例句與造句

1. Does monotone locally bounded function definitely have extreme
   "單調(diào)有界函數(shù)必有極限"嗎
2. Theorem 2 the product of a bounded function and an infinitesimal is an infinitesimal
   推論1常數(shù)與無窮小的乘積是無窮小。
3. Theorem 2 the product of a bounded function and an infinitesimal is an infinitesimal
   定理2有界函數(shù)與無窮小的乘積是無窮小。
4. Almost bounded function
   殆有界函數(shù)
5. A priori point - wise estimations are established for bounded functions satisfying a new class of nonlinear inequalities involving improper integrals
   摘要對滿足一類新的含反常積分非線性不等式的有界函數(shù)建立了先驗逐點估計。
6. It's difficult to find bounded function in a sentence. 用bounded function造句挺難的
7. A general estimation of the nth derivation of the function is presented by using the principle of the inductive model and the characters of the bounded functions
   對有界正則函數(shù)族中的函數(shù)，根據(jù)最大模原理和有界函數(shù)的系數(shù)不等式，得到了n階導(dǎo)數(shù)的準確估計式。
8. This dissection is mainly to discuss the problems of estimating in the derivation of bounded functions , the coefficients of bounded regular functions and schwarz - pick lemma for the derivation on the hyperbolic metric
   本文研究有界正則函數(shù)導(dǎo)數(shù)和系數(shù)的估計問題，以及雙曲度量下關(guān)于導(dǎo)數(shù)的schwarz - pick不等式。
9. The overall idea is that the system of robotic manipulators is decomposed as two parts : one is nominal system with perfect knowledge of dynamic model and the other is system with uncertainties . ctc is used to control nominal system . for uncertainties system , we utilize the regressor of robotic system or bounding function on uncertainties to design
   基本思想都是將不確定性機器人系統(tǒng)分解成標稱系統(tǒng)和不確定系統(tǒng)：對于標稱系統(tǒng)，采用計算力矩控制；對于不確定系統(tǒng)，利用機器人系統(tǒng)的回歸矩陣或集中不確定性上界的包絡(luò)函數(shù)，設(shè)計不同的補償控制器。
10. We compare the approximation of an analytic function f by its taylor polynomial and its poisson partial sum with the same number of terms and illustrate that for functions with limit zero at infinity and for bounded functions the poisson expansion provides a better approximation to the function than the taylor expansion
    在第三章中，介紹了rb曲線與poisson曲線的概念以及基本的幾何性質(zhì)，指出了poisson基函數(shù)與有理bernstein基函數(shù)之間存在的關(guān)系，并且將解析函數(shù)的taylor逼近與poisson逼近進行比較。實例表明，對于在無窮遠處極限為0的函數(shù)以及有界函數(shù)， poisson逼近比taylor逼近效果要好。