Understanding the Shifts in the Common Core State Standards A Focus on Mathematics Wednesday, October 19th, 2011 2:00 pm – 3:30 pm Doug Sovde, Senior Adviser, PARCC Instructional Supports and Educator Engagement, Achieve Beth Cocuzza, Student Achievement Partners, LLC
Shift One: Focus Shift Two: Coherence Shift Three: Deep Understanding Shift Four: Fluency Shift Five: Application Shift Six: Intensity
The Six Shifts in Mathematics
Significantly narrow and deepen the scope and content of how time and energy is spent in the math classroom Focus deeply on only the concepts that are prioritized in the standards so that students reach strong foundational knowledge and deep conceptual understanding Students are able to transfer mathematical skills and understanding across concepts and grades
Shift One: Focus
Carefully connect the learning within and across grades so that students can build new understanding onto foundations built in previous years.
Begin to count on deep conceptual understanding of core content and build on it. Each standard is not a new event, but an extension of previous learning.
Shift Two: Coherence
The
current U.S. curriculum is ‘a mile wide and an inch deep.’
Focus
allows each student to think, practice, and integrate each new idea into a growing knowledge structure.
The Importance of Focus
Traditional U.S. Approach K 12
Number and Opera0ons
Measurement and Geometry
Algebra and Func0ons
Sta0s0cs and Probability
CCSS K-8 Domain Structure
Domain
Grades
Major Work/Major Concerns (not a complete list)
Counting and Cardinality
K
• Know number names and the count sequence • Count to tell the number of objects • Compare numbers
Operations and Algebraic Thinking
K-5
• Concrete use of the basic operations (word problems) • Mathematical meaning and formal properties of the basic operations • Prepare students to work with expressions and equations in middle school
Number and Operations —Base Ten
K-5
• Place value understanding • Develop base-ten algorithms using place value and properties of operations • Computation competencies (fluency, estimation)
Number and Operations —Fractions
3-5
• Enlarge concept of number beyond whole numbers, to include fractions • Use understanding of basic operations to extend arithmetic to fractions • Lay groundwork for solving equations in middle school
The Number System
6-8
• Build concepts of positive and negative numbers • Work with the rational numbers as a system governed by properties of operations • Begin work with irrational numbers
Expressions and Equations
6-8
• Understand expressions as objects (not as instructions to compute) • Transform expressions using properties of operations • Solve linear equations • Use variables and equations as techniques to solve word problems
Ratios and Proportional Relationships
6-7
• Consolidate multiplicative reasoning • Lay groundwork for functions in Grade 8 • Solve a wide variety of problems with ratios, rates, percents
Functions
8
• Extend and formalize understanding of quantitative relationships from Grades 3-7 • Lay groundwork for work with functions in High School
Measurement and Data
K-5
• Emphasize the common nature of all measurement as iterating by a unit • Build understanding of linear spacing of numbers and support learning of the number line • Develop geometric measures • Work with data to prepare for Statistics and Probability in middle school
Geometry
K-8
• Ascend through progressively higher levels of logical reasoning about shapes • Reason spatially with shapes, leading to logical reasoning about transformations • Connect geometry to number, operations, and measurement via notion of partitioning
Statistics and Probability
6-8
• Introduce concepts of central tendency, variability, and distribution • Connect randomness with statistical inference • Lay foundations for High School Statistics and Probability
Opera0ons and Algebraic Thinking
Expressions → and Equa0ons
Number and Opera0ons— Base Ten
→
1
2
3
4
Algebra The Number → System
Number and Opera0ons— Frac0ons
K
→
→
5
6
7
8
High School
Focusing attention within Number and Operations
Coherence
provides the opportunity to make connections between mathematical ideas. Coherence occurs both within a grade and across grades. Coherence is necessary because mathematics instruction is not just a checklist of topics to cover, but a set of interrelated and powerful ideas.
The Importance of Coherence
Making connections at a single grade Mul0plica0on and Division
Proper0es of Opera0ons
Area
Coherence example: Grade 3
“The coherence and sequential nature of mathematics dictate the foundational skills that are necessary for the learning of algebra. The most important foundational skill not presently developed appears to be proficiency with fractions (including decimals, percents, and negative fractions). The teaching of fractions must be acknowledged as critically important and improved before an increase in student achievement in algebra can be expected.� Final Report of the National Mathematics Advisory Panel (2008, p. 18)
Coherence example: Progression across grades
Content Emphases by Cluster Grade Four
Teach
more than “how to get the answer” and instead support students’ ability to access concepts from a number of perspectives Students are able to see math as more than a set of mnemonics or discrete procedures Students demonstrate deep conceptual understanding of core math concepts by applying them to new situations
Shift Three: Deep Understanding
Students
are expected to have speed and accuracy with simple calculations
Teachers
structure class time and/or homework time for students to practice core functions such as single-digit multiplication so that they are more able to understand and manipulate more complex concepts
Shift Four: Fluency
Grade
Required Fluency
K
Add/subtract within 5
1
Add/subtract within 10
2 3
Add/subtract within 20 Add/subtract within 100 Mul0ply/divide within 100 Add/subtract within 1000
4
Add/subtract within 1,000,000
5
Mul0-digit mul0plica0on
6 7
Mul0-digit division Mul0-digit decimal opera0ons Solve px + q = r, p(x + q) = r
Required Fluencies
Use math and choose the appropriate concept for application even when not prompted to do so Provide opportunities at all grade levels for students to apply math concepts in “real world” situations Teachers in content areas outside of math, particularly science, ensure that students are using math – at all grade levels – to make meaning of and access content
Shift Five: Application
The standards call equally for conceptual understanding, procedural skill and fluency, and application of mathematics.
Meeting these standards requires intensity in the classroom.
Practice is intense: fluency is built and assessed through timed exercises. Solitary thinking and classroom discussion are intense, centered on thought-provoking problems that build conceptual understanding.
Applications are challenging and meaningful. The amount of time and energy spent practicing and understanding learning environments is driven by the specific mathematical concept and therefore, varies throughout the given school year.
Shift Six: Intensity
Place
Value
◦ Standards Progression ◦ Seeing the Six Shifts Fractions
◦ Standards Progression ◦ Seeing the Six Shifts
The Shifts in Action—Two Examples
Place Value Problems for Deep Understanding
Place
Value
◦ Standards Progression ◦ Seeing the Six Shifts Fractions
◦ Standards Progression ◦ Seeing the Six Shifts
The Shifts in Action—Two Examples
Example: Fractions 4.NF
Fractions Problems for Deep Understanding
Questions?