Lec3 principle virtual_work_method
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The document summarizes the principle of virtual work (PVW) used in structural analysis. It defines work done by forces and virtual work done by internal forces in structures during small imaginary displacements. It provides examples of using PVW to determine bending moment, axial force, and slope of indeterminate structures by equating virtual work done by internal and external forces. The key concepts are defined in less than 3 sentences.
Lec3 principle virtual_work_method
- 1. Structural Design and Inspection- Principle of Virtual Work By Dr. Mahdi Damghani 2019-2020 1
- 2. Suggested Readings Reference 1 Reference 2 2
- 3. Objective(s) • Familiarity with the definition of work • Familiarity with the concept of virtual work by • Axial forces • Transverse shear forces • Bending • Torsion • Familiarisation with unit load method 3
- 4. Comments • Please post any comments either here or on BB: https://padlet.com/damghani_mahdi/SDI 4
- 5. Introduction • They are based on the concept of work and are considered within the realm of “analytical mechanics” • Energy methods are fit for complex problems such as indeterminate structures • They are essential for using Finite Element Analysis (FEA) • They provide approximates solutions not exact • The Principle of Virtual Work (PVW) is the most fundamental tool of analytical mechanics 5
- 7. Work • Displacement of force times the quantity of force in the direction of displacement gives a scalar value called work cosFWF 2 1 a FWF 2 2 a FWF 21 FFF WWW MWF 7
- 8. Work on a particle • Point A is virtually displaced (imaginary small displacement) to point A’ • R is the resultant of applied concurrent forces on point A • If particle is in equilibrium? R=0 WF=0 8
- 9. Principle of Virtual Work (PVW) • If a particle is in equilibrium under the action of a number of forces, the total work done by the forces for a small arbitrary displacement of the particle is zero. (Equivalent to Newton’s First Law) • Can we say? If a particle is not in equilibrium under the action of a number of forces, the total work done by the forces for a small arbitrary displacement of the particle is not zero. R could make a 90 degree angle with displacement 9
- 10. In other words • The work done by a real force 𝑃 moving through an arbitrary virtual displacement ≈ arbitrary test displacement ≈ arbitrary fictitious displacement 𝛿𝑢 is called the virtual work 𝛿𝑊. It is defined as; 𝛿𝑊 = 𝑃𝛿𝑢 • Note that The word arbitrary is easily understood: it simply means that the displacements can be chosen in an arbitrary manner without any restriction imposed on their magnitudes or orientations. More difficult to understand are the words virtual, test, or fictitious. All three imply that these are not real, actual displacements. More importantly, these fictitious displacements do not affect the forces acting on the particle. • Then we define PVW for both rigid bodies and deformable bodies separately (see subsequent slides). 10
- 11. Note 1 • Note that, Δv is a small and purely imaginary displacement and is not related in any way to the possible displacement of the particle under the action of the forces, F; • Δv has been introduced purely as a device for setting up the work-equilibrium relationship; • The forces, F, therefore remain unchanged in magnitude and direction during this imaginary displacement; • This would not be the case if the displacements were real. 11
- 12. PVW for rigid bodies • External forces (F1 ... Fr) induce internal forces; • Suppose the rigid body is given virtual displacement; • Internal and external forces do virtual work; • There are a lot of pairs like A1 and A2 whose internal forces would be equal and opposite; • We can regard the rigid body as one particle. 21 A i A i FF eitotal WWW 0iW et WW 021 A i A i WW 12 It does not undergo deformation (change in length, area or shape) under the action of forces. Internal forces act and react within the system and external forces act on the system
- 13. PVW for deformable bodies • If a virtual displacement of Δ is applied, all particles do not necessarily displace to the amount of Δ, i.e. internal virtual work is done in the interior of the body. • This principle is valid for; • Small displacements. • Rigid structures that cannot deform. • Elastic or plastic deformable structures. • Competent in solving statically indeterminate structures. 21 A i A i FF 0 ietotal WWW 13 0iW The distance between two points changes under the action of forces.
- 14. Work of internal axial force on mechanical systems/structures 14 Isolate Section This truss element is working under the action of axial load only as a result of external aerodynamic loading. After imposing a virtual displacement, the axial load does virtual work on this truss element. To obtain the amount of virtual work, we obtain the work on the section and then throughout the length (next slide).
- 15. Work of internal axial force A A N AN • Work done by small axial force due to small virtual axial strain for an element of a member: xNxdA A N w v A vNi , • Work done by small axial force due to small virtual axial strain for a member: L vNi dxNw , • Work done by small axial force due to small virtual axial strain for a structure having r members: rm m vmmNi dxNw 1 , 15 x xl l vA A vv :reminder
- 16. Work of internal axial force for linearly elastic material • Based on Hook’s law (subscript v denotes virtual); • Therefore, we have (subscript m denotes member m); EA N E vv v ... 21 22 22 11 11 1 , L v L v rm m L mm vmm Ni dx AE NN dx AE NN dx AE NN w m 16 rm m vmmNi dxNw 1 ,
- 17. Work of internal shear force AS • Work done by small shear force due to small virtual shear strain for an element of a member (β is form factor): xSxdA A S xdAw vv A vSi , • Work done by small shear force due to small virtual shear strain for a member of length L: L vSi dxSw , δS • Work done by small shear force due to small virtual shear strain for a structure having r members: rm m L vmmmSi dxSw 1 , 17
- 18. Work of internal shear force for linearly elastic material • Based on Hook’s law (subscript v denotes virtual); • Therefore, we have (subscript m denotes member m); GA S G vv v ... 21 22 22 2 11 11 1 1 , L v L v rm m L mm vmm mSi dx AG SS dx AG SS dx AG SS w m 18
- 19. Work of internal bending moment • Work done by small bending due to small virtual axial strain for an element of a member: x R M x R y dAw vA v Mi , • Work done by small bending due to small virtual axial strain for a member: L v Mi dx R M w , • Work done by small bending due to small virtual axial strain for a structure having r members: rm m vm m Mi dx R M w 1 , A vMi xdAw , 19 Radius of curvature due to virtual displacement v v EI My v R y IE My EI M R v ,1
- 20. Work of internal bending moment for linearly elastic material • We have (subscript m denotes member m); 1 v v M R EI ... 21 22 22 11 11 1 , L v L v rm m L mm vmm Mi dx IE MM dx IE MM dx IE MM w m 20
- 21. Work of internal torsion • See chapter 2 of Reference 1, chapter 15 of Reference 2 or chapter 9 of Reference 3 for details of this • Following similar approach as previous slides for a member of length L we have; L v Ti dx GJ TT w , • For a structure having several members of various length we have; ... 21 22 22 11 11 1 , L v L v rm m L mm vmm Ti dx JG TT dx JG TT dx JG TT w m 21
- 22. Virtual work due to external force system • If you have various forces acting on your structure at the same time; L yvvvxvyve dxxwTMPWW ,,, )( L L L vAvAvA L vA i dx GJ TT dx EI MM dx GA SS dx EA NN W 0 ie WW 22
- 23. Note • So far virtual work has been produced by actual forces in equilibrium moving through imposed virtual displacements; • Base on PVW, we can alternatively assume a set of virtual forces in equilibrium moving through actual displacements; • Application of this principle, gives a very powerful method to analyze indeterminate structures; 23
- 24. Example 1 • Determine the bending moment at point B in the simply supported beam ABC. 24
- 25. Solution • We must impose a small virtual displacement which will relate the internal moment at B to the applied load; • Assumed displacement should be in a way to exclude unknown external forces such as the support reactions, and unknown internal force systems such as the bending moment distribution along the length of the beam. 25
- 26. Solution • Using conventional equations of equilibrium method; 26 RA RC0CM A A R L Wb b R W L B A ab M R a W L
- 27. Solution • Let’s give point B a virtual displacement; 27 β b a baBv , b L B BvBBie WMWW , L Wab MWa b L M BB Rigid Rigid
- 28. Example 2 • Using the principle of virtual work, derive a formula in terms of a, b, and W for the magnitude P of the force required for equilibrium of the structure below, i.e. ABC (you may disregard the effects weight). 28 A C B W P a b
- 29. Solution • We assume that AB and AC are rigid and therefore internal work done by them is zero • Apply a very small virtual displacement to our system 29 Just to confirm the answer, you would get the same result if you took moment about B, i.e. 𝑀 𝐵 = 0 Virtual movements C A r b r a Virtual work 0 0 0 / A C U P r W r Pa Wb P bW a A C B W P a b Cr Ar
- 30. Example 3 • Calculate the force in member AB of truss structure? 30
- 31. Solution • This structure has 1 degree of indeterminacy, i.e. 4 reaction (support) forces, unknowns, and 3 equations of equilibrium • Let’s apply an infinitesimally small virtual displacement where we intend to get the force • Equating work done by external force to that of internal force gives 31 BvCv CvBv ,, ,, 3 4 43 )tan( kNFF ABBvABCv 4030 ,,
- 32. Example 4 • We would like to obtain slope for the portal frame below; 32 P 2rk1rk 1M 2M h a
- 33. Solution 33 1 1 2 2 e i W P W M M 1 2 / h 1 2 1 2 / /i i W M h M h W M M h 1 2 1 2 1 2 0 1 1 0 0 / i i i e i M k r r W W P M M P M M h h Ph k k P 2rk1rk 1M 2M h a
- 34. Note • The amount of virtual displacement can be any arbitrary value; • For convenience lets give it a unit value, for example in the previous example lets say Δv,B=1; • In this case the method could be called unit load method. 34
- 35. Note • If you need to obtain force in a member, you should apply a virtual displacement at the location where force is intended; • If you need to obtain displacement in a member, you should apply a virtual force at the location displacement is intended. 35
- 36. Example 5 • Determine vertical deflection at point B using unit load method. 36
- 37. Solution • Apply a virtual unit load in the direction of displacement to be calculated 37 LxxMv )( 2 22 222 )( xL wwL wLx wx xM • Work done by virtual unit load Be vw 1 • Work done by internal loads L L v Mi xL EI w dx EI MM w 0 3 , 2 • Equating external work with internal EI wL vxL EI w v B L B 82 1 4 0 3 Virtual system Real system
- 38. Example 6 • Using unit load method determine slope and deflection at point B. 38 AC B D 5kN/m IAB=4x106 mm4 IBC=8x106 mm4 8kN 2m 0.5m 0.5m E=200 kN/mm2
- 39. Solution • For deflection we apply a unit virtual load at point B in the direction of the intended displacement; 39 Virtual system Real system Segment Interval I (mm4) M v (kN.m) M (kN.m) AD 0<x<0.5 4x106 0 8x DB 0.5<x<1 4x106 0 8x-2.5(x-0.5)2 BC 1<x<3 8x106 -x+1 8x-2.5(x-0.5)2 ... 21 22 22 11 11 1 , L v L v rm m L mm vmm Mi dx IE MM dx IE MM dx IE MM w m
- 40. Solution 40 12B mm • For slope we apply a unit virtual moment at point B 2 2 0.5 1 3 6 6 6 0 0.5 1 0 8 2.5 0.5 1 8 2.5 0.50 8 1 200 4 10 200 4 10 200 8 10 v B L x x x x xM M x dx dx dx dx EI 1kN.m ... 21 22 22 11 11 1 , L v L v rm m L mm vmm Mi dx IE MM dx IE MM dx IE MM w m
- 41. Solution 41 Segment Interval I (mm4) M v (kN.m) M (kN.m) AD 0<x<0.5 4x106 0 8x DB 0.5<x<1 4x106 0 8x-2.5(x-0.5)2 BC 1<x<3 8x106 1 8x-2.5(x-0.5)2 3 1 6 21 5.0 6 25.0 0 6 108200 5.05.281 104200 5.05.280 104200 80 1 dx xx dx xx dx x dx EI MM L v B radB 0119.0
- 42. Q1 • Use the principle of virtual work to determine the support reactions in the beam ABCD. 42
- 43. Q2 • Find the support reactions in the beam ABC using the principle of virtual work. 43
- 44. Q3 • Find the bending moment at the three-quarter-span point in the beam. Use the principle of virtual work. 44
- 45. Q4 • Use the unit load method to calculate the deflection at the free end of the cantilever beam ABC. 45
- 46. Q5 • Calculate the deflection of the free end C of the cantilever beam ABC using the unit load method. 46
- 47. Q6 • Use the unit load method to find the magnitude and direction of the deflection of the joint C in the truss. All members have a cross-sectional area of 500mm2 and a Young’s modulus of 200,000 N/mm2. 47
- 48. Q7 • Calculate the forces in the members FG, GD, and CD of the truss using the principle of virtual work. All horizontal and vertical members are 1m long. 48