今天的例子是评测一个三次多项式。
Today's example function is evaluating a third order polynomial.
比方说,你要乘两个多项式在一起。
这种方法有助于多项式模型的化简。
给出了多项式时间的最优算法。
We provide a polynomial time algorithm to solve the problem.
结式是多项式理论中的一个重要概念。
The resultant is an important concept over the theory of polynomials.
多项式模型可提高拟合效果。
目的探讨多项式拟合曲线在临床中的应用。
Objective To discuss the clinical application of polynomial curves fitting.
觉得还可以就让通过,我想知道多项式乘法。
I felt that I could let through, I want to know polynomial multiplication.
注意:你的解法应该满足多项式时间复杂度。
Note: Your solution should be in polynomial time complexity.
目的研究第一类、第二类契贝谢夫多项式的一些恒等式。
Aim To study the identities of the first and second Chebyshev multinomial.
利用计算机进行公式推导,最终将归结于多项式的处理。
The formula manipulation by a computer will eventually result in a polynomial manipulation.
至于实零点多项式的研究,更是数学本身的基本问题之一。
Polynomials with only real zeros are also a basic problem in combinatorics.
但是,该方法的关键是寻求循环码的一个覆盖多项式集合。
The key point of this method is to find a set of covering polynomials.
在这里,系统的状态描述与多项式描述之间联系显得很自然。
Furthermore, the relationship between state description and polynomial description of system appears natural.
现在我为什么要这么做呢?,或许我应该使用伪多项式这个值?
Now why am I going through all this, maybe I should use the word pseudo-theory?
通常的多元样条函数要求在网线的每一点上,分片多项式的光滑性一致。
Usually, multivariate spline function is smooth on every point of net lines.
主要结果是:当高次项是奇数次齐次多项式时,周期函数是单调增加的;
The main results are. the period function is increasing when the higher degree is odd;
主要结果是:当高次项是奇数次齐次多项式时,周期函数是单调增加的;
The main results are. the period function is increasing when the higher degree is odd;
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