1 / 12

What is a Function?

What is a Function? . FUNCTIONS REPRESENTED BY DATA. EXAMPLE 1 The average monthly precipitation in Bogota, Colombia, from 1973 to 2003, is given in the table below ( Intellicast.com ) where the months, January to December, are numbered from 1 to 12.

jolie
Télécharger la présentation

What is a Function?

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. What is a Function?

  2. FUNCTIONS REPRESENTED BY DATA EXAMPLE 1 The average monthly precipitation in Bogota, Colombia, from 1973 to 2003, is given in the table below (Intellicast.com) where the months, January to December, are numbered from 1 to 12

  3. Average Precipitation in Bogota 1973- 2003 The average precipitation is a function of the month The domain is discrete {1, 2, 3, …., 12} Units of domain and units of range P(5) represents the height of the function when m=5 Meaning of P(5)=3.7 in words

  4. Exercise 1 • Enter the data in the graphing calculator and display a graph similar to the one shown above (activity for lab) . b. From the table calculate P(6) . What is its meaning? c. Find the height of the function when m=10. • Find the values of m (from the table and from the graph) that satisfy P(m)=2.2 • Construct a new table with the precipitation as the inputs and months as the outputs. Introduce notation P-1(2) • Is the precipitation a function of the months? Explain.

  5. REMARK. The Average Precipitation in Bogota an example of a function with discrete domain. The domain does not contain interval(s) of real numbers. A line graph can be displayed to help with graphs that have discrete domain

  6. Example 2 The table below shows the average height, h(t) in meters, of a population of trees up to 40 years old, where t represents the number ofyears after they were planted. In this case h(t) is a function of time t.Why? Although only some inputs are given in the table, the input could be any value on the interval [0,40]. The data are depicted below as a scattered plot, as a line graph (a line segment joins consecutive data points), and as a smooth graph (no corners).

  7. For each graph determine • Domain • Range • Highest value of h(t) • Smallest value of h(t) Where is this function increasing? Decreasing? Concave up? Concave down?

  8. Intervals

  9. EXERCISE 7 Use the graphs of the functions f(x), g(x) to answer the questions below. Take as domain only the values displayed on each window. Where is f(x)increasing? Where is f(x)concave up? c Where is f(x) increasing and concave down? e. Where is g(x)increasing and concave down? g. Find the solution to: i) f(x)>0 ii) g(x)<0 iii) g(x)=-1

  10. EXERCISE 10 Sketch a graph for each of the following situations including the corresponding units. Indicate whether the domain in consideration is an interval or discrete. Make sure concavities, if any, are included. Include proper labeling to identify the main features of the graph. Determine in each case if the function has a largest/smallest value

  11. A population of birds start at a large value, decreases to a small value, and then increases to an intermediate value. • An egg is placed in a refrigerator. Sketch the temperature of the egg over time (minutes) f) The bottom of a 10-foot long ladder leaning against a wall is sliding away from the wall. Display the distance between the wall and the bottom of the ladder with respect to time.

More Related