Monitoring the degradation in shear and bulk moduli of rubber for inclusion in visco-elastic FE models.This article is organized into four sections, the first two appearing this month and the last two in January 2001 issue. The first section discusses aspects related to the theory of viscoelasticity Viscoelasticity, also known as anelasticity, is the study of materials that exhibit both viscous and elastic characteristics when undergoing deformation. Viscous materials, like honey, resist shear flow and strain linearly with time when a stress is applied. . Time and frequency domains are presented, along with calibration of models for finite element analysis Finite element analysis (FEA) is a computer simulation technique used in engineering analysis. It uses a numerical technique called the finite element method (FEM). There are many finite element software packages, both free and proprietary. (FEA (Finite Element Analysis) A mathematical technique for analyzing stress, which breaks down a physical structure into substructures called "finite elements." The finite elements and their interrelationships are converted into equation form and solved mathematically. ). The second edition is an overview of compressive stress Compressive stress is the stress applied to materials resulting in their compaction (decrease of volume). When a material is subjected to compressive stress, then this material is under compression. Usually, compressive stress applied to bars, columns, etc. leads to shortening. relaxation (CSR (1) (Customer Service Representative) A person who handles a customer's request regarding a bill, account changes or service or merchandise ordered. Agents in call centers are known as CSRs. See call center. ) tests developed in the rubber industry. Section three presents a newer method to monitor shear and bulk moduli of rubber under recycling temperature and the circulation of fluids. Section three also presents results of modeling samples used in testing. Data collected under uniaxial uniaxial /uni·ax·i·al/ (u?ne-ak´se-al) 1. having only one axis. 2. developing in an axial direction only. uniaxial 1. having only one axis. 2. developed in an axial direction only. tension and compression, planar tension and volumetric volumetric /vol·u·met·ric/ (vol?u-met´rik) pertaining to or accompanied by measurement in volumes. vol·u·met·ric adj. Of or relating to measurement by volume. compression, along with decay in shear and bulk moduli with time and temperature, were used in analyzing a seal in Verb 1. seal in - close with or as if with a tight seal; "This vacuum pack locks in the flavor!" lock in confine - prevent from leaving or from being removed section four. Theory of viscoelasticity Many engineering materials are rate-dependent while behaving elastically. Following deformation, they return to their original undeformed state but at non-uniform speeds. For prescribed stresses, these materials exhibit creep, a recoverable phenomenon that also occurs in metals, but only significantly at high temperatures. Polymers are viscoelastic Adj. 1. viscoelastic - having viscous as well as elastic properties natural philosophy, physics - the science of matter and energy and their interactions; "his favorite subject was physics" even at temperatures below -200 [degrees] C. For prescribed strains, polymers exhibit stress relaxation Stress relaxation describes how polymers relieve stress under constant strain. Because they are viscoelastic, polymers behave in a nonlinear, non-Hookean fashion.[1] . Stresses drop to zero for viscoelastic fluids (such as glass and plastics at high temperatures or non-vulcanized rubber). Long term stresses remain in viscoelastic solid (examples being plastics at low temperatures and vulcanized rubber India rubber, vulcanized. - Knight. See also: Vulcanize ). Linear visco-elasticity Linear time dependency means a proportionality of the relaxation rate with the instantaneous stress. In the linear viscoelastic theory, creep and stress-relaxation curves are proportional. Classical viscoelasticity uses the small strain theory, i.e., the instantaneous stress is proportional to the strain. "Finite strain" linear viscoelasticity uses the hyper-elastic theory of elasticity with a relaxation rate proportional to the stress. This is the simplest method for viscoelasticity at large strains, and a small amount of experimental data is sufficient to calibrate To adjust or bring into balance. Scanners, CRTs and similar peripherals may require periodic adjustment. Unlike digital devices, the electronic components within these analog devices may change from their original specification. See color calibration and tweak. the mathematical modeling. Temperature dependency Viscoelastic properties are strongly dependent on temperature. Polymers are viscoelastic at all temperatures as (1) their instantaneous response is temperature-dependent (moduli depending on temperature) and (2) their rate of relaxation is dependent on temperature, in which case these materials are referred to as thermo-rheologically simple (TRS See traffic engineering methods. TRS - term rewriting system ). Frequency domain response For a sinusoidal sinusoidal /si·nus·oi·dal/ (si?nu-soi´dal) 1. located in a sinusoid or affecting the circulation in the region of a sinusoid. 2. shaped like or pertaining to a sine wave. strain [Gamma](t) = [[Gamma].sub.o] [e.sup.iwt] being the angular frequency In physics (specifically mechanics and electrical engineering), angular frequency ω (also referred to by the terms angular speed, radial frequency, and radian frequency) is a scalar measure of rotation rate. , the stress response in a viscoelastic material is out of phase to take the form: [Sigma](t) = [[Sigma].sub.o] [e.sup.i(wt+[Sigma])] where [Delta] is the loss angle. In other words Adv. 1. in other words - otherwise stated; "in other words, we are broke" put differently , the strain lags behind the stress by an angle [Delta]. For a purely elastic material [Delta] = 0 whereas [Delta] [much greater than] 0 for polymers (such as rubbers). It is convenient to separate the viscoelastic response of materials into "in-" and "out-of-phase" components. It is also useful to introduce a "complex" modulus: G*(w) = [Sigma] (t)/[Gamma](t) = [[Sigma].sub.o][e.sup.i(wt+[Sigma])]/[[Gamma].sub.o][e.sup.iwt] or [[Sigma].sub.o]/[[Gamma].sub.o] cos [Delta] + i [[Sigma].sub.o]/[[Gamma].sub.o] sin [Delta] Storage and loss moduli, [G.sub.s] or [[Sigma].sub.o]/[g.sub.o] cos [Delta] and [G.sub.1] or [[Sigma].sub.o]/[[Gamma].sub.o] sin [Delta] characterize the in- and out-of-phase response of materials. Complex moduli for uniaxial, shear and hydrostatic hy·dro·stat·ic or hy·dro·stat·i·cal adj. Of or relating to fluids at rest or under pressure. hydrostatic pertaining to a liquid in a state of equilibrium or the pressure exerted by a stationary fluid. deformation are: E*(w) = [E.sub.s] + i[E.sub.1] = E' + iE", G*(w) = [G.sub.s] + i[G.sub.1] = G' + iG" and K*(w) = [K.sub.s] + i[K.sub.1] = K' + iK". Real and imaginary parts in the forms listed are storage and loss moduli. These depend on frequency for unfilled rubbers, but their ratio is independent of the strain amplitude; [G.sub.1]/[G.sub.s] or tan [Delta] is the loss tangent. For filled rubbers, storage and loss moduli depend on the strain amplitude and test data should be very near the amplitude to model. Hysteresis hysteresis (hĭs'tərē`sĭs), phenomenon in which the response of a physical system to an external influence depends not only on the present magnitude of that influence but also on the previous history of the system. For cyclic loading, viscoelastic materials dissipate energy: for a strain input [Gamma](t) = [[Gamma].sub.o] sin(wt), the stress output is [Sigma](t) = [[Sigma].sub.o] sin (wt+[Delta]). Strain energy U takes the form: [MATHEMATICAL EXPRESSION A group of characters or symbols representing a quantity or an operation. See arithmetic expression. NOT REPRODUCIBLE IN ASCII ASCII or American Standard Code for Information Interchange, a set of codes used to represent letters, numbers, a few symbols, and control characters. Originally designed for teletype operations, it has found wide application in computers. ] At very high cycling frequencies, instantaneous properties characterize the viscoelastic response of materials. At very low cycling frequencies, long-term properties characterize such a response. Material damage There is a difference between the response of rubber during a first stretch or after repeated straining; rubber gets damaged with stretching besides hysteresis. Before measuring rubber properties, one should consider the end-use application of the product that will be made out of the rubber being tested. Pre-conditioning rubber prior to data collection, if any, should derive from such a consideration. Dampening characteristics of rubber In practical applications, damping characteristics of rubber are very important. These are dependent on chemical constituents of the rubber and are often tailored to specific requirements. Fillers (such as carbon black and silica) strongly influence both elastic and viscoelastic behavior of rubber. The relaxation rate in unfilled rubber is proportional to the stress level. It is thus possible to characterize the behavior of unfilled rubber with finite strain viscoelasticity. Unfortunately, the relaxation rate is not proportional to the stress in filled rubbers. Linear viscoelastic theory Classical linear viscoelasticity derives a relaxation modulus from a one-step strain test (a relaxation test). Figure 1 shows the tensile mode of deformation. [ILLUSTRATION OMITTED] In classical linear viscoelasticity, the strain [Epsilon](t) equals [[Epsilon].sub.o]H(t) and stress at time t: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where [Epsilon](-[infinity]) = 0 and E(t) is the "relaxation modulus." The relaxation modulus can be obtained from a one-step strain test. In such a case, the stress-strain relation can be inverted inverted reverse in position, direction or order. inverted L block a pattern of local filtration anesthesia commonly used in laparotomy in the ox. and strain at time t is characterized by: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where [Sigma](-[infinity]) = 0 and J(t) is the "creep function." The creep function can also be obtained from a one-step stress test (a creep test) in which case: [Sigma](t) = [[Sigma].sub.o]H(t) and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] or J(t) = [Epsilon](t)/[[Sigma].sub.o] E(t) and J(t) are related through: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] The energy dissipated under controlled stress or strain is the same. In finite strain viscoelasticity, the stress relaxation equation has to be written entirely in terms of stress. Using integration by parts In calculus, and more generally in mathematical analysis, integration by parts is a rule that transforms the integral of products of functions into other, hopefully simpler, integrals. The rule arises from the product rule of differentiation. : [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] Note that creep and stress relaxation are conjugate conjugate /con·ju·gate/ (kon´jdbobr-gat) 1. paired, or equally coupled; working in unison. 2. a conjugate diameter of the pelvic inlet; used alone usually to denote the true conjugate diameter; see . Time domain viscoelasticity Advanced finite element See FEA. codes such as ABAQUS and MARC use isotropic Refers to properties that do not differ no matter which direction is measured. For example, an isotropic antenna radiates almost the same power in all directions. In practice, antennas cannot be 100% isotropic. linear viscoelasticity and treat relaxation moduli for deviatoric and volumetric behavior separately: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where S = [Sigma] + pI and p = -1/3 tr([Sigma]) The user must supply [G.sub.o], [K.sub.o], G(t) and K(t). Prony series representation G(t) and K(t) are often expressed in terms of Prony series: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where instantaneous moduli [G.sub.o] and [K.sub.o] can be determined from [E.sub.o] and [v.sub.o], the instantaneous Young's (or elasticity) modulus and Poisson's ratio When a sample of material is stretched in one direction, it tends to get thinner in the other two directions. Poisson's ratio (ν,  ), named after Simeon Poisson, is a measure of this tendency. . Relaxation test data Figure 2 shows a simple shear Simple shear is a special case of deformation of a fluid where only one component of velocity vectors has a non-zero value:  test in which [[Gamma].sub.o] is the instantaneous shear strain shear strain or shearing strainSee under strain. . The normalized shear relaxation modulus is defined through [g.sub.R](t) = G(t)/[G.sub.o] also equal to [Tau](t)/[[Tau].sub.o] or [Tau](t)/[G.sub.o][[Gamma].sub.o]. Due to linearity between shear stress shear stress n. See shear. shear stress A form of stress that subjects an object to which force is applied to skew, tending to cause shear strain. and strain, only one curve is needed. [ILLUSTRATION OMITTED] Likewise, the normalized bulk relaxation modulus can be obtained as [k.sub.R](t) = K(t)/[K.sub.o] or p(t)/[p.sub.o]. Constants [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] are obtained from separate nonlinear least square fits to experimental data; results are combined into a single set of Prony parameters. If test data are collected at similar time intervals, one fit results in [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII]. It is important that a proper number of terms be used in the Prony series - too few terms yield a poor fit and too many cause ill conditioning. Also, experimental data must cover the time domain of interest. Prony series can only represent the behavior of rubber over the fitted time domain, i.e., extrapolation (mathematics, algorithm) extrapolation - A mathematical procedure which estimates values of a function for certain desired inputs given values for known inputs. If the desired input is outside the range of the known values this is called extrapolation, if it is inside then does not work. For nearly incompressible in·com·press·i·ble adj. Impossible to compress; resisting compression: mounds of incompressible garbage. in materials, Poisson's ratio approaches the half. Uniaxial relaxation or creep data can define a shear modulus shear modulus See under modulus of elasticity. as G(t) [approximately equals] 1/3 E(t); volumetric test data or [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] is not needed in such a case. Isotropic finite strain viscoelasticity In the stress relaxation equation: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] For hyper-elastic materials E(t) depends on both magnitude and direction of straining. Finite strain viscoelasticity considers [Epsilon] (t) as E(t)/[E.sub.o], a dimensionless relaxation modulus that is independent of the magnitude and direction of straining. Only one dimensionless relaxation curve is required to characterize a viscoelastic behavior. Similarly to the isotropic linear viscoelasticity, independent moduli for deviatoric and volumetric behavior are required in finite strain viscoelasticity. Such moduli depend on the choice of strain energy function. Polynomial polynomial, mathematical expression which is a finite sum, each term being a constant times a product of one or more variables raised to powers. With only one variable the general form of a polynomial is a0xn+a energy function has the form: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where coefficients [C.sub.jk]([Tau]) and 1/[D.sub.k]([Tau]) are defined by Prony series: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] Constants [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] are dimensionless shear and bulk relaxation moduli, and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] derive from instantaneous shear and volumetric behavior. Constants [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] define the visco and hyper-elastic sections in finite element models. Note that if a material is incompressible, [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and volumetric test data is not needed. Ogden's energy function has the form: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] where coefficients [[micro].sub.k] and 1/[D.sub.k]([Tau]) are also defined by Prony series: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] Constants [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] are dimensionless shear and bulk relaxation moduli and, [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] derive from instantaneous shear and volumetric behavior. Again, [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] define the viscoelastic response of a material in FEA; [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] define hyper-elasticity. Also, no volumetric data is needed for an incompressible material as [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII]. Harmonic viscoelasticity The stress-relaxation relation: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] is inadequate for a Fourier transform Fourier transform In mathematical analysis, an integral transform useful in solving certain types of partial differential equations. A function's Fourier transform is derived by integrating the product of the function and a kernel function (an exponential function raised to since (for solids) E(t) [is not equal to] 0 as t [right arrow] [infinity]. A dimensionless relaxation function e(t) = E(t)/[E.sub.[infinity]]-1 where [E.sub.[infinity]] is a long-term modulus making e(t) [right arrow] 0 as t [right arrow] [infinity] is rather used. Substituting for e(t) in the stress relaxation equation and letting t-[Tau]' = [Tau] yields: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] Harmonic excitation Consider the application of a sinusoidal strain [Epsilon](t) = [Epsilon][e.sup.iwt] where w is the angular frequency. Substituting [Epsilon](t) in the long-term stress relaxation equation yields: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] Therefore, [Sigma](t) = E*[Epsilon](t) where E*(w) = [E.sub.[infinity]](1-iwe*(w)) is the complex modulus and e*(w) the Fourier transform of e(t). Similarly, e*(w) = Re(e*) + i Im(e*), E*(w) = [E.sub.[infinity]](1-w Im(e*)) + i [E.sub.[infinity]](1-w Re(e*)) where [E.sub.[infinity]](1-w Im(e*)) is the storage modulus [E.sub.s](w) and [E.sub.[infinity]](1-w Re(e*)) the loss modulus [E.sub.1](w). Previous formulas relating storage and loss moduli to Fourier transform of the dimensionless relaxation function define frequency domain viscoelasticity. In such a case, Re(e*) = 1-[E.sub.s](w)/[E.sub.[infinity]] and Im(e*) = 1-[E.sub.1](w)/[E.sub.[infinity]] are required for modeling. Frequency domain vicoelasticity Isotropic viscoelasticity is implemented in finite element software such as ABAQUS and MARC. This assumes relaxation moduli for deviatoric and volumetric behavior to be independent. One must supply [G.sub.[infinity]], [K.sub.[infinity]], [G*.sub.[infinity]] and [K.sub.[infinity]] for modeling. Storage and loss moduli are related to Fourier transforms of non-dimensional shear and bulk relaxation functions g(t) and k(t) though: [G.sub.s](w) = [G.sub.[infinity]](1-wIm(g*)), [G.sub.1](w) = [G.sub.[infinity]]wRe(g*), [K.sub.s](w) = [K.sub.[infinity]](1-wIm(g*)) and [K.sub.1](w) = [K.sub.[infinity]]wRe(g*). where g*(w) and k*(w) are Fourier transforms of g(t) and k(t), g(t) = G(t)/[G.sub.[infinity]]-1 and k(t) = K(t)/[K.sub.[infinity]]-1. Long-term moduli [G.sub.[infinity]] and [K.sub.[infinity]] can be obtained from [E.sub.[infinity]] and [v.sub.[infinity]] defining the elastic stage of materials. Storage and loss moduli are needed for analysis: Re([w.sub.i][g.sib.i]*), Im([w.sub.i][g.sub.i]*), Re([w.sub.i][k.sub.i]*), Im(w.sub.i][k.sub.i]*) and [f.sub.i] (or w/2[Pi]) which define a formula parameter for real and imaginary parts of non-dimensional relaxation functions. Isotropic finite strain viscoelasticity Like with isotropic linear viscoelasticity, independent moduli for deviatoric and volumetric behavior are required. These are effective tangent moduli, which depend on the choice of strain energy function. Frequency dependent behavior is specified in the way described earlier. Long-term moduli specification depends on the hyper-elastic form; i.e., [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] for the polynomial strain energy function, and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII], [[Alpha].sub.i] and [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] for Ogden's. Time-temperature correspondence For many viscoelastic materials, a TRS model describes accurately the dependence of relaxation time relaxation time n. Physics The time required for an exponential variable to decrease to 1/e (0.368) of its initial value. Noun 1. on temperature. In such a model, relaxation at a given temperature T is described by a temperature-independent relaxation function: [MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] with A(T) a time reduction factor that depends on temperature. The reduction factor A is often expressed as a logarithmic logarithmic pertaining to logarithm. logarithmic relationship when the logs of two variables plotted against each other create a straight line. time shift: h(T) = -log(A(T)). Such a time shift can be used to extrapolate extrapolate - extrapolation relaxation data to long or short times. Relaxation tests allow the measurement of shear and bulk moduli at different temperatures, for instance at T = [T.sub.o] and T = [T.sub.o] [+ or -] [Delta]T where [T.sub.o] is a reference temperature for which h([T.sub.o]) = 0. The measured curves make it possible to determine the shift functions h([T.sub.o]-[Delta]T) and h([T.sub.o]+[Delta]T). These can, in turn be used to extrapolate the relaxation curves well beyond the measured time domain. By carrying out relaxation experiments over a wide enough range of temperatures, a complete relaxation curve spanning many decades in time can be obtained. The default shift function in finite element codes is the Williams-Landell-Ferry (WLF WLF Washington Legal Foundation WLF Wallis and Futuna (ISO Country code) WLF Waist Level Finder (camera viewfinder type) WLF Viva La Figa (MotoGP motorcycle races) ): H(T) = [C.sub.1](T-[T.sub.o])/([C.sub.2]+(T-[T.sub.o])) where [C.sub.1] and [C.sub.2] are constants to define from test data and [T.sub.o] the glassy transition temperature. Finite element users can code other forms of A(T) through subroutines. Industry developed CSR tests Several tests have been developed to assess the degradation in physical properties of rubber with time, temperature and the presence of fluids. These are known as the Shawbury Wallace, Weckham-Ferrance, Joh and Jamak techniques. Akron Rubber Development Laboratory (ARDL ARDL Akron Rubber Development Laboratory, Inc. ARDL American Roller Derby League ARDL Applied Research & Development Laboratory (Mt. Vernon, IL) ) published shear tests under quasi-static loading. The lab also published a procedure to measure the decay in physical properties of rubber in hot oil: A rubber button is compressed to 25% of its height then immersed in oil at 150 [degrees] C. The sample is then removed from oil, allowed to cool to the ambient before the force to further compress it by 0.2 mm is recorded. Such operator-dependent procedure is often repeated at intervals coming or happening with intervals between; now and then. See also: Interval of 200 hours or larger. In the Weckham-Ferrance and current industrial CSR tests, the effect of stressing is not understood, nor is thermal-cycling, the presence of fluids, the shape and size of samples, and straining beside compression. Monitoring the degradation in forces to compress ring gaskets was developed as early as 1991 at Joh Rubber in Germany Strain gauges were used to measure deflections of a beam under reaction of rubber. The test was rather to validate the design of ring gaskets of given cross-sections and not to characterize materials. The system by Joh progressed to use a jig from Jamak. A load cell replaced Joh's strain gauges for repeatable usage. Figure 3 presents a dismantled Jamak jig by a load cell and Joh's holding frame. [ILLUSTRATION OMITTED] Both a washer and a solid disk are used in the Jamak CSR fixture. The washer is 19.050 and 9.525 mm in outer and inner diameters and 3 mm thick. This is often compressed to 80% of its height as a load cell monitors the decay in the force to keep the sample compressed. Some of today's issues with CSR testing are drift in calibration of cells in oven environments and their permeation by fluids. A newer system by the Swedish Elastocon keeps the cells at ambient. Note that viscoelastic tests in the rubber industry are compressive com·pres·sive adj. Serving to or able to compress. com·pres  sive·ly adv. , while finite element codes such as ABAQUS and MARC require decay in shear and bulk moduli to define Prony series. ARDL developed techniques to measure the shear stress versus shear strain under quasi-static conditions. These are unfortunately tensile and would be difficult to set in time. Figures 4 and 5 present a dual lap shear test at ARDL. [ILLUSTRATIONS OMITTED] Figures 6 and 7 present the quadruple lap shear test engineered by the Akron-based lab. Rubber can bound the mating hardware, however, sizes remain to be proved in tested samples. (Parts 3 and 4 will appear in the January, 2001 issue.) [ILLUSTRATIONS OMITTED] Dr. Ben Chouchaoui is a graduate of Polytechnic School Polytechnic School, often referred to as simply Poly, is a college preparatory private school in Pasadena, California. The school was founded in 1907 as the first private non-profit elementary school in California, descended from the Throop Polytechnic Institute of Montreal Of Montreal is an American indie pop band formed in Athens, Georgia, fronted by Kevin Barnes. It was among the second wave of groups to emerge from The Elephant 6 Recording Company. and the University of Waterloo The University of Waterloo (also referred to as UW, UWaterloo, or Waterloo) is a medium-sized research-intensive public university in the city of Waterloo, Ontario, Canada. The school was founded in 1957. in Canada. He specializes in materials and FEA and currently runs the Windsor Industrial Development Laboratory concentrating on material and process testing and stimulation to aid in product design and manufacturing. |
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