You are given two integers $$$b$$$ and $$$w$$$. You have a chessboard of size $$$10^9 \times 10^9$$$ with the top left cell at $$$(1; 1)$$$, the cell $$$(1; 1)$$$ is painted white.

Your task is to find a connected component on this chessboard that contains exactly $$$b$$$ black cells and exactly $$$w$$$ white cells. Two cells are called connected if they share a side (i.e. for the cell $$$(x, y)$$$ there are at most four connected cells: $$$(x - 1, y), (x + 1, y), (x, y - 1), (x, y + 1)$$$). A set of cells is called a connected component if for every pair of cells $$$C_1$$$ and $$$C_2$$$ from this set, there exists a sequence of cells $$$c_1$$$, $$$c_2$$$, ..., $$$c_k$$$ such that $$$c_1 = C_1$$$, $$$c_k = C_2$$$, all $$$c_i$$$ from $$$1$$$ to $$$k$$$ are belong to this set of cells and for every $$$i \in [1, k - 1]$$$, cells $$$c_i$$$ and $$$c_{i + 1}$$$ are connected.

Obviously, it can be impossible to find such component. In this case print "NO". Otherwise, print "YES" and any suitable connected component.

You have to answer $$$q$$$ independent queries.