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Tuesday, February 16

Tuesday, June 2

  1. page home edited ... Main Topic Compound Interest Simple Interest Exponential functions Linear Functions…
    ...
    Main Topic
    Compound Interest
    Simple Interest
    Exponential functions
    Linear Functions
    Review Topics
    Arithmetic Sequences
    (view changes)
    11:14 am

Thursday, March 5

  1. page 2C-1 Hyperbolas, Cubics, and Exponentials edited Understand the equation of a hyperbola 1. Sketch the asymptotes and plot enough points to creat…

    Understand the equation of a hyperbola
    1. Sketch the asymptotes and plot enough points to create and accurate sketch of
    y=\frac{1}{x}
    2. Find the domain and range of the function:
    y=4(\frac{1}{x+5})+7

    (view changes)
    12:08 am
  2. page 2A Hyperbolas, Cubics, and Exponentials edited Understand the equation of a hyperbola 1. Sketch the asymptotes and plot enough points to creat…

    Understand the equation of a hyperbola
    1. Sketch the asymptotes and plot enough points to create and accurate sketch of
    y=\frac{1}{x}
    2. Find the domain and range of the function:
    y=4(\frac{1}{x+5})+7

    (view changes)
    12:08 am
  3. page 2C Hyperbolas, Cubics, and Exponentials edited Hyperbolas, Cubic functions,Exponential functions, and their parent graphs. hyperbolas hyper…

    Hyperbolas, Cubic functions,Exponential functions, and their parent graphs.
    hyperbolashyperbola
    Hyperbolas
    Graphing Equation
    (view changes)
    12:05 am
  4. page 2C Hyperbolas, Cubics, and Exponentials edited ... Examples #2 and #3 {HW_2-28.png} [[cubic|cubic]] cubic Cubic Functions {http://i32.tin…
    ...
    Examples #2 and #3
    {HW_2-28.png}
    [[cubic|cubic]]cubic
    Cubic Functions
    {http://i32.tinypic.com/15cg8pt.png}
    ...
    'h' determines the x-coordinate of the inflection point.
    'k' determines the y-coordinate of the inflection point.
    [[exponential|exponential]]exponential
    Exponential Functions
    f(x)=a(k^x-h)
    (view changes)
    12:03 am
  5. page 2C Hyperbolas, Cubics, and Exponentials edited Hyperbolas, Cubic functions,Exponential functions, and their parent graphs. [[hyperbolas|hyperb…

    Hyperbolas, Cubic functions,Exponential functions, and their parent graphs.
    [[hyperbolas|hyperbolas]]hyperbolas
    Hyperbolas
    Graphing Equation
    (view changes)
    12:03 am
  6. page 2C Hyperbolas, Cubics, and Exponentials edited Hyperbolas, Cubic functions,Exponential functions, and their parent graphs. hyperbolas [[hyper…

    Hyperbolas, Cubic functions,Exponential functions, and their parent graphs.
    hyperbolas[[hyperbolas|hyperbolas]]
    Hyperbolas
    Graphing Equation
    ...
    Examples #2 and #3
    {HW_2-28.png}
    cubic[[cubic|cubic]]
    Cubic Functions
    {http://i32.tinypic.com/15cg8pt.png}
    ...
    'h' determines the x-coordinate of the inflection point.
    'k' determines the y-coordinate of the inflection point.
    exponential[[exponential|exponential]]
    Exponential Functions
    f(x)=a(k^x-h)
    (view changes)
    12:02 am
  7. page 2C Hyperbolas, Cubics, and Exponentials edited Hyperbolas, Cubic functions, Exponential functions,Exponential functions, and hyperbolas Hyp…

    Hyperbolas, Cubic functions, Exponentialfunctions,Exponential functions, and
    hyperbolas
    Hyperbolas
    (view changes)
    12:01 am
  8. page 2C Hyperbolas, Cubics, and Exponentials edited Hyperbolas, Cubic functions, Exponential functions, and their parent graphs. hyperbolas Hyperb…

    Hyperbolas, Cubic functions, Exponential functions, and their parent graphs.
    hyperbolas
    Hyperbolas
    Graphing Equation
    y=a(\frac{1}{x-h})+k
    -'h' is the x asymptote
    -'k' is the y asymptote
    -'a' is how close/far away the graph is from the point at which the asymptotes intersect
    Example #1
    {the_wiki.png}
    Graphing Form:
    y=4(\frac{1}{x+4})+0
    'a' is equal to 4
    'h' is equal to -4
    'k' is equal to 0
    Key point =(-4,0) This is where the asymptotes intersect each other.
    The 'a' moved the the graph further from the key point.
    The 'h' moved the graph 4 points more to the left.
    The 'k' didn't move the graph.
    Domain = (-oo, -4) and (-4, oo)
    Range = (-oo, 0) and (0, oo)
    Asymptotes
    x=-4 and y=0
    To determine the asymptotes you look a the graphing form of the equation. The asymptotes are the h and k in the equation
    Examples #2 and #3
    {HW_2-28.png}
    cubic
    Cubic Functions
    {http://i32.tinypic.com/15cg8pt.png}
    Inflection Point - Where the graph changes from up to down. It's basically the vertex point, but because of the type of equation it is and how the graph looks, it's called an inflection point.
    y = a(x-h)^3+k
    'a' determines how far away from the inflection point the graph goes.
    'h' determines the x-coordinate of the inflection point.
    'k' determines the y-coordinate of the inflection point.
    exponential
    Exponential Functions
    f(x)=a(k^x-h)
    'k' is the initial value
    'a' is the steepness/flatness of the graph
    '-h' is the asymptote
    This is an example of the parent graph for exponential functions.
    {Exponential_Functions.png}

    (view changes)
    12:00 am

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