Last time: Problems from 7.7; beginning of review
Today:
- No new worksheet.
- No problems to return.
- No quiz opportunity.
- No problems to collect.
- Questions on old stuff?
- Section Review:
- Today we'll look at early stuff (differentiation) plus
middle stuff (integration); tomorrow, recent stuff.
- Review (part II of III)
- Function Zoo
- Unknown animals
- Transformations
- Compositions
- Inverses
- New types
- Exponentials/Logarithms
- Hyperbolic trig functions
- Limits
(in order to characterize continuity, and to get at the tangent line)
- Derivatives
- Integrals
- Types of Problems:
- Study of a function
- Domain and Range
- Intercepts (e.g. roots)
- Symmetry
- Asymptotes (including slant)
- Continuity
- Differentiability
- Increasing/Decreasing intervals
- Concavity and Inflection
- Extrema
- Graphing it (and its derivatives)
- Calculate derivatives using
- Limit definition
- Formulas (product, chain, etc.)
- Using derivatives
- To find extrema
- To find tangent lines
- Especially: Optimization problems
- Matching derivatives (to create smoothness,
e.g. when should a pilot start descent?)
- Higher derivatives
- Rolle's theorem and Mean Value Theorem (tilted
Rolle's)
- Integrals
- Started with real areas, approximating them with
rectangles
- Left rectangles
- Right rectangles
- Midpoint rectangles
- Trapezoids (average of left and
right)
- Calculating net areas (positive and negative)
- Calculating definite versus indefinite integrals.
Key to solving them is based on antiderivatives -
An antiderivative of f is a function
which has f(x) as its derivative.
- Antiderivatives are not unique - don't
forget "C"
- Fundamental theorem of calculus
- Using symmetry to solve integrals
- Calculating areas between curves
- Integrals as things other than areas!
- Integrating along the y-axis, rather than
the x-axis
Next time: Final day of review
Website maintained by Andy Long.
Comments appreciated.
