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McGraw-Hill authors represent the leading experts in their fields and are dedicated to improving the lives, careers, and interests of readers worldwide McGraw-Hill authors represent the leading experts in their fields and are dedicated to improving the lives, careers, and interests of readers worldwide
Linear Coordinate Systems. Absolute Value. Inequalities * Rectangular Coordinate Systems * Lines * Circles * Equations and their Graphs * Functions * Limits * Continuity * The Derivative * Rules for Differentiating Functions * Implicit Differentiation * Tangent and Normal Lines * Law of the Mean. Increasing and Decreasing Functions * Maximum and Minimum Values * Curve Sketching. Concavity. Symmetry * Review of Trigonometry * Differentiation of Trigonometric Functions * Inverse Trigonometric Functions * Rectilinear and Circular Motion * Related Rates * Differentials. Newton's Method * Antiderivatives * The Definite Integral. Area under a Curve * The Fundamental Theorem of Calculus * The Natural Logarithm * Exponential and Logarithmic Functions * L'Hopital's Rule * Exponential Growth and Decay * Applications of Integration I: Area and Arc Length * Applications of Integration II: Volume * Techniques of Integration I: Integration by Parts * Techniques of Integration II: Trigonometric Integrands and Trigonometric Substitutions * Techniques of Integration III: Integration by Partial Fractions * Miscellaneous Substitutions * Improper Integrals * Applications of Integration II: Area of a Surface of Revolution * Parametric Representation of Curves * Curvature * Plane Vectors * Curvilinear Motion * Polar Coordinates * Infinite Sequences * Infinite Series * Series with Positive Terms. The Integral Test. Comparison Tests * Alternating Series. Absolute and Conditional Convergence. The Ratio Test * Power Series * Taylor and Maclaurin Series. Taylor's Formula with Remainder * Partial Derivatives * Total Differential. Differentiability. Chain Rules * Space Vectors * Surface and Curves in Space * Directional Derivatives. Maximum and Minimum Values * Vector Differentiation and Integration * Double and Iterated Integrals * Centroids and Moments of Inertia of Plane Areas * Double Integration Applied to Volume under a Surface and the Area of a Curved Surface * Triple Integrals * Masses of Variable Density * Differential Equations of First and Second Order