If it is a closed curve, we should be able to replace it by a double integral.
如果是一条闭曲线,也可以用二重积分来代替的。
Next, I should try to look at my double integral and see if I can make it equal to that.
然后观察二重积分,看看能不能使两式相等。
So, using Green's theorem, the way we'll do it is I will, instead, compute a double integral.
那么,使用格林公式,我们去计算二重积分。
So, if a curl was well defined at the origin, you would try to, then, take the double integral.
如果旋度在原点有定义,你就可以试试了,计算二重积分。
One example that we did, in particular, was to compute the double integral of a quarter of a unit disk.
我们已经做过的一个例子是,计算四分之一单位圆上的二重积分。
The introduction of one way to solve the problem of definite integral by means of double integral.
介绍利用二重积分解决有关定积分问题的一种方法。
Then I can actually -- --replace the line integral for flux by a double integral over R of some function.
那么我就能名正言顺地,用R上的某个函数的二重积分来替代通量的线积分。
Yes? In case you want the bounds for this region in polar coordinates, indeed it would be double integral.
请说,你想知道极坐标系下的积分边界,这是一个二重积分。
And this is finally where I have left the world of surface integrals to go back to a usual double integral.
也就是最终要摆脱曲面积分,回到常规的二重积分。
So, for example, the area of region is the double integral of just dA, 1dA or if it helps you, one dA if you want.
举个例子,区域R的面积是dA的二重积分,便于理解,在这里写成。
In this paper, the symmetry of double integral in symmetric domain and its application are briefly introduced.
文章简单介绍了在对称区域上重积分的对称性及其应用。
The way we actually think of the double integral is really as summing the values of a function all around this region.
就二重积分来讲,它是对区域里函数值求总和。
But, you know, it gives you an example where you can turn are really hard line integral into an easier double integral.
但是你知道,它给了你一个例证,其中你可以,把复杂的线积分化成简单些的二重积分。
Double integral is a kind of common conversion technology, with high precision, strong anti-jamming capability, etc.
双积分是一种常用的转换技术,具有精度高,抗干扰能力强等优点。
In this paper, a theorem which turns double integral into linear integral is given, and its application is discussed.
给出把一类二重积分化为曲线积分的一个定理,讨论定理的一些应用。
So, we'll call that the double integral of our region, R, of f of xy dA and I will have to explain what the notation means.
称之为区域R上fdA的二重积分,会向大家解释这些符号的含义的。
So maybe we first want to look at curves that are simpler, that will actually allow us to set up the double integral easily.
先看看简单些的曲线的情形,这样我们解决二重积分会简单许多。
And both the continuous double integral method and the virtual work method used in this paper can solve this problem well.
文中利用连续二次积分法和虚功法很好地解决了这一问题。
So, now, if I compare my double integral and, sorry, my triple integral and my flux integral, I get that they are, indeed, the same.
比较这个二重积分的话,抱歉。。。,比较这个三重积分和通量积分,就可以看到,它们是一样的。
So, that means that the double integral for flux through the top of R vector field dot ndS becomes double integral of the top of R dxdy.
这就是说通量的二重积分,顶部R•ndS的二重积分,变成了Rdxdy的二重积分。
So, it's one over the area times the double integral of xdA, well, possibly with the density, 1 but here I'm thinking uniform density one.
那么就是在这个区域的对xdA的二重积分,当然可能和密度有关系,但在这认为密度均为。
R This one is a double integral. So, if you are doing it, say, on a disk, you would have both R and theta if you're using polar coordinates.
不是变量,这是在一个圆上。,R,is,not,a,variable。,You,are,on,the,circle。,这个是二重积分,如果你们这么做的话,在圆盘上,如果你们用极坐标的话,就需要用到R和θ
There is a similar thing with the divergence theorem, of course, with flux and double integral of div f, you can apply exactly the same argument.
有一个和散度定理很像的东西,当然,对于通量和div,f的二重积分,都可以使用类似的理论。
No matter which form it is, it relates a line integral to a double integral Let's just try to see if we can reduce it to the one we had yesterday.
不管哪种形式,都把线积分和二重积分联系在一起,来看看,能不能通过化简得到昨天的公式。
The yellow lead making process is essentially a subject with multivariable coupling, double integral action, and nonminimun phase characteristics.
铅粉机是一个多变量耦合的、具有双重积分和本质非最小相位特性的对象。
That is just going to be, if you look at this paraboloid from above, all you will see is the unit disk so it will be a double integral of the unit disk.
这就会变成…,如果俯视这个抛物面,所看到的就是单位圆盘,这就应该是单位圆上的二重积分了。
Double integral of F.dS or F.ndS if you want, and to set this up, of course, I need to use the geometry of the surface depending on what the surface is.
就是做F·dS或是F·ndS的二重积分,为了能建立积分,需要用到曲面的几何性质,这与该曲面的类型有关。
To give better advice on teaching, futher discussion, is made on how to simplify the double integral operation with symmetry, precisely and effectively.
为更好地指导教学,文章还对如何准确、有效地利用对称性简化二重积分的计算作了进一步的探讨。
So, switching the area, moving the area to the other side, I'll get double integral of xdA is the area of origin times the x coordinate of the center of mass.
那么,改变一下区域,把这块移到另一侧,我们得到对xdA的双重积分,是原点那的圆面积乘质心的x的坐标。
And whether these line integrals or double integrals are representing work, flux, integral of a curve, whatever, the way that we actually compute them is the same.
不管是线积分或是二重积分,也不管它们表示的是功还是通量,计算它们的方法实际上是一样的。
应用推荐