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more legendre transforms1 starting with the fundamental equation in the helmholtz free energy representation f ftvn
enthalpythe enthalpy of a material in a certain range of temperature and pressure is well approximated by the
molecular dynamics md simulation of a simple harmonic oscillatorthis assignment uses the molecular dynamics method
two one-dimensional relativistic particlesconsider two one-dimensional relativistic ideal-gas particles with masses
bosons in two dimensionsconsider an ideal boson gas in two dimensions the n particles in the gas each have mass m and
each problem must be done using word for each problem the quiz solution must identify1 steps2 words to explain
extra credit assignmentwe talk about several general classes of materials metals polymers ceramics glasses and
the final project submission should include a design introduction writeup an assembly drawing of your overall design
watch the video forged in fire and write one page including1- strenghthening mechanisms2- proporties they were
a continuous hot rolling mill has two stands thickness of the starting plate 25 mm and width 300 mm final thickness
computer simulations of mismatched dice1 write a computer program to compute the probability distribution for the sum
numerical evaluation of the poisson distributionin an earlier problem you derived the poisson distribution1 modify a
the cast oil-field fittinga cast iron t-type fitting is being produced for the oil drilling industry using an air-set
maximum work from temperature differencesuppose we have two buckets of water with constant heat capacities ca and cb so
general forms for the entropy we have derived the entropy of a classical ideal gas which satisfies all the postulates
two one-dimensional ideal-gas particles consider two ideal-gas particles with masses ma and mb confined to a
maxwell-boltzmann distributionin the near future we will derive the maxwell-boltzmann distribution for the velocities
thermodynamic stability1 starting with the stability conditions on the second derivatives of the helmholtz free energy
classical simple harmonic oscillatorconsider a one-dimensional classical simple harmonic oscillator with mass m and
partition function of ideal gas1 calculate the partition function and the helmholtz free energy of the classicalideal
helmholtz free energy near a phase transitionconsider a material described by the phase diagram shown below a quantity
yet another thermodynamic identityprove the following thermodynamic derivative and determine what should replace the