The Callendar–Van Dusen equation is an equation that describes the relationship between resistance and temperature of platinumresistance thermometers. As commonly used for commercialapplications of RTD thermometers, the relationship between resistance and temperature is given by the following equations. The relationship above 0 °C is a simplification of the equation that holds over a broader range down to -200 °C. The longer form was published in 1925 by M.S. Van Dusen and is given as: While the simpler form was published earlier by Callendar, it is generally valid only over the range between 0 °C to 661 °C and is given as: Where constants A, B, and C are derived from experimentally determined parameters α, β, and δ using resistance measurements made at 0 °C, 100 °C and 260 °C. It is important to note that these equations are listed as the basis for the temperature/resistance tables for idealized platinum resistance thermometers and are not intended to be used for the calibration of an individual thermometer, which would require the experimentally determined parameters to be found. These equations are cited in International Standards for platinum RTD's resistance versus temperature functions , also adopted as , and with some modification, JIS C1604. The equation was found by British physicistHugh Longbourne Callendar, and refined for measurements at lowertemperatures by M. S. Van Dusen, a chemist at the U.S. National Bureau of Standards in work published in 1925 in the . Starting in 1968, the Callendar-Van Dusen Equation was replaced by an interpolating formula given by a 20th order polynomial first published in by the Comité International des Poids et Mesures. Starting in 1990, the interpolating formula was further refined with the publication of . The ITS-90 is published by the Comité Consultatif de Thermométrie and the Comité International des Poids et Mesures. This work provides a 12th order polynomial that is valid over an even broader temperature range that spans from 13.8033 K to 273.16 K and a second 9th order polynomial that is valid over the temperature range of 0 °C to 961.78 °C.