What is the Discipline of Mathematics Education? Essential Maths & Mathematical Essences

What is the Discipline of Mathematics Education?Essential Maths&Mathematical Essences John Mason Hobart 2007

Outline • Justifying “a problem a day keeps the teacher in play” • What mathematics is essential? • What is mathematical essence?

Grid Movement ((7+3)x2)+3 is a path from 7 to ‘?’. What expression represents the reverse of this path? What values can ‘?’ have: if exactly one - and one ÷ are used? Max value? Min Value? x2 ? ÷2 7 What about other cells?Does any cell have 0? -7? Does any other cell have 7? Characterise ALL the possible values that can appear in a cell -3 +3

x2 ? ÷2 7 +3 -3 Reflections • What variations are possible? • What have you gained by working on this task (with colleagues)? • What criteria would you use in choosing whether to use this (or any) task? • What might be gained by working on (a variant of) this task with learners? Tasks –> Activity –> Experience –> ‘Reflection’

More Disciplined Enquiry • What is the point? (Helen Chick) • Outer task & Inner task • What is the line? (Steve Thornton) • Narrative for HoD, Head, parents, self • What is (the) plain? • What awarenesses? What ‘outcomes’? • What is the space? • Domain of related tasks • Dimensions of possible variation; ranges of permissible change

Differences AnticipatingGeneralising Rehearsing Checking Organising

Sketchy Graphs • Sketch the graphs of a pair of straight lines whose y-intercepts differ by 2 • Sketch the graphs of a pair of straight lines whose x-intercepts differ by 2 • Sketch the graphs of a pair of straight lines whose slopes differ by 2 • Sketch the graphs of a pair of straight lines meeting all three conditions

Chordal Midpoints • Where can the midpoint of a chord of your cubic get to?(what is the boundary of the region of mid-points?) • What about 1/3 points or 4/3 points?

Justifying ‘doing’ maths for oneself and with others • Sensitise myself to what learners may be experiencing • Refresh my awareness of the movements of my attention • Remind myself what it is like to be a learner • Experience the type of task I might use with learners

Awarenesses Give a family a fish and you feed them for a day Show them how to fish, and you feed them until the stocks run out Obtaining tasks and lesson plans gets you through some lessons … Becoming aware of affordances, constraints and attunements, in terms of mathematical themes, powers & heuristics enables you to promote learning

area more same less altitude more more altless area more altmore area more altsame area Same altmore area same altless area same less less altmore area less altsame area less altless area More Or Less Altitude & Area Draw a scalene triangle

more same less area No. of rectangles more more rectsless area more rectsmore area more rectssame area same rectsmore area same rectsless area same fewer rectsmore area fewer rectssame area fewer fewer rectsless area More Or Less Rectangles & Area Draw a rectilinear figure which requires at least 4 rectangles in any decomposition How many can have the same perimeter?

more same less more same less More Or Less Percent & Value 50% of something is 20 Value % 60% of 60 is 36 60% of 30 is 20 40% of 30 is 12 50% of 60 is 30 50% of 40 is 20 50% of 30 is 15 40% of 60 is 24 40% of 50 is 20 40% of 40 is 16

more same less more same less More Or Less Whole & Part ? of 35 is 21 Part Whole 3/4 of 28 is 21 6/7 of 35 is 30 3/5 of 35 is 21 3/5 of 40 is 24

2 6 7 2 1 5 9 2 8 3 4 Sum( ) – Sum( ) = 0 Magic Square Reasoning What other configurationslike thisgive one sumequal to another? Try to describethem in words

Sum( ) – Sum( ) = 0 More Magic Square Reasoning

Graphical Awareness

Multiplication as Scaling • If you stick a pin in Hobart in a map of Australia, and scale the map by a factor of 1/2 towards Hobart • And if a friend does the same in Darwin, scaling by 1/2 towards Darwin • What will be the difference in the two scaled maps? What if one of you scales by a factor of 2/3 towards Hobart and then by a further 1/2 towards Darwin, while the other scales by 1/2 towards Darwin and then by a further 2/3 towards Hobart?

Raise Your Hand When You See … Something which is 2/5 of something; 3/5 of something; 5/2 of something; 5/3 of something; 2/5 of 5/3 of something; 3/5 of 5/3 of something; 5/2 of 2/5 of something; 5/3 of 3/5 of something; 1 ÷ 2/5 of something;1 ÷ 3/5 of something

Essential Conceptual Awarenesses • Choosing the unit • Additive actions • Multiplicative actions • Scaling; multi-ply & many-fold, repetition, lots of; … • Coordinated actions • Angle actions • Combining • Translating • Measuring actions • Comparing lengths; areas; volumes; (unit) • Comparing angles • Discrete-Continuous • Randomness

Essential Mathematical-nesses • Mathematical Awarenesses underlying topics • Movement of Attention • Mathematical Themes • Mathematical Powers • Mathematical Strategies • Mathematical Dispositions Ways of working on these constitute a (the) discipline of mathematics education

Movement of Attention • Gazing (holding wholes) • Discerning Details • Recognising Relationships • Perceiving Properties • Reasoning on the Basis of Properties Compare SOLO & van Hiele

Mathematical Themes • Doing & Undoing • Invariance in the midst of Change • Freedom & Constraint • Extending and Restricting Meaning • …

Mathematical Powers • Imagining & Expressing • Specialising & Generalising • Conjecturing & Convincing • Classifying & Characterising • …

Mathematical Strategies/Heuristics • Acknowledging ignorance (Mary Boole) • Changing view point • Changing (re)presentation • Working Backwards • …

Mathematical Dispositions • Propensity to ‘see’ the world math’ly • Propensity to pose problems • Propensity to seek structure • Perseverence • …

Essential Pedgaogic Awarenesses • Tasks • initiate activity; • activity provides immediate experience; • learning depends on connecting experiences, often through labelling when standing back from the action • Mathematics develops from engaging in actions on objects; and those actions becoming objects, … • Actions need to become not just things done under instruction or guidance, but choices made by the learner

Choices • What pedagogic choices are available when constructing/selecting mathematical tasks for learners? • What pedagogic choices are available when presenting mathematical tasks to learners? • What criteria are used for making those choices?

What mathematics is essential? • Extensions of teaching-maths • Experience analogously something of what learners experience, but enrich own awareness of connections and utility • Extensions of own maths • Experience what it is like to encounter an unfamiliar topic

It is only after you come to know the surface of things that you venture to see what is underneath; but the surface of things is inexhaustible (Italo Calvino 1983)

Human Psyche Only awareness is educable Only behaviour is trainable Only emotion is harnessable Mental imagery Awareness (cognition) Emotion (affect) Behaviour (enaction)

What Can a Teacher Do? • Directing learner attention by being aware of structure of own attention (amplifying & editing; stressing & ignoring) • Invoking learners’ powers • Bringing learners in contact with mathematical heuristics & powers • Constructing experiences which, when accumulated and reflected upon, provide opportunity for learners to educate their awareness and train their behaviour through harnessing their emotions.

I am grateful to the organisers for affording me the opportunity and impetus to contact, develop and articulate these ideas For this presentation and othersand other resources see http://mcs.open.ac.uk/jhm3

What is the Discipline of Mathematics Education? Essential Maths & Mathematical Essences