Using these equations and the iteration computing method, a variety of reconstruction problems can be solved.
用这组方程和迭代计算方法,能够求解各种类型的振幅和相位的恢复问题。
Using these equations, not only can calculate values of shape error and position of maximum shape error? but also can control values and position of maximum shape error.
应用此方程,不仅能定量的算出面形误差、确定面形误差最大值的位置,而且还能控制面形误差的大小和位置。
By using these equations, the frequency-tuning characteristics of te (a) CO2 lasers, using such techniques as grating, F-P modulator, or injection locking, can be investigated theoretically.
利用这个方程组,可以从理论上研究采用各种可调谐技术(如光栅调谐、F - P调制器调谐、注入锁模等)的TE (A) CO_2激光器的调谐特性。
For example, inclusion of equations or figures can be done using MathML or SVG, respectively; the AbiWord developers have no need to re-engineer these capabilities themselves.
比如,包含公式或者图片可以分别使用MathML或SVG实现,AbiWord开发人员不需要自己重新实现这些功能。
Using a coordinate transformation matrix, which is formed by these linearly independent mode set, the component equations of motion in generalized coordinates are derived.
应用这组线性无关的模态集构成坐标变换矩阵,推导出广义坐标下的部件动力学方程。
Generally speaking, the regular equations obtained using these criteria are nonlinear equations.
一般地说,从这些准则出发得到的正则方程均为非线性方程。
These equations can be solved using numerical methods based on the finite difference or the finite element.
这些方程可以通过有限差分或有限元等数值方法进行求解。
Constraint equations were constructed by using distance error model, and the actual geometric parameters of the robot were solved, and then these parameters were used in the modified kinematics model.
利用距离误差模型构造出机器人本体的约束方程,并求解出机器人的实际几何参数,进而将该参数应用于修正系统的运动学模型。
The exact and explicit solutions of these equations are obtained by using the travelling wave method. These exact solutions are solitary wave solutions of a rational type.
用行波方法得到了这些方程的显式精确解,即有理分式型孤立波解。
Using the matrix assembly method, these acoustic equations can be composed a universal program with a general format for sound transmission in insulating glass.
根据所建立的声学方程,通过矩阵组装方法来进行中空玻璃声透射问题的研究。
Usually these equations can be solved using the method of perturbation approximation in quantum mechanics.
通常利用量子力学的时间微扰法可求得这类方程一次近似解的黄金定律。
Numbers of equations can be reduced by using this method. Finally an example is presented to illustrate these results.
这种做法可以减少方程的数目,使问题得到简化,最后给出一个说明性算例。
Numbers of equations can be reduced by using this method. Finally an example is presented to illustrate these results.
这种做法可以减少方程的数目,使问题得到简化,最后给出一个说明性算例。
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