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Webinar

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Title: Webinar


1
Mathematics and the NCEA realignmentPart three
  • Webinar
  • facilitated by
  • Angela Jones
  • and
  • Anne Lawrence

2
Mathematics and the NCEA realignment
  • AS 1.5
  • Feedback on the standard and the task
  • Implications for teaching and learning
  • Supporting deeper thinking
  • Understanding different levels of thinking
  • Next steps

3
Mathematics and NCEA realignment
Introductions
  • Angela Jones
  • Senior adviser
  • Secondary Outcomes Team
  • Ministry of Education
  • angela.jones_at_minedu.govt.nz
  • Anne Lawrence
  • Adviser in Numeracy, Mathematics Statistics
  • Massey University College of Education
  • a.lawrence_at_massey.ac.nz

4
AS 1.5 Apply measurement in solving problems
  • Achieve
  • Apply measurement in solving problems.
  • Merit
  • Apply measurement in solving problems,
  • using relational thinking.
  • Excellence
  • Apply measurement in solving problems,
  • using extended abstract thinking.

5
Achievement standard 1.4
Key skills and knowledge for 1.5
  • Measurement includes the use of standard
    international metric units for length, area,
    capacity, mass, temperature, and time. Derived
    measures include density, speed and other rates
    such as unit cost or fuel consumption.
  • Students will be expected to
  • be familiar with perimeter, area and surface
    area, volume, metric units.
  • convert between metric units, using decimals
  • deduce and use formulae to find the perimeters
    and areas of polygons, and volumes of prisms
  • find the perimeters and areas of circles and
    composite shapes and the volumes of prisms,
    including cylinders
  • apply the relationships between units in the
    metric system
  • calculate volumes, including prisms, pyramids,
    cones, and spheres, using formulae.

6
Achievement standard 1.4
Solving problems at A, M and E for 1.5
  • Solving problems - using a range of methods
    solving problems, demonstrating knowledge of
    concepts, solutions usually require only one or
    two steps.
  • Relational thinking - one or more of a logical
    sequence of steps connecting different concepts
    and representations demonstrating understanding
    of concepts forming and using a model, and
    relating findings to a context, or communicating
    thinking using appropriate mathematical
    statements.
  • Extended abstract thinking - one or more of
    devising a strategy to investigate or solve a
    problem identifying relevant concepts in
    context developing a chain of logical reasoning
    forming a generalisation, and using correct
    mathematical statements, or communicating
    mathematical insight.
  • Problems are situations that provide
    opportunities to apply knowledge or understanding
    of mathematical concepts. The situation will be
    set in a real-life or mathematical context.
  • The phrase a range of methods indicates that
    there will be evidence of at least three
    different methods.

7
Achievement standard 1.4
What does excellence look like?
Student B
Student A
Student C
Student D
Student E
8
Supporting M and E thinking
  • Students need to develop their own understanding
    of what A, M and E looks like.
  • They need to
  • Explore examples of A, M and E work
  • Discuss student work (their own and others)
  • Evaluate student work (their own and others)
  • Is this at the M standard?
  • What else is needed to make it to M?
  • What could you take away and still have it M?

9
From Dan Meyer (US maths teacher)
  • Dan Meyer Ted Talk - recommended viewing for all
    maths teachers
  • http//www.youtube.com/watch?vBlvKW
  • Questions to ask as you watch Dans talk
  • What do you see as Dans key message(s)?
  • What are the implications for the classroom?
  • What are the key message(s) for you from Dans
    talk?

10
From Dan Meyer (US maths teacher)
  • Dan Meyer Ted Talk
  • http//www.youtube.com/watch?vBlvKW

11
Levels of thinking, NZC and NCEA
The NZC requires that deeper and more complex
thinking are rewarded along with more effective
communication of mathematical ideas and outcomes.
These are fundamental competencies to
mathematics. NCEA realignment supports this
focus. Students need to engage with activities
that provide the opportunity to develop numeric
reasoning, relational thinking and abstract
thinking in solving problems.
12
Rich mathematical activities
  • Key questions
  • What sorts of activities are appropriate?
  • How do we support students to access these
    activities?
  • What are appropriate levels of scaffolding?

13
Levels of demand
  • Lower level demands
  • Memorisation
  • Procedures without connections
  • Higher level demands
  • Procedures with connections
  • Doing mathematics
  • Students of all abilities deserve tasks that
    demand higher level skills BUT teachers and
    students conspire to lower the cognitive demand
    of tasks!

14
Fuel for thought
  • Which of the following would save more fuel?
  • Replacing a compact car that gets 34 miles per
    gallon (MPG) with a hybrid that gets 54 MPG
  • Replacing a sport utility vehicle (SUV) that gets
    18 MPG with a sedan that gets 28 MPG
  • Both changes save the same amount of fuel.

15
Student responses
  • Alex I see that the change from 34 to 54 MPG is
    an increase of 20 MPG, but the 18 to 28 MPG
    change is only a change of 10 MPG. So, replacing
    the compact car saves more fuel.
  • Bo The change from 34 MPG to 54 MPG is an
    increase of about 59 while the change from 18 to
    28 MPG is an increase of only 56. So the
    compact car is a better choice.

16
  • Chloe I thought about how much gas it would take
    to make a 100-mile trip.
  • Compact car
  • 100 miles/54MPG 1.85 gallons used
  • 100 miles/34MPG 2.94 gallons used
  • SUV
  • 100 miles/28MPG 3.57 gallons used
  • 100 miles/18MPG 5.56 gallons used
  • The compact car saved 1.09 gallons while the SUV
    saved 1.99 gallons for every 100 miles. That
    means you actually save more gasoline by
    replacing the SUV.

17
Fuel for Thought
Using technology A general graph of what occurs
with different MPG amounts
What do you notice? Can you draw a conclusion?
18
Always, sometimes or never true?
  • If two rectangles have the same perimeter, they
    have the same area.
  • If two cubes have the same volume, they have the
    same surface area.

19
Putting your own spin on this
  • Think about any topic
  • Recast the content as questions that students can
    explore
  • Resist the temptation to tell students the
    content. Believe that students can investigate
    and derive relationships and mathematical
    concepts.

20
Exploring activities
  • Where would this activity fit?
  • What is the level of demand?
  • How can I extend the activity?
  • How can I support students who are stuck?

21
Plan to get the most out of activities
  • Use problems that have multiple entry points
  • students at different levels of mathematical
    experience and with different interests all need
    to engage meaningfully in reasoning about a
    problem.
  • Plan questions for when
  • students get stuck
  • students think they have the solution
  • students are unable to extend the problem
    further.

22
An abundance of sources for rich tasks
http//www.shyamsundergupta.com/amicable.htm http
//micro.magnet.fsu.edu/primer/java/scienceopticsu
/powersof10/ http//www.curiousmath.com/index.php
?nameNewsfilearticlesid55 http//www.maths.s
urrey.ac.uk/hosted-sites/R.Knott/Fractions/egyptia
n.html http//mathbits.com/virtualroberts/spacema
th/BottleTop/project.htm http//www.noao.edu/educ
ation/peppercorn/pcmain.html http//mathbits.com
/virtualroberts/spacemath/BottleTop/project.htm
23
Key implications
  • Rich mathematical activities provide the
    opportunity for students to develop their
    thinking
  • Sharing, examining and discussing student work
    develops students understanding of A, M and E

24
Next steps
  • Discuss in your department
  • Participate in the online forum
  • Feedback
  • Discussion, questions and comments
  • Ideas for tasks
  • Moderating assessment
  • Look out for what is on offer next year

25
Next steps
  • Discuss in your department
  • Participate in the online forum
  • Feedback
  • Discussion, questions and comments
  • Ideas for tasks
  • Moderating assessment
  • Look out for what is on offer next year
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