2) Yao Zhenzong
姚振宗
1.
Yao Zhenzong s Inheriting and developing the Bibliography from Zhang Xuecheng;
姚振宗对章学诚目录学的继承与发展
2.
Three errors in "The Study of Sui Shu Jing Ji Zhi " by Yao Zhenzong;
姚振宗《<隋书·经籍志>考证》辨误三则
4) oscillating functions
振荡函数
1.
This paper presents a new highly accurate method of Gaussian integration for oscillating functions of cosine type,the method can get quadrature accuracy of 4n+1 only by 2n quadrature nodes.
给出一种新的高精度的求余弦型振荡函数的Gauss积分方法,该方法在仅调用2n个求积节点的情况下,达到4n+1的求积代数精确度。
2.
Aim To study the numerical integration for a class of oscillating functions type as ∫ π -π f(x) sin( ωx )d x ( ω are positive integers).
目的研究型如∫π-πf(x)sin(ωx)dx(ω为正整数)的振荡函数的数值积分问题。
5) mode shape function
振型函数
1.
The mode shape function of the pier was offered to study the dynamic deformation feature of the continuous beam bridge sited on the elastic foundation.
为了研究弹性基础上连续梁的振动特性,提出了连续梁桥墩的振型函数表达式。
2.
The mode shape function represented by the reaction forces at point supports is obtained.
文中的振型函数是用支点的反力表示的,确定支点反力的齐次方程组和用行列式表示的频率方程的阶数等于支点反力的个数。
3.
The mode shape function represented by the reaction fores of point supports is obtained.
文中的振型函数是用支点反力表示的,确定支点反力的齐次方程组和用行列式表示的频率方程的阶数等于支点反力的个数。
6) Oscillatory function
振荡函数
1.
The numerical methods to evaluating the Oscillatory function integrals are usually based on no-oscillatory function to establishing interpolatory fuction,such as spline interpolation and Gauss interpolation.
振荡函数积分的数值计算,通常采用对非振荡函数建立插值函数,比如样条插值、Gauss点插值等。
补充资料:哭秘书姚少监(一作姚丞)
【诗文】:
寒空此夜落文星,星落文留万古名。入室几人成弟子,
为儒是处哭先生。家无谏草逢明代,国有遗篇续正声。
晓向平原陈葬礼,悲风吹雨湿铭旌。
【注释】:
【出处】:
全唐诗:卷650-35
寒空此夜落文星,星落文留万古名。入室几人成弟子,
为儒是处哭先生。家无谏草逢明代,国有遗篇续正声。
晓向平原陈葬礼,悲风吹雨湿铭旌。
【注释】:
【出处】:
全唐诗:卷650-35
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条