mathematical thinking. is of course very special
TRANSCRIPT
Mathematical thinking
is of course
very special
Why should we care about whether it’s
special?
Because we’re asking society to fund us to teach it.
Because we want to be able to recognise mathematical thinking when we see it.
Because somebody might ask us – at a party or in a classroom.
Because a teacher’s political position +
her general educational philosophy +
her views about nature of mathematics and numeracy
= (sort of)her approaches to teaching, and to curriculum and accreditation issues
Based on Ernest, P., 1991, The Philosophy of Mathematics Education, Basingstoke, Flamer Press
What do you really hope or believe about the “specialness” of maths?
Hopes and beliefs exercise
What makes maths special?
•Content?•Style of thinking?•Style and standards of proof?
Maths is ABOUT something
It’s about numbers orshapes orsymbols ormental objects or........
Bain, I. 1986. Celtic Knotwork. London: Constable
Bain, I. 1986. Celtic Knotwork. London: Constable
Zaslavsky, C. 1973 Africa Counts. Westport. Lawrence Hill & Co.
Zaslavsky, C. 1973 Africa Counts. Westport. Lawrence Hill & Co.
Zaslavsky, C. 1973 Africa Counts. Westport. Lawrence Hill & Co.
Zaslavsky, C. 1973 Africa Counts. Westport. Lawrence Hill & Co.
Deal or No Deal.
Any mathematical thinking going on there?
OK...... it’s not about things......
it’s about FACTS about the things.
Maths is really a set of facts about the world...
like 1 + 1 = 2
Or.......
“for every line, L, and point, P, which is not on that line, there exists a unique line, M, through P that is parallel to L.”
Is that a fact? A mathematical fact?
Ok, forget content, forget facts.
Maths isn’t a noun, it’s a verb.
It’s about a style of thinking.
style of thinking.....
logical objective challenging integrated stuck but happy knitting ideas together deductive consistent compartmentalised
creative questioningstep-by-step disciplined rule-generating speculating generalising enquiring practical abstract well-organised
rule-following proof refutation algorithmic
structured by leaps and bounds intuitive
How about proof?
If you prove something, you’ve been doing mathematical thinking........?
And if you haven’t proved something, you haven’t .......?
When is a proof really a proof?
Formal ? Algebraic? Computer-generated? Visual? Intuition? Consensus?
Proof-building by “incessant improvement of guesses by speculation and criticism, by the logic of proofs and refutations”Lakatos, I. (1976). Proofs and Refutations. Cambridge: Cambridge University Press.
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Mathematicians as enquirers
• Visual - thinking in pictures, often dynamic
• Analytic - thinking symbolically, often formalistically
• Conceptual - thinking in ideas, classifying
Burton, L. (2004). Mathematicians as Enquirers - Learning about Learning Mathematics. Dordecht: Kluwer Academic Publishers.
And finally.......
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