Logarithms
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The Definition of the Logarithm
Definition
The function logbx is defined as the inverse function of y = bxRecall that by definition, if f and g are inverse functions then
f(g(x)) = g(f(x)) = xHence we have the following two properties:
Log Properties
(From the inverse definition)-
logbbx = x
-
blogb(x) = x
Example:
Solve
2x = 128Solution
Take the log base 2 of both sides:log22x = log2128
hencex = log2128
Note that Property 1 allows us to cancel the log and the exponent
Example:
log39 = 2
since
32 = 9Exercises:
Find
-
log101000
-
log464
-
log51/5
-
log3(
)
Simplify
-
10log10(1/x)
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log3 27x-1
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log4(24x-2)
-
-
Logs and Calculators
Goal:
Find
log317
Note: The calculator has ln and log
Definition
-
log x = log10 x
-
ln x = loge x
Change of Base Formula
logba = lna/lnb = loga/logb
Hence
log317 = ln17/ln3 = 2.5789...
Exercise:
Find
log529
and
log618
-
-
Logs and Graphs
Below is the graph of
y = log2 x
It can be found by reflecting
y = 2x
across the line
y = x
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 ,
)
and
the range of log x is R
Exercise
Use shifting rules to graph
y = log2(x - 3) + 1
and
y = -log2x
-
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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