Difference between revisions of "Logarithmic Functions"

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===Change of Base===
 
===Change of Base===
 
When x and b are positive real numbers and are not equal to 1. Then you can write <math>\log_a x\,</math> as <math>\frac { \log_b x}{ \log_b a}</math>. This works for the natural log as well. here is an example:
 
When x and b are positive real numbers and are not equal to 1. Then you can write <math>\log_a x\,</math> as <math>\frac { \log_b x}{ \log_b a}</math>. This works for the natural log as well. here is an example:
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 +
===Solving a Logarithmic Equation===
 +
A '''logarithmic equation''' is an equation wherein one or more of the terms is a logarithm.
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 +
e.g. Solve <math>\lg x + \lg (x+2) = 2</math> <ref group="note"><math>\lg</math> is another way of writing <math>\log_{10}</math></ref>
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 +
<math>\begin{align}
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\lg x + \lg (x+2) &= 2 \\
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\lg (x(x+2)) &= 2 \\
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x(x+2) &= 100 \\
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x^2 + 2x &= 100 \\
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(x + 1)^2 &= 101 \\
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x+1 &= \sqrt{101} \\
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x &= -1 \pm \sqrt{101}
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\end{align}</math>
  
 
<math>\log_2 8 = \frac { \log 8}{ \log 2} = \frac {.9}{.3} = 3\,</math> now check <math>2^3 = 8\,</math>
 
<math>\log_2 8 = \frac { \log 8}{ \log 2} = \frac {.9}{.3} = 3\,</math> now check <math>2^3 = 8\,</math>

Revision as of 11:31, 4 October 2021

Logarithmic Functions

Logexponential.svg

In mathematics you can find the inverse of an exponential function by switching x and y around: becomes . The problem arises on how to find the value of y. The logarithmic function solved this problem. All conversions of logarithmic function into an exponential function follow the same pattern: becomes . If a log is given without a written b then b=10. Also with logarithmic functions, b > 0 and . There are 2 cases where the log is equal to x: and .

Laws of Logarithmic Functions

When X and Y are positive.

Change of Base

When x and b are positive real numbers and are not equal to 1. Then you can write as . This works for the natural log as well. here is an example:

Solving a Logarithmic Equation

A logarithmic equation is an equation wherein one or more of the terms is a logarithm.

e.g. Solve [note 1]

now check

Resources


Cite error: <ref> tags exist for a group named "note", but no corresponding <references group="note"/> tag was found, or a closing </ref> is missing