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MATH 141. Chapter 1: Graphs and Functions (Review). Distance Formula. 1.1. Example: Find distance between (-1,4) and (-4,-2). Answer: 6.71. Midpoint Formula. Example: Find the midpoint from P 1(-5,5) to P 2(-3,1). Answer: (-4,3). y. ( x , y ). r. ( h , k ). x. 1.2.
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MATH 141 Chapter 1: Graphs and Functions (Review)
Distance Formula 1.1 Example: Find distance between (-1,4) and (-4,-2). Answer: 6.71
Midpoint Formula Example: Find the midpoint from P1(-5,5) to P2(-3,1). Answer: (-4,3)
y (x, y) r (h, k) x 1.2 Equations in two variables – Example: Circle Equations The standard form of an equation of a circle with radius r and center (h, k) is: The Unit Circle equation is:
1.3 Definition of a Function
Theorem: Vertical Line Test A set of points in the xy - plane is the graph of a function if and only if a vertical line intersects the graph in at most one point.
y x Not a function.
y x Function.
Summary Important Facts About Functions • For each x in the domain of f, there is exactly one image f(x) in the range; however, an element in the range can result from more than one x in the domain. • f is the symbol that we use to denote the function. It is symbolic of the equation that we use to get from an x in the domain to f(x) in the range. • If y = f(x), then x is called the independent variable or argument of f, and y is called the dependent variable or the value of f at x.
A function f is even if for every number x in its domain the number -x is also in its domain and f(-x) = f(x) A function f is odd if for every number x in its domain the number -x is also in its domain and f(-x) = - f(x) 1.4 Properties of Functions: Even and Odd Functions
Determine whether each graph given is an even function, an odd function, or a function that is neither even nor odd.
Local Maxima and Minima Local Max
1.5 Library of Functions (Famous Functions)
Piecewise-defined Functions: Example:
1.6 Graphing Functions:
