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Logarithms

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    Logarithms

    1. The Definition of the Logarithm

       

                Definition 
      The function logbx is defined as the inverse function of y = bx  

      Recall that by definition, if f and g are inverse functions then 

              f(g(x)) = g(f(x)) = x

      Hence we have the following two properties:

       

      Log Properties 
      (From the inverse definition)

      1. logbbx  =  x

      2. blogb(x) = x 


      Example:  

      Solve 

              2x = 128

      Solution  

      Take the log base 2 of both sides:

              log22x = log2128 

      hence

              x = log2128 

      Note that Property 1 allows us to cancel the log and the exponent

       

      Example:  

              log39 = 2 

      since 

              32 = 9

       

      Exercises:  

      Find

      1. log101000

      2. log464

      3. log51/5

      4. log3(  \(\sqrt{3}\))

      Simplify

      1. 10log10(1/x) 

      2. log3 27x-1

      3. log4(24x-2)  

          

    2. Logs and Calculators

      Goal:  

      Find 

              log317

      Note:  The calculator has ln and log



       

             Definition

      1. log x = log10 x 

      2. ln x = loge x

       

      Change of Base Formula

      logba = lna/lnb = loga/logb

      Hence   

              log317 = ln17/ln3 = 2.5789...
       

      Exercise:  

      Find 

              log529 

      and 

              log618

       

    3.  Logs and Graphs


      Below is the graph of 

              y = log2 x 

      It can be found by reflecting 

               y  =  2x  

      across the line 

              y  =  x
       

      Graph of log base 2 of x. It has a right vertical asymptote going down at the y-axis, intercepts the x-axis at x=1 and then goes up, but less steep as it heads right.



      Note:  The domain of the inverse is the range of the function and the range of the inverse is the domain of the function.  Hence, 

      the domain of log x is (0 , \(\infty \) ) 

      and 

      the range of log x is R    
       

       

      Exercise

      Use shifting rules to graph

              y  =  log2(x - 3) + 1 

      and 

              y  =  -log2x  

       

    4. Application

      The pH of a liquid describes how acidic or basic the liquid is.  Chemists define the pH by the formula:

      pH = -log[H+]

      where  [H+] is the concentration of hydrogen ions.

       

      Example

      A solution of Hydrochloric acid has

              [H+] = 3.2 X 10-4

      Find the pH of the solution.

      Solution


              PH = -log(3.2 X 10-4)  =  3.5



      Exercise

      Suppose that the pH of a shampoo is 7.3.  Find the concentration of hydrogen ions.  

     

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