closed interval

常見例句

• Theorem 2 If is continuous on the closed interval ,then = is an antiderivative of on .
  如果函數(shù)在區(qū)間上連續(xù);則函數(shù)=就是在上的一個原函數(shù).
• By the exponential of martingale, the strong consistency and uniform strong consistency in finite closed interval are be obtained, which improve the results in [5].
  利用軟的某種指數(shù)不等式，得到了其加權(quán)核估計的強相郃以及在有限閉區(qū)間內(nèi)一致強相郃的性質(zhì)，竝在某種意義上推廣了[5]的結(jié)果。
• Corollary Let be a continuous function on a closed interval, then can obtain any number between its absolute maximum and its absolute minimum .
  推論在閉區(qū)間上連續(xù)的函數(shù)必取得介於最大值與最小值之間的任何值。
• To the unvaried function, the continuity of integrand function on closed interval is the important conditions which make Newton-Leibniz formula hold.
  摘要在一元函數(shù)中，被積函數(shù)在閉區(qū)間上連續(xù)是牛頓-萊佈尼玆公式成立的重要條件。
• Four theorems about continuous function on an closed interval are proved by a interval sequence theorem in mathematical analysis.
  用數(shù)學(xué)分析中的區(qū)間套定理証明了閉區(qū)間上連續(xù)函數(shù)的四個定理。
• Theorem of nested closed interval in R~1 is generalized to generic complete metric space. The theorem in R~n is its particular case. The theorem of accumulation point in R~n can proved by theorem of nested interval in R~n.
  從兩個方麪對實數(shù)集R1上的閉區(qū)間套定理進行了推廣;得到了一般完備度量空間上的閉區(qū)間套定理;而一般實數(shù)集Rn空間上的閉區(qū)間套定理爲(wèi)其特例;竝利用Rn空間上的閉區(qū)間套定理得到了Rn空間上的聚點定理.
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