Calculus theory: Difference between revisions

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## [[Defining the derivative]]
## [[Defining the derivative]]
## [[Defining the partial derivatives]]
## [[Defining the partial derivatives]]
## [[Conditions for differentiability]]
## [[Conditions for differentiability for a single variable]]
## [[Conditions for differentiability for many variables]]
## [[Linear approximation for one variable]]
## [[Linear approximation for one variable]]
## [[Linear approximation for two variables]]
## [[Linear approximation for two variables]]
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## [[Finding critical points of a function]]
## [[Finding critical points of a function]]
## [[l'Hospital rule]]
## [[l'Hospital rule]]
## [[Finding extreme values of a multivariable function]]
## [[Finding critical points of a multivariable function]]
# '''Integration and total change'''
# '''Integration and total change'''

Revision as of 02:48, 29 March 2022

  1. Functions
    1. Mistakes regarding functions
    2. Defining a function
    3. Operations with functions
    4. Visualising the domain of a function
    5. Graph of single variable functions
    6. Transforming the graph of functions
    7. Linear algebra and deforming graphs of functions
    8. Guessing the graphs of single variable functions
    9. Guessing the graphs of multivariable functions
    10. Level curves and level surfaces
  2. Polar coordinates and parametric curves
    1. Mistakes regarding polar coordinates
    2. Mistakes regarding parametric curves
    3. Polar coordinates
    4. Parametric curves
    5. Parametrization of curves
  3. Limits and continuity
    1. Mistakes regarding limits
    2. Informal limit and continuity of a single variable function
    3. Formal limit and continuity of a single variable function
    4. Limit and continuity of a multivariable function
    5. Properties of limits
    6. Limits at or with infinity
    7. Theorems covering limits and continuity of functions
  4. Differentiation and derivatives
    1. Mistakes regarding derivatives
    2. Defining the derivative
    3. Defining the partial derivatives
    4. Conditions for differentiability for a single variable
    5. Conditions for differentiability for many variables
    6. Linear approximation for one variable
    7. Linear approximation for two variables
    8. Derivative formulas
    9. Derivative of trigonometric functions
    10. Chain rule for single variable functions (incomplete at the end)
    11. Chain rule for multivariable functions
    12. Implicit differentiation
  5. Applications of differentiation
    1. Increasing and decreasing functions
    2. Extreme values of a function
    3. Finding extreme values of a function
    4. Finding critical points of a function
    5. l'Hospital rule
    6. Finding extreme values of a multivariable function
    7. Finding critical points of a multivariable function
  6. Integration and total change
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