?With reference to Ex. 10.4,(a) Apply Eq. (10.7) to Eq. (A) to verify Eqs. (B) and
Chapter 10, Problem 10.12(choose chapter or problem)
With reference to Ex. 10.4,
(a) Apply Eq. (10.7) to Eq. (A) to verify Eqs. (B) and (C).
(b) Show that Eqs. (B) and (C) combine in accord with Eq. (10.11) to regenerate Eq. (A).
(c) Show that Eqs. (B) and (C) satisfy Eq. (10.14), the Gibbs/Duhem equation.
(d) Show that at constant T and P,
\(\left(d \bar{H}_{1} / d x_{1}\right)_{x_{1}=1}=\left(d \bar{H}_{2} / d x_{1}\right)_{x_{1}=0}=0\)
(e) Plot values of H, \(\bar{H}_{1} \text {, and } \bar{H}_{2}\), calculated by Eqs. (A), (B), and (C), vs. \(x_{1}\). Label points \(H_{1}, H_{2}, \bar{H}_{1}^{\infty}, \text { and } \bar{H}_{2}^{\infty}\), and show their values.
Text Transcription:
(d bar H_1/dx_1)_x_1 =1 = (d bar H_2/dx_1)_x_1 = 0 = 0
barH_1, and barH_2
x_1
H_1, H_2, barH_1^infty, and barH_2^infty
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