Mechanical Design in Optical Engineering. For a prismatic bar of length L in tension by axial forces P we have determined:

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1 Deformation of Axial Members For a prismatic bar of length L in tension by axial forces P we have determined: σ = P A δ ε = L It is important to recall that the load P must act on the centroid of the cross section. Now, let us assume that the bar is made of a homogenous material and that the material is linearly elastic so that Hooke s law applies. E = σ/ε Combining and solving for displacement, we obtain the following equation for the elongation (deformation) of the bar. δ = PL AE he above equation shows that deformation is proportional to the load and the length and inversely proportional to the cross sectional area and the elastic modulus of the material. he product AE is known as the axial rigidity of the bar. We can see that a bar is tension is analogous to an axially loaded spring. Recall for a spring P = Kδ, where K is the spring stiffness. Likewise, the above equation can be expressed as follows: P = AE L δ he quantity AE/L is the stiffness K of an axially loaded bar and is defined as the force required to produce a unit deflection. In an analogous manner, the flexibility ƒ is defined as the deformation due to a unit load. hus the flexibility of a axially loaded bar is: f = L AE In general, the total elongation (deformation) of a bar consisting of several parts having different axial forces and cross sectional areas may be obtained as follows: PL n n i i δi i= 1 i= 1 AiE i δ = = 24

2 Consider the following example: Where: a = 10 in A (a) = 1 in 2 b = 15 in A (b) = 2.0 in 2 P 1 = P 2 = 1000 lbs E 1 = E 2 = 10,000,000 psi When the axial force or the cross-sectional area varies continuously along the axis of the bar, the previous equation is no longer suitable. Recall the strain at point Q is defined as follows: ε Q δ = = x lim x 0 dδ dx herefore: dδ = ε dx Q But ε = σ/e and σ = P/A dδ = Px A E x dx L Px dx δ = A E 0 x 25

3 hermal Strains & Design Concepts hermal Strains All the members and structures we have considered so far were assumed to be at a constant uniform temperature. Let us consider a homogeneous bar AB, which rest freely on a smooth horizontal surface. If we raise the temperature by, we observe the bar elongates by an amount δ. δ = α ( ) L Where α is a material characteristic called the coefficient of thermal expansion. herefore, we conclude that the thermal strain is: ε = α α = in/in/ F or in/in/ C or mm/mm/ C In many cases α is stated as parts/million/ F or parts/million/ C. Strains caused by temperature changes and strains caused by applied loads are essentially independent. herefore, the total amount of strain may be expressed as follows. ε total = ε σ + ε σ εtotal = + α E Note: Since homogeneous, isotropic materials expand uniformly in all directions when heated (and contract uniformly when cooled), neither shear stresses nor shear stains are affected by temperature changes 26

4 Now let us consider that the same rod is placed between two fixed supports as shown below. It is assumed that there is no stress or strain in the rod at this initial condition. If we raise the temperature by, the rod cannot elongate because of the supports. herefore, δ = 0. Our problem is to determine the stress in the bar caused by the temperature change. From previous examples, we observe that this problem is statically indeterminate. Superposition Method 1. Designate one of the unknown reactions as redundant and eliminate the corresponding support. 2. reat the redundant reaction as an unknown load, which together with the other loads must produce deformations that are compatible with the original constraints. 3. Solve by considering separately the deformations caused by the given loads and the redundant reactions and by adding (superposing) the results obtained. Substituting: δ = δ + δ = P 0 PL δ = α( ) L + = 0 AE 27

5 herefore: And: P = AEα ( ) P σ = = Eα( ) A Coefficient of hermal Expansion for Common Materials Coefficient of thermal Material expansion z 10-6 / F 10-6 / C Aluminum and aluminum alloys Brass Red brass Naval brass Brick Bronze Manganese bronze Cast Iron Gray cast iron Concrete Medium strength 6 11 Copper Beryllium copper Glass Magnesium (pure) Alloys Monel (67% Ni, 30% Cu) Nickel Nylon Rubber Steel High-strength Stainless Structural Stone itanium (Alloys) ungsten Wrought Iron

6 Design Concepts Failure State or condition in which the member or structure no longer functions as intended. Modes of Failure Yielding Fracture Excessive deformation Creep Buckling Fatigue Brittle Fracture (Fracture Mechanics) Mathematical Analysis Probabilistic mechanical design Allowable stress design (ASD) Factor of Safety Margin of Safety Strength FS = Stress Allowablestress MS = 1 Stress 29

7 Knife Edge Support Example FEA Analysis of Knife Edge Support 4 Node Shell Elements Cell Structure Knife Edge 3 Node Beam Elements Bolts 2g Gravity Load Applied as Pressure to Knife Edge FE Model Max Displacement. = in. 30

8 Max Stress = 8416 psi Margin of Safety (Ball Aerospace Equation) MS = Ring Gravity hickness Load (in) AllowableS tress 1 LimitStres s * FS Yield Ultimate Factor of Factor of Margin of Margin of Principal Stress Ring Strength Strength Safety Safety Safety Safety Stress Concentration Material (psi) (psi) (yield) (ultimate) (yield) (ultimate) (psi) Factor

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