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This problem supports the development of the idea of generic proof with the children. This is a tricky concept to grasp but it draws attention to mathematical structures that are not often addressed at primary school level. It is possible that only very few children in the class may grasp the idea but this is still a worthwhile activity which provides opportunities for children to explore
consecutive numbers and the relationship between them. Generic proof involves examining one example in detail to identify structures that will prove the general result. Proof is a fundamental idea in mathematics and in encouraging them to do this problem you will be helping them to behave like mathematicians.
By addressing the case of adding three consecutive numbers, a generic proof that adding three consecutive always gives an answer that is a multiple of three is developed based on the structure of one example. The article entitled Take One Example with its video clips will help you understand how this problem supports the development of the idea of generic proof with the children. Reading it will help you to see what is involved.
Ask the children to choose three consecutive numbers and and add them together. It is probably easiest if they choose ones that are easy to model and numbers that they are secure with.
Suggest that they make a model of their numbers using apparatus that is widely available in the classroom. Resist pointing them in specific directions unless they become stuck. If they are stuck then resources such as Multilink cubes, Numicon or squared paper will be helpful.
The idea is that they take a particular example and then see if they can see the general structure within that one example.
How would you like to represent these numbers?
What do you notice about the answer?
Can you see anything in your example that would work in exactly the same way if you used three different consecutive numbers?
Can you say what will happen every time you add any three consecutive numbers?
Can you convince your friend that this is true?
When adding three numbers there are a number of different combinations that are possible. Ask the children to explore what they are. Get them to identify the possible combinations and the features of those combinations that matter.
Does it matter whether the starting number is odd or even?
What would happen if we added four consecutive numbers? Or five? Or six? The possibilities are endless.
It may be helpful to return to Two Numbers Under the Microscope if the children are struggling with adding three numbers. This might help them to feel more comfortable with the rules they have proved in that problem and so build the foundations for this one.
The children may find it helpful to use representations of numbers such as these to support their thinking.