Multiplication Squares

This solution came from Adam from Moorfield Junior School.

This is how I arranged the numbers from one to nine in a multiplication square once and once only:

He is right but doesn't tell us how he worked it out. This solution is from James, Terry, John and Indiya from Sabden Primary School, Clitheroe, Lancashire.

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This solution is from Ailsa from Romsey Abbey Primary School, Romsey, Hampshire. She says:

I managed to crack the Multiplication Square, below, here is how I did it:

First I worked out that the only way to make 15 was to use the numbers 1, 3 and 5. I then discovered that the only way to make 8 was to use the numbers 1, 2 and 4. Therefore the 1 had to go in the top row and second column. I then worked out 5 had to go in the top row and third column because 315 is a multiple of 5 and 144 is not, so that meant that the 3 had to go in the top row in the first column.

Then I divided 108 by 2, the answer was 54, and then made 54 using the numbers I had left, 6, 7, 8 and 9, the answer was 9 x 6, so I knew that 9 and 6 were the 2 other numbers that went in the second row. 6 is not a multiple of 315 so 6 went in the first column and 9 went in the third column.

So now the only 2 numbers left were 7 and 8 so I worked the answer out by discovering how to make 315. I multiplied 5 by 9 to give me the answer 45 and then tried multiplying it by both 7 and 8. 7 was the correct number so 7 went in the third column and 8 went in the first.

This is a really clear description of your method, well done!

Kaden from Coleridge Community College, Cambridge also sent a correct solution. Well done!

We have had some other solutions, from a different school, that had got the 6 and the 9 swapped over. Will it work then?