If real numbers $x, y, z$ satisfy $2 + \log_2 x = 3 + \log_3 y = 5 + \log_5 z$, then the size relationship of $x, y, z$ that is impossible is A. $x > y > z$ B. $x > z > y$ C. $y > x > z$ D. $y > z > x$
If real numbers $x, y, z$ satisfy $2 + \log_2 x = 3 + \log_3 y = 5 + \log_5 z$, then the size relationship of $x, y, z$ that is impossible is\\
A. $x > y > z$\\
B. $x > z > y$\\
C. $y > x > z$\\
D. $y > z > x$