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Binary constitution

Figure 1.10 The standard Gibbs energy of formation from the binary constitutent oxides of the kyanite, sillimanite and andalusite modifications of A SiOs as a function of pressure at 800 K. Data are taken from [3]. All three oxides are treated as incompressible. Figure 1.10 The standard Gibbs energy of formation from the binary constitutent oxides of the kyanite, sillimanite and andalusite modifications of A SiOs as a function of pressure at 800 K. Data are taken from [3]. All three oxides are treated as incompressible.
For this purpose the chemical composition of the working alloy that would ensure the required characteristics of the unit has been computed and selected on the basis of the literature data on the binary constitution diagrams for Ce-La, La-Ni and Ce-Ni (Figs. 6,7,8,9). The ternary diagram has been computed and constructed for the Ce-La-Ni system (Fig. 10) (such diagram is unavailable in literature). [Pg.372]

See de Saussure [1807], and [1814] Gay-Lussac [1815] Chevreul [1823] and Dumas and BouUay [1827]. On the conception of binary constitution of oiganic compounds, which was broadly shared by chemists at the time, see Klein [2003a] and the primary and secondary literature quoted there. [Pg.285]

R. P. Elliott, Constitution of Binary CWojs 1st Suppl., McGraw-Hill, New York, 1965. [Pg.443]

Copper alloys can also be grouped according to how the principal elemental additions affect properties. This grouping depends primarily on whether the additions that dissolve in Hquid copper can form discrete second phases during either melting/casting or in-process thermal treatment. AHoy constitution that relates to limits of soHd solubiUty and equiUbrium phases that form in binary and ternary combinations with copper are found in the Hterature (2,3). [Pg.220]

The equilibrium constitution of an alloy can be determined experimentally by metallography and thermal analysis (described later). If the pressure is held constant at 1 atm., then the independent variables which control the constitution of a binary alloy are T and Xr or Wg. [Pg.326]

DEF. The diagram shows the equilibrium constitution for all the binary alloys that can be made of lead and tin, in all possible proportions, or, in short, for the lead-tin system. [Pg.327]

Our results demonstrate that the augmented space recursion and the orbital peeling method in conjunction with the LMTO formalism, constitute a viable and computationally feasible approach to the calculation of phase stability in binary substitutionally disordered alloys. ... [Pg.30]

The liquid line and vapor line together constitute a binary (vapor + liquid) phase diagram, in which the equilibrium (vapor) pressure is expressed as a function of mole fraction at constant temperature. At pressures less than the vapor (lower) curve, the mixture is all vapor. Two degrees of freedom are present in that region so that p and y2 can be varied independently. At pressures above the liquid (upper) curve, the mixture is all liquid. Again, two degrees of freedom are present so that p and. v can be varied independently/... [Pg.407]


See other pages where Binary constitution is mentioned: [Pg.267]    [Pg.51]    [Pg.57]    [Pg.285]    [Pg.285]    [Pg.287]    [Pg.289]    [Pg.267]    [Pg.51]    [Pg.57]    [Pg.285]    [Pg.285]    [Pg.287]    [Pg.289]    [Pg.189]    [Pg.2370]    [Pg.469]    [Pg.27]    [Pg.32]    [Pg.320]    [Pg.87]    [Pg.633]    [Pg.344]    [Pg.209]    [Pg.177]   


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