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通过对Weng旋回与Poison、Gamma(亦记为Γ)分布模型的对比和分析表明,Weng旋回模型原式的自变量为特定的时间变量,即其时间为实际发生时间的1/B故模型原式在自变量从0~+∞积分,其结果并非是真正的可采储量,而是对应于特定时间的积分值,这一数值等于可采储量的1/B;Weng氏模型原式与Poison分布尽管具有相似的表现形式,但却是两个完全不同的模型,因为二者的自变量不具有同一数学意义;Weng旋回模型的本质符合连续型Gamma随机分布的数学原理,以往对模型参数n规定取正整数的假设是不妥和多余的。在上述研究的基础上,给出了Weng旋回模型的简明式和结构式,使其上升到了一定的理论高度,更加具有实际意义和Weng氏特色,同时给应用者带来了方便。
By comparing and analyzing the Weng cycle with the Poison and Gamma distribution models, it is shown that the original argument of the Weng cycle model is a specific time variable, that is, the 1 / B model whose time is actually occurring The original formula integrates from 0 to + ∞. The result is not a real recoverable stock but an integral corresponding to a specific time, which is equal to 1 / B of recoverable reserves. Although the Poison distribution has similar expressions, it is two completely different models because the independent variables of the two do not have the same mathematical meaning. The essence of the Weng cyclical model conforms to the mathematical principle of continuous Gamma random distribution. In the past, The assumption of taking positive integers is inappropriate and unnecessary. On the basis of the above studies, the conciseness and structure of the Weng cycle model are given, which make it rise to a certain theoretical height, more practical and Weng ’s characteristics, and bring convenience to the users.