It was clear God sent you, Mr. A, as he sends Mr. X, Mrs. Y, Miss Z, and they provide the material means we need for our work.
很显然,是上帝派你来的,A先生,因为上帝也派了X先生,Y女士,Z小姐来,他们为我们的工作提供了物质上所需要的东西。
The rules might be of the form: If borrower has income above X, debt less than Y, and a credit score above Z, the borrower qualifies for a given loan amount.
规则可能是这样的:如果借款者的收入大于X,债务小于Y,并且信用度为Z,那么他就符合特定额度的贷款条件。
Namely, we will be saying the /a normal vector is x, y, z over a, plus or minus depending on whether we want it pointing in or out.
我们容易知道,法向量为,正负号取决于它是指向外面还是里面。
Then during each iteration we get a little more data from system X, and some more from system Y, and some more from system Z, and so on.
在每个迭代中,我们从系统X 中再获得一些,从系统Z中获得一些,等等。
That statement says, get the value of x, which is this link, and give z a pointer to the same place.
这个声明的意思是,取得x的值,也就是连接指向的值,然后给z赋予一个指向同样位置的指针。
He would put out a tweet saying, 'So I have albums by x, y, and z, but am I missing anything?'
他将发一条微博,‘因此,通过x,y,和z,我拥有专辑,但是,我是不是正在错过一些东西呢?’
The RTLS provider might provide location data on a coordination system in the form of x, y, z, id, or for two-dimensional data in the form of x, y, id.
RTLS提供者可以通过一个形式为x,y,z,id的坐标系统来提供位置数据,或者对二维数据采用形式为x, y, id的坐标系统。
z The problem is sometimes you cannot actually solve for x, y, z in here because this condition is too complicated and then we need a new method. That is what we are going to do.
但是问题是,有时候我们并不能解出x,y,因为这个关系方程g太复杂了,这时必须要有一个新的方法,现在就是要研究这个方法。
So, it's actually a function of maybe x, y, z.
因此它实际上可能是x,y,z的函数。
z It means that for given values of y and z z we will get a term that does not depend on x. It still depends on y and z.
它意味着,对于任意给定的y和,我们会得到一个不依赖于x的项,它仍然依赖于y和。
The built-in alloy wires localize a stylus on the x, y, and z axis points.
内置的合金线路将在x,y,z轴上定位输入笔的位置。
If a programmer wishes to address the A has_many B through=> [X, Y, Z] issue, they can specify the desired through association in their model class definition, and DrySQL will honour this.
如果开发者想解决A has_manyBthrough=> [X,Y,Z]的问题,他们可以在模型类中定义想要的间接关联,并且DrySQL也希望你这么做。
Let's take a linear function of x, y, and z.
我们来看关于x,y, z的一个线性方程。
So now, that's going to be particularly important when we have variables that are related because, let's say now that I have a function that depends on x, y, and z.
在处理相关变量时,这一点特别的重要,这是因为…,例如有一个依赖于x,y,z的函数。
So, let's say that you have a point in space at coordinates x, y, z.
有一个点位于由x,y,z轴确定的空间。
z Maybe we don't know how to solve for z as a function of x and y, but our surface is given by some equation.
也许我们不知道如何直接用x,y表示,但是曲面是由某些方程给出的。
If A has_many B through=> [X, Y, Z], then it becomes problematic to determine which association should be generated.
如果A has_manyB与 [X,Y,Z]间接关联,那么很难去决定应该生成哪一个关联。
That's a very good question The question is, what is the geometric significance of an equation like x y z equals to 1, 2, 3 or something else?
问得好,你的问题是,在方程x+y+z=1或2或3中3,常数项的几何意义是什么?
So, remember, when we did it first over z, we start by fixing a point, x and y, and for that value of x and y, we look at a small vertical slice and see from where to where we have to go.
要牢记,当我们对z积分时,首先固定一个点,看看它们的值,取一个垂直切片,并找出z的积分限。
So, just to get you used to this idea, I'm going to draw a level surface of a function of three variables OK, so it's a surface given by the equation w of x, y, z equals some constant c.
为了令你们习惯于这个想法,我画一个三变量函数的等值面,这是一个平面,由函数w=c给出的。
Remember, partial f, partial x was obtained by y That means I am slicing the graph of f by a plane that is parallel to the x, z plane.
要记得,在这里的fx中,是作为常量保持不变的。,looking,at,the,situation,where,y,is,held,constant。,这是我用一个平行于xz坐标系的平面,横截了f,所得到的图形。
Namely, let's say that you have a function maybe of three variables, x, y, z, df = fxdx+fydy +fzdz then you would write df equals f sub x dx plus f sub y dy plus f sub z dz.
即是说,如果你有一个,含自变量,x,y,z的函数,那么。
Because the gradient vectors here are f sub x, z If you have a third variable z gz then you have also an equation f sub z equals lambda g sub z.
因为这里,梯度向量就是,如果还有一个变量,那就还有一个等式fz等于λ乘以。
Suppose f of x, y, z equals k1, that is my equation, s1 and it gives me a solution s1.
假设我的方程是这样,然后给出了一个解。
The power of linearity is F=k1+k2 if I come across f of x, y, z equals k1 plus k2, if it is a linear equation, I don't have to go and solve it all over again.
线性的威力是,一个方程,如果它是个线性方程,那么我就不用再去解他了。
So, we have a function of x, y, z, t, and we have another function here.
有一个关于x,y,z和t的函数。
This maybe a -x + 2y and maybe a -z... oh, let me make that a -1.
x +2y -z,哦,让我使它为-1。
We want to know whether a given vector field with components P, Q and R can be written as f sub x, f sub y and f sub z for a same function f.
要看向量场,能否写成,其中f是同一个函数。
Thus, the architectural solution to the problem is a cube of exact dimensions (x, y, z), and an almost monolithic abstraction.
因此,建筑方案采用尺寸确切的立方体,它几乎是整块的抽象化。
My career path is important to me, and I've been very impressed with what I've learned about this company and believe that this position in particular is a great fit for my skills in X, Y, and Z.
我的职业生涯路线是非常重要的,而且对贵公司的了解给我留下了深刻的印象,我相信这个职位非常适合我,因为它所要求的X,Y,Z技能我都具备。
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