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Published byCalvin Anthony Oliver Modified over 9 years ago
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Definition of Functions The basic object of study in calculus is a function. A function is a rule or correspondence which associates to each number x in a set A a unique number f(x) in a set B. The set A is called the domain of f and the set of all f(x)'s is called the range of f.
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Four Representations of a Function Symbolic or algebraic Numerical Graphical Verbal
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Continuity If the graph of f breaks at x=x 0, so that you have to lift the pencil off the paper before continuing, then f is said to be discontinuous at x=x 0. If the graph doesn’t break at x=x 0, then f is continuous at x 0.
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Increasing and Decreasing Functions A function is increasing on an interval, if for any a, and b, in the interval f(a) < f(b) whenever a < b. In other words, If the curve of a line is going up from left to right, then it is increasing. A function is decreasing on an interval, if for any a, and b, in the interval f(a) > f(b) whenever a < b
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A one-to-one function maps different inputs to different outputs. In other words, no two x values have the same y value. A non-one-to-one function can map more than one input to the same output. One-to-one and Non-one-to-one Functions
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Horizontal Line Test A curve that passes the vertical line test, and thus is the graph of a function, will further be the graph of a one-to-one function if and only if no horizontal line intersects the curve more than once.
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Basic Functions Constant functions Power functions Inverses of functions Exponential functions Logarithm functions
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Inverses of Functions Let f be a function with domain D and range R. A function g with domain R and range D is an inverse function for f if, for all x in D, y = f(x) if and only if x = g(y).
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Exponential Functions Let b be a positive real number. An exponential function with base b is the function: f(x) = b x If the base of the function is e=2.7182818…, a particular irrational number (an infinite non- repeating decimal) between 2.71 and 2.72, the function e x is often referred to as the exponential function.
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Logarithm Functions Let b be a positive real number. The logarithm with base b f(x) = log b (x) is the inverse of the exponential function g(x) = b x. Informally, we can think of log b (x) as the exponent to which the base b must be raised to give x.
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Natural Logarithm The natural logarithm f(x) = ln(x) is the inverse of the exponential function g(x) = e x. In other words, ln(x) = log e (x).
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Laws of Exponents and Logarithms (p. 26) 11.ln e x = x and e ln x = x 12.e x e y = e x+y 13.e x /e y = e x-y 14.e -x = 1/e x 15.(e x ) y = e xy 16.ln ab = ln a + ln b 17.ln (a/b) = ln a – ln b 18.ln (1/a) = - ln a 19.ln (a b ) = b ln a
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Problem - Solving Tactic To solve an equation with the unknown in an exponent, take the logarithm of both sides. To solve an equation with the unknown inside a logarithm, exponentiate both sides.
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Solving Inequalities Involving Elementary Functions Step 1: Find values of x where f is discontinuous. Step 2: Find the values of x where f is zero. Step 3: Look at the open intervals in between. On each of the intervals, f maintains only one sign.
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