# Herman Yeung – Calculus – Integration by part 1 分部積分法1

(1) Concept of Differentiation 微分概念
(2) First Principle 基本原理
(3) Rule development 法則證明
(4) Trigonometric skills 三角學技術
(5) Limit 極限
(6) Sandwiches Theorem 迫近定理
(7) Leibniz Theorem 萊布尼茲定理
(8) Logarithmic differentiation 對數求導法
(9) Implicit differentiation 隱函數微分
(10) Differentiation of more than 2 variables 超過2個變數之微分
(11) Differentiation by Calculator 微分計數機功能
(12) Application of Differentiation – curve sketching 微分應用之曲線描繪
(13) Meaning of Integration 積分意義
(14) Rule of Integration 積分法則
(15) Trigonometric rule of Integration 三角積分法則
(16) Exponential, Logarithmic rule of integration 指數、對數積分法則
(17) Integration by Substitution 代換積分法
(18) Integration by Part 分部積分法
(19) Integration Skill : Partial Fraction 積分技術︰部分分式
(20) Integration by Trigonometric Substitution 三角代換積分法
(21) t-formula
(22) Reduction formula 歸約公式
(23) Limit + Summation = Integration 極限 + 連加 = 積分
(24) Application of Integration – Area 積分應用之求面積
(25) Application of Integration – Volume 積分應用之求體積
(26) Application of Integration – Length of curve 積分應用之求曲線長度
(27) Application of Integration – Surface area 積分應用之求表面積
(28) L’ Hospital rule 洛必達定理
(29) Fundamental Theorem of Integral Calculus 微積分基礎原理
(30) Calculus on Physics 微積分於物理上的應用
(31) Calculus on Economics 微積分於經濟上的應用
(32) Calculus on Archeology 微積分於考古學上的應用

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