是与未解之谜的搏斗,而不是最终的答案,定义了我们的生命。
The wrestling with mystery, not the ascension to resolution, defines who we are.
有关我们经历了什么,以及我们如何经历的疑问,引导我们进入下一个大脑未解之谜- - -古老的意识问题。
The question of what we've experienced and how we experienced it is leading into our next unsolved brain mystery — the age-old question of consciousness.
随即一个新问题就被发现了,那就是,在解这个方程的时候,我们会发现电子有负能量的能级。
It was not long before a new difficulty appeared. Namely, working with this equation, one found that the electron had states of negative energy.
随即一个新问题就被发现了,那就是,在解这个方程的时候,我们会发现电子有负能量的能级。
It was not long before a new difficulty appeared.Namely, working with this equation, one found that the electron had states of negative energy.
周一我们讨论了,薛定谔方程解的波函数。
And on Monday what we were discussing was the solution to the Schrodinger equation for the wave function.
既然它是个公理,我们可以用它来解这个数学题目了。
Since it is an axiom, we can use it to solve this maths problem.
考虑到他想继续读书,我们还特意为他补习功课,现在他已经会解二元方程序了。
Consider him to continue studying, we also specially for him with his homework, he now has a dual formula will solution.
我们仔细地研究了试验函数空间并且正确地选择了试验函数,使得试验函数空间与解函数空间相匹配。
We study the test function space carefully, then make the correct choice of test functions, such that test function space matches with the solution function space in each problem.
本文应用可积的一类线性微分方程求出了非均质变截面弹性直杆振动问题的一个精确解,我们应用这一精确解验证了渐近解的精确度。
This paper gives an exact solution for free vibration of a physically nonuniform straight bar with varying section by the use of a class of integrable linear ordinary differential equation.
创41:13后来正如他给我们圆解的成就了:我官复原职,膳长被挂起来了。
Gen 41:13 and things turned out exactly as he interpreted them to us: I was restored to my position, and the other man was hanged.
在第四章中,我们考虑了一类更一般形式的广义非线性变分包含并证明了它在H -空间中解的存在性。
In chapter four, we consider a more general form of generalized nonlinear variational inclusions and prove the existence of solutions for these variational inclusions in H-space.
我们在对SEG - D格式的标准进行介绍的基础上,分析了SEG - D格式的磁带结构,给出了SEG - D格式磁带解编的常规流程。
On the basis of introducing the standards of SEG-D format, we analyzed tape structure in SEG-D format and gave ordinary flow of demultiplex of SEG-D format tape.
通过对语义项在心理空间中投射规律的考察,我们发现心理空间理论揭示了信息接受者对话语意义的解歧过程。
By examining the projection of elements between mental Spaces, it is shown that the theory of mental Spaces throws light on the disambiguation process of discourse meaning.
我们用初等方法证明了周期解的存在性,并且扩大了文献中给出的参数范围。
We use some elementary methods to demonstrate the existence of a periodic solution for a considerably larger parameter set than considered earlier.
在第二部分第一篇论文中,我们系统研究了二维非交换李代数及其全形的可解性、完备性与非半单性等性质。
In the first paper of the second part , it studies two dimensional noncommutative Lie algebra and its solvability, completeness and nonsemisimplicity and so on .
在第三章中,我们研究了两类等时系统解的有界性和不变环面的存在性。
In Chapter 3, we study the boundedness of solutions and the existence of invariant tori for two kinds of isochronous systems.
我们分析了这三个因子对解的渐近行为的影响。
We investigate how the three factors influence the asymptotic behavior of solutions.
我们学习科学是要获得 对自然规律更深刻的了 解。
We study science to gain deeper insight into natural laws. ;
我们基于EM算法来计算参数的ML估计,推导了对应的参数迭代方程,给出了参数的一个闭式解。
We calculate the ML estimation via the EM algorithm, and derive its iteration equations, which gives a closed-form solution for parameters.
另外在第四章中,我们还研究了极端相对论方程组熵解的非相对论整体极限问题。
Moreover, in Chapter 4, we also consider the non-relativistic global limits of entropy solutions to the extremely relativistic Euler equations.
第一章中我们简述了一些研究非线性偏微分方程精确解的方法。
In the chapter 1, we introduce some methods to study the exact solution of nonlinear partial differential equations.
我们考虑了这类变分不等式解的存在性及迭代逼近算法问题。
There are many iterative algorithms for the solution of variational inequality and fixed point of mappings.
解骨的平均伤害是450.5(DPH),肺穿的平均伤害是350.5(DPH)。因此,双手交换后我们损失了25点基础武器伤害。
Rib Spreader has an average damage of 450.5, while Lungbreaker has an average damage of 350.5 Thus, we lose 25 base weapon damage by making the swap.
在随机微分方程的基础上,我们建立了金融市场模型,并且分析了模型的解与性质。
Using the stochastic theory to analyse the finance market model, we discuss the solution and properties of the model.
然后在此基础上,我们讨论了上述熵解同拟一维流问题的解在L2意义下的相近程度。
Then based on it, we give an estimation on the difference between this local entropy solution and the solution of the quasi-one-dimensional problem in L2 norm.
本文介绍了对于强流离子束在加速—减速系统中传输特性的有效的二维数值解方法。我们要求如下的数值解:(1)非线性泊松方程。
In this paper, a convergent two-dimensional numerical simulation method for transport characteristics of intense ion beams in acceleration-deceleration system is presented.
本文介绍了对于强流离子束在加速—减速系统中传输特性的有效的二维数值解方法。我们要求如下的数值解:(1)非线性泊松方程。
In this paper, a convergent two-dimensional numerical simulation method for transport characteristics of intense ion beams in acceleration-deceleration system is presented.
应用推荐