Abstract A generalization of regular magic squares with magic sum $\mu$ is an sq-corner (or square corner) magic square.
It is a magic square satisfying the condition that the sum of 4 entries, square symmetrically placed with respect to the center, equals $\frac{4\mu}{n}$.
Using the sq-corner magic squares of order $n$, a construction of sq-corner magic squares of order {$n+2$} is derived.
Moreover, this construction provides some nonsingular classical sq-corner magic squares of all orders.
In particular, a nonsingular regular magic square of any odd order can be constructed under this new method, as well.
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