A few of polynomial identity structures defined on complex field have been discussed and studied.
探讨了几种复数域的多项式同一性结构,并研究了它们的一些性质。
So that, the studies on the zeros of polynomial can be looked upon as the studies on the constructions of polynomial identity structure, its properties and the way to pick them up.
从演绎的内涵上将多项式零点问题的研究归结为对同一性多项式的结构,性质、与选择的研究。
With the use of the properties of the second Chebyshev polynomial, a group of interesting identity of sine and cosine function is obtained.
利用第二类契贝谢夫多项式的性质得到了关于正余弦函数的一组有趣的恒等式。
This paper investigates the integral valued polynomial and its identity factors, also gives a new proof for Fermat's little theorem.
探讨整值多项式及其恒因子,并给出费马小定理的一种证明方法。
In this paper by using the symplectic transformation condition, some new formulas including Chebyshev Polynomial, trigonometric identity, hyperbolic identity were obtained.
利用辛变换条件得到了一些新的切比雪夫多项式公式、三角恒等式和双曲恒等式。
In this paper by using the symplectic transformation condition, some new formulas including Chebyshev Polynomial, trigonometric identity, hyperbolic identity were obtained.
利用辛变换条件得到了一些新的切比雪夫多项式公式、三角恒等式和双曲恒等式。
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