Presentation is loading. Please wait.

Presentation is loading. Please wait.

Logarithmic Functions. How Tall Are You? Objective I can identify logarithmic functions from an equation or graph. I can graph logarithmic functions.

Published byOwen Mosley Modified over 8 years ago

Similar presentations

Presentation on theme: "Logarithmic Functions. How Tall Are You? Objective I can identify logarithmic functions from an equation or graph. I can graph logarithmic functions."— Presentation transcript:

1 Logarithmic Functions

2 How Tall Are You?

3 Objective I can identify logarithmic functions from an equation or graph. I can graph logarithmic functions using a graphing utility and identify asymptotes, intercepts, domain and range.

4 Warmup Find the inverse of f(x) = x 2 Find the inverse of f(x) = 2 x

5 Logarithmic Function An logarithmic function is a function of the form f(x) = log b (x), where b is > 0, is a positive constant (called the base) and not equal to 1, and x >0. y = log b (x) is equivalent to b y =x y = log b (x) Logarithmic form b y =xExponential form Logarithmic functions are either strictly increasing or strictly decreasing. Logarithmic functions have asymptotes.

6 How Tall Are You? Percent of adult height obtained by a male x years old can be modeled by f(x) = 29 + 48.8log 10 (x+1) What percent of adult height is an eight year old male? What percent of adult height is a 17 year old male?

7 Logarithmic Function The inverse function of the exponential function with base b is called the logarithmic function with base b y x

8 Logarithmic Function Example: Draw and label f(x) = 4 x and g(x) = log 4 (x) Identify domain, range and asymptotes y x

9 Logarithmic Function Example: Draw and label f(x) = (1/2) x and g(x) = log (1/2) (x) Identify domain, range and asymptotes y x

10 Characteristics of Logarithmic Functions For logarithmic functions of the form f(x) = log b (x) Domain: {x | x > 0} all real numbers (0, ∞) Range: {y | -∞ ≤ y ≤ ∞} all real numbers (-∞, ∞) Graph of f(x) = log b (x) passes thru (1,0) [ f(1) = log b (1) = 0] No Y-intercept X-intercept is (1,0) If b > 1, f(x) = log b (x) goes up to right, increasing function. If 0 < b < 1, f(x) = log b (x) goes down to right, decreasing function. f(x) = log b (x) is one to one and has an inverse function f(x) = log b (x) is the inverse function of f(x) = b x – If f(x) = b x, then f -1 (x) = log b (x) Graph of f(x) = log b (x) approaches but does not touch y axis. Vertical asymptote : x=0 (y axis)

11 Transformations of Logarithmic Functions TransformationEquationDescription Vertical Translation Horizontal Translation Reflection Vertical Shrinking or Stretching Horizontal Shrinking or Stretching

12 Transformation Examples y x y x

Download ppt "Logarithmic Functions. How Tall Are You? Objective I can identify logarithmic functions from an equation or graph. I can graph logarithmic functions."

Similar presentations

Exponential Functions Brought to you by Tutorial Services The Math Center.

Exponential Functions Brought to you by Tutorial Services The Math Center.
Function Families Lesson 1-5.

Function Families Lesson 1-5.
Graphs of Exponential and Logarithmic Functions

Graphs of Exponential and Logarithmic Functions
Create a table and Graph:. Reflect: Continued x-intercept: y-intercept: Asymptotes: xy -31/3 -21/2 1 -1/22 xy 1/2-2 1 2-1/2 3-1/3.

Create a table and Graph:. Reflect: Continued x-intercept: y-intercept: Asymptotes: xy -31/3 -21/2 1 -1/22 xy 1/ /2 3-1/3.
Logarithmic Functions. Definition of a Logarithmic Function For x > 0 and b > 0, b = 1, y = log b x is equivalent to b y = x. The function f (x) = log.

Logarithmic Functions. Definition of a Logarithmic Function For x > 0 and b > 0, b = 1, y = log b x is equivalent to b y = x. The function f (x) = log.
4.3 Logarithmic Functions and Graphs Do Now Find the inverse of f(x) = 4x^2 - 1.

4.3 Logarithmic Functions and Graphs Do Now Find the inverse of f(x) = 4x^2 - 1.
Logarithmic Functions Section 2. Objectives Change Exponential Expressions to Logarithmic Expressions and Logarithmic Expressions to Exponential Expressions.

Logarithmic Functions Section 2. Objectives Change Exponential Expressions to Logarithmic Expressions and Logarithmic Expressions to Exponential Expressions.
Exponential Functions Section 1. Exponential Function f(x) = a x, a > 0, a ≠ 1 The base is a constant and the exponent is a variable, unlike a power function.

Exponential Functions Section 1. Exponential Function f(x) = a x, a > 0, a ≠ 1 The base is a constant and the exponent is a variable, unlike a power function.
3.6 Warm Up Find the initial point, state the domain & range, and compare to the parent function f(x) = √x. y = 3√x – 1 y = -1/2√x y = - √(x-1) + 2.

3.6 Warm Up Find the initial point, state the domain & range, and compare to the parent function f(x) = √x. y = 3√x – 1 y = -1/2√x y = - √(x-1) + 2.
4.2 Logarithmic Functions

4.2 Logarithmic Functions
Definition of a Logarithmic Function For x > 0 and b > 0, b≠ 1, y = log b x is equivalent to b y = x The function f (x) = log b x is the logarithmic function.

Definition of a Logarithmic Function For x > 0 and b > 0, b≠ 1, y = log b x is equivalent to b y = x The function f (x) = log b x is the logarithmic function.
Sullivan PreCalculus Section 4.4 Logarithmic Functions Objectives of this Section Change Exponential Expressions to Logarithmic Expressions and Visa Versa.

Sullivan PreCalculus Section 4.4 Logarithmic Functions Objectives of this Section Change Exponential Expressions to Logarithmic Expressions and Visa Versa.
Logarithms.

Logarithms.
exponential functions

exponential functions
Objectives: Evaluate Exponential Functions Graph Exponential Functions Define the Number e.

Objectives: Evaluate Exponential Functions Graph Exponential Functions Define the Number e.
The exponential function f with base a is defined by f(x) = ax

The exponential function f with base a is defined by f(x) = ax
Exponential Functions Section 1. Exponential Function f(x) = a x, a > 0, a ≠ 1 The base is a constant and the exponent is a variable, unlike a power function.

Exponential Functions Section 1. Exponential Function f(x) = a x, a > 0, a ≠ 1 The base is a constant and the exponent is a variable, unlike a power function.
Warm-up Solve: log3(x+3) + log32 = 2 log32(x+3) = 2 log3 2x + 6 = 2

Warm-up Solve: log3(x+3) + log32 = 2 log32(x+3) = 2 log3 2x + 6 = 2
Section 6.3 – Exponential Functions Laws of Exponents If s, t, a, and b are real numbers where a > 0 and b > 0, then: Definition: “a” is a positive real.

Section 6.3 – Exponential Functions Laws of Exponents If s, t, a, and b are real numbers where a > 0 and b > 0, then: Definition: “a” is a positive real.
Mrs. McConaughyHonors Algebra 21 Graphing Logarithmic Functions During this lesson, you will:  Write an equation for the inverse of an exponential or.

Mrs. McConaughyHonors Algebra 21 Graphing Logarithmic Functions During this lesson, you will:  Write an equation for the inverse of an exponential or.

Similar presentations

Ads by Google