Transcript Greenwich
Thinking Mathematically and Learning Mathematics Mathematically John Mason Greenwich Oct 2008 1 Conjecturing Atmosphere Everything said is said in order to consider modifications that may be needed Those who ‘know’ support those who are unsure by holding back or by asking revealing questions 2 Up & Down Sums 1+3+5+3+ 1 22 + 3 2 = = 3x4+1 1 + 3 + … + (2n–1) + … + 3 + 1 = 3 (n–1)2 + n2 = n (2n–2) + 1 Remainders of the Day Write down a number that leaves a reminder of 1 when divided by 3 and another and another Choose two simple numbers of this type and What is special about the ‘1’? multiply them together: what remainder does it leave when divided by 3? Why? What is special about the ‘3’? What is special about the ‘1’? 5 Primality What is the second positive non-prime after 1 in the system of numbers of the form 1+3n? 100 = 10 x 10 = 4 x 25 What does this say about primes in the multiplicative system of numbers of the form 1 +3n? What is special about the ‘3’? 6 Inter-Rootal Distances Sketch a quadratic for which the interrootal distance is 2. and another and another How much freedom do you have? What are the dimensions of possible variation and the ranges of permissible change? If it is claimed that [1, 2, 3, 3, 4, 6] are the inter-rootal distances of a quartic, how would you check? 7 Bag Constructions (1) Here there are three bags. If you compare any two of them, there is exactly one colour for which the difference in the numbers of that colour in the two bags is exactly 1. For four bags, what is the least number of objects to meet the same constraint? For four bags, what is the least number of colours to meet the same constraint? 8 17 objects 3 colours Bag Constructions (2) Here there are 3 bags and two objects. There are [0,1,2;2] objects in the bags with 2 altogether Given a sequence like [2,4,5,5;6] or [1,1,3,3;6] how can you tell if there is a corresponding set of bags? 9 Statisticality write down five numbers whose mean is 5 and whose mode is 6 and whose median is 4 10 ZigZags the graph of y = |x – 1| Sketch the graph of y = | |x - 1| - 2| Sketch the graph of y = | | |x – 1| – 2| – 3| What sorts of zigzags can you make, and not make? Characterise all the zigzags you can make using sequences of absolute values like this. Sketch 11 Towards the Blanc Mange function 12 Reading Graphs 13 Examples Of what is |x| an example? Of what is y = x2 and example? – y = b + (x – a)2 ? 14 Functional Imagining Imagine a parabola Now imagine another one the other way up. Now put them in two planes at right angles to each other. Make the maximum of the downward parabola be on the upward parabola Now sweep your downward 15 parabola along the upward parabola so that you get a surface MGA Getting-a-sense-of Manipulating Articulating Getting-a-sense-of Manipulating 16 Powers Specialising & Generalising Conjecturing Imagining Ordering & Convincing & Expressing & Classifying Distinguishing Assenting 17 & Connecting & Asserting Themes Doing & Undoing Invariance Freedom & Constraint Extending 18 Amidst Change & Restricting Meaning Teaching Trap Learning Trap Expecting the teacher to Doing for the learners do for you what you can what they can already do for themselves already do for yourself Teacher Lust: Learner Lust: – desire that the learner – desire that the teacher learn teach – desire that the learner – desire that learning will appreciate and be easy understand – expectation that ‘dong – Expectation that learner the tasks’ will produce will go beyond the tasks learning as set – allowing personal – allowing personal excitement to drive reluctance/uncertainty behaviour to drive behaviour 19 Human Psyche Training Behaviour Educating Awareness Harnessing Emotion Who does these? – Teacher? – Teacher with learners? – Learners! 20 Structure of the Psyche Awareness (cognition) Imagery Will Emotions (affect) Body (enaction) Habits Practices 21 Structure of a Topic Language Patterns & prior Skills Imagery/Senseof/Awareness; Connections Root Questions predispositions Different Contexts in which likely to arise; dispositions Standard Confusions & Obstacles Techniques & Incantations Emotion Only Emotion is Harnessable Only Awareness is Educable 22 Only Behaviour is Trainable Didactic Tension The more clearly I indicate the behaviour sought from learners, the less likely they are to generate that behaviour for themselves (Guy Brousseau) 23 Didactic Transposition Expert awareness is transposed/transformed into instruction in behaviour (Yves Chevellard) 24 More Ideas For Students (1998) Learning & Doing Mathematics (Second revised edition), QED Books, York. (1982). Thinking Mathematically, Addison Wesley, London For Lecturers (2002) Mathematics Teaching Practice: a guide for university and college lecturers, Horwood Publishing, Chichester. (2008). Counter Examples in Calculus. College Press, London. http://mcs.open.ac.uk/jhm3 [email protected] 25 Modes of interaction Expounding Explaining Exploring Examining Exercising Expressing Teacher Student Content Expounding Teacher Content Student Explaining Student Content Teacher Examining Student Teacher Content Exploring Content Teacher Student Expressing Content Student Teacher Exercising