Jeopardy The Sexton Edition Miscellaneous Functions Polynomials Equations Statistics/Probability Terminology Jeopardy Terminology Misc. Functions Polynomials Equations Stats/Prob. Terminology 100 100 100 100 100 100 200 200 200 200 200 200 300 300 300 300 300 300

ByNotes Over 2.2 1 3 5 8 7 Identifying Functions - Numerically Decide whether the relation is a function. 1. Input Output A function , because every input goes to only one output Not a function , because 4 goes to both 3 and 5

ByPrecalculus – MAT 129. Instructor: Rachel Graham Location: BETTS Rm. 107 Time: 8 – 11:20 a.m. MWF. Chapter One. Functions and Their Graphs. 1.1 – Lines in the Plane. Slope Equation of a line Point-Slope form Slope-intercept form General form Parallel and Perpendicular Lines

ByHare Krsna Hare Krsna Krsna Krsna Hare Hare Hare Rama Hare Rama Rama Rama Hare Hare Jaya Sri Sri Radha Vijnanasevara (Lord Krsna, the King of Math and Science) KRSNA CALCULUS™ PRESENTS:. CHAPTER SIX: APPLICATIONS OF THE INTEGRAL. Released by Krsna Dhenu February 03, 2002

ByRepresenting Functions. TLW determine whether a relation is a function; find functional values. TEKS: A.4A, A.4C, A.5C. Determine whether the relation {(6, -3), ( 4, 1), (7, -2), (-3, 1)} is a function. Explain.

ByLecture 2. Economic Models, Functions, Logs, Exponents, e. Variables, Constant, Parameters. Variables: magnitude can change Price, profit, revenue… Represented by symbols Can be ‘frozen’ by setting value Try to setup models to obtain solutions to variables

ByINVERSE. FUNCTIONS. 1. 2. 2. 4. 3. 6. 4. 8. 10. 5. Remember we talked about functions---taking a set X and mapping into a Set Y. 1. 2. 2. 4. 3. 6. 4. 8. 10. 5. Set X. Set Y. An inverse function would reverse that process and map from Set Y back into Set X.

ByObtaining Information from Graphs. You can obtain information about a function from its graph. At the right or left of a graph, you will find closed dots, open dots, or arrows. A closed dot indicates that the graph does not extend beyond this point and the point belongs to the graph.

ByPRECALCULUS I. Functions and Graphs Function, domain, independent variable Graph, increasing/decreasing, even/odd. Dr. Claude S. Moore Danville Community College. Definition: Function.

By4.6 – Formalizing Relations and Functions. Vocab, Vocab, Vocab!!. Relation – a pairing of numbers in one set with numbers in another set. Domain – the set of x-values of a relation Range – the set of y-values of a relation.

ByChapter 2. Section 1 Relations and Functions. Relations and Functions. ALGEBRA 2 LESSON 2-1. (For help, go to Skills Handbook page 848 and Lesson 1-2.). Graph each ordered pair on the coordinate plane. 1. (–4, –8) 2. (3, 6) 3. (0, 0) 4. (–1, 3) 5. (–6, 5).

ByObjectives. Identify the domain and range of relations and functions. Determine whether a relation is a function. 1.6 Relations and Functions. Vocabulary. relation domain range function. Warm Up Use the graph for Problems 1–2. 1. List the x -coordinates of the points.

ByDefinition 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 .

ByUnit 5. Section 5.4 Functions and Relations. Function. To determine if a graph is a function, we perform the vertical line test . . PASS. -- Yes, it is a function. FAIL. -- No, it is not a function. Function. Vertical Line Test: 1.Draw a vertical line through the graph.

BySection 1-2. Functions and Their Properties. Section 1-2. function definition and notation domain and range continuity increasing/decreasing boundedness local and absolute extrema symmetry asymptotes end behavior. Functions.

ByObjectives The student will be able to:. 1. To determine if a relation is a function. 2. To find the value of a function. SOL: A.7aef. Designed by Skip Tyler, Varina High School. Functions.

By6.3 Inverse Functions. ©2001 by R. Villar All Rights Reserved. Inverse Functions. An inverse of a relation (set of ordered pairs) is obtained by switching the x and y in the ordered pairs. For example, the inverse of {(0, –3), (2, 1), (6, 3)} is: {(–3, 0), (1, 2), (3, 6)}

ByIntermediate Algebra. A review of concepts and computational skills Chapters 1-3. The Real Numbers. Sets and notation—union, intersection, subset Natural, Whole, Integers, Rational, Irrational Graphing reals on a number line Interval notation. Properties of Real Numbers and Evaluating.

ByJeopardy. Number Sense. Calculators. Statistics. Equations. Functions. 100. 100. 100. 100. 100. 200. 200. 200. 200. 200. Jeopardy. 300. 300. 300. 300. 300. 400. 400. 400. 400. 400. 500. 500. 500. 500. 500.

ByChapter 9. Rational Numbers and Real Numbers, with an Introduction to Algebra. 9.1 The Rational Numbers. The set of rational numbers is the set. Definition : Equality or Rational Numbers if and only if Theorem : Let be any rational number and n any nonzero integer. Then .

ByView Vertical line test PowerPoint (PPT) presentations online in SlideServe. SlideServe has a very huge collection of Vertical line test PowerPoint presentations. You can view or download Vertical line test presentations for your school assignment or business presentation. Browse for the presentations on every topic that you want.