| 1. | Macarthur surmised that competition equations should be considered as first elements of a taylor series .
麦克阿瑟推测,竟争方程应被看作为泰勒级数的首要元素。 |
| 2. | Exceptional function of a general random taylor series
一般随机泰勒级数的例外函数 |
| 3. | Taylor series expansion method and its performance analysis
级数展开法定位及其性能分析 |
| 4. | Higher derivatives and taylor series
高阶导数和泰勒级数。 |
| 5. | Taylor series expansion
泰勒级数展开 |
| 6. | In this paper , we aim at the growth of the random taylor series and the growth and value distribution of random dirichlet series
本文研究随机taylor和dirichlet级数的增长性以及随机dirichlet级数的值分布性质。 |
| 7. | The starting point for the solution is the taylor series of the 1 / x , and then by using a single private polynomial evaluation protocol we can get the solution
构造的思路是先将其转化为相应的泰勒展开式,然后使用健忘多项式计算协议获得结果。 |
| 8. | Firstly part of quadratic term of taylor series is chosen ; a low - dimension surface is used to approximate limit state surface ; and the modified reliability formula is derived
首次选取泰勒级数的部分二次项,用一个距原点最近点处拟合的超低维曲面近似极限状态面。 |
| 9. | It is shown by analysis that chan ' s algorithin is the most suitable one when channel environment is relatively good , otherwise taylor series expansion method is more appropriate
分析结果表明,信道环境较好时适合采用chan算法,较差时采用泰勒序列展开法则更有利。 |
| 10. | The optimal systems geometry is given . secondly , by expanding the equation in a taylor series about a reference point , the linearity least square algorithm is presented
根据定位方程非线性的特点,应用泰勒级数展开,提出了多基地声呐定位的线性化最小二乘定位优化算法。 |
