spectroscopic measurement of the vapour pressure of ice by k. bielska, d. k. havey, g. e. scace, d....
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![Page 1: Spectroscopic measurement of the vapour pressure of ice by K. Bielska, D. K. Havey, G. E. Scace, D. Lisak, and J. T. Hodges Philosophical Transactions](https://reader036.vdocuments.site/reader036/viewer/2022082819/56649f1d5503460f94c33a0f/html5/thumbnails/1.jpg)
Spectroscopic measurement of the vapour pressure of ice
by K. Bielska, D. K. Havey, G. E. Scace, D. Lisak, and J. T. Hodges
Philosophical Transactions AVolume 370(1968):2509-2519
June 13, 2012
©2012 by The Royal Society
![Page 2: Spectroscopic measurement of the vapour pressure of ice by K. Bielska, D. K. Havey, G. E. Scace, D. Lisak, and J. T. Hodges Philosophical Transactions](https://reader036.vdocuments.site/reader036/viewer/2022082819/56649f1d5503460f94c33a0f/html5/thumbnails/2.jpg)
Calculated water vapour absorption coefficient (based on Voigt profiles) at T=296 K, a total pressure of 13.3 kPa and molar fraction of 10−3 water vapour in air.
K. Bielska et al. Phil. Trans. R. Soc. A 2012;370:2509-2519
©2012 by The Royal Society
![Page 3: Spectroscopic measurement of the vapour pressure of ice by K. Bielska, D. K. Havey, G. E. Scace, D. Lisak, and J. T. Hodges Philosophical Transactions](https://reader036.vdocuments.site/reader036/viewer/2022082819/56649f1d5503460f94c33a0f/html5/thumbnails/3.jpg)
(a) Measured spectrum (circles) and least-squares fit of the SDNGP (solid line) for transition 2 at x=2.22×10−4, p=13.3 kPa.
K. Bielska et al. Phil. Trans. R. Soc. A 2012;370:2509-2519
©2012 by The Royal Society
![Page 4: Spectroscopic measurement of the vapour pressure of ice by K. Bielska, D. K. Havey, G. E. Scace, D. Lisak, and J. T. Hodges Philosophical Transactions](https://reader036.vdocuments.site/reader036/viewer/2022082819/56649f1d5503460f94c33a0f/html5/thumbnails/4.jpg)
Temperature dependence of the fractional difference between our measured vapour pressure, ew,m, and the literature values, ew,lit, reported by Wexler [15] (circles) and Marti &
Mauersberger [4] (triangles).
K. Bielska et al. Phil. Trans. R. Soc. A 2012;370:2509-2519
©2012 by The Royal Society