Properties of Logarithms

Slides:



Advertisements
Similar presentations
15.4, 5 Solving Logarithmic Equations OBJ:  To solve a logarithmic equation.
Advertisements

Essential Question: What are some of the similarities and differences between natural and common logarithms.
Copyright © 2009 Pearson Education, Inc. CHAPTER 5: Exponential and Logarithmic Functions 5.1 Inverse Functions 5.2 Exponential Functions and Graphs 5.3.
Table of Contents Solving Logarithmic Equations A logarithmic equation is an equation with an expression that contains the log of a variable expression.
7.5 E XPONENTIAL AND L OGARITHMIC E QUATIONS. E XPONENTIAL E QUATIONS An exponential equation is an equation containing one or more expressions that have.
Properties of Logarithms
Properties of Logarithms. The Product Rule Let b, M, and N be positive real numbers with b  1. log b (MN) = log b M + log b N The logarithm of a product.
5.4 Exponential and Logarithmic Equations Essential Questions: How do we solve exponential and logarithmic equations?
Exponential and Logarithmic Equations
7.6 – Solve Exponential and Log Equations
Objectives Solve exponential and logarithmic equations and equalities.
Logarithmic and Exponential Equations
LOGS EQUAL THE The inverse of an exponential function is a logarithmic function. Logarithmic Function x = log a y read: “x equals log base a of y”
Logarithmic Functions
Section 4.1 Logarithms and their Properties. Suppose you have $100 in an account paying 5% compounded annually. –Create an equation for the balance B.
EQ: How do you use the properties of exponents and logarithms to solve equations?
Properties of Logarithms Section 6.5 Beginning on page 327.
Algebra II w/trig. A logarithm is another way to write an exponential. A log is the inverse of an exponential. Definition of Log function: The logarithmic.
4.4 Solving Exponential and Logarithmic Equations.
Warm up. 3.4 Solving Exponential & Logarithmic Equations Standards 13, 14.
6.3A – Logarithms and Logarithmic Functions Objective: TSW evaluate logarithmic expressions.
Academy Algebra II/Trig 6.6: Solve Exponential and Logarithmic Equations Unit 8 Test ( ): Friday 3/22.
Solving Exponential and Logarithmic Equations Section 8.6.
Solving Exponential and Logarithmic Equations Section 6.6 beginning on page 334.
1. Expand the following: 2. Condense the following: Warm-upWarm-up.
Unit 5: Modeling with Exponential & Logarithmic Functions Ms. C. Taylor.
1 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 9-1 Exponential and Logarithmic Functions Chapter 9.
8.5 – Using Properties of Logarithms. Product Property:
Properties of Logarithms Product, Quotient and Power Properties of Logarithms Solving Logarithmic Equations Using Properties of Logarithms Practice.
Section 11-4 Logarithmic Functions. Vocabulary Logarithm – y is called this in the function Logarithmic Function – The inverse of the exponential function.
8.3-4 – Logarithmic Functions. Logarithm Functions.
Copyright © 2009 Pearson Education, Inc. CHAPTER 5: Exponential and Logarithmic Functions 5.1 Inverse Functions 5.2 Exponential Functions and Graphs 5.3.
Algebra II w/trig. Logarithmic expressions can be rewritten using the properties of logarithms. Product Property: the log of a product is the sum of the.
Logarithms 1 Converting from Logarithmic Form to Exponential Form and Back 2 Solving Logarithmic Equations & Inequalities 3 Practice Problems.
You’ve gotten good at solving exponential equations with logs… … but how would you handle something like this?
Chapter 5: Exponential and Logarithmic Functions 5.5: Properties and Laws of Logarithms Essential Question: What are the three properties that simplify.
Solving Exponential Equations. We can solve exponential equations using logarithms. By converting to a logarithm, we can move the variable from the exponent.
Properties of Logarithms Change of Base Formula:.
Solving Logarithmic Equations
Exponential and Logarithmic Equations
Section 5.5 Solving Exponential and Logarithmic Equations Copyright ©2013, 2009, 2006, 2001 Pearson Education, Inc.
4.7 (Green) Solve Exponential and Logarithmic Equations No School: Monday Logarithms Test: 1/21/10 (Thursday)
Property of Logarithms If x > 0, y > 0, a > 0, and a ≠ 1, then x = y if and only if log a x = log a y.
Properties of Logarithms and Common Logarithms Sec 10.3 & 10.4 pg
Exponents – Logarithms xy -31/8 -2¼ ½ xy 1/8-3 ¼-2 ½ The function on the right is the inverse of the function on the left.
Algebra 2 Notes May 4,  Graph the following equation:  What equation is that log function an inverse of? ◦ Step 1: Use a table to graph the exponential.
Logarithmic Properties Exponential Function y = b x Logarithmic Function x = b y y = log b x Exponential Form Logarithmic Form.
6.5 Solving Exponential Equations SOLVE EXPONENTIAL EQUATIONS WITH THE SAME BASE. SOLVE EXPONENTIAL EQUATIONS WITH UNLIKE BASES.
Goals:  Understand logarithms as the inverse of exponents  Convert between exponential and logarithmic forms  Evaluate logarithmic functions.
Review of Logarithms. Review of Inverse Functions Find the inverse function of f(x) = 3x – 4. Find the inverse function of f(x) = (x – 3) Steps.
Logarithmic Functions
Properties of Logarithm
CHAPTER 5: Exponential and Logarithmic Functions
Ch. 8.5 Exponential and Logarithmic Equations
Logarithmic Functions and Their Graphs
Logarithmic Functions
6.5 Applications of Common Logarithms
Section 6.4 Properties of Logarithmic Functions Objectives:
Unit 8 [7-3 in text] Logarithmic Functions
5.4 Logarithmic Functions and Models
Solving Exponential and Logarithmic Equations
7.5 Exponential and Logarithmic Equations
5.5 Properties and Laws of Logarithms
Logarithmic and Exponential Equations
Logarithmic and Exponential Equations
Keeper #39 Solving Logarithmic Equations and Inequalities
3.4 Exponential and Logarithmic Equations
Properties of Logarithmic Functions
4 minutes Warm-Up Write each expression as a single logarithm. Then simplify, if possible. 1) log6 6 + log6 30 – log6 5 2) log6 5x + 3(log6 x – log6.
Logarithmic Functions
Presentation transcript:

Properties of Logarithms Check for Understanding – 3103.3.16 – Prove basic properties of logarithms using properties of exponents and apply those properties to solve problems. Check for Understanding – 3103.3.17 – Know that the logarithm and exponential functions are inverses and use this information to solve real-world problems.

Since logarithms are exponents, the properties of logarithms are similar to the properties of exponents.

n Product Property logb mn = logb m + logb n Quotient Property logb m = logb m – logb n n Power Property logb mp = p logb m m > 0, n > 0, b > 0, b ≠ 1

Use log2 3 ≈ 1.5850, log2 5 ≈ 2.3219, and log2 7 ≈ 2.8074 to approximate the value of each expression. log2 35 log2 7 ∙ 5 log2 7 + log2 5 2.8074 + 2.3219 5.1293

2. log2 45 log2 32 ∙ 5 log2 32 + log2 5 2log2 3 + log2 5 Use log2 3 ≈ 1.5850, log2 5 ≈ 2.3219, and log2 7 ≈ 2.8074 to approximate the value of each expression. 2. log2 45 log2 32 ∙ 5 log2 32 + log2 5 2log2 3 + log2 5 2(1.5850) + 2.3219 5.4919

3. log2 4.2 log2 (3 ∙ 7) ÷ 5 log2 3 + log2 7 – log2 5 Use log2 3 ≈ 1.5850, log2 5 ≈ 2.3219, and log2 7 ≈ 2.8074 to approximate the value of each expression. 3. log2 4.2 log2 (3 ∙ 7) ÷ 5 log2 3 + log2 7 – log2 5 1.5850 + 2.8074 – 2.3219 2.0705

4. log5 2x – log5 3 = log5 8 log5 = log5 8 = 8 2x = 24 x = 12 Solve each equation. Check your solutions. 4. log5 2x – log5 3 = log5 8 log5 = log5 8 = 8 2x = 24 x = 12

5. log2 (x + 1) + log2 5 = log2 80 – log2 4 log2 5(x + 1)= log2 20 Solve each equation. Check your solutions. 5. log2 (x + 1) + log2 5 = log2 80 – log2 4 log2 5(x + 1)= log2 20 5x + 5 = 20 5x = 15 x = 3

3log2 x – 2log2 5x = 2 100x2 = x3 log2 x3 – log2 (5x)2 = 2 Solve each equation. Check your solutions. 3log2 x – 2log2 5x = 2 log2 x3 – log2 (5x)2 = 2 100x2 = x3 0 = x3 – 100x2 0 = x2(x – 100) 0 = x2 0 = x – 100 log2 = 2 22 = x = 0 x = 100 4 =

½ log6 25 + log6 x = log6 20 8. log7 x + 2log7 x – log7 3 = log7 72 Solve each equation. Check your solutions. ½ log6 25 + log6 x = log6 20 8. log7 x + 2log7 x – log7 3 = log7 72

½ log6 25 + log6 x = log6 20 4 log7 x + 2log7 x – log7 3 = log7 72 6 Solve each equation. Check your solutions. ½ log6 25 + log6 x = log6 20 4 log7 x + 2log7 x – log7 3 = log7 72 6