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Exponential and Logarithmic Functions 5 Exponential Functions Logarithmic Functions Compound Interest Differentiation of Exponential Functions Differentiation of Logarithmic Functions Exponential Functions as Mathematical Models
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Exponential Function An exponential function with base b and exponent x is defined by Ex. Domain: All reals Range: y > 0 (0,1) 0 1 1 3 2 9 x y x y
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Laws of Exponents LawExample
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Properties of the Exponential Function 1.The domain is. 2. The range is (0, ). 3. It passes through (0, 1). 4. It is continuous everywhere. 5. If b > 1 it is increasing on. If b < 1 it is decreasing on.
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Examples Ex.Simplify the expression Ex.Solve the equation
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The Base e-infinite non-repeating decimal
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Logarithms The logarithm of x to the base b is defined by Ex.
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Examples Ex. Solve each equation a. b.
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Logarithmic Notation Common logarithm Natural logarithm
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Laws of Logarithms
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Example Use the laws of logarithms to simplify the expression:
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Logarithmic Function The logarithmic function of x to the base b is defined by Properties: 1. Domain: (0, ) 2.Range: 3. x-intercept: (1, 0) 4. Continuous on (0, ) 5. Increasing on (0, ) if b > 1 Decreasing on (0, ) if b < 1
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Graphs of Logarithmic Functions Ex. (1,0) xx y y (0, 1)
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Ex. Solve Apply ln to both sides.
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Example A normal child’s systolic blood pressure may be approximated by the function where p(x) is measured in millimeters of mercury, x is measured in pounds, and m and b are constants. Given that m = 19.4 and b = 18, determine the systolic blood pressure of a child who weighs 92 lb.
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Differentiation of Exponential Functions Chain Rule for Exponential Functions Derivative of Exponential Function If f (x) is a differentiable function, then
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Examples Find the derivative of
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Differentiation of Logarithmic Functions Chain Rule for Exponential Functions Derivative of Exponential Function If f (x) is a differentiable function, then
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Examples Find the derivative of Find an equation of the tangent line to the graph of Slope: Equation:
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Logarithmic Differentiation 1.Take the Natural Logarithm on both sides of the equation and use the properties of logarithms to write as a sum of simpler terms. 2.Differentiate both sides of the equation with respect to x.x. 3.Solve the resulting equation for.
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Examples Use logarithmic differentiation to find the derivative of Apply ln Differentiate Properties of ln Solve
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Q: quantity t: time Q 0 : initial value What's properties for this function? What's the case when k<0? Q 0 >0; k>0
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Exponential Growth/Decay Models Q 0 is the initial quantity k is the growth/decay constant A quantity Q whose rate of growth/decay at any time t is directly proportional to the amount present at time t can be modeled by: Growth Decay
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Application: Growth of Bacteria A certain bacteria culture experiences exponential growth. If the bacteria numbered 20 originally and after 4 hours there were 120, find the number of bacteria present after 6 hours.
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Application: Decay of Radioactive Substance Example 2 (P427): Decay of Radium Example 3 (P428): Carbon-14 Dating Do you want to be an archaeologist?
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Online Assignment 1 Summarize the models of Learning Curves and Logistic Growth Function, including: a. What's the functions? b. What's the property for the functions? c. Sketch the graph for the functions (Use Excel). d. List at least 3 real problems which can be applied by the Learning Curves model. e. List at least 3 real problems which can be applied by the Logistic Growth Function model.
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Online Assignment 2 Suppose that the temperature T, in degrees Fahrenheit, of an object after t minutes can be modeled using the following equation: 1. Find the temperature of the object after 5 minutes. 2. Find the time it takes for the temperature of the object to reach 190°.
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