CF185B Mushroom Scientists

As you very well know, the whole Universe traditionally uses three-dimensional Cartesian system of coordinates. In this system each point corresponds to three real coordinates $ (x,y,z) $ . In this coordinate system, the distance between the center of the Universe and the point is calculated by the following formula: . Mushroom scientists that work for the Great Mushroom King think that the Universe isn't exactly right and the distance from the center of the Universe to a point equals $ x^{a}·y^{b}·z^{c} $ . To test the metric of mushroom scientists, the usual scientists offered them a task: find such $ x,y,z $ $ (0

The first line contains a single integer $ S $ $ (1

Print three real numbers — the coordinates of the point that reaches maximum value in the metrics of mushroom scientists. If there are multiple answers, print any of them that meets the limitations. A natural logarithm of distance from the center of the Universe to the given point in the metric of mushroom scientists shouldn't differ from the natural logarithm of the maximum distance by more than $ 10^{-6} $ . We think that $ ln(0)=-∞ $ .