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Transcript
Chapter 9 Static Equilibrium; Elasticity and Fracture Torque and Two Conditions For Equilibrium An object in mechanical equilibrium must satisfy the following conditions: 1. 2. The net external force must be zero: ΣF = 0 The net external torque must be zero: Στ = 0 Two Conditions of Equilibrium First Condition of Equilibrium ○ The net external force must be zero F 0 or Fx 0 and Fy 0 Necessary, but not sufficient Translational equilibrium Two Conditions of Equilibrium Second Condition of Equilibrium ○ The net external torque must be zero Στ = 0 or Στx = 0 and Στy = 0 Rotational equilibrium Both conditions satisfy mechanical equilibrium Two Conditions of Equilibrium Objects in mechanical equilibrium Rock on ridge See-saw Examples of Objects in Equilibrium Draw a diagram of the system 1. Include coordinates and choose a rotation axis Isolate the object being analyzed and draw a free body diagram showing all the external forces acting on the object 2. For systems containing more than one object, draw a separate free body diagram for each object Examples of Objects in Equilibrium Apply the Second Condition of Equilibrium Στ = 0 This will yield a single equation, often with one unknown which can be solved immediately 4. Apply the First Condition of Equilibrium ΣF = 0 This will give you two more equations 4. Solve the resulting simultaneous equations for all of the unknowns Solving by substitution is generally easiest 3. Examples of Objects in Equilibrium Examples of Free Body Diagrams (forearm) • Isolate the object to be analyzed • Draw the free body diagram for that object • Include all the external forces acting on the object Examples of Objects in Equilibrium FBD - Beam • The free body diagram includes the directions of the forces • The weights act through the centers of gravity of their objects Fig 8.12, p.228 Slide 17 Examples of Objects in Equilibrium FBD - Ladder • The free body diagram shows the normal force and the force of static friction acting on the ladder at the ground • The last diagram shows the lever arms for the forces Examples of Objects in Equilibrium Example: Stress and Strain So far, studying rigid bodies the rigid body does not ever stretch, squeeze or twist However, we know that in reality this does occur, and we need to find a way to describe it. This is done by the concepts of stress, strain and elastic modulus. Stress and Strain All objects are deformable All objects are spring-like! It is possible to change the shape or size (or both) of an object through the application of external forces When the forces are removed, the object tends to its original shape This is a deformation that exhibits elastic behavior (spring-like) Elastic Properties Stress is the force per unit area causing the deformation Strain is a measure of the amount of deformation Elastic Modulus The elastic modulus is the constant of proportionality between stress and strain For sufficiently small stresses, the stress is directly proportional to the strain The constant of proportionality depends on the material being deformed and the nature of the deformation Can be thought of as the stiffness of the material A material with a large elastic modulus is very stiff and difficult to deform ○ Analogous to the spring constant Young’s Modulus: Elasticity in Length Tensile stress is the ratio of the external force to the crosssectional area Tensile is because the bar is under tension The elastic modulus is called Young’s modulus Young’s Modulus, cont. SI units of stress are Pascals, Pa 1 Pa = 1 N/m2 The tensile strain is the ratio of the change in length to the original length Strain is dimensionless F L Y A Lo s t r e s s = E la s t ic m o d u lu s × s t r a in Stress and Strain, Illustrated A bar of material, with a force F applied, will change its size by: ΔL/L = = /Y = F/AY Strain is a very useful number, being dimensionless Example: Standing on an aluminum rod: Y = 70109 N·m2 (Pa) say area is 1 cm2 = 0.0001 m2 say length is 1 m weight is 700 N = 7106 N/m2 = 104 ΔL = 100 m compression is width of human hair L F F A L = F/A = ΔL/L = Y· Young’s Modulus, final Young’s modulus applies to a stress of either tension or compression It is possible to exceed the elastic limit of the material No longer directly proportional Ordinarily does not return to its original length Breaking If stress continues, it surpasses its ultimate strength The ultimate strength is the greatest stress the object can withstand without breaking The breaking point For a brittle material, the breaking point is just beyond its ultimate strength For a ductile material, after passing the ultimate strength the material thins and stretches at a lower stress level before breaking Shear Modulus: Elasticity of Shape Forces may be parallel to one of the object’s faces The stress is called a shear stress The shear strain is the ratio of the horizontal displacement and the height of the object The shear modulus is S Shear Modulus, final F shear stress A x shear strain h F x S A h S is the shear modulus A material having a large shear modulus is difficult to bend Bulk Modulus: Volume Elasticity Bulk modulus characterizes the response of an object to uniform squeezing Suppose the forces are perpendicular to, and act on, all the surfaces ○ Example: when an object is immersed in a fluid The object undergoes a change in volume without a change in shape Bulk Modulus, cont. Volume stress, ΔP, is the ratio of the force to the surface area This is also the Pressure The volume strain is equal to the ratio of the change in volume to the original volume Bulk Modulus, final V P B V A material with a large bulk modulus is difficult to compress The negative sign is included since an increase in pressure will produce a decrease in volume B is always positive The compressibility is the reciprocal of the bulk modulus Notes on Moduli Solids have Young’s, Bulk, and Shear moduli Liquids have only bulk moduli, they will not undergo a shearing or tensile stress The liquid would flow instead Ultimate Strength of Materials The ultimate strength of a material is the maximum force per unit area the material can withstand before it breaks or factures Some materials are stronger in compression than in tension Stress and Strain Example: