You are given a string $$$s$$$. You can build new string $$$p$$$ from $$$s$$$ using the following operation no more than two times:

1. choose any subsequence $$$s_{i_1}, s_{i_2}, \dots, s_{i_k}$$$ where $$$1 \le i_1 < i_2 < \dots < i_k \le |s|$$$;
2. erase the chosen subsequence from $$$s$$$ ($$$s$$$ can become empty);
3. concatenate chosen subsequence to the right of the string $$$p$$$ (in other words, $$$p = p + s_{i_1}s_{i_2}\dots s_{i_k}$$$).

Of course, initially the string $$$p$$$ is empty.

For example, let $$$s = \text{ababcd}$$$. At first, let's choose subsequence $$$s_1 s_4 s_5 = \text{abc}$$$ — we will get $$$s = \text{bad}$$$ and $$$p = \text{abc}$$$. At second, let's choose $$$s_1 s_2 = \text{ba}$$$ — we will get $$$s = \text{d}$$$ and $$$p = \text{abcba}$$$. So we can build $$$\text{abcba}$$$ from $$$\text{ababcd}$$$.

Can you build a given string $$$t$$$ using the algorithm above?