The following links lead to videos, slides, handouts, and other resources to help to gain an in-depth understanding of concepts. These are also the resources that you will access, when and if you're absent, to catch up. 01 - Equation and its graph 02 - Functions 03 - Limits 04 - Limit Laws 05 - Limit Techniques 06 - Continuous Functions 07 - Intermediate Value Theorem 08 - Infinite Limits and Vertical Asymptotes 09 - Tangent line to a curve 10 - Derivative Function 11 - Differentiability and Continuity 12 - Alternate form of the derivative 13 - Differentiation Rules 14 - Product Rule 15 - Quotient Rule 16 - Derivatives of Trigonometric Functions 17 - Chain Rule 18 - Chain Rule – Trigonometric Functions 19 - Implicit Differentiation 20 - Velocity Acceleration 21 - Related Rates 22 - Extreme Values 23 - Rolle’s Theorem and Mean Value Theorem 24 - Increasing Decreasing Functions 25 - Concavity and Second Derivative Test 26 - Horizontal Asymptotes 27 - Summary of Curve-Sketching 28 - Optimization 29 - Newton's Method 30 - Antiderivative 31 - Sigma Notation 32 - Area of a Plane Region 33 - Fundamental Theorem of Calculus 34 - Mean Value Theorem for Integrals 35 - Second Fundamental Theorem 36 - U-substitution 37 - Trapezoidal Rule 38 - Simpsons Rule 39 - Natural Log Function 40 - Derivative of a log function 41 - Log rule for integration 42 - Derivatives of Inverse Functions 43 - Natural Exponential Function 44 - Functions with bases other than e 45 - Derivatives and integrals of Inverse Trig Functions 46 - Slope Fields 47 - Euler's Method 48 - Separable Equations 49 - Growth-Decay-Logistic 50 - Area Between Two Curves 51 - Volumes by Cross-section 52 - Volumes - Disk Method 53 - Washer Method 54 - Shell Method 55 - Arc length 56 - Basic integration Rules 57 - Integration by parts 58 - Partial Fractions 59 - L’hopital’s Rule and indeterminate forms 60 - Improper Integrals 61 - Sequences – Definition and Limit 62 - Series and Convergence 63 - Integral Test and P-series 64 - Comparison of Series 65 - Alternating Series 66 - Conditional and absolute convergence 67 - Taylor Polynomials and Approximations 68 - Power Series 69 - Geometric Power Series 70 - Taylor and Maclauren Series 71 - Parametric Equations 72 - Polar Equations 73 - Derivatives and integrals of polar graphs 74 - AP Calculus Review Book traversal links for Lesson Resources ‹ Study Questions List Up 01 - Equation and its graph ›