获得了求三类递归数列通项公式的一种新方法。
And a new method of three kinds of recurrence sequences for general term formula was obtained.
本文论述了母函数与递归数列的关系,并探讨了用母函数求解递归数列的方法。
In this paper, we discuss the relation between master function and recursion, and the approach in solving recursive relation by master function.
为了测试这段初步的日志记录代码,我将使用一个精巧的递归方法,它是斐波纳契数列计算的一个实现,如清单4 所示。
To test this preliminary logging code, I'll use a nicely recursive method, an implementation of the Fibonacci sequence calculation, as shown in Listing 4.
他当时使用的例子,就是用递归生成一个斐波那契数列。
The example he USES is a function that generates a Fibonacci sequence.
如果我来写斐波那契数列你可以看看这儿,原因是我想让你看看这部分的递归可以翻倍。
And the reason I want to show you this is to notice that the recursion can be doubled.
没有谁真的在右脑中,按我最初讲的递归方法,计算Fibonacci数列。
Nobody in their right mind actually implements a recursive Fibonacci the way I did it originally.
在数学定义中,递归是十分常见的,如fibonacci数列(斐波那契数列)。
Definitions in mathematics are often given recursively. For instance, the Fibonacci sequence is defined recursively.
然后在这里有个这样的数列,一个很好的用递归来实现的斐波那契i数列。
And so we've got it up here, a nice little recursive implementation of it.
这是一个递归结构求斐波那契数列中的数列中的前10个数。
This is a recursive structure for Fibonacci series, the series of 10 numbers.
这是一个递归结构求斐波那契数列中的数列中的前10个数。
This is a recursive structure for Fibonacci series, the series of 10 numbers.
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