Introduction to integralsIntegral like limit and derivative is another important concept in calculusIntegral is the inverse of differentiation in some senseThere is a connection between integral calcu

More on Derivatives and Integrals-Product Rule-Chain RuleAP Physics CMrs. Coylef (x) = lim f(x h) - f(x ) h ?0 h DerivativeDerivative Notations f (x) df (x) dx . fdfdxNotations when evalua

Precise definition of limitsThe phrases x is close to a and f(x) gets closer and closer to L are vague. since f(x) can be arbitrarily close to 5 as long as x approaches

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级Chapter2 Derivatives2.1 The Derivative as a function The Tangent Problem Let f be a function and let P(a f(a)) be a point on the graph of f. To find the slo

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级Chapter1 Limits and Continuity1.1 Rates of Change and Limits The Tangent Problem Let f be a function and let P(a f(a)) be a point on the graph of f. To find t

单击此处编辑母版文本样式第二级第三级第四级第五级单击此处编辑母版标题样式Chapter 5 Applications of integralsAreas between curves The area A of the region bounded by the curves And the lines

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级Chapter 2 Limits and Derivatives2.1The tangent and velocity problems2.1.1 The tangent problemExample 1 Find an equation of the tangent line to the parabola

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级CHAPTER 3 DIFFERENTIATION RULES3.1 Derivatives of Polynomials and Exponential Functions3.2 The Product and Quotient Rules3.3 Rates of Change in the Nat

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级Chapter3 Applications of Derivatives3.1 Extreme Values of Functions3.1 Maximum and minimum valuesThe maximum and minimum values of f are called the extreme values

Click to edit Master title styleClick to edit Master text stylesSecond levelThird levelFourth levelFifth level7TECHNIQUES OF INTEGRATIONTECHNIQUES OF INTEGRATIONDue to the Fundamental Theorem of Calcu

单击此处编辑母版标题样式单击此处编辑母版文本样式第二级第三级第四级第五级Chapter 2 Limits and Derivatives2.1The tangent and velocity problems2.1.1 The tangent problemExample 1 Find an equation of the tangent line to the parabola

Click to edit Master title styleClick to edit Master text stylesSecond levelThird levelFourth levelFifth levelCopyright ? by Houghton Mifflinpany Inc. All rights reserved.Parametric EquationsDigit