De Jongh(1973)曾发表了用于JN方程的理论α系数的“ALPHAS”计算程序。根据该程序原理,本文先讨论了理论α系数的计算过程,然后导出理论α系数的转换公式。应用导出的公式,消去项不同的理论α系数能从一种形式转换到另一种形式。JN方程提供了消去项能任意选择的优点,e等于i作为特例可导出LT方程,正是由于不同消去项的理论α系数转换公式的导出,用在JN方程和LT方程中的理论α系数可以作相互转换。本文对理论α系数的应用也作了简单讨论。 De Jongh (1973) published an “ALPHAS” calculation program for theoretical alpha coefficients of JN equations. According to the principle of the program, this paper first discusses the calculation of the theoretical α coefficient, and then derives the conversion formula of the theoretical α coefficient. Apply the derived formula to eliminate the different theoretical α coefficients from one form to another. The JN equation provides the advantage that the elimination term can be chosen arbitrarily, and e is equal to i. As a special case, the LT equation can be derived. It is due to the derivation of the theoretical alpha coefficient conversion formulas for different elimination terms that the theoretical alpha coefficients used in the JN and LT equations For mutual conversion. This article also made a brief discussion on the application of the theoretical α coefficient.