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亚德诺半导体技术有限公司
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analoge Elektroniklehre
模拟电子
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Analysis
数学分析/分析/解析/Mathematical analysis
Die Analysis [aˈnaːlyzɪs] (ανάλυσις análysis ‚Auflösung‘, ἀναλύειν analýein ‚auflösen‘) ist ein Teilgebiet der Mathematik. Als eigenständiges Teilgebiet der Mathematik existiert die Analysis seit Leonhard Euler (18. Jahrhundert). Seither ist sie die Mathematik der Natur- und Ingenieurwissenschaften.

数学分析学,也称分析数学分析学解析学(英语:Mathematical Analysis),是普遍存在于大学数学专业的一门基础课程。大致与非数学专业学生所学的高等数学课程内容相近,但内容更加深入,一般指以微积分学无穷级数解析函数等的一般理论为主要内容,并包括它们的理论基础[注 1]的一个较为完整的数学学科。[1]

数学分析研究的内容包括实数复数实函数复变函数。数学分析是由微积分演进而来,在微积分发展至现代阶段中,从应用中的方法总结升华为一类综合性分析方法,且初等微积分中也包括许多数学分析的基础概念及技巧,可以认为这些应用方法是高等微积分生成的前提。数学分析的方式和其几何有关,不过只要任一数学空间有定义邻域拓扑空间)或是有针对两对象距离的定义(度量空间),就可以用数学分析的方式进行分析。

Die Analysis [aˈnaːlyzɪs] (ανάλυσις análysis ‚Auflösung‘, ἀναλύειν analýein ‚auflösen‘) ist ein Teilgebiet der Mathematik. Als eigenständiges Teilgebiet der Mathematik existiert die Analysis seit Leonhard Euler (18. Jahrhundert). Seither ist sie die Mathematik der Natur- und Ingenieurwissenschaften.

Ihre Grundlagen wurden im 17. Jahrhundert von Gottfried Wilhelm Leibniz und Isaac Newton als Infinitesimalrechnung unabhängig voneinander entwickelt. Infinitesimalrechnung ist die mathematische Untersuchung kontinuierlicher Veränderungen, so wie Geometrie die Untersuchung der Form und Algebra die Untersuchung der Verallgemeinerung arithmetischer Operationen ist.

Zentrale Begriffe der Analysis sind die des Grenzwerts, der Folge, der Reihe sowie in besonderem Maße der Begriff der Funktion. Die Untersuchung von reellen und komplexen Funktionen hinsichtlich StetigkeitDifferenzierbarkeit und Integrierbarkeit zählt zu den Hauptgegenständen der Analysis. Grundlegend für die gesamte Analysis sind die beiden Körper  (der Körper der reellen Zahlen) und  (der Körper der komplexen Zahlen) mitsamt deren geometrischen, arithmetischen, algebraischen und topologischen Eigenschaften.

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ANSI
ANSI(美国国家标准协会)编码是一种扩展的ASCII码. ANSI-American National Standards Institute
    ANSI(美国国家标准协会)编码是一种扩展的ASCII码,使用8个比特来表示每个符号。8个比特能表示出256个信息单元,因此它可以对256个字符进行编码。ANSI码开始的128个字符的编码和ASCII码定义的一样,只是在最左边加了一个0。例如:在 ASCII编码中,字符“a”用1100001表示,而在ANSI编码中,则用01100001表示。除了ASCII码表示的128个字符外,ANSI码还可以表示另外的128个符号,如版权符号、英镑符号、希腊字符等。
    除了ANSI编码外,世界上还存在着另外一些对ASCII码进行扩展的编码方案,ASCII码通过扩展甚至可以编码中文、日文和韩文字符。不过令人遗憾的是,正是由于这些编码方案的存在导致了编码的混淆和不兼容性。
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