Economics 214 Lecture 6 Properties of Functions. Increasing & Decreasing Functions.

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Presentation transcript:

Economics 214 Lecture 6 Properties of Functions

Increasing & Decreasing Functions

Figure 2.6 Increasing Functions and Decreasing Functions

Example functions

Monotonic Functions Monotonic if it increasing or if it is decreasing. Strictly monotonic if it is strictly increasing or if it is strictly decreasing. Non-monotonic if it is strictly increasing over some interval and strictly decreasing over another interval. Strictly monotonic functions are one-to-one functions.

One-to-One Function A function f(x) is one-to-one if for any two values of the argument x 1 and x 2, f(x 1 )= f(x 2 ) implies x 1 =x 2. An one-to-one function ha an inverse function. The inverse of the function y=f(x) is written y=f -1 (x).

Inverse Function

Example

Graph of example

Graph of inverse function

Special Property

Composite Function

Graphing Inverse function To graph the inverse function y=f -1 (x) given the function y=f(x), we make use of the fact that for any given ordered pair (a,b) associated with a one-to-one function there is an ordered pair (b,a) associated with the inverse function. To graph y=f -1 (x), we make use of the 45  line, which is the graph of the function y=x and passes through all points of the form (a,a). The graph of the function y=f -1 (x), is the reflection of the graph of f(x) across the line y=x.

Graph of function and inverse function

Common Example Inverse function Traditional demand function is written q=f(p), i.e. quantity is function of price. Traditionally we graph the inverse function, p=f -1 (q). Our Traditional Demand Curve shows maximum price people with pay to receive a given quantity.

Demand Function

Plot of our Demand function