Description:
You are given two positive integers $$$n$$$ and $$$k$$$.
Your task is to find a string $$$s$$$ such that all possible strings of length $$$n$$$ that can be formed using the first $$$k$$$ lowercase English alphabets occur as a subsequence of $$$s$$$.
If there are multiple answers, print the one with the smallest length. If there are still multiple answers, you may print any of them.
Note: A string $$$a$$$ is called a subsequence of another string $$$b$$$ if $$$a$$$ can be obtained by deleting some (possibly zero) characters from $$$b$$$ without changing the order of the remaining characters.
Input Format:
The first line of input contains a single integer $$$t$$$ ($$$1\leq t\leq 676$$$) denoting the number of test cases.
Each test case consists of a single line of input containing two integers $$$n$$$ ($$$1\leq n\leq 26$$$) and $$$k$$$ ($$$1\leq k\leq 26$$$).
Output Format:
For each test case, print a single line containing a single string $$$s$$$ which satisfies the above property. If there are multiple answers, print the one with the smallest length. If there are still multiple answers, you may print any of them.
Note:
For the first test case, there are two strings of length $$$1$$$ which can be formed using the first $$$2$$$ lowercase English alphabets, and they are present in $$$s$$$ as a subsequence as follows:
- $$$\texttt{a}: {\color{red}{\texttt{a}}}\texttt{b}$$$
- $$$\texttt{b}: \texttt{a}{\color{red}{\texttt{b}}}$$$
For the second test case, there is only one string of length $$$2$$$ which can be formed using the first lowercase English alphabet, and it is present in $$$s$$$ as a subsequence as follows:
- $$$\texttt{aa}: {\color{red}{\texttt{aa}}}$$$
For the third test case, there are $$$4$$$ strings of length $$$2$$$ which can be formed using the first $$$2$$$ lowercase English alphabets, and they are present in $$$s$$$ as a subsequence as follows:
- $$$\texttt{aa}: \texttt{b}{\color{red}{\texttt{aa}}}\texttt{b}$$$
- $$$\texttt{ab}: \texttt{ba}{\color{red}{\texttt{ab}}}$$$
- $$$\texttt{ba}: {\color{red}{\texttt{ba}}}\texttt{ab}$$$
- $$$\texttt{bb}: {\color{red}{\texttt{b}}}\texttt{aa}{\color{red}{\texttt{b}}}$$$
For the fourth test case, there are $$$9$$$ strings of length $$$2$$$ which can be formed using the first $$$3$$$ lowercase English alphabets, and they are present in $$$s$$$ as a subsequence as follows:
- $$$\texttt{aa}: {\color{red}{\texttt{a}}}\texttt{bcb}{\color{red}{\texttt{a}}}\texttt{c}$$$
- $$$\texttt{ab}: {\color{red}{\texttt{ab}}}\texttt{cbac}$$$
- $$$\texttt{ac}: \texttt{abcb}{\color{red}{\texttt{ac}}}$$$
- $$$\texttt{ba}: \texttt{abc}{\color{red}{\texttt{ba}}}\texttt{c}$$$
- $$$\texttt{bb}: \texttt{a}{\color{red}{\texttt{b}}}\texttt{c}{\color{red}{\texttt{b}}}\texttt{ac}$$$
- $$$\texttt{bc}: \texttt{a}{\color{red}{\texttt{bc}}}\texttt{bac}$$$
- $$$\texttt{ca}: \texttt{ab}{\color{red}{\texttt{c}}}\texttt{b}{\color{red}{\texttt{a}}}\texttt{c}$$$
- $$$\texttt{cb}: \texttt{ab}{\color{red}{\texttt{cb}}}\texttt{ac}$$$
- $$$\texttt{cc}: \texttt{ab}{\color{red}{\texttt{c}}}\texttt{ba}{\color{red}{\texttt{c}}}$$$