write a go solution for Description:
You are given a positive integer n.

The weight of a permutation p_1,p_2,ldots,p_n is the number of indices 1<=i<=n such that i divides p_i. Find a permutation p_1,p_2,...,p_n with the minimum possible weight (among all permutations of length n).

A permutation is an array consisting of n distinct integers from 1 to n in arbitrary order. For example, [2,3,1,5,4] is a permutation, but [1,2,2] is not a permutation (2 appears twice in the array) and [1,3,4] is also not a permutation (n=3 but there is 4 in the array).

Input Format:
Each test contains multiple test cases. The first line contains the number of test cases t (1<=t<=10^4). The description of the test cases follows.

The only line of each test case contains a single integer n (1<=n<=10^5) — the length of permutation.

It is guaranteed that the sum of n over all test cases does not exceed 10^5.

Output Format:
For each test case, print a line containing n integers p_1,p_2,...,p_n so that the permutation p has the minimum possible weight.

If there are several possible answers, you can print any of them.

Note:
In the first test case, the only valid permutation is p=[1]. Its weight is 1.

In the second test case, one possible answer is the permutation p=[2,1,4,3]. One can check that 1 divides p_1 and i does not divide p_i for i=2,3,4, so the weight of this permutation is 1. It is impossible to find a permutation of length 4 with a strictly smaller weight.. Output only the code with no comments, explanation, or additional text.