Common Core State Standards for Mathematics: Coherence Grade 3.
Presentation on theme: "Common Core State Standards for Mathematics: Coherence Grade 5."— Presentation transcript:
Common Core State Standards for Mathematics: Coherence Grade 5
Essential Questions How and why were the Common Core State Standards developed and by whom? What are the 3 shifts in math instruction in the CCSS? Why the need for Coherence? How is Coherence reflected in the classroom? What are the next steps in implementing Coherence?
Overview of the Common Core State Standards
Rationale for CCSS Declining US competitiveness with other developed countries NAEP performance that is largely flat over the past 40 years in 8th grade Slight improvement on NAEP performance at the 4th grade level Slight decline on NAEP performance at the high school level High rates of college remediation
Background of CCSS Initiated by the National Governors Association (NGA) and Council of Chief State School Officers (CCSSO) with the following design principles: Result in College and Career Readiness Based on solid research and practice evidence Fewer, higher (greater DOK), and clearer standards
College Math Professors Feel HS Students Today are Not Prepared for College Math
What The Disconnect Means for Students Nationwide, many students in two-year and four-year colleges need remediation in math. Remedial classes lower the odds of finishing the degree or program. Need to set the agenda in high school math to prepare more students for postsecondary education and training.
The Common Core State Standards Require Three Instructional Shifts in Mathematics Focus: Focus strongly where the standards focus. Coherence: Think across grades and link to major topics. Rigor: In major topics, pursue conceptual understanding, procedural skill and fluency, and application.
Shift 2: Coherence The Standards are designed around coherent progressions from grade to grade. Principals and teachers carefully connect the learning across grades so that students can build new understanding onto foundations built in previous years. Teachers can 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.
William McCallum on Coherence
Coherence: Think Across Grades Example: Fractions 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 NMA Panel, 2008
12 CCSS Fraction Progression
Coherence: Think Across Grades
Coherence: Link to Major Topics Within Grades
Engaging with the shifts: Coherence Cards In front of you lie a set of colored cards and a large poster. Each colored set of cards represents one theme, such as number lines or properties of operations, and each card has an individual standard printed on it. Your goal as a team is to correctly place the cards within each grade in an accurate progression. The only parameters are that no two of the same color cards will appear in the same grade, and that there will not necessarily be one card in each grade for each progression.
Examples of Opportunities for Connections among Standards, Clusters or Domains Directions: Solve the following problem. Think about how the problem connects to the standard and how it looks different than what we currently do in the classroom. 5.NF.4 & 5.NF.5 The work that students do in multiplying fractions extends their understanding of the operation of multiplication. For example, to multiply a/b x q (where q is a whole number or a fraction), students can interpret a/b x q as meaning a parts of a partition of q into b equal parts. This interpretation of the product leads to a product that is less than, equal to or greater than q depending on whether a/b 1, respectively.
Examples of Major Within-Grade Dependencies Convert like measurement units within a given measurement system (5.MD.1) depends on students abilities to apply and extend previous understandings of multiplication and division to multiply and divide fractions. (5.NF.3) Directions: Solve the following problem. Think about how the problem connects to the standard and how it looks different than what we currently do in the classroom.
a. Five brothers are going to take turns watching their family's new puppy. How much time will each brother spend watching the puppy in a single day if they all watch him for an equal length of time? Write your answer -Using only hours -Using a whole number of hours and a whole number of minutes -Using only minutes b. Mrs. Hinojosa had 75 feet of ribbon. If each of the 18 students in her class gets an equal length of ribbon, how long will each piece be? Write your answer -Using only feet -Using a whole number of feet and a whole number of inches -Using only inches c. Wesley walked 11 miles in 4 hours. If he walked the same distance every hour, how far did he walk in one hour? Write your answer -Using only miles -Using a whole number of miles and a whole number of feet -Using only feet
Math Shifts What is this shift? Why this shift? OpportunitiesChallenges 2. Coherence: Think across grades Group Discussion