Calculus I - Limits, Derivative, Integrals

Calculus I - Limits, Derivative, Integrals

Dr. Trefor Bazett via YouTube Direct link

The Velocity Problem | Part II: Graphically

2 of 59

2 of 59

The Velocity Problem | Part II: Graphically

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Classroom Contents

Calculus I - Limits, Derivative, Integrals

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  1. 1 The Velocity Problem | Part I: Numerically
  2. 2 The Velocity Problem | Part II: Graphically
  3. 3 A Tale of Three Functions | Intro to Limits Part I
  4. 4 A Tale of Three Functions | Intro to Limits Part II
  5. 5 What is an infinite limit?
  6. 6 Limit Laws | Breaking Up Complicated Limits Into Simpler Ones
  7. 7 Building up to computing limits of rational functions
  8. 8 Limits of Oscillating Functions and the Squeeze Theorem
  9. 9 Top 4 Algebraic Tricks for Computing Limits
  10. 10 A Limit Example Combining Multiple Algebraic Tricks
  11. 11 Limits are simple for continuous functions
  12. 12 Were you ever exactly 3 feet tall? The Intermediate Value Theorem
  13. 13 Example: When is a Piecewise Function Continuous?
  14. 14 Limits "at" infinity
  15. 15 Computing Limits at Infinity for Rational Functions
  16. 16 Infinite Limit vs Limits at Infinity of a Composite Function
  17. 17 How to watch math videos
  18. 18 Definition of the Derivative | Part I
  19. 19 Applying the Definition of the Derivative to 1/x
  20. 20 Definition of Derivative Example: f(x) = x + 1/(x+1)
  21. 21 The derivative of a constant and of x^2 from the definition
  22. 22 Derivative Rules: Power Rule, Additivity, and Scalar Multiplication
  23. 23 How to Find the Equation of a Tangent Line
  24. 24 The derivative of e^x.
  25. 25 The product and quotient rules
  26. 26 The derivative of Trigonometric Functions
  27. 27 Chain Rule: the Derivative of a Composition
  28. 28 Interpreting the Chain Rule Graphically
  29. 29 The Chain Rule using Leibniz notation
  30. 30 Implicit Differentiation | Differentiation when you only have an equation, not an explicit function
  31. 31 Derivative of Inverse Trig Functions via Implicit Differentiation
  32. 32 The Derivative of ln(x) via Implicit Differentiation
  33. 33 Logarithmic Differentiation | Example: x^sinx
  34. 34 Intro to Related Rates
  35. 35 Linear Approximations | Using Tangent Lines to Approximate Functions
  36. 36 The MEAN Value Theorem is Actually Very Nice
  37. 37 Relative and Absolute Maximums and Minimums | Part I
  38. 38 Relative and Absolute Maximums and Minimums | Part II
  39. 39 Using L'Hopital's Rule to show that exponentials dominate polynomials
  40. 40 Applying L'Hopital's Rule to Exponential Indeterminate Forms
  41. 41 Ex: Optimizing the Volume of a Box With Fixed Surface Area
  42. 42 Folding a wire into the largest rectangle | Optimization example
  43. 43 Optimization Example: Minimizing Surface Area Given a Fixed Volume
  44. 44 Tips for Success in Flipped Classrooms + OMG BABY!!!
  45. 45 What's an anti-derivative?
  46. 46 Solving for the constant in the general anti-derivative
  47. 47 The Definite Integral Part I: Approximating Areas with rectangles
  48. 48 The Definite Integral Part II: Using Summation Notation to Define the Definite Integral
  49. 49 The Definite Integral Part III: Evaluating From The Definition
  50. 50 "Reverse" Riemann Sums | Finding the Definite Integral Given a Sum
  51. 51 Fundamental Theorem of Calculus 1 | Geometric Idea + Chain Rule Example
  52. 52 Fundamental Theorem of Calculus II
  53. 53 Intro to Substitution - Undoing the Chain Rule
  54. 54 Adjusting the Constant in Integration by Substitution
  55. 55 Substitution Method for Definite Integrals **careful!**
  56. 56 Back Substitution - When a u-sub doesn't match cleanly!
  57. 57 Average Value of a Continuous Function on an Interval
  58. 58 Exam Walkthrough | Calc 1, Test 3 | Integration, FTC I/II, Optimization, u-subs, Graphing
  59. 59 ♥♥♥ Thank you Calc Students♥♥♥ Some final thoughts.

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