+ stefanie buckner buncombe county schools [email protected] core plus mathematics
TRANSCRIPT
+Core Plus Mathematics Project Essential Features
Courses organized around interwoven mathematical strands
Mathematical strands developed in coherent, focused units connected by fundamental unifying idea
Mathematics developed in context with an emphasis on applications and mathematical modeling
Student-centered investigations that promote active learning through problem solving
Full and appropriate use of technology tools
+Course One (“blue” book)
Unit 1: Patterns of Change
Unit 2: Patterns in Data
Unit 3: Linear Functions
Unit 4: Vertex-Edge Graphs
Unit 5: Exponential Functions
Unit 6: Patterns in Shape
Unit 7: Quadratic Functions
Unit 8: Patterns in Chance
+Common Core Math 1How Buncombe County Does CCSS Math 1 using Core Plus Materials (somewhat exclusively)
+Course Two (“green” book)
Unit 1: Functions, Equations, and Systems
Unit 2: Matrix Methods
Unit 3: Coordinate Methods
Unit 4: Network Optimization
Unit 5: Nonlinear Functions and Equations
Unit 6: Regression and Correlation
Unit 7: Trigonometric Methods
Unit 8: Probability Distributions
+Common Core Math 21How Buncombe County plans to do CCSS Math 2 using Core Plus Materials (somewhat exclusively)
+
+Course Three (“purple” book)
Unit 1: Reasoning and Proof
Unit 2: Inequalities and Linear Programming
Unit 3: Similarity and Congruence
Unit 4: Samples and Variation
Unit 5: Polynomial and Rational Functions
Unit 6: Circles and Circular Functions
Unit 7: Recursion and Iteration
Unit 8: Inverse Functions and Logarithms
+Course Four (“orange” book)
Unit 1: Families of Functions
Unit 2: Vectors and Motion
Unit 3: Algebraic Functions and Equations
Unit 4: Trigonometric Functions and Equations
Unit 5: Exponential Functions, Logarithms, and Equations
Unit 6: Surfaces and Cross Sections
Unit 7: Rates of Change
Unit 8: Counting Methods and Induction
Unit 9: Binomial Distributions and Statistical Inference
Unit 10: Mathematics of Information Processing and the Internet
+
Instructional Support Materials
TeacherWorks CD
StudentWorks CD
ExamView Pro
Resource Masters
Teacher Editions (different approach)
+
Core Plus Instructional Model
Launch – Think About the Situation (TATS) Full class discussion of a problem
situation and related questions to think about; purpose is both affective and cognitive.
Explore – Investigation Group investigation of focused
problems and questions related to the launching situation.
Share and Summarize - Summarize the Mathematics (STM) Class discussion of the mathematical
ideas, strategies and reasoning developed in their groups leads to a summary of important ideas.
Apply (CYU) Tasks students complete individually
to check and reinforce their developing understanding.
+
Student to student discourse and student to teacher discourse is at the heart of CPMP investigations.
Collaboration Based
+Everyone has a job
+Collaborative Group Guidelines
Each member of the group:
contributes to the group’s work;
is responsible for listening carefully when another group member is talking;
has the responsibility and the right to ask questions;
should help others in the group when asked;
should be considerate and encouraging.
All members should work together until everyone in the group understands and can explain the group’s results.
+
A new “twist” on practice problemsEach LESSON is followed by an extensive set of On Your Owns (OYOs)
On Your Owns
+On Your Own Tasks
Applications Provide opportunities for students to use and strengthen their
understanding of ideas they have learned in the lesson.
Connections Help students to build links between mathematical topics in
the lesson and to connect those topics with other mathematics that they know.
Reflections Provide opportunities for students to re-examine their thinking
about ideas in the lesson.
Extensions Provide opportunities for students to explore further or more
deeply the mathematics they are learning.
Review Provide opportunities for just-in-time review and distributed
practice of skills to maintain procedural fluency.
+
Mathematically proficient students consider the available tools when solving a mathematical problem. These tools might include pencil and paper, concrete models, a ruler, a protractor, a calculator, a spreadsheet, a computer algebra system, a statistical package, or dynamic geometry software. Proficient students are sufficiently familiar with tools appropriate for their grade or course to make sound decisions about when each of these tools might be helpful. . . .
Common Core State Standards for Mathematics, 2010, p. 7
Core Math Tools
+Core Math Tools
Core Math Tools is freely available at:
www.nctm.org/coremathtools
Core Math Tools is accompanied by user support and resources at a CMT portal within the NCTM website.
Core Math Tools is designed for use with any CCSSM‐ oriented high school textbook series. BUT Core Plus Data sets are all preloaded. The text often times references CPMP tools.
Can be used online in mathematics classrooms, in school and local libraries, or any other place offering Internet access.
Can be freely downloaded to user’s class or home computer and is self‐updating whenever connected to the Internet.
aka CPMP tools
+General Purpose Tools
+
Algebra ToolsElectronic spreadsheet, computer algebra system (CAS) that produces tables and graphs, manipulates algebraic expressions, and solves equations inequalities. Also includes custom apps supporting mathematical modeling.
+
Geometry ToolsInteractive drawing tools for constructing, measuring, manipulating, and transforming geometric figures. Ability to turn off/on coordinate plane. Includes simple programming language for custom applications. Custom apps specifics to geometric properties.
+
Statistics ToolsTools for graphic display and analysis of both univariate and bivariate data, simulation of probabilistic situations and mathematical modeling of quantitative relationships.
Spreadsheet capability has built in data sets (correlate to CPMP text) and the ability to enter your own data.
Customs apps are key in developing key statistical ideas.
+Modeling with Core Math Tools
Optimal Refinery Location: Drilling teams from oil companies search around the world for new sites to place oil wells. Increasingly, oil reserves are being discovered in offshore waters. The Gulf Oil Company has drilled two high-capacity wells in the Gulf of Mexico about 5 km and 9 km from shore. The company wants to build a refinery to pipe oil from the two wells to a single new refinery on shore. Assume the 20 km of shoreline is nearly straight.
What are important considerations in locating the refinery?
What is your best estimate for the location of the refinery? How did you decide on that location?
+Interactive Geometry Approach
+Multiple Algebraic Approaches
+A Reflection Approach