 1.13 \times 64.81 \times 10^{3} \sqrt{4624.6 \frac{141.6}{64.81}} = 7.361 \times 10^{6} Nmm = 7.361 kNm where i_{pt}^{2} = i_{o}^{2}$

The cross section is doubly symmetrical (β = 0) and the load acts above the shear center (in the symmetry axis), Δ = 0.

Step 4. Check the beam for lateral-torsional buckling.

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$M_{\max} = \frac{p L^{2}}{8} = \frac{0.819 \times 4 . 0^{2}}{8} = 0.1638 kNm < M_{cr} = 7.361 kNm$

The beam is safe.

Results
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The section properties are given below.

See in the previous Problem.

A = 2 \times 100 \times 3 + 150 \times 3 = 1050 {mm}^{2} I_{z} = 2 \frac{100^{3} \times 3}{12} + \frac{150 \times 5^{3}}{12} = 5.003 \times 10^{5} {mm}^{4} i_{o}^{2} = \frac{I_{z}}{A} + \frac{I_{y}}{A} = \frac{5.003 \times 10^{5}}{1050} + \frac{4.356 \times 10^{6}}{1050} = 4624.6 {mm}^{2} I_{ω} = \frac{b_{f}^{3} t_{f}}{24} d^{2} = \frac{100^{3} \times 3}{24} 153^{2} = 2.926 \times 10^{9} {mm}^{6} I_{t} = 2 \frac{100 \times 3^{3}}{3} + \frac{150 \times 3^{3}}{3} = 3150 {mm}^{4}

The buckling loads of the beam are

Results of the previous problem are modified by the different buckling length

N_{y, cr} = \frac{π^{2} E I_{z}}{L^{2}} = \frac{π^{2} \times 210 \times 10^{3} \times 5.003 \times 10^{5}}{{(4.0 \times 10^{3})}^{2}} = 64.81 \times 10^{3} N = 64.81 kN N_{ω, cr} = \frac{1}{i_{o}^{2}} (\frac{π^{2} E I_{ω}}{L^{2}} + G I_{t}) = \frac{1}{4624.6} (\frac{π^{2} 210 \times 10^{3} \times 2.926 \times 10^{9}}{4.0 \times 10^{3}} + 87.5 \times 10^{3} \times 3150) = 141.6 \times 10^{3} N = 141.6 kN

The critical bending moment is determined as follows

Eq.(7-158) and Table 7.6.

$M_{cr} = 1.13 N_{y, cr} \sqrt{i_{pt}^{2} \frac{N_{ω, cr}}{N_{y, cr}}} = 1.13 \times 64.81 \sqrt{4624.6 \frac{141.6}{64.81}} = 7.361 \times 10^{6} Nmm = 7.361 kNm where i_{pt}^{2} = i_{o}^{2}$

The cross section is doubly symmetrical (β = 0) and the load acts above the shear center (in the symmetry axis), Δ = 0.

$M_{\max} = \frac{p L^{2}}{8} = \frac{0.819 \times 4 . 0^{2}}{8} = 0.1638 kNm < M_{cr} = 7.361 kNm$

The beam is safe for lateral-torsional buckling.