10/19/2011 1 What Mathematics is important for (future) Work? How to achieve a balanced curriculum Henk van der Kooij Freudenthal Institute, Utrecht University [email protected]Goals for math education 1. To prepare for (critical) citizenship 2. To prepare for future work 3. To prepare for further learning In most countries, ‘further learning’ still seems the most (or only?) important drive 2 No balanced curriculum at all!! 3 100 ? ? ? Abstract version of a problem from a Dutch textbook (1986) 53 47 10 100 x z y x + y = 100 x + z = 63 y + z = 57 5 100 ? ? ? Strategy 1: 63+57+100 = 220 and 220:2 = 110 110 – 57 = 53 110 – 100 = 10 110 – 63 = 47 6 Strategy 2: L + R = 100 and L = R + 6 100 ? ? ? L so L = 50 + 3 and R = 50 – 3 and U = 10 R
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In most countries, ‘further learning’ still seems the most (or only?) important drive
2
No balanced curriculum at all!!
3
100?
?
?
Abstract version of a problem from a Dutch textbook (1986)
5347
10
100x
z
y
x + y = 100
x + z = 63
y + z = 57
5
100?
?
?
Strategy 1: 63+57+100 = 220 and 220:2 = 110
110 – 57 = 53 110 – 100 = 10 110 – 63 = 47
6
Strategy 2: L + R = 100 and L = R + 6
100?
?
?L
so L = 50 + 3 and R = 50 – 3
and U = 10
R
10/19/2011
2
7
?
?Start here with 0
So this number has to be -6
Then this number is 63
But the sum should be 100, so I am 106 away. Therefore start with half the difference: 53
Strategy 3:
100?
?
?
8
?
Start here with x
So this number has to be 57 – (63 – x) = x – 6
Then this number is 63-x
x + (x – 6) = 100, so 2x = 106
And thus: x = 53
Strategy book:
100?
?
?
Non-professional ‘mathematicians’ solve problems different from professional mathematicians
When you are not a professional mathematician, you try to find an answer to the stated problem by making use of the context in which the problem is stated
Lesson learned:Pilots at work
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Research among practitioners in England, carried out in the 90-sCelia Hoyles and Richard Noss
They observed, interviewed and “worked” with bank staff, nurses and pilots
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150 km/h
N
S
90°
N
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N
S
130°
75 km/h
wind
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3
13
A
B
C
c=150 a = 75
γ = 40°
a
sinα=
b
sinβ=
c
sinγ
40°
?
?
75
sinα=
bsin β
=150
sin400
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Problems like this were offered to pilots in a school-like setting : sitting in a classroom with pencil and paper
� some pilots were not able to do it outsidethe cockpit
� others were not able to do it without theinstruments at hand
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A
q
pr
B
2 m/s
1 m/s
r
a
-q
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A number of pilots could not solve this problem!
The numbers were so much smaller than the ones they were used to, that the problem did not make sense to them.
Situated abstraction
Practitioners at work do use situated abstraction inwhich local mathematical models and ideas are usedthat are only partly valid in a different context becausethey are connected to anchors within the context of theproblem itself
T = 2πl
g y = 2 x
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F m a= ⋅ V I R= ⋅and
� The (work) context is of influence on the way in
which mathematical activities take place
� Transfer of mathematical knowledge is not selfevident
Research findings onwork-related math
(Noss & Hoyles, Steen, …)
• reading and interpreting tables, charts and graphs
• use of ICT (like spreadsheets)
• dealing with numbers, often not precise andcoming with units of measurement
• proportional reasoning
• statistical process control activities
• representing and analyzing data
• multi-step problem solving
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Focus on ‘math for work’
My interest in this area started in 1996:
Curriculum reform project in vocational education (engineering) with the aim to:
Make Math and Physics really supportive for vocational courses
1920
20
Dutch school system
age
12
14
16
18
Primary Education ( age 4 - 12)
Secondary Education
VWO
pre university
generalHAVO
middle level
general
VMBO
lower level
pre-vocational
university higher
vocational
educationSenior high
vocational
education
reading and interpreting tables, charts and graphs
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f =c ⋅ F ⋅ l 3
E ⋅ w ⋅ h 3⋅ 9.81
proportional reasoning
Flexion of a beam
23 24
Find the relationship between b, f and the entries d of the table
Geometry: cut/copy and pasteSchool Mathematics: Ideal, abstract world
Mathematics at Work: Real, complex world
Elementary use of sophisticated mathematics
Sophisticated use of elementary mathematics
Lynn Arthur Steen (USA)
Models and continuous functions
Discrete data and measurements: Data analysis
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exists in this world as a real object2
in this world is an operation not yet finished;given the tolerance it will be 1.4…2
If a ‘balanced curriculum’ is what we want to have
(citizenship, work and further learning) …
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… how can that be organized?
Difficult when viewed from the existing content perspective
PISA Framework (OECD, 2003)Modern view on mathematics emphasizes‘the study of pattern’ and ‘dealing with data’
To be used to define a balanced curriculum?
Ove
rarc
hin
g th
em
es
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• (Patterns in) Space and Shape
• (Dealing with) Uncertainty
• (Patterns in) Change and Relationships
• (Patterns in) Quantity
Policies and Politics (Economic factor) 1
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Policies and Politics (Economic factor) 2
We believe, after examining the findings of cognitive science, that themost effective way of learning skills is "in context," placing learningobjectives within a real environment rather than insisting that students firstlearn in the abstract what they will be expected to apply.(SCANS, 1991, USA)
Mathematical competence is the ability to develop and applymathematical thinking in order to solve a range of problems in everydaysituations. Building on a sound mastery of numeracy, the emphasis is onprocess and activity, as well as knowledge. Mathematical competenceinvolves, to different degrees, the ability and willingness to usemathematical modes of thought (logical and spatial thinking) andpresentation (formulas, models, constructs, graphs, charts).(Key competence 3, 2007, EU)
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Why do curricula worldwide not (or only poorly) reflect these visions?
Probably because of the deeply rooted belief that math has to be learned through a linear sequence:from arithmetic, via algebra to functions and calculus (with some probability/statistics and geometry alongside)
This is a safe environment, in particular seen from the perspective of teaching and assessment.“It worked for us, so it will work for them”
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What ‘work-math’ aspects should be included in a balanced curriculum?
• interpreting and analyzing tables, graphs
• use (and design) of spreadsheets
• proportional reasoning
• some discrete math
• dealing with data, uncertainty
• multi-step problem solving activities
• modeling activities
• logical and critical thinking
• making decisions34
Time for a balanced curriculum?!
35source: Jan de Lange, Freudenthal Institute
quantitative literacy
(pre-) vocational(62%)
pre-university(22%)
work-related math
Informal math formal math
Work
Learning
Citizenship
pre-higher voc(16%)
Consequences for curricula in secondary education
� including workplace related topics needs time, soreconsider the value of traditional topics
?? skip quadratics (polynomials) as a main topic??
� reconsider the curriculum from the ‘PISA- perspective’
� create time for project days or – weeks to challengestudents with modeling activities
� stop thinking about linear sequencing (difficult!) of acurriculum
� add ‘workplace elements’ in current classroom practice