A magic square puzzle of the order n is an organization of n 2 numbers, usually unique integers, in a square. The n numbers in all rows, columns, and diagonals equal the magic total. To solve a 3 x 3 magic square, fill in the small squares inside the large square with consecutive integers from 1 to 16 so that the sum of all rows, columns, and diagonals is one constant number, the “magic constant”.
To form a magic square, start in the top left corner of the square and place 1 in the top left corner. List the nine consecutive numbers in order and add them up then divide by three. The very middle number in a consecutive number list is the number for the middle.
The formula of the magic square sum is n(n2 + 1)/2. For a magic square of order 3, substitute n = 3 to know the magic sum. Write the numbers to be placed into the magic square in order, then write the number in the middle of the sequence in the center of the square. Finally, solve the magic square by completing the square and completing the remaining squares.
In summary, a magic square puzzle of the order n is an organization of n 2 numbers, usually unique integers, in a square. To solve a 3 x 3 magic square, follow these basic rules and use the magic square formula to find the magic constant.
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