This very simple program declares the two decision variables: the constraint and the objective function.
这个非常简单的程序声明了两个决策变量:约束和目标函数。
If an iterator class or a function with static (or global) variables depends on multiple data states, two problems come up.
如果带静态(或全局)变量的迭代器类或函数取决于多个数据状态,则出现两个问题。
OK, so now, let's say that we had, actually, a function of two variables.
可能是这样的,现在我们可以说,有一个含有两个变量的函数。
So, when we think of a graph, really, it is a function of two variables.
因此当我们在想像一个图像时,其实那只是一个二元函数的图像。
And then, we'll see that if we have more than two variables, then it's harder to plot the function.
我们会发现如果函数有多于两个变量,那把它画出来会困难得多。
Well, let's say how to visualize a function of two variables.
如何想象一个有两个变量的函数。
So, we said when we have a function of two variables, we have the gradient vector.
我们说,当一个二元函数存在时,就有梯度向量。
That was our first example of a function of two variables possibly.
这是二元函数中的第一个例子。
This is going to be a function, I only need two variables, and here I've got three variables down.
我们只,需要两个变量,而现在这里有三个变量。
y OK, so let's say that we have a function of two variables, x and y.
假设有一个函数含有2个变量x和。
we've seen is how to actually view a function of two variables in terms of its graph and its contour plot.
我们学过怎样认识二元函数,从它的图像和等高线的角度来看。
Oh, a function of two variables.
这的确是一个二元函数。
I should say that is for a function of two variables to try to decide whether a given critical point is a minimum, a maximum or a saddle point.
但这种办法并不普遍,只能用于二元函数,来判断是极小值点、极大值点还是鞍点。
This example returns the length of the third side of a right triangle by applying the SQUARE function to two variables and then calculating the square root of their sum.
此示例通过对两个变量应用SQUARE函数然后计算其和的平方根,返回直角三角形第三边的长度。
Limit of function of two variables is more complex than that of one variable.
二元函数的极限远比一元函数的极限复杂,但它们之间又有密切的联系。
Chapter two briefly introduces the origin and function of market subdivision as well as the variables in market subdivision.
第二章简要介绍了市场细分的产生、作用以及市场细分变量要素。
By using the limits of functions and the exchange limit theorem, we considered the relationship between the double limit of function with two variables and its repeated limits.
应用函数列的极限与函数的极限交换次序定理,研究了二元函数的二重极限与它的两个累次极限的关系定理,研究了二元函数的两个二阶混合偏导数可交换次序定理。
After summing up, summarizing, find some laws: Choosing proper route to confirm the function limit of two variables' doesn't exist.
经过归纳,总结,找到一些规律:即选择适当路径以确定二元函数极限不存在。
After summing up, summarizing, find some laws: Choosing proper route to confirm the function limit of two variables' doesn't exist.
经过归纳,总结,找到一些规律:即选择适当路径以确定二元函数极限不存在。
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