主要讨论了第二积分中值定理“中值点”的渐近性和渐近速度。
This paper discusses the asymptotic rate of "mean value point" in second mean value theorem for integrals.
利用泰勒公式,给出中值定理“中值点”渐近性质的一个定量刻画。
Using the Taylor formula, gives the theorem of mean "the value point" an approach nature quota portray.
利用极限理论,给出了复函数积分中值公式的“中值点”的渐近性的简洁证明。
By using the limit theory, we discuss and prove the asymptotic properties of mean point in integral mean value formula for a complex function.
First, it's pointing to the beginning of the list, which initially might be down here at but after a while, might be part way through. And to that, I simply add a halfway point, and then I check.
列表中间的一个部分了,然后我求出列表的中值点,然后看看该点的值是不是等于目标值,如果是的话就完成了,如果不是的话,如果中位值大于我要找的目标值。
In binary search-- ah, there's that wonderful phrase, this is called a version of binary search just like you saw bin-- or bi-section methods, - when we were doing numerical things- in binary search, I need to keep track of the starting point and the ending point of the list I'm looking at.
就是当我们处理数字的时候,所称的二分检索,在二分法搜索中,我需要记录区间的开始点和尾点,初始化的时候就是-,问题输入的开始点和尾点,当我开始做测试的时候,我想要做的就是去取中值点。
OK. Now, having said that, where should I pick to look in this list?
对不对?中值点?为什么呢?,你答对了但是为什么呢?
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