Solving Logarithmic Equations: Step-by-Step Guide

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SUMMARY

This discussion clarifies the evaluation of the logarithmic equation log2(x(x-4))=5. The key step involves understanding that log2(x) signifies applying the logarithm base 2 to x, not multiplying log2 by x. By applying the inverse function 2x to both sides, the equation simplifies to x(x-4)=25, leading to the quadratic equation x2-4x-32=0. The solutions to this equation are x=8 and x=-4.

PREREQUISITES
  • Understanding of logarithmic functions, specifically log2(x)
  • Familiarity with inverse functions, particularly the exponential function 2x
  • Basic algebra skills for solving quadratic equations
  • Knowledge of factoring techniques for polynomials
NEXT STEPS
  • Study the properties of logarithms, focusing on change of base and inverse functions
  • Practice solving logarithmic equations using different bases
  • Learn how to apply the quadratic formula to solve polynomial equations
  • Explore real-world applications of logarithmic functions in various fields
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Students learning algebra, educators teaching logarithmic functions, and anyone seeking to improve their problem-solving skills in mathematics.

majormuss
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Homework Statement


My book has these steps for evaluating a logarithmic equation and I don't quite understand what is going on. It says...
log (2) x(x-4)=5
x(x-4)=2^5 <---------> this is the level I am getting problems... how does log(2) divide the 5 on the other side and end up getting 2^5 ??
By the way this is how the equation continues( which I understand)
X^2-4x -32
(x-8)(x+4)= 0
x=8 x=-4

Homework Equations





The Attempt at a Solution

 
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If log_2(a)=b then a=2^b. It's sort of the definition of log.
 
majormuss said:

Homework Statement


My book has these steps for evaluating a logarithmic equation and I don't quite understand what is going on. It says...
log (2) x(x-4)=5
x(x-4)=2^5 <---------> this is the level I am getting problems... how does log(2) divide the 5 on the other side and end up getting 2^5 ?
It doesn't! "log_2 x does NOT mean "log_2 multiplied by x" and so you are not "dividing by log_2"

log_2 x means "apply the function "logarithm base 2" to x. You remove that function by applying the inverse function to both sides. And the inverse function to f(x)= log_2 x if f^{-1}(x)= 2^x. Specifically, f(f^{-1}(x))= x and f^{-1}(f(x))= 2^{log_2 x}= x.

Applying the inverse function of log_2(x), 2^x, to both sides:
2^{log_2(x(x-4))}= 2^5
x(x-4)= 2^5.

What did you learn as the definition of "log_2(x)"?

By the way this is how the equation continues( which I understand)
X^2-4x -32
(x-8)(x+4)= 0
x=8 x=-4

Homework Equations





The Attempt at a Solution

 

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