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LOGARITHMS Section 4.2 JMerrill, 2005 Revised 2008
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Exponential Functions 1111. Graph the exponential equation f(x) = 2x on the graph and record some ordered pairs.xf(x)01 12 24 38
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Review 2222. Is this a function? –Y–Y–Y–Yes, it passes the vertical line test (which means that no x’s are repeated) 3333. Domain? Range?
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Review 2222. Is the function one- to-one? Does it have an inverse that is a function? –Y–Y–Y–Yes, it passes the horizontal line test.
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Inverses To graph an inverse, simply switch the x’s and y’s (remember???) f(x) =f -1(x) = xf(x) 01 12 24 38xf(x)10 21 42 83
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Now graph f(x) f -1 (x)
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How are the Domain and Range of f(x) and f -1 (x) related? The domain of the original function is the same as the range of the new function and vice versa. f(x) =f -1(x) = xf(x) 01 12 24 38xf(x)10 21 42 83
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Graphing Both on the Same Graph Can you tell that the functions are inverses of each other? How?
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Graphing Both on the Same Graph Can you tell that the functions are inverses of each other? How? They are symmetric about the line y = x!
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Logarithms and Exponentials The inverse function of the exponential function with base b is called the logarithmic function with base b.
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Definition of the Logarithmic Function For x > 0, and b > 0, b 1 y = log b x iff b y = x The equation y = log b x and b y = x are different ways of expressing the same thing. The first equation is the logarithmic form; the second is the exponential form.
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Location of Base and Exponent Logarithmic: log b x = y Exponential: b y = x Exponent Base Exponent Base The 1 st to the last = the middle
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Changing from Logarithmic to Exponential Form aaaa.log5 x = 2means52 = x SSSSo, x = 25 bbbb.logb64 = 3meansb3 = 64 SSSSo, b = 4 since 43 = 64 YYYYou do: cccc. log216 = xmeans SSSSo, x = 4 since 24 = 16 dddd. log255 = xmeans SSSSo, x = ½ since the square root of 25 = 5! 2 x = 16 25 x = 5
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Changing from Exponential to Logarithmic aaaa.122 = xmeans log12x = 2 bbbb.b3 = 9means logb9 = 3 YYYYou do: cccc. c4 = 16means dddd. 72 = xmeans log c 16 = 4 log 7 x = 2
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Properties of Logarithms BBBBasic Logarithmic Properties Involving One: llllogbb = 1 because b1 = b. llllogb1 = 0 because b0 = 1 IIIInverse Properties of Logarithms: llllogbbx = x because bx = bx bbbblogbx = x because b raised to the log of some number x (with the same base) equals that number
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Characteristics of Graphs TTTThe x-intercept is (1,0). There is no y-intercept. TTTThe y-axis is a vertical asymptote; x = 0. GGGGiven logb(x), If b > 1, the function is increasing. If 0<b<1, the function is decreasing. TTTThe graph is smooth and continuous. There are no sharp corners or gaps.
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Transformations Vertical Shift VVVVertical shifts –M–M–M–Moves the same as all other functions! –A–A–A–Added or subtracted from the whole function at the end (or beginning)
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Transformations Horizontal Shift HHHHorizontal shifts –M–M–M–Moves the same as all other functions! –M–M–M–Must be “hooked on” to the x value!
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Transformations Reflections gggg(x)= - logbx RRRReflects about the x-axis gggg(x) = logb(-x) RRRReflects about the y-axis
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Transformations Vertical Stretching and Shrinking ffff(x)=c logbx SSSStretches the graph if the c > 1 SSSShrinks the graph if 0 < c < 1
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Transformations Horizontal Stretching and Shrinking ffff(x)=logb(cx) SSSShrinks the graph if the c > 1 SSSStretches the graph if 0 < c < 1
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Domain Because a logarithmic function reverses the domain and range of the exponential function, the domain of a logarithmic function is the set of all positive real numbers unless a horizontal shift is involved.
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Domain Con’t. Domain
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Properties of Commons Logs General Properties Common Logarithms (base 10) log b 1 = 0 log 1 = 0 log b b = 1 log 10 = 1 log b b x = x log 10 x = x b log b x = x 10 logx = x
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Properties of Natural Logarithms General Properties Natural Logarithms (base e) log b 1 = 0 ln 1 = 0 log b b = 1 ln e = 1 log b b x = x ln e x = x b log b x = x e lnx = x
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