Perhaps you’ve seen the magic square<\/p>\n\n\n\n
8 1 6
3 5 7
4 9 2<\/p>\n\n\n\n
which has the property that all rows, columns and diagonals sum to 15. Well, it has another “magic” and “square” property! If you read the rows as NUMBERS, forwards and backwards, and square them, then Magic?<\/p>\n\n\n\n Presentation Suggestions:<\/strong> The\u00a0Math\u00a0Behind\u00a0the\u00a0Fact:<\/strong> 13 6 11 you can check that: How to Cite this Page:<\/strong>
8162<\/sup> + 3572<\/sup> + 4922<\/sup> = 6182<\/sup> + 7532<\/sup> + 2942<\/sup>.<\/p>\n\n\n\n
If they like this fun fact, ask them to take a minute to see what happens with the columns when you read them forwards and backwards and take their sums of squares. Then try the “diagonals” which wrap around the square… they also share a similar property!<\/p>\n\n\n\n
This holds for ANY 3×3\u00a0magic square\u00a0(though if the entries contain more than one digit, you will have to carry the extra places) using techniques of linear algebra. For instance, for this magic square:<\/p>\n\n\n\n
8 10 12
9 14 7<\/p>\n\n\n\n
(1300+60+11)2<\/sup> +(800+100+12)2<\/sup> +(900+140+7)2<\/sup> = (1100+60+13)2<\/sup> +(1200+100+8)2<\/sup> + (700+140+9)2<\/sup>.
The Gardner references makes this observation for this specific 3×3 magic square, and the Benjamin-Yasuda reference proves the generalization for all 3×3 magic squares.<\/p>\n\n\n\n
Su, Francis E., et al. “Magic Squares, indeed!.” Math Fun Facts<\/em>. <http:\/\/www.math.hmc.edu\/funfacts>.<\/p>\n\n\n\n