Utah Core
•
Curriculum Search
•
All Adult Ed/ Mathematics Lesson Plans
•
USBE Adult Ed/ Mathematics website

Mathematics Adult Basic Education 4

Course Preface
Key Shifts in the Standards

Through their selections, panelists validated three key shifts in instruction prompted by the Common Core State Standards (CCSS) and outlined by Student Achievement Partners (2012). The shifts described below identify the most significant elements of the CCSS for Mathematics. At the heart of these shifts is a focus in mathematics instruction on delving deeply into the key processes and ideas upon which mathematical thinking relies. The shifts below therefore center on the knowledge and skills students must master to be adept at understanding and applying mathematical ideas.

Shift 1 – Focus: *Focusing strongly where the standards focus *

Generally speaking, instructors need both to narrow significantly and to deepen the manner in which they teach mathematics, instead of racing to cover topics. Focusing deeply on the major work of each level will allow students to secure the mathematical foundations, conceptual understanding, procedural skill and fluency, and ability to apply the math they have learned to solve all kinds of problems—inside and outside the math classroom. This important shift finds explicit expression in the selection of priority content addressing a clear understanding of place value and its connection to operations in the early levels. The emphasis on numeracy in early grades leads to a deeper understanding of the properties of operations at subsequent levels, encouraging fluency in the application of those properties, eventually for all operations with all number systems in a variety of situations.

Shift 2 – Coherence: *Designing learning around coherent progressions level to level *

The second key shift required by the CCSS and reflected in panelists’ selections is to create coherent progressions in the content within and across levels, so that students can build new understanding onto previous foundations. That way, instructors can count on students having conceptual understanding of core content. Instead of each standard signaling a new concept or idea, standards at higher levels become extensions of previous learning. The focus on understanding numbers and their 5. THE RESULTS: COLLEGE AND CAREER READINESS STANDARDS FOR MATHEMATICS 45 properties through the levels also exemplifies the progression from number to expressions and equations and then to algebraic thinking. This is seen in the selected standards within and across the levels. For example, an emphasis on understanding place value, as indicated above for Shift 1, progresses to using place value to add and subtract two-digit numbers to fluency in addition and subtraction of whole numbers to 1000 (including a requirement to explain why the strategies for addition and subtraction work). An understanding of both the numbers and their operations grows from the emphasis on place value and follows a progression extending beyond operations with numbers to include algebraic expressions and equations and ultimately to a deep understanding of functions. These connections can be further exemplified in applications related to other domains within and across the levels, such as the connection between properties of operations (e.g., multiplication) and geometric applications (e.g., area).

Shift 3 – Rigor: *Pursuing conceptual understanding, procedural skill and fluency, and application—all with equal intensity *

The third key shift required by the CCSS and reinforced in panelists’ selections is equal measures of conceptual understanding of key concepts, procedural skill and fluency, and rigorous application of mathematics in real-world contexts. Students with a solid conceptual understanding see mathematics as more than just a set of procedures. They know more than “how to get the answer” and can employ concepts from several perspectives. Students should be able to use appropriate concepts and procedures, even when not prompted, and in content areas outside of mathematics. Panelists therefore selected standards reflecting key concepts used in a variety of contexts, such as place value, ratios and proportional relationships, and linear algebra. They also selected standards calling for speed and accuracy in calculations using all number systems, as well as standards providing opportunities for students to apply math in context, such as calculations related to geometric figures involving rational number measures; calculation of probabilities as fractions, decimals, or percent; and statistical analysis of rational data.

Key Features of the Mathematics Standards Charts

The charts below contain the panel’s selections for mathematics standards from the earliest levels of learning through adult secondary education over a range of domains (e.g., The Number System, Operations and Algebraic Thinking, Functions, Geometry, Measurement and Data, and Statistics and Probability). These have been placed into five grade-level groupings: A (K–1), B (2–3), C (4–5, 6), D (6, 7–8) and E (high school). (Note: Grade 6 standards are split between Level C and Level D.)

The CCSS for Mathematics have two central parts: the Standards for Mathematical Practice and the Standards for Mathematical Content. The Standards for Mathematical Practice (the Practices)—accepted in their entirety by the panel—describe habits of mind that mathematics educators at all levels of learning should seek to develop in their students. These practices rest on “processes and proficiencies” with established significance in mathematics education, including such skills as complex problem solving, reasoning and proof, modeling, precise communication, and making connections. The Standards for Mathematical Content are a balanced combination of procedural fluency and conceptual understanding intended to be connected to the Practices across domains and at each level. The Practices define ways students are to engage with the subject matter as they grow in mathematical maturity and expertise across levels. Content expectations that begin with the word “understand” highlight the relationship between the two parts of the CCSS for Mathematics and connect the practices and content standards.

Modeling is directly addressed in the Practices (MP.4 Model with mathematics) and also in the content standards. Since modeling is best understood in relation to the content and the context, the content standards addressing mathematical modeling can be found in Number and Quantity, Algebra, Functions, and Geometry and are indicated by an asterisk (*). In the CCSS document, when a star appears on a heading for a cluster of standards, it applies to all standards in that group.

The grades K–8 mathematics standards are organized by grade level, with four or five domains within each level. Under each domain are overarching standard statements followed by a cluster of related standards. For high school, the CCSS are organized by conceptual categories, which together portray a coherent view of high school mathematics and span traditional high school course boundaries.

These conceptual categories include: Number and Quantity, Algebra, Functions, Modeling, Geometry, and Statistics and Probability. Under each conceptual category there is an organizing structure similar to that used in K–8: domains with overarching standard statements, with each followed by a cluster of related standards. Each grade level and conceptual category has an overview page that indicates the domain, their related standard statements, and the associated Mathematical Practices.

Mathematics Standards Key

The citation at the end of each standard identifies the CCSS grade, domain, and standard number (or standard number and letter, where applicable). So, 6.NS.6a, for example, stands for Grade 6, Number Sense domain, Standard 6a, and 5.OA.2 stands for Grade 5, Operations and Algebraic Thinking domain, Standard 2.

The CCSS domains for K–8 are: | |

NBT: | Number and Operations in Base Ten (K–5) |

NS: | The Number System (6–8) |

NF: | Number and Operations—Fractions (3–5) |

RP: | Ratios and Proportional Relationships (6–7) |

OA: | Operations and Algebraic Thinking (K–5) |

EE: | Expressions and Equations (6–8) |

F: | Functions (8) |

G: | Geometry (K–8) |

MD: | Measurement and Data (K–5) |

SP: | Statistics and Probability (6–8) |

The CCSS domains for high school are: | |

N.RN: | The Real Number System |

N.Q: | Number and Quantity |

A.SSE: | Algebra: Seeing Structure in Expressions |

A.APR: | Algebra: Arithmetic with Polynomials and Rational Expressions |

A.CED: | Algebra: Creating Equations |

A.REI: | Algebra: Reasoning with Equations and Inequalities |

F.IF: | Functions: Interpreting Functions |

F.BF: | Functions: Building Functions |

F.LE: | Functions: Linear, Quadratic, and Exponential Models |

G.CO: | Geometry: Congruence |

G.SRT: | Geometry: Similarity, Right Triangles, and Trigonometry |

G.GMD: | Geometry: Geometric Measurement and Dimension |

G.MG: | Geometry: Modeling with Geometry |

S.ID: | Statistics and Probability: Interpreting Categorical and Quantitative Data |

http://www.uen.org - in partnership with Utah State Board of Education (USBE) and Utah System of Higher Education (USHE). Send questions or comments to USBE Specialist - BRIAN OLMSTEAD and see the Adult Ed/ Mathematics website. For general questions about Utah's Core Standards contact the Director - BRIAN OLMSTEAD. These materials have been produced by and for the teachers of the State of Utah. Copies of these materials may be freely reproduced for teacher and classroom use. When distributing these materials, credit should be given to Utah State Board of Education. These materials may not be published, in whole or part, or in any other format, without the written permission of the Utah State Board of Education, 250 East 500 South, PO Box 144200, Salt Lake City, Utah 84114-4200.