Calculation of water bulk modulus using equation of state

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Which Volume are you using at your Calculation? Strictly speaking, the bulk modulus is a Thermodynamic Quantity.

This basically means you need to use the original mass or amount of matter. As there is no mass or amount of material (ie. $kJ/mol$ or $kJ/kg$) used in these equations, the connection to some amount of material must be made through original Volume. But it seems that you are using the Specific Volume instead. This means you calculate with a smaller amount of material, which obviously leads to a decrease in Bulk Modulus. Its dimensional form (SI pascal) is basically $M^1L^−1T^−2$ Which pretty much means you have too small $M$ (mass) the $L$ is too big (some length) or the $T$ Temperature is too big.

Your temperature is constant, and length comes from the definition of the Energy (newton), so the Mass really seems to be the only possible source of this problem.

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JimK
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JimK

Updated on December 11, 2020

Comments

  • JimK
    JimK almost 3 years

    I simply want to calculate the bulk modulus of water at 50C and increasing pressures. I think I am correctly calculating the new specific volume from the original conditions at (25C and 1atm) to 50C and higher pressures. I am rightly getting a decrease in specific volume with increasing pressure at constant temperature (Column7). Here is the spreadsheet:

    enter image description here

    ${V}^{'}={V}_{o}e^{{\beta}(T-25)-\kappa\Delta P}$

    where:

    ${V}^{'}$ is column 7

    ${V}_{o}$ is column 1, the specific volume of water at 1 atm and 25C

    $T$ is in Celsius

    $P$ is in atm.

    I used the above cross plot to graphically solve the slope $(\frac{\partial v} {\partial P})_{T} $ and input it into Column 8:

    Then to calculate the new compressibility at 50C (${\kappa}$) Column 9:

    ${\kappa}=-\frac{1} {V}(\frac{\partial v} {\partial P})_{T} $

    which gives me the new compressibiliy Column 9. Then I I just take the reciprocal and convert the units to GPa.

    Oops, bulk modulus (Column 10) should be increasing with pressure at a constant temperature, not decreasing. I know that since dividing by an ever decreasing specific volume as pressure increases will give me a larger compressibility (Column 9) and a decreasing Bulk Modulus (Column 10). But everyone knows increasing pressure should have the opposite effect. Where did I go wrong?

    • tpg2114
      tpg2114 almost 9 years
      Can you clearly write out the equations you think you should be using? It's either a wrong equation or a typo in the spreadsheet -- the former we can help with, the latter, not so much.
    • tpg2114
      tpg2114 almost 9 years
      Check your equations, is it just a typo that your partial derivatives are with respect to $T$ and not to $P$?
    • JimK
      JimK almost 9 years
      The partial differential is correct now. It is with respect to P at constant temperature.