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Implementing the Common Core Through Increased Rigor

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Presentation on theme: "Implementing the Common Core Through Increased Rigor"— Presentation transcript:

1 Implementing the Common Core Through Increased Rigor
Lisa Choate Cannon County High School Woodbury, Tennessee

2 Only high school in our county
650 +/- students Middle Tennessee Only high school in our county

3 Proficient and Advanced
Algebra one progress This represents a 455% increase over the last 3 years! 50% Proficient and Advanced 31% 9%

4 Proficient and Advanced
Algebra Two Progress This represents a 224% increase over the last year! Proficient and Advanced

5 Algebra Lab for struggling freshmen math students
How did we do iT? Algebra Lab for struggling freshmen math students Failure is not an option Standards-based grading Formative Assessment Lessons

6 http://map.mathshell.org/materials/download.php?fileid =700

7 What a formative assessment is…
Students demonstrate what they know Students apply knowledge in new situations Assessment AS learning

8 What a formative assessment is not…
A test

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10 Lesson structure

11 Assessment (Pre and Post)

12 Review pre-assessments Group homogeneously 2 or 3 in a group
Grouping Review pre-assessments Group homogeneously 2 or 3 in a group

13 The keys to success are…
Allow productive struggle. Do not give away anything. MP1 Press for justification. Ask advancing questions. MP3

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15 Disclaimer: I don’t baby step.
Task Disclaimer: I don’t baby step. At this point, the script suggests you review the different forms of quadratics, but I believe that decreases the rigor. I use the task as a review of quadratics.

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18 Justification I use legal paper and include 5 blank cards for them to include their justifications. Justification Justification Justification I don’t give them tape until they have justified every match. Justification

19 The teacher should be circulating around the groups as an OBSERVER.
Facilitation notes The teacher should be circulating around the groups as an OBSERVER. This is when you can ask the assessing and advancing questions.

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23 e If you focus on “right” answers, as soon as the “right” answer is revealed, everyone shuts down. Multiple solution paths! You may do this using a document camera or having students hold up their work in front of the class.

24 Assessment (Pre and Post)

25 Ball Toss Vertical Projectile Motion h(t) = -1/2 gt2 + vt + h
Where g = gravity (9.8 m/sec) t = time h = height v = initial velocity h(t) = height for given time This is a short task that we do in one day. Y= x x

26 Recognizing the level of thinking as demonstrated by students
Rigor is… Scaffolding thinking Planning for thinking Assessing thinking about content Recognizing the level of thinking as demonstrated by students Managing the teaching/ learning level for the desired thinking level Rigor is not… More or harder worksheets AP or honors courses More homework Only for “smart” students Source:

27 Where do I get these rigorous tasks?

28 What is the maximum? {hint: The maximum is the y-value of the vertex.}
Textbook problem Too much scaffolding f(x) = -16x2 +200x Graph the parabola. Identify the vertex. What is the maximum? {hint: The maximum is the y-value of the vertex.} What will a student remember from this problem? No room for multiple solution paths No real-world connection

29 Superman is jumping over a 612 foot
Modified for added rigor Superman is jumping over a 612 foot high building. He has an initial velocity of 200 feet/second. Will Superman clear the building? Defend your conclusion by proving it at least 2 ways. Students will remember this problem Real-world connections No scaffolding, but it can be added for students who need it Requires multiple solution paths Although we will probably have to provide the equation “f(x) = -16x x” students will be required to THINK about what the equation and its individual parts actually means.

30 4. Model with mathematics.
Textbook problem f(x) = -16x2 +200x Graph the parabola. Identify the vertex. What is the maximum? {hint: The maximum is the y-value of the vertex.} CCSS A-REI.10 F-IF.4 F-IF.7 MP 4. Model with mathematics.

31 Superman is jumping over a 612 foot
Modified for added rigor Superman is jumping over a 612 foot high building. He has an initial velocity of 200 feet/second. Will Superman clear the building? Defend your conclusion by proving it at least 2 ways. CCSS A-SSE.1 A-CED.1 F-IF.4 F-IF.5 *F-IF.2 *F-IF.7 *F-IF.8.a *potentially MP Make sense of problems and persevere in solving them. 3. Construct a viable argument and critique reasoning of others. 4. Model with mathematics. 7. Look for and make use of structure. Although we will probably have to provide the equation “f(x) = -16x x” students will be required to THINK about what the equation and its individual parts actually means.

32 Strategies for modifying textbook tasks
Include a prompt instructing students to represent the solution another way (table, graph…) and to write about their insights gained from looking at the new representation. Ask students to create a real-world story for “naked number” problems.

33 Strategies for modifying textbook tasks
Eliminate components of the task that provide too much scaffolding. 3. Use a task “out of sequence” before students have memorized a rule or practiced a procedure that can be routinely applied.

34 Strategies for modifying textbook tasks
5. Adapt a task so as to provide more opportunities for students to think and reason-let students figure out things for themselves.

35 Find the solutions of the equation for x=0 and y = 0.
swimming Original 37. If you swim the backstroke, you burn 9 cal/min. If you swim the butterfly stroke, you burn 12 cal/min. The equation 9x+12y = 360 models how you can burn 360 calories by swimming the backstroke for x minutes and the butterfly stroke for y minutes. Find the solutions of the equation for x=0 and y = 0. Explain what the solutions mean. Graph the solutions you found in part A. Draw a line through the points. Use your graph from part B. If you swim the butterfly stroke for 10 min., how long should you swim the backstroke to burn 360 calories?

36 Swimming Modified If you swim the backstroke, you burn 9 cal/min. If you swim the butterfly stroke, you burn 12 cal/min. You want to burn 360 calories. Determine a way to find all the combinations of swimming the butterfly stroke and the backstroke that will meet this goal. Write and graph an equation that represents the relationship you described in part A. If you swim the butterfly stroke for 10 minutes, how long must you swim the backstroke to burn 360 calories? Notice the student must determine the equation.

37 Find the solutions of the equation for x=0 and y = 0.
swimming Original 37. If you swim the backstroke, you burn 9 cal/min. If you swim the butterfly stroke, you burn 12 cal/min. The equation 9x+12y = 360 models how you can burn 360 calories by swimming the backstroke for x minutes and the butterfly stroke for y minutes. Find the solutions of the equation for x=0 and y = 0. Explain what the solutions mean. Graph the solutions you found in part A. Draw a line through the points. Use your graph from part B. If you swim the butterfly stroke for 10 min., how long should you swim the backstroke to burn 360 calories? What learning happens here?

38 Swimming Modified If you swim the backstroke, you burn 9 cal/min. If you swim the butterfly stroke, you burn 12 cal/min. You want to burn 360 calories. Determine a way to find all the combinations of swimming the butterfly stroke and the backstroke that will meet this goal. Write and graph an equation that represents the relationship you described in part A. If you swim the butterfly stroke for 10 minutes, how long must you swim the backstroke to burn 360 calories? What learning happens here?

39 We cannot get high cognitive demand from a low-level task
We cannot get high cognitive demand from a low-level task. What do we say to our students when we give them a low-level task?

40 But you don’t know MY students…
“Every morning in Africa, a gazelle wakes up. It knows it must run faster than the fastest lion or it will be killed. Every morning a lion wakes up. It knows it must outrun the slowest gazelle or it will starve. Moral: It doesn’t matter whether you are a lion or a gazelle, when the sun comes up, you had better be running.” ---African Proverb

41 Other Resources ex.php (official CC website) (PARCC website) dy/dan (Dan Meyer’s amazing blog)


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