Calculus 1

Calculus 1

Linda Green via YouTube Direct link

Continuity at a Point

9 of 67

9 of 67

Continuity at a Point

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Classroom Contents

Calculus 1

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  1. 1 Graphs and Limits
  2. 2 When Limits Fail to Exist
  3. 3 Limit Laws
  4. 4 The Squeeze Theorem
  5. 5 Limits using Algebraic Tricks
  6. 6 When the Limit of the Denominator is 0
  7. 7 Limits at Infinity and Graphs
  8. 8 Limits at Infinity and Algebraic Tricks
  9. 9 Continuity at a Point
  10. 10 Continuity Example with a Piecewise Defined Function
  11. 11 Continuity on Intervals
  12. 12 Continuity and Domains
  13. 13 Intermediate Value Theorem
  14. 14 Derivatives and Tangent Lines
  15. 15 Computing Derivatives from the Definition
  16. 16 Interpreting Derivatives
  17. 17 Derivatives as Functions and Graphs of Derivatives
  18. 18 Proof that Differentiable Functions are Continuous
  19. 19 Power Rule and Other Rules for Derivatives
  20. 20 Higher Order Derivatives and Notation
  21. 21 Derivative of e^x
  22. 22 Proof of the Power Rule and Other Derivative Rules
  23. 23 Product Rule and Quotient Rule
  24. 24 Proof of Product Rule and Quotient Rule
  25. 25 Special Trigonometric Limits
  26. 26 Derivatives of Trig Functions
  27. 27 Proof of Trigonometric Limits and Derivatives
  28. 28 Derivatives and Rates of Change (Rectilinear Motion)
  29. 29 Marginal Cost
  30. 30 The Chain Rule
  31. 31 More Chain Rule Examples and Justification
  32. 32 Justification of the Chain Rule
  33. 33 Implicit Differentiation
  34. 34 Derivatives of Exponential Functions
  35. 35 Derivatives of Log Functions
  36. 36 Logarithmic Differentiation
  37. 37 Inverse Trig Functions
  38. 38 Derivatives of Inverse Trigonometric Functions
  39. 39 Related Rates - Distances
  40. 40 Related Rates - Volume and Flow
  41. 41 Related Rates - Angle and Rotation
  42. 42 Maximums and Minimums
  43. 43 Mean Value Theorem
  44. 44 Proof of Mean Value Theorem
  45. 45 Derivatives and the Shape of the Graph
  46. 46 First Derivative Test and Second Derivative Test
  47. 47 Derivatives and the shape of the graph - example
  48. 48 Extreme Value Examples
  49. 49 Linear Approximation
  50. 50 The Differential
  51. 51 L'Hospital's Rule
  52. 52 L'Hospital's Rule on Other Indeterminate Forms
  53. 53 Newtons Method
  54. 54 Antiderivatives
  55. 55 Finding Antiderivatives Using Initial Conditions
  56. 56 Any Two Antiderivatives Differ by a Constant
  57. 57 Summation Notation
  58. 58 Approximating Area
  59. 59 The Fundamental Theorem of Calculus, Part 1
  60. 60 The Fundamental Theorem of Calculus, Part 2
  61. 61 Proof of the Fundamental Theorem of Calculus
  62. 62 The Substitution Method
  63. 63 Why U-Substitution Works
  64. 64 Average Value of a Function
  65. 65 Proof of the Mean Value Theorem for Integrals
  66. 66 Recitation 2 a solution and some hints
  67. 67 Limit as x goes to infinity recitation problem

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