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Definition of Function or How to Relate Definition of a Relation.

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Presentation on theme: "Definition of Function or How to Relate Definition of a Relation."— Presentation transcript:

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2 Definition of Function or How to Relate

3 Definition of a Relation

4 Relation (1)32 mpg (2)8 mpg (3)16 mpg (A) (C) (B)

5 Domain and Range The values that make up the set of independent values are the domain The values that make up the set of dependent values are the range. State the domain and range from the 4 examples of relations given.

6 DomainRange Correspondence or Relation

7 Definition of a Relation A Relation maps a value from the domain to the range. A Relation is a set of ordered pairs. The most common types of relations in algebra map subsets of real numbers to other subsets of real numbers.

8 Example DomainRange 3π 11- 2 1.6182.718

9 Definition of a Function If a relation has the additional characteristic that each element of the domain is mapped to one and only one element of the range then we call the relation a Function.

10 Definition of a Function If we think of the domain as the set of boys and the range the set of girls, then a function is a monogamous relationship from the domain to the range. Each boy gets to go out with one and only one girl. But… It does not say anything about the girls. They get to live in Utah.

11 Decide if the Relation is a Function. The relation is the year and the cost of a first class stamp. The relation is the weight of an animal and the beats per minute of it’s heart. The relation is the time of the day and the intensity of the sun light. The relation is a number and it’s square. The relation is time since you left your house for work and your distance from home.

12 Examples Please Give three examples from the real world of relations. Be sure and state the domain, the range, and the definition of how the variables are related. Decide which if any of your examples are functions.

13 x DOMAIN y1y2y1y2 RANGE R NOT A FUNCTION

14 y RANGE f FUNCTION x1x1 DOMAIN x2x2

15 Mathematical Examples Decide if the following relations are functions. X Y 1 2 -5 7 -1 2 3 X Y 1 -5 1 -1 1 3 1 X Y 1 2 1 7 1 2 1 3 X Y 1 π π 1 -1 5 π 3

16 Ways to Represent a Function SymbolicSymbolic X Y 1 2 5 10 -1 -2 3 6 GraphicalGraphical NumericNumeric VerbalVerbal The cost is twice the original amount.

17 Function Notation The Symbolic Form A truly excellent notation. It is concise and useful.

18 Output Value Member of the Range Dependent Variable These are all equivalent names for the y. Input Value Member of the Domain Independent Variable These are all equivalent names for the x. Name of the function

19 Examples of Function Notation The f notation Find f(2), g(-1), f(-0.983),

20 Your Turn! Given: Evaluate the following:

21 Graphical Representation Graphical representation of functions have the advantage of conveying lots of information in a compact form. There are many types and styles of graphs but in algebra we concentrate on graphs in the rectangular (Cartesian) coordinate system.

22 Graphs and Functions Domain Range

23 Determine the Domain and Range for Each Function From Their Graph

24 Vertical Line Test for Functions If a vertical line intersects a graph once and only once for each element of the domain, then the graph is a function.

25 How to determine Domain and Range of a function. Graph the following on your calculator. Also give the algebra.

26 Big Deal! A point is in the set of ordered pairs that make up the function if and only if the point is on the graph of the function.A point is in the set of ordered pairs that make up the function if and only if the point is on the graph of the function.

27 Key Points Definition of a function Ways to represent a function Symbolically Graphically Numerically Verbally


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