common core standards – mathematics
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Common Core Standards – Mathematics. Course Sequence and Options for TUSD Middle Schools. Presentation Outline. Switch Shifts in the Common Core Recommendations for TUSD Why take this path? Addressing acceleration Moving forward with next steps. Making the Switch. Background. - PowerPoint PPT PresentationTRANSCRIPT
COMMON CORE STANDARDS – MATHEMATICS
Course Sequence and Options for TUSD Middle Schools
Presentation Outline Switch Shifts in the Common Core Recommendations for TUSD Why take this path? Addressing acceleration Moving forward with next
steps
Making the Switch
Background The implementation of the Common
Core State Standards in Math (CCSSM) requires rethinking not only course content, but also course sequencing.
The CCSSM are greatly accelerated, more rigorous, and contain more content than the 1997 Content Standards.
Common Core Standards Mathematics
Three Major Shifts• Places strong emphasis on the
new grade-level and course-level standards (Shift in content)
Focus
• Think across grades and link major topics in each grade
Coherence
• Higher order thinking and application to real-world situations and problems
Rigor
Common Core Standards Mathematics
Grades 6 – 8 • Algebraic concepts, geometric
concepts, ratio, proportion, rates, percent, and statistics and probability within a spiral curriculum
Focus
• Extending operations with fractions to rational numbers
Coherence
•Foundational concepts of Algebra•Expectations of fluency with expressions and linear equations
Rigor
Common Core Standards Mathematics
Higher Mathematics (9 – 12)
• Mathematics that students need for success in college and careers
Focus
• Extending from algebraic concepts to calculus, trigonometry, and advanced probability and statistics
Coherence
• Expectation that students are college and career ready and able to utilize mathematics in their lives
Rigor
2013 California Framework
Progression SequenceProgression of Mathematics Courses
K - 5
• Kindergarten
• Grade 1
• Grade 2
• Grade 3
• Grade 4
• Grade 5
6 – 8
• Grade 6
• Grade 7
• Grade 8
Higher Math (9 –
12) • Algebra I
• Geometry
• Algebra II
Advanced Math
AP Probability & Statistics
Calculus
TUSD Additional Offerings:
Intermediate Algebra II
Pre-Calculus
AP Calculus AB
AP Calculus BC
Applied Calculus
IB Math SL
Comparing Old to New
1997 Framework• On Grade Level:
• Grade 6 - Math• Grade 7 - Pre-
Algebra• Grade 8 - Algebra I
• Not On Grade Level:• Grade 8 - General
Math (for students not enrolled in Algebra I, penalty on API for General Math test)
2013 CCSS Framework
• On Grade Level:• Grade 6 Math• Grade 7 Math• Grade 8 Math
• Algebra I moved to high school
• Grade 8 students in Algebra I take the Grade 8 Math SBAC test
Recommendation for TUSD
Traditional Course
Pathway
•Grade 6 Math•Grade 7 Math•Grade 8 Math
Accelerated Course
Pathway• Grade 6
• Grade 6 Math• First 1/2 of Grade 7
Math • Grade 7
• Second 1/2 of Grade 7 Math
• Grade 8 Math• Grade 8 - Algebra I
Two Course Pathways for Students
Packs Algebraic skills over 3 years to build strong
conceptual skills.
Why take this path?
Math Subject Area Council – Standards Analysis
Teacher representatives from all schools, grade levels, and math courses participated
Examined the CCSS standards and compared them to the 1997 standards
Found great differences in the CCSS, particularly in middle school grades
Differences were noted in an expanded curriculum, greater depth and complexity, significant content shifts, emphasis on literacy, and first instances of spiral curriculum for high school Geometry (6th grade)
CST vs. CCSS Standards
1997 Algebra I – 2.0 Students understand and use such operations as
taking the opposite, finding the reciprocal, taking a root, and raising to a fractional power. They understand and use the rules of exponents.
CCSS Algebra I - N-RN.1 Explain how the definition of the meaning of rational
exponents follows from extending the properties of integer exponents to those values, allowing for a notation for radicals in terms of rational exponents. For example, we define 51/3 to be the cube root of 5 because we want (51/3)3 = 5(1/3)3 to hold, so (51/3)3 must equal 5.
Rigor
New CCSS Standard
•Algebra I – IF-F.4 For a function that models a relationship between two quantities, interpret key features of graphs and tables in terms of the quantities, and sketch graphs showing key features given a verbal description of the relationship. Key features include: intercepts; intervals where the function is increasing, decreasing, positive, or negative; relative maximums and minimums; symmetries; end behavior; and periodicity.
Corresponding 1997 Standard
•Trigonometry - 2.0 Students know the definition of sine and cosine as y-and x-coordinates of points on the unit circle and are familiar with the graphs of the sine and cosine functions.•Calculus - 9.0 Students use differentiation to sketch, by hand, graphs of functions. They can identify maxima, minima, inflection points, and intervals in which the function is increasing and decreasing.
Grade 8 CCSS Mathematics
The Grade 8 CCSS Math contain a large number of accelerated 1997 Content Standards:
Algebra I (26) Geometry (11)
Statistics, Data Analysis, and Probability (5) moved from Grade 7 Math
Plus 6 Completely New Math Standards
Algebra 1 Analysis Results
The CCSS for Algebra I contain a large number of accelerated 1997 Content Standards:
Algebra II (15) AP Probability and Statistics (6) Probability and Statistics (5) Pre-Calculus (1) Calculus (2) Trigonometry (3) Algebra I (60)
Plus 19 Completely New Algebra I Standards
Addressing acceleration
Goals
Increase the number of students taking four years of high school mathematics.
Maintain or increase the number of students taking Advanced Placement and other advanced high school mathematics courses.
Any acceleration should take into consideration a commitment of four years of high school mathematics.
• Successful transitions beyond high school, without the need for remediation, are in part dependent on students’ consistent math enrollment throughout high school. (WestEd, 2013)
• Irrespective of students’ math performance, taking four years of high-school math strengthens their postsecondary and employment opportunities in STEM-related fields. (WestEd, 2013)
Challenges to Acceleration
42%of TUSD’s 2013-14 students in Grade 12 are currently
enrolled in
an advanced math course in their 4th year of high school math.
(AP Calculus AB/BC, IB Math SL, Applied Calculus, AP Statistics, Pre-Calculus)
57%of TUSD’s 2013-14 students in Grade 12 are currently
enrolled in
their 4th year of high school math.
Senior Year
Junior Year
Sophomore Year
Freshmen Year
8th GradeYear
7th Grade Year
6th Grade Year
5th GradeYear
Math 5*
Math 6A*
Math 6
Math 7A*
Math 7 Math 8 GeometryAlgebra 1
Algebra 1*
* Signifies a course with an end of year mastery exam.
Geometry Algebra 2 Pre-CalcAP Calc
BC
Algebra 2
Pre-Calc
AP Calc AB
AP Statistics
IB Math SL
Finite Math
Applied Calculus
Accelerated Path
Traditional Path
Two Pathways – Four Years of High School Math
Honors Option Courses
Is Middle School Acceleration Possible?
1 •Advancing students through the sequence requires compacted courses without omitting content.
2 •Skipping standards is not recommended, as students will miss foundational skills.
3 •The creation of compacted courses must include all standards (i.e. covering and mastering content for more than one grade level in one school year).
Challenges to Acceleration
42-minute class periods in middle school equate to one lost class period per week as compared to high school length periods.
More content needs to be covered in these 42 minutes.
Acceleration may require a two-period math structure to accommodate the sheer amount of content involved with compacting 1.5 years of content into one school year.
Although accelerated Grade 8 students may take Algebra I, at this time Grade 8 students will take the Grade 8 Mathematics Smarter Balanced Assessment.
Decisions to accelerate students, especially in middle school, should be carefully considered.
• Solid evidence of mastery of prerequisite standards should be required; diagnostic testing can help identify strengths and challenges in particular areas of math content (WestEd, 2013).
Recommendation
Traditional Course
Pathway
•Grade 6 Math•Grade 7 Math•Grade 8 Math
Accelerated Course
Pathway• Grade 6
• Grade 6 Math• First 1/2 of Grade 7
Math • Grade 7
• Second 1/2 of Grade 7 Math
• Grade 8 Math• Grade 8 - Algebra I
Two Course Pathways for Students
Packs Algebraic skills over 3 years to build strong
conceptual skills.
Our Plan for 2013-141 • Obtain Board direction.
2• Create bridge course
support for 2013-14 to close the gaps.
3• Create curriculum for grades 6/7
and 7/8 combined classes to support acceleration for the 2014-15 school year.
4• Develop assessments
(placement, interim, and end-of-course).
5• Rename courses and update
Course Catalog for 2014-15.
6• Communicate and elicit
feedback from our community.