MathAmigo
Your Helping Hand
Learning with MathAmigo
In all domains of learning, the development of expertise occurs only with major investment in time, and the amount of time it takes to learn is roughly proportional to the amount of material being learnt.
Singley and Anderton
The transfer of Cognitive Skills
Havard University Press, 1989
Although many people believe “talent” plays a role in who becomes an expert in particular area, even seemingly talented people require a great deal of practice in order to develop their expertise .
Ericsson et. al,
The role of deliberate practice in the acquisition of expert performance,
Psychological Review (1993)
MathAmigo gives the chance
for students to practice and:
1. Engage in lots of varied math work
2. Work at their pace
3. Develop their own strategies
4. Use feedback to improve the strategies
5. Learn with understanding
Mastery
MathAmigo aims at helping students master the different ideas and skills. Once a student has mastered a stage MathAmigo automatically moves them to the next stage, if they struggle it moves them back.
The next stage might present a broader view of the concepts, it might deal with the maths in more depth or simply present a different way of looking at the ideas.
You can link these stage activities together to create a set up. This way you can personalize the materials to suit each student.
Scope and Sequence
Years K-8
Counting to algebra
Correlate to Standards
Personalized to meet the needs of the students
Types of Activity
Concept building Developing Fluency Problem Solving
MathAmigo has 3 types of activity aimed at:
Concept Building
Concepts are the foundation of mathematics – we must take care in building them.
We can know our number facts but puzzle why is 7 x 0 = 0?
The activity helps students understand that multiplication is repeated addition we can see that:
0 + 0 + 0 + 0 + 0 + 0 + 0 = 0
In Stage 1 multiplication is
presented as addition of sets of objects
In Stage 2 the idea is repeated with numerals
instead of objects.
In Stage 3 the notion of repeated addition is
made specific.
In Stage 4 we revert to sets objects: this time displayed as an array – laying a foundation for
understanding area
Developing Fluency
The new science of learning does not deny that facts are
important for problem solving and thinking … However, the research shows clearly that
“usable knowledge” is not the same as a mere list of
disconnected facts. Experts’ knowledge is connected and organised around important
concepts…
John Bransford et. al,
How People Learn (p9)
National Academy Press (2000)
Look at the information screen and study the
pattern.
Developing Fluency
Based on the pattern.
What is the missing number?
Developing Fluency
How did you calculate your answer?
In this activity students use basic number facts and operations. They make choices, about how the make the calculation.
What is this missing number and how did you
calculate it?
Developing Fluency
Engagement in the activity:
1. Reinforces student’s factual memory through usage
2. Helps students understand the relationship between the basic operations
MathAmigo develops factual fluency by offering students
a wide range of different situations and contexts to
use their knowledge.
Introducing Problem Solving
MathAmigo does not encourage the teaching of methodology. If you build strong conceptual foundations you can offer students tasks that you might normally regard drill and practice in a way that includes problem solving.
Consider this example:
Introducing Problem Solving
The common way to teach this is making the students learn a mechanical algorithm (in this case a throw-back to Victorian schools).
67 49+ = ?
67
49+
Introducing Problem Solving
The common way to teach this is making the students learn a mechanical algorithm (in this case a throw-back to Victorian schools).
67 49+ = ?
67
49+
Introducing Problem Solving
We present the activity in the horizontal format to avoid encouraging this approach. If the students have a strong understanding of the number system and place value you can ask them to answer the question without teaching them a methodology. Here are two different ways answered by some 9 year old students:
67 49+ = ?
67 + 49 is 60 plus 40: that’s 100 and 7 plus 9 is 16 which makes the answer 116.
67 + 49 is 60 plus 50 which is 110 and 7 is 117 minus 1 equals 116.
There is a place for learning methods, but not at the expense of not developing the mathematical thinking skills shown by these students.
Look at the pattern opposite.
Mayan Number System: it is a vigesimal (base 20) system
Problem Solving
Problem Solving is the application of knowledge you have to situations you are unfamiliar with.
Solving this requires students to apply their understanding of place value and the number system.
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