To celebrate your birthday you have prepared a festive table! Now you want to seat as many guests as possible.

The table can be represented as a rectangle with height $$$h$$$ and width $$$w$$$, divided into $$$h \times w$$$ cells. Let $$$(i, j)$$$ denote the cell in the $$$i$$$-th row and the $$$j$$$-th column of the rectangle ($$$1 \le i \le h$$$; $$$1 \le j \le w$$$).

Into each cell of the table you can either put a plate or keep it empty.

As each guest has to be seated next to their plate, you can only put plates on the edge of the table — into the first or the last row of the rectangle, or into the first or the last column. Formally, for each cell $$$(i, j)$$$ you put a plate into, at least one of the following conditions must be satisfied: $$$i = 1$$$, $$$i = h$$$, $$$j = 1$$$, $$$j = w$$$.

To make the guests comfortable, no two plates must be put into cells that have a common side or corner. In other words, if cell $$$(i, j)$$$ contains a plate, you can't put plates into cells $$$(i - 1, j)$$$, $$$(i, j - 1)$$$, $$$(i + 1, j)$$$, $$$(i, j + 1)$$$, $$$(i - 1, j - 1)$$$, $$$(i - 1, j + 1)$$$, $$$(i + 1, j - 1)$$$, $$$(i + 1, j + 1)$$$.

Put as many plates on the table as possible without violating the rules above.