This is the period when we are accustomed to speak of beginning "abstract" work; it is well to be clear what it means, and how it stands related to a child's need for experience. When we leave the problems of life, such as shopping, keeping records of games and making measurements for construction; and when we begin to work with pure number, we are said to be dealing with the abstract. Formerly dealing with pure number was called "simple," and dealing with actual things, such as money and measures, "compound," and they were taken in this order. But experience has reversed the process, and a child comes to see the need of abstract practice when he finds he is not quick enough or accurate enough, or his setting out seems clumsy, in actual problems. This was discussed at greater length in the chapter on Play.

For instance, he might set down the points of a game by strokes, each line representing a different opponent:

John ||||||||||||||||

Henry |||||||||||

Tom |||

He will see how difficult it is to estimate at a glance the exact score, and how easy it is to be inaccurate. It seems the moment to show him that the idea of grouping or enclosing a certain number, and always keeping to the same grouping, is helpful:

John |||||||||| |||||| = 1 ten and 6 singles.

Henry |||||||||| | = 1 ten and 1 single.

Tom ||| = 3 singles.

After doing this a good many times he could be told that this is a universal method, and he would doubtless enjoy the purely puzzle pleasure in working long sums to perfect practice. This pleasure is very common in children at this stage, but too often it comes to them merely through being shown the "trick" of carrying tens. They have reached a purely abstract point, but they cannot get through it without some more material help. The following is an example of the kind of help that can be given in getting clear the concept of the ten grouping and the processes it involves: