374-380ġ0.3 Convergence Tests: All Series, pp. 356-359ġ0.2 Convergence Tests: Positive Series, pp. 351-355ĩ.3 Slope, Length, and Area for Polar Curves, pp. 348-367ĩ.2 Polar Equations and Graphs, pp. 328-335ĩ: Polar Coordinates and Complex Numbers, pp. 311-319Ĩ.3 Area of a Surface of Revolution, pp. ![]() 311-347Ĩ.1 Areas and Volumes by Slices, pp. 294-299Ĩ: Applications of the Integral, pp. 283-310ħ.3 Trigonometric Substitutions, pp. 259-266Ħ.6 Powers Instead of Exponentials, pp. 242-251Ħ.5 Separable Equations Including the Logistic Equation, pp. 228-282Ħ.3 Growth and Decay in Science and Economics, pp. 213-219Ħ: Exponentials and Logarithms, pp. 206-212ĥ.7 The Fundamental Theorem and Its Consequences, pp. 195-200ĥ.6 Properties of the Integral and the Average Value, pp. 187-194ĥ.4 Indefinite Integrals and Substitutions, pp. 164-170Ĥ.4 Inverses of Trigonometric Functions, pp. 160-163Ĥ.3 Inverse Functions and Their Derivatives, pp. 154-159Ĥ.2 Implicit Differentiation and Related Rates, pp. 146-153Ĥ.1 Derivatives by the Charin Rule, pp. 137-145ģ.8 The Mean Value Theorem and l’Hôpital’s Rule, pp. 130-136ģ.7 Newton’s Method and Chaos, pp. 105-111ģ.5 Ellipses, Parabolas, and Hyperbolas, pp. 96-104ģ.3 Second Derivatives: Minimum vs. 91-153ģ.2 Maximum and Minimum Problems, pp. 71-77ģ: Applications of the Derivative, pp. 64-70Ģ.5 The Product and Quotient and Power Rules, pp. 58-63Ģ.4 Derivative of the Sine and Cosine, pp. ![]() 44-49Ģ.3 The Slope and the Tangent Line, pp. 34-35Ģ.1 The Derivative of a Function, pp. Answers to Odd-Numbered Problems ( PDF - 2.4MB)ġ.3 The Velocity at an Instant, pp.The videos, which include real-life examples to illustrate the concepts, are ideal for high school students, college students, and anyone interested in learning the basics of calculus. MIT Professor Gilbert Strang has created a series of videos to show ways in which calculus is important in our lives. The complete textbook is also available as a single file. There is also an online Instructor’s Manual and a student Study Guide. It is well organized, covers single variable and multivariable calculus in depth, and is rich with applications. Trigonometric Integrals by The Organic Chemistry TutorĬalculus 2 Lecture 7.Published in 1991 by Wellesley-Cambridge Press, the book is a useful resource for educators and self-learners alike. Integration By Parts by The Organic Chemistry Tutor Cylindrical Shell… when to use which? by Quoc Dat PhungĬalculus 2: Arc Length (Video #8) by Math TV with Professor V Shell Method (rotated about different lines) by blackpenredpenĭisk/Washer vs. Shell Method – Volume of Rotation by The Organic Chemistry Tutorĭisk/Washer Method vs. ![]() U – Substitution with Definite Integrals by The Organic Chemistry TutorĪrea Between Two Curves by The Organic Chemistry Tutorįinding the Area Between Two Curves by Integration by Professor Dave Explainsįinding Area Between Curves by patrickJMTĭisk & Washer Method – Calculus by The Organic Chemistry Tutor How to Integrate Using U – Substitution by The Organic Chemistry Tutor If you have any questions, feel free to email me on webcourses and I’ll try to respond as quickly as I can! The table below will have locations and times listed. In all we’ll have four sessions a week, three in person and one online held via zoom. This will be my second semester being an SI leader and I look forward to working with you all. and I’ll be your SI leader for MAC 2312 this semester. Intro to Discrete Structures with Iliya.
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