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Foundation for Functions: A.1A describe independent and dependent quantities in functional relationships.

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Presentation on theme: "Foundation for Functions: A.1A describe independent and dependent quantities in functional relationships."— Presentation transcript:

1 Foundation for Functions: A.1A describe independent and dependent quantities in functional relationships

2 Foundation for Functions: A.1B gather and record data and use data set to determine functional relationships between quantities

3 Foundation for Functions: A.1Cdescribe functional relationships for given problem situations and write equations or inequalities to answer questions arising from the situations

4 Foundations for Functions: A.1Drepresent relationships among quantities using concrete models, tables, graphs, diagrams, verbal descriptions, equations, and inequalities

5 Foundation for Functions: A.1E interpret and make decisions, predictions, and critical judgments from functional relationships

6 Foundations for Functions: A.2Aidentify and sketch the general forms of linear ( ) and quadratic ( ) parent functions

7 Foundation for Functions: A.2Bidentify mathematical domains and ranges and determine reasonable domain and range values for given situations, both continuous and discrete

8 Foundation for Functions: A.2Cinterpret situations in terms of given graphs or creates situations that fit given graphs

9 Foundation for Functions: A.2Dcollect and organize data, make and interpret scatterplots (including recognizing positive, negative, or no correlation for data approximating linear situations), and model, predict, and make decisions and critical judgments in problem situations

10 Foundation for Functions: A.3Ause symbols to represent unknowns and variables

11 Foundation for Functions: A.3Blook for patterns and represent generalizations algebraically

12 Foundation for Functions: A.4Afind specific function values, simplify polynomial expressions, transform and solve equations, and factor as necessary in problem situations

13 Foundation of Functions: A.4Buse the commutative, associative, and distributive properties to simplify algebraic expressions

14 Foundation for Functions: A.4Cconnect equation notation with function notation, such as and

15 Linear Functions A.5Adetermine whether or not given situations can be represented by linear functions

16 Linear Functions A.5Bdetermine the domain and range for linear functions in given situations

17 Linear Functions A.5C use, translate, and make connections among algebraic, tabular, graphical, or verbal descriptions of linear functions

18 Linear Functions A.6Adevelop the concept of slope as rate of change and determine slopes from graphs, tables, and algebraic representations

19 Linear Functions A.6Binterpret the meaning of slope and intercepts in situations using data, symbolic representations or graphs

20 Linear Functions A.6Cinvestigate, describe, and predict the effects of changes in m and b on the graph of

21 Linear Functions A.6Dgraph and write equations of lines given characteristics such as two points, a point and a slope, or a slope and y-intercept

22 Linear Functions A.6Edetermine the intercepts of the graphs of linear functions and zeros of linear functions from graphs, tables, and algebraic representations

23 Linear Functions A.6Finterpret and predict the effects of changing slope and y-intercept in applied situations

24 Linear Functions A.6Grelate direct variation to linear functions and solve problems involving proportional change

25 Linear Functions A.7Aanalyze situations involving linear functions and formulate linear equations or inequalities to solve problems

26 Linear Functions A.7Binvestigate methods for solving linear equations and inequalities using concrete models, graphs, and the properties of equality, select a method and solve the equations and inequalities

27 Linear Functions A.7Cinterpret and determine the reasonableness of solutions to linear equations and inequalities

28 Linear Functions A.8Aanalyze situations and formulate systems of linear equations in two unknowns to solve problems

29 Linear Functions A.8Bsolve systems of linear equations using concrete models, graphs, tables, and algebraic methods

30 Linear Functions A.8Cinterpret and determine the reasonableness of solutions to systems of linear equations

31 Quadratic and other Nonlinear Functions A.9Adetermine the domain and range for quadratic functions in given situations

32 Quadratic and other Nonlinear Functions A.9Binvestigate, describe, and predict the effects of changes in a on the graph of

33 Quadratic and other Nonlinear Functions A.9Cinvestigate, describe, and predict the effects of changes in c on the graph of

34 Quadratic and other Nonlinear Functions A.9Danalyze graphs of quadratic functions and draw conclusions

35 Quadratic and other Nonlinear Functions A.10Asolve quadratic equations using concrete models, tables, graphs, and algebraic methods

36 Quadratic and other Nonlinear Functions A.10Bmake connections among the solutions (roots) of quadratic equations, the zeros of their related functions, and the horizontal intercepts (x-intercepts) of the graph of the function

37 Quadratic and other Nonlinear Functions A.11Ause patterns to generate the laws of exponents and apply them in problem-solving situations

38 Quadratic and other Nonlinear Functions A.11Banalyze data and represent situations involving inverse variations using concrete models, tables, graphs, or algebraic methods

39 Quadratic and other Nonlinear Functions A.11Canalyze data and represent situations involving exponential growth and decay using concrete models, tables, graphs, or algebraic methods


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