Hi Foo Keong-- It is so generous of you to even try to explain! And
your
question re math seems to me
relevant to other areas of knowledge as well when you ask, "Can we
condensefour thousand years of
human development into an easily digestible four minutes for
learners."
Could we consider four years, just for whole numbers? Davydov starts
with
Algebra as the gateway arithmetic. Jean Schmittau, Peter Moxhay and
others
believe his method of introducing youngesters to math has some extra
power.
As I understand it, others on xmca are dubious and look to other
sources of
difficulty. Karen Fuson, in her article on "developing mathematical
power
ins whole number operations" focuses on introducing number operations
through very simple, familiar, imaginable,
events where exchange is involved.
Its odd to me experiencing the cycle of time, the "coming back to the
beginning and recognizing it
for the first time" that is happening for me right now with
arithmetic and
early algebra. The source
is quite practical with social significance: the unbridgable gap the
children I work with face between
what their teachers are teaching about (say) subtraction (2005-118
is my
current keystone example)
trying to get their kids to learn that the first step is to subtract
8 from
15 and know enough to treat the
second zero as a 9. But the child, even understanding that the task
the
teacher is focused on is
disabled because when asked 15-8 the answer =3 and only painstaking
attention to the problem set up with fingers and subtracting one by
one,
with full compliance and even eagerness by the child, brings
her to 7.
Now suppose this phenomenon is ubiquitous, affects 100's of
thousands of
children, and is heavily correlated with social class.
Then .... ??? ....
I think my frustration is probably equivalent to yourse in
intensity, but
the quality is of a somewhat different nature.
mike
On Sat, Jun 6, 2009 at 3:11 AM, Ng Foo Keong <lefouque@gmail.com>
wrote:
I was trained in mathematics at the University of Cambridge (UK)
for my undergraduate studies, concentrating more on pure
mathematics (including algebra). I am able to roll out a
rigorous abstract proof of why "minus times minus" is a "plus",
using only the basic axioms of real numbers (actually you only
need a few of those axioms).
However, abstract proofs aren't likely to be useful for non-math
specialists and struggling neophyte learners of algebra. in
order to pull off such a proof, or even just to understand just
the few lines of proof, you almost need to be a mental masochist.
Who likes to go through mental torture?
Can we condense four thousand years of human development of
mathematical understanding into an easily digestible four minutes
for learners?
thus the huge gulf of understanding still persists. that's why
as an educator, i feel so useless being unable to help other
people. :-(
F.K.
2009/6/4 Mike Cole <lchcmike@gmail.com>:
I am currently reading article by Fuson suggestion by Anna Sfard
on whole
number operations. I also need to study Anna's paper with exactly
this
example in it. Not sure what moment of despair at deeper
understanding
hit
me. Now that I am done teaching and have a whole day to communicate
things
are looking up!! Apologies for doubting I could have deep
understanding
of
why minus x minus = plus and minus x plus = minus. At present my
understanding remains somewhat bifurcated. The former is negation
of a
negation as david kel long ago suggested, linking his suggestion to
Anna's
comognition
approach. The second I think more of in terms of number line and
multiplication as repeated addition.
Perhaps the two will coalesce under your combined tutelage.
mike
And member book links are coming in. Nice.
mike
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