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Mathematics 116 Chapter 5. Exponential And Logarithmic Functions. John Quincy Adams. “Patience and perseverance have a magical effect before which difficulties disappear and obstacles vanish.” Mathematics 116 Exponential Functions and Their Graphs. Def: Relation.
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Mathematics 116Chapter 5 • Exponential • And • Logarithmic Functions
John Quincy Adams • “Patience and perseverance have a magical effect before which difficulties disappear and obstacles vanish.” • Mathematics 116 • Exponential Functions • and • Their Graphs
Def: Relation • A relation is a set of ordered pairs. • Designated by: • Listing • Graphs • Tables • Algebraic equation • Picture • Sentence
Def: Function • A function is a set of ordered pairs in which no two different ordered pairs have the same first component. • Vertical line test – used to determine whether a graph represents a function.
Defs: domain and range • Domain: The set of first components of a relation. • Range: The set of second components of a relation
Objectives • Determine the domain, range of relations. • Determine if relation is a function.
Mathematics 116 • Inverse Functions
Objectives: • Determine the inverse of a function whose ordered pairs are listed. • Determine if a function is one to one.
Inverse Function • g is the inverse of f if the domains and ranges are interchanged. • f = {(1,2),(3,4), (5,6)} • g= {(2,1), (4,3),(6,5)}
One-to-One Function • A function f is one-to one if for and and b in its domain, f(a) = f(b) implies a = b. • Other – each component of the range is unique.
One-to-One function • Def: A function is a one-to-one function if no two different ordered pairs have the same second coordinate.
Horizontal Line TestA test for one-to one • If a horizontal line intersects the graph of the function in more than one point, the function is not one-to one
Existence of an Inverse Function • A function f has an inverse function if and only if f is one to one.
Find an Inverse Function • 1. Determine if f has an inverse function using horizontal line test. • 2. Replace f(x) with y • 3. Interchange x and y • 4. Solve for y • 5. Replace y with
Definition of Inverse Function • Let f and g be two functions such that f(g(x))=x for every x in the domain of g and g(f(x))=x for every x in the domain of. • g is the inverse function of the function f
Objective • Recognize and evaluate exponential functions with base b.
Michael Crichton – The Andromeda Strain (1971) • The mathematics of uncontrolled growth are frightening. A single cell of the bacterium E. coli would, under ideal circumstances, divide every twenty minutes. It this way it can be shown that in a single day, one cell of E. coli could produce a super-colony equal in size and weight to the entire planet Earth.”
Graph • Determine: Domain, range, function and why, 1-1 function and why, y intercept, x intercept, asymptotes
Graph • Determine: Domain, range, function and why, 1-1 function and why, y intercept, x intercept, asymptotes
Exponential functions • Exponential growth • Exponential decay
Properties of graphs of exponential functions • Function and 1 to 1 • y intercept is (0,1) and no x intercept(s) • Domain is all real numbers • Range is {y|y>0} • Graph approaches but does not touch x axis – x axis is asymptote • Growth or decay determined by base
Calculator Keys • Second function of divide • Second function of LN (left side)
Dwight Eisenhower – American President • “Pessimism never won any battle.”
Property of equivalent exponents • For b>0 and b not equal to 1
Compound Interest • A = Amount • P = Principal • r = annual interest rate in decimal form • t= number of years
Continuous Compounding • A = Amount • P = Principal • r = rate in decimal form • t = number of years
Compound interest problem • Find the accumulated amount in an account if $5,000 is deposited at 6% compounded quarterly for 10 years.
Objectives • Recognize and evaluate exponential functions with base b • Graph exponential functions • Recognize, evaluate, and graph exponential functions with base e. • Use exponential functions to model and solve real-life problems.
Albert Einstein – early 20th century physicist • “Everything should be made as simple as possible, but not simpler.”
Mathematics 116 – 4.2 • Logarithmic Functions • and • Their Graphs
Objectives • Recognize and evaluate logarithmic function with base b • Note: this includes base 10 and base e • Graph logarithmic functions • By Hand • By Calculator
Shape of logarithmic graphs • For b > 1, the graph rises from left to right. • For 0 < b < 1, the graphs falls from left to right.
Properties of Logarithmic Function • Domain:{x|x>0} • Range: all real numbers • x intercept: (1,0) • No y intercept • Approaches y axis as vertical asymptote • Base determines shape.
Evaluate Logs on calculator • Common Logs – base of 10 • Natural logs – base of e
**Property of Logarithms • One to One Property
Objective • Use logarithmic functions to model and solve real-life problems.
Jim Rohn • “You must take personal responsibility. You cannot change the circumstances, the seasons, or the wind, but you can change yourself. That is something you have charge of.”
Mathematics 116 – 4.3 • Properties • of • Logarithms