You have $$$n$$$ rectangular wooden blocks, which are numbered from $$$1$$$ to $$$n$$$. The $$$i$$$-th block is $$$1$$$ unit high and $$$\lceil \frac{i}{2} \rceil$$$ units long.

Here, $$$\lceil \frac{x}{2} \rceil$$$ denotes the result of division of $$$x$$$ by $$$2$$$, rounded up. For example, $$$\lceil \frac{4}{2} \rceil = 2$$$ and $$$\lceil \frac{5}{2} \rceil = \lceil 2.5 \rceil = 3$$$.

For example, if $$$n=5$$$, then the blocks have the following sizes: $$$1 \times 1$$$, $$$1 \times 1$$$, $$$1 \times 2$$$, $$$1 \times 2$$$, $$$1 \times 3$$$.

The available blocks for $$$n=5$$$

Find the maximum possible side length of a square you can create using these blocks, without rotating any of them. Note that you don't have to use all of the blocks.

One of the ways to create $$$3 \times 3$$$ square using blocks $$$1$$$ through $$$5$$$