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Problem I
4 thought

Write a program which, given an integer $n$ as input, will produce a mathematical expression whose solution is $n$. The solution is restricted to using exactly four $4$’s and exactly three of the binary operations selected from the set $\{ *, +, -, /\} $. The number $4$ is the ONLY number you can use. You are not allowed to concatenate fours to generate other numbers, such as $44$ or $444$.

For example given $n=0$, a solution is $4 * 4 - 4 * 4 = 0$. Given $n=7$, a solution is $4 + 4 - 4~ /~ 4 = 7$. Division is considered truncating integer division, so that $1/4$ is $0$ (instead of $0.25$). Assume the usual precedence of operations so that $4 + 4 * 4 = 20$, not $32$. Not all integer inputs have solutions using four $4$’s with the aforementioned restrictions (consider $n=11$).

Hint: Using your forehead and some forethought should make an answer forthcoming. When in doubt use the fourth.

Input

Input begins with an integer $1 \leq m \leq 1\, 000$, indicating the number of test cases that follow. Each of the next $m$ lines contain exactly one integer value for $n$ in the range $-1\, 000\, 000 \leq n \leq 1\, 000\, 000$.

Output

For each test case print one line of output containing either an equation using four $4$’s to reach the target number or the phrase no solution. Print the equation following the format of the sample output; use spaces to separate the numbers and symbols printed. If there is more than one such equation which evaluates to the target integer, print any one of them.

Sample Input 1 Sample Output 1
5
9
0
7
11
24
4 + 4 + 4 / 4 = 9
4 * 4 - 4 * 4 = 0
4 + 4 - 4 / 4 = 7
no solution
4 * 4 + 4 + 4 = 24

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