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Change, core equations

Consequently, the core equation of the SADA, Eq. (143), should be changed... [Pg.153]

In order to allow for the thinning of the multilayer, it is necessary to assume a pore model so as to be able to apply a correction to Uj, etc., in turn for re-insertion into Equation (3.52). Unfortunately, with the cylindrical model the correction becomes increasingly complicated as desorption proceeds, since the wall area of each group of cores changes progressively as the multilayer thins down. With the slit model, on the other hand, <5/l for a... [Pg.148]

Equation 9.1-17 is the continuity equation for unsteady-state diffusion of A through the ash layer it is unsteady-state because cA = cA(r, a To simplify its treatment further, we assume that the (changing) concentration gradient for A through the ash layer is established rapidly relative to movement of the reaction surface (of the core). This means that for an instantaneous snapshot, as depicted in Figure 9.3, we may treat the diffusion as steady-state diffusion for a fixed value of rc i.e., cA = cA(r). The partial differential emiatm. [Pg.230]

For ease of solution, it is assumed that the spherical shape of the pellet is maintained throughout reaction and that the densities of the solid product and solid reactant are equal. Adopting the pseudo-steady state hypothesis implies that the intrinsic chemical reaction rate is very much greater than diffusional processes in the product layer and consequently the reaction is confined to a gradually receding interface between reactant core and product ash. Under these circumstances, the problem can be formulated in terms of pseudo-steady state diffusion through the product layer. The conservation equation for this zone will simply reflect that (in the pseudo-steady state) there will be no net change in diffusive flux so... [Pg.177]

It is known (Chap. A) that Koopmans theorem is not vahd for the wavefunctions and eigenvalues of strongly bound states in an atom or in the cores of a solid, i.e. for those states which are a solution of the Schrodinger (or Dirac) equation in a central potential. In them the ejection (or the emission) of one-electron in the electron system means a strong change in Coulomb and exchange interactions, with the consequent modification of the energy scheme as well as of the electronic wavefunction, in contradiction to Koopmans theorem. [Pg.203]

The useful range of the Kelvin equation is limited at the narrow pore end by the question of its applicability (see Section 8.5) and at the wide pore end, measurements are limited by the rapid change of the center core radius with relative pressure. [Pg.119]

As Sf air gap core or armature then a small change in x will produce a large variation in fr. The self-inductance 5 of the coil in Fig. 6.14a is the total flux linked per unit current. Thus, from equation 6.18 ... [Pg.458]

See other pages where Change, core equations is mentioned: [Pg.161]    [Pg.153]    [Pg.2000]    [Pg.153]    [Pg.72]    [Pg.311]    [Pg.608]    [Pg.740]    [Pg.91]    [Pg.165]    [Pg.93]    [Pg.155]    [Pg.76]    [Pg.197]    [Pg.156]    [Pg.503]    [Pg.28]    [Pg.57]    [Pg.35]    [Pg.48]    [Pg.342]    [Pg.164]    [Pg.594]    [Pg.134]    [Pg.248]    [Pg.150]    [Pg.374]    [Pg.179]    [Pg.574]    [Pg.121]    [Pg.73]    [Pg.378]    [Pg.508]    [Pg.169]    [Pg.257]    [Pg.634]    [Pg.35]    [Pg.90]    [Pg.287]    [Pg.620]    [Pg.105]    [Pg.37]   
See also in sourсe #XX -- [ Pg.54 ]



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