Unit 1

Unit 1 Characteristics and Applications of Functions

Parent Function Checklist Unit 1: Characteristics and Applications of Functions

Parent Function Checklist

Function Vocabulary Unit 1: Characteristics and Applications of Functions

Increasing • Picture/Example • Common Language: Goes up from left to right. • Technical Language: f(x) is increasing on an interval when, for any a and b in the interval, if a > b, then f(a) > f(b).

Decreasing • Picture/Example • Common Language: Goes down from left to right. • Technical Language: f(x) is decreasing on an interval when, for any a and b in the interval, if a > b, then f(a) < f(b).

Maximum • Picture/Example • Common Language: Relative “high point” • Technical Language: A function f(x) reaches a maximum value at x = a if f(x) is increasing when x < a and decreasing when x > a. The maximum value of the function is f(a).

Minimum • Picture/Example • Common Language: Relative “low point” • Technical Language: A function f(x) reaches a minimum value at x = a if f(x) is decreasing when x < a and increasing when x > a. The minimum value of the function is f(a).

Asymptote • Picture/Example • Common Language: A boundary line • Technical Language: A line that a function approaches for extreme values of either x or y.

Odd Function • Picture/Example • Common Language: A function that is symmetric with respect to the origin. • Technical Language: A function is odd iff f(-x) = -f(x).

Even Function • Picture/Example • Common Language: A function that has symmetry with respect to the y-axis • Technical Language: A function is even iff f(-x)=f(x)

End Behavior • Picture/Example • Common Language: Whether the graph (f(x)) goes up, goes down, or flattens out on the extreme left and right. • Technical Language: As x-values approach ∞ or -∞, the function values can approach a number (f(x)n) or can increase or decrease without bound (f(x)±∞).

Heart Medicine Unit 1: Characteristics and Applications of Functions

In the function editor of your calculator enter:

Table

Graph

1) Use a graphing calculator to find the maximum rate at which the patient’s heart was beating. After how many minutes did this occur? • 79.267 beats per minute • 1.87 minutes after the medicine was given

2) Describe how the patient’s heart rate behaved after reaching this maximum. • The heart rate starts decreasing, but levels off. • The heart rate never drops below a certain level (asymptote).

3) According to this model, what would be the patient’s heart rate 3 hours after the medicine was given? After 4 hours? • 3 hours = 180 minutes  h(180) ≈ 60.4 bpm • 4 hours = 240 minutes  h(240) ≈ 60.3 bpm

4) This function has a horizontal asymptote. Where does it occur? How can it’s presence be confirmed using a graphing calculator? • Asymptote: h(x)=60 • Scroll down the table and look at large values of x or trace the graph and look at large values of x. • The end behavior of the function is: As x  ∞, f(x)  60 and as x  -∞, f(x)  60

End Behavior Unit 1: Characteristics and Applications of Functions

End Behavior

Piecewise-Defined Functions Unit 1: Characteristics and Applications of Functions

Evaluate the function at the given values by first determining which formula to use.

Define a piecewise function based on the description provided.

Graph the given piecewise functions on the grids provided.

Continuity Unit 1: Characteristics and Applications of Functions

Continuity-Uninterrupted in time or space.

1) Complete the table and answer the questions that follow.

2) Graph each function using a “decimal” window (zoom 4) to observe the different ways in which functions can lack continuity.

3) Graph each function to determine where each discontinuity occurs. Classify each type.

Unit 1

Unit 1

Presentation Transcript

UNIT 1

UNIT-1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1-1

1 Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1

Unit 1