theory of hyperbolic functions [数] 双曲函数论
complex hyperbolic functions 复双曲线函数
Areafunktionen inverse hyperbolic functions 反双曲函数
Trigonometric and Hyperbolic Functions 三角和曲线函数
Hyperbelfunktionen hyperbolic functions 双曲函数
Inverse Hyperbolic Functions 函数
signs of hyperbolic functions 双曲函数符号
extended hyperbolic functions method 扩展的双曲函数法
Hyperbolic and Inverse Functions 双曲函数和反双曲函数
The hyperbolic function model is the best choice after the comparision of the results from the four models.6.
并对这几种方法的计算结果进行了比对,确认了双曲函数模型是在该条件下计算电子激发温度的最佳模型。
参考来源 - 特殊等离子体环境物理信息获取与处理的研究·2,447,543篇论文数据,部分数据来源于NoteExpress
以上来源于: WordNet
N any of a group of functions of an angle expressed as a relationship between the distances of a point on a hyperbola to the origin and to the coordinate axes. The group includes sinh (hyperbolic sine), cosh (hyperbolic cosine), tanh (hyperbolic tangent), sech (hyperbolic secant), cosech (hyperbolic cosecant), and coth (hyperbolic cotangent) 双曲线函数
Finally, let's take care of the inverse trig and hyperbolic functions.
最后,让我们的双曲函数反三角函数和照顾。
The hyperbolic trigonometric functions are to hyperbolae as the trigonometric functions are to circles. That is, imagine you plot these points on a Cartesian plane for all possible values of t.
双曲三角函数就是对曲线应用三角函数,也就是说,想象将这些点放在笛卡尔平面上来得到t的所有可能值。
The coefficient functions of the hyperbolic equations considered are assumed to be piecewise constant.
我们假设在所考虑的微分方程中,系数函数为片段常函数。
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