![SOLVED:For liquid water the isothermal compressibility is given by: \kappa=\frac{c}{V(P+b)} where c and b are functions of temperature only. If 1 kg of water is compressed isothermally and reversibly from 1 to SOLVED:For liquid water the isothermal compressibility is given by: \kappa=\frac{c}{V(P+b)} where c and b are functions of temperature only. If 1 kg of water is compressed isothermally and reversibly from 1 to](https://cdn.numerade.com/previews/d97ad7d5-6590-4b95-a6b9-f467a49cdb62.gif)
SOLVED:For liquid water the isothermal compressibility is given by: \kappa=\frac{c}{V(P+b)} where c and b are functions of temperature only. If 1 kg of water is compressed isothermally and reversibly from 1 to
![The compressibility kappa of a substance is defined as the fractional change in volume of that substance for a given change in pressure : kappa = - 1V dVdP (a) Explain why The compressibility kappa of a substance is defined as the fractional change in volume of that substance for a given change in pressure : kappa = - 1V dVdP (a) Explain why](https://haygot.s3.amazonaws.com/questions/1635537_1739457_ans_b1faf8ac94674e2589c27d14ab542e4e.jpeg)
The compressibility kappa of a substance is defined as the fractional change in volume of that substance for a given change in pressure : kappa = - 1V dVdP (a) Explain why
![Department of Mechanical Engineering ME 322 – Mechanical Engineering Thermodynamics Lecture 5 Thermodynamic Properties. - ppt download Department of Mechanical Engineering ME 322 – Mechanical Engineering Thermodynamics Lecture 5 Thermodynamic Properties. - ppt download](https://images.slideplayer.com/25/8184059/slides/slide_9.jpg)
Department of Mechanical Engineering ME 322 – Mechanical Engineering Thermodynamics Lecture 5 Thermodynamic Properties. - ppt download
![SOLVED:p=\frac{R T}{V-b}-\frac{a}{V^{2}}-V\left(\frac{\partial p}{\partial V}\right)_{T}=\frac{R T V}{(V-b)^{2}}-\frac{2 a}{V^{2}} or, \quad \kappa=\frac{-1}{V}\left(\frac{\partial V}{\partial p}\right)_{T} =\left[\frac{R T V^{3}-2 a(V-b)^{2}}{V^{2 ... SOLVED:p=\frac{R T}{V-b}-\frac{a}{V^{2}}-V\left(\frac{\partial p}{\partial V}\right)_{T}=\frac{R T V}{(V-b)^{2}}-\frac{2 a}{V^{2}} or, \quad \kappa=\frac{-1}{V}\left(\frac{\partial V}{\partial p}\right)_{T} =\left[\frac{R T V^{3}-2 a(V-b)^{2}}{V^{2 ...](https://cdn.numerade.com/previews/a2aa83f3-0610-4ca6-bd82-7797a4731a30.gif)