Given a positive integer $$$m$$$, we say that a sequence $$$x_1, x_2, \dots, x_n$$$ of positive integers is $$$m$$$-cute if for every index $$$i$$$ such that $$$2 \le i \le n$$$ it holds that $$$x_i = x_{i - 1} + x_{i - 2} + \dots + x_1 + r_i$$$ for some positive integer $$$r_i$$$ satisfying $$$1 \le r_i \le m$$$.

You will be given $$$q$$$ queries consisting of three positive integers $$$a$$$, $$$b$$$ and $$$m$$$. For each query you must determine whether or not there exists an $$$m$$$-cute sequence whose first term is $$$a$$$ and whose last term is $$$b$$$. If such a sequence exists, you must additionally find an example of it.