我们对它进行初等性质及分析性质的研究,可深入了解其特性,并广泛用于解决一些微积分的问题。
We carry on the primary nature and the Analysis nature archery target research to it, but thoroughly understood its characteristic, and widely USES in solving some fluxionary calculus problems.
扼要论述了化归的原则及意义,从理论和实例分析讨论了一元微积分中若干典型问题化归的基本方法。
Applying theory to specific cases to analyse ideogical method of transformation of several problems, briefly problems the principle and significance of transformation method in monadic calculus.
扼要论述了化归的原则及意义,从理论和实例分析讨论了一元微积分中若干典型问题化归的基本方法。
Applying theory to specific cases to analyse ideogical method of transformation of several problems, briefly problems the principle and significance of transformation method in monadic calculus.
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