Tuesday, 14 August 2012

Times tables - part of our mental map - or should be

Here's another contribution (not from me) to the times tables debate

The current proposals for reform of the primary maths curriculum appear to be yet another strand in Michael Gove's ideological assault on learning. As with the 'facts, facts, facts' approach to history teaching, it seems to be a case of treating learning as merely a series of boxes to tick: specific items of knowledge, separated from each other. It runs contrary to more egalitarian notions of learning, which grasp the complexity of learning and focus on conceptual development: making connections, understanding and applying concepts, developing higher levels of thinking.

The government's latest is also part of the obsessive teacher-blaming and determination to distract us from the real (political and economic) causes of high unemployment and poverty that we expect from the Tories.

But opposition to Gove's ideology should not mean rejecting the notion of multiplication tables as a core understanding. Indeed they are valuable to conceptual development. They are not simply a discreet factual topic (like, say, learning the names of the world's capital cities).

We should reject the absurdly prescriptive approach of demanding that ALL children must know their times tables by a certain age - why nine years old anyway? where does that come from? - and reject the framing of times tables as one of a series of 'basic skills' like spelling that are given a reified status. Actually, they are cognitively very different to spelling - for example, learning how to spell is all about developing a grasp of both patterns and variations (and one aspect of developing competence in writing), whereas times tables are finite and clearly defined. Put bluntly: you just have to learn the buggers.

Can someone be good at Maths, go on to study the subject at university, etc, without knowing their times tables? No doubt they can. This isn't about the subject of Maths - though I can't help thinking that any Maths student would benefit from memorising times tables, considering how valuable they are for arithmetic. No - it is about recognising a very useful building block in conceptual understanding.

People sometimes say 'But when do I ever need to use times tables in everyday life?' If we apply such a narrow, reductive utilitarian logic there is little point in ever learning anything. In an age when you can look pretty much anything up on Wikipedia, why learn anything so that you can 'use' it? The point is that - once mentally embedded - a grasp of basic multiplication becomes part of how we comprehend the world (along with a whole bunch of other skills, concepts and understandings - let's ditch the sacred halo around times tables). It is part of what might loosely be termed a mental map of the world.

During the Olympics I spent far too many hours tuned into TV coverage or listening to Radio 5 Live. During those many hours I must have done mental arithmetic literally hundreds of times: calculating and comparing speeds, distances, etc. Of course you can live without that kind of capacity for arithmetic, but it illustrates the point that we actually use arithmetic all the time, even if not consciously aware that we're doing so. Every time I go shopping, every time I use a cash machine, every time I buy a drink in a bar, every time I check a utility bill... you get the idea.

Being able to multiply quickly, and without paper or technology, is not the be-all and end-all. It shouldn't be given a reified status or be presented to children as an obstacle over which they must jump before proceeding any further. It shouldn't be taught in such a way that children feel a failure if it takes them longer than some of their classmates to learn - comparing and ranking should be avoided, and artificially prescriptive age 'targets' don't help.

But none of that should distract from the valuable place that mutiplication tables do have in intellectual development - in helping with a capacity for sequencing, calculating, comparing etc, as part of the foundations for further numeracy development, as what could become an embedded part of someone's mental map for life.