We give a theoretical basis for special solution of the linear non-homogeneous recursion equation with constant coefficient.
提出了非齐次线性递归方程的降阶公式,并由此导出了常系数非齐次线性递归方程的特解公式。
This paper puts forward a recursion equation, which is verified in the forecast and calculation of phenol pollution of Linfen Section of Fenhe River.
文章提出的河流水质预测预报递归方程,在汾河临汾段酚的预测计算中得到了验证。
In this paper, we study the structure of the linear recursion equation and get the solution to the constant coefficient linear homogeneous recursion equation.
本文研究了线性递推方程解的结构以及常系数线性齐次递推方程解法。
In the demonstration research, base on the PLS - structure equation principle, used the recursion iteration method to carry on the exhaustive fitting analysis and the statistical test using the model.
在实证研究中,以PLS—结构方程原理为支撑,采用递归迭代方法对应用模型进行了详尽的拟合分析与统计检验。
The equation has recursion form and only relates to multiplication and will not lead to overflow in calculation.
该方程具有递推的形式且只涉及乘法运算,避免了传统算法中的计算溢出。
An elementary proof of the Diophantine equation (the equation abbreviated) is given by using recursion sequence method.
运用递推序列法,给出组合数丢番图方程(方程序略)的一个初等解法。
An elementary proof of the Diophantine equation (the equation abbreviated) is given by using recursion sequence method.
运用递推序列法,给出组合数丢番图方程(方程序略)的一个初等解法。
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