Created
February 28, 2019 03:14
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Tensegrity Material Analysis
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| #!/usr/bin/env python | |
| import numpy as np | |
| ''' | |
| Notes: | |
| - Tensile strength of 7x19 1/4" galvanized steel wire rope ~ 7000 lbs | |
| ''' | |
| # TUNABLE PARAMETERS | |
| # Length | |
| L = 20 * 12 # Length in inches | |
| K = 1.0 # Column effective length factor -- taken to be 1.0 for pinned at both ends | |
| def buckling(D, W, E): | |
| ''' | |
| Calculate the euler critical buckling load of a round tube column | |
| - D - outer diameter (in) | |
| - W - wall thickness (in) | |
| - E - Modulus of elasticity (ksi) | |
| ''' | |
| # Inner diameter (in) | |
| d = D - 2 * W | |
| # Moment of Inertia (in^4) | |
| inertia = np.pi * ((D ** 4) - (d ** 4)) / 64 | |
| # Euler Critical Buckling Load (lbf) | |
| return 1000 * (np.pi ** 2) * E * inertia / ((K * L) ** 2) | |
| for E in (10000, 30000): # Modulus of elasticity for [aluminum, steel] | |
| for D in [3, 3.5, 4, 5]: # Outer diameter | |
| for W in [.063, .083, .095, 0.1, 0.12, .125, .18, .187, .25]: # Wall thickness | |
| buckle = buckling(D, W, E) | |
| if buckle >= 4000: | |
| mat = {10000: '6061', 30000: 'A500'}[E] | |
| print(f'D {D:0.2f} W {W:0.3f} mat {mat} buckling {buckle:.0f}') | |
| break |
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