Versions Compared

Key

  • This line was added.
  • This line was removed.
  • Formatting was changed.

One of a number of tried and tested technique for teaching work that students learners find hard to learn found in teaching tricks and tips

Making any problem more concrete makes it take less working memory - and that is one of the best ways of enhancing the learning of low attaining learners.

On this page are a number of examples where we expect our learners to record on their page, in a concrete way, perhaps with boxes, function machines etc The concrete diagrams will require the learner to hold less in working memory and so free up enough working memory to continue to solve the problem.

If we as teachers think about simplifying in algebrasimplify algebra simplifypq: 2g x 3g and simplifypq: 6gof a situation in which our working memory isn't sufficient and what we do about this, this will help in our teaching. At every step of problem solving we could think, what am I remembering? and would all my learners be able to hold all of this in their heads, without something slipping out?.

everyday situation when working memory isn't enough

Imagine you are getting a round of drinks in, could be a coffee run or a pub.

For 3 people you can probably remember what they all want Anja wants ... Bihl wants ... Carli wants ... 

However how about 6 people? ... 11 people ... probably not, so what we do is make a list - we have now "freed up" our short term memory and can now concentrate on getting the correct drinks ordered /milk and sugar in the correct mugs.

low attaining learners in maths have less working memory than their peers

I personally suspect that smaller working memories and shorter long term memory retention is causal to low attainment ... but I don't know any way to prove this (ethically) than try to improve low attaining learners effective memory capacity and strategies to increase long term memory intention. True or not, giving learners strategies that need less working memory, enables better attainment outcomes.

Giving learners more concrete methods "frees up" working memory to enable more available to concentrate on the rest of the maths problem (the rest of the maths problem is often the numeracy aspect). More concrete methods will  generally make learners more accurate. 

One of the problems with giving more concrete methods is that it often goes against giving "paper saving methods", which have come to be considered to be standard methods (for more on this see the long multiplication and long division sections below). 

The plan for this page is to build up examples as above and include links to "teaching Higher work to Foundation studentslearners" videos and more easy on the eye student or learner "remind-me" videos. For now though here is a list of situations where we have found asking students to  has helped.learners to make it more concrete has helped.

use boxes 

ratio

An abstract notion such as ratio is because it is hard to "hold on to mentally" so takes up a lot of working memory (of course it is also hard because it involves multiplying, dividing and finding a scale factor) - so enabling learners to have a concrete model which they can put on the page, and not need to hold in working memory is hugely beneficial. With the problem

ratio: £48 3to 5 (remove this picture once video is available)

Image Added

Note we encourage learners to draw out the ratio as boxes and label the boxes - moving from the abstract to the concrete.If we further provide a rational as to why Eva gets less than Francis (such as Eva worked for 3 hours and Francis worked for 5) then we have removed that worry form our learners minds. Now we have "freed up" working memory so learners can concentrate on solving the rest of the problem. 

This method can be adjusted for more complex situations

  • ... how much more money does Francis get than Eva
  • Francis gets £10 more than Eva, how much ....
  • Eva gets $240 how much does Francis get
  • A piece of copper pipe is divided in the ratio 3:5 
  • A piece of copper pipe is divided in the ratio 1:3:5 

Other situations where using boxes helps

  • fraction of
    • fraction of: fraction of the thing
    • fraction of: LESLEY rerecord fraction of the number
  • convert between a ratio and a fraction 
    • FD%RasaFD%R: ratio3to4Fraction
    • FD%RasaFD%R: Fasaratio

use function diagrams

  • solve

    solve: 4e + 22 = 70 (where the function machine is writing out all the things that happen to e  long-windedly)

    solve: m - 6 = 8 (where the function machine is writing out what happens to m  long-windedly)

  • change units
    • changeUnits: m2cm
    • changeUnits: grams2kg

  • exchange rate

start with a standard way to write out the first step

  • simple probability - write out all the possible outcomes
  • % of CALC problems - write word problem in maths
    • percent CALC: 17%
  • % of NC problems - start by writing 100% = ...
    • percent NC: 2% of £560
    • percent NC: 10% of £4.60 LESLEY record
  • expand
    • expand: number(outside a bracket) algebra 5(x + 3) 
    • expand: just a letter(outside a bracket) x(x-3) algebra
    • expand: (a bracket squashed)(next to another bracket) exp&simp (m + 3)(m+2)
  • BIDMAS problems, write out the problem (with more space and write out BIDMAS and then again in signs)
  • discreteDataDiagram: pictograms, write the amount inside each picture