Start from the fundamental exact differential expression

I attached the picture of the question.Here are some notes that will help:Start from the fundamental exact differential expression for dH:dH = TdS + PdVSolve for T then divide by dS:TdS = dH – PdVT = dH/dS – PdV/dSTake the derivative of this expression with respect to P at constant U:(dT/dV)(const U) = d^2H/(dPdS) (const U) – d^2V/(dPdS)Use this webpage: http://en.wikipedia.org/wiki/Maxwell_relations and the fundamental exact equations for U to replace the derivatives. There’s a value for d^2H/(dPdS) on the table there.

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