而由于黎曼积分具有局限性,黎曼积分只能用于连续函数类的积分。
And because of the limitations of Riemann Integration, it can only be used for continuous function.
文章针对被积函数是连续函数、可导函数的定积分不等式提出了几种有效的证明方法。
This article analyses how to prove the stable integral inequality effectively while knowing the function is continuous and derivative.
定义了n重导数,n元绝对连续函数,广义n重原函数及牛顿n重积分。
It defines n-ple derivative, n-ary absolutely continuous function, generalized n-ple primitive function and Newton n-ple integral.
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