Problem E
Cantor
The ternary expansion of a number is that number written in base $3$. A number can have more than one ternary expansion. A ternary expansion is indicated with a subscript $3$. For example, $1 = 1_{3} = 0.222\ldots _{3}$, and $0.875 = 0.212121\ldots _{3}$.
The Cantor set is defined as the real numbers between $0$ and $1$ inclusive that have a ternary expansion that does not contain a $1$. If a number has more than one ternary expansion, it is enough for a single one to not contain a $1$.
For example, $0 = 0.000\ldots _{3}$ and $1 = 0.222\ldots _{3}$, so they are in the Cantor set. But $0.875 = 0.212121\ldots _{3}$ and this is its only ternary expansion, so it is not in the Cantor set.
Your task is to determine whether a given number is in the Cantor set.
Input
The input consists of several test cases, at most $10$.
Each test case consists of a single line containing a number $x$ written in decimal notation, with $0 \le x \le 1$, and having at most $6$ digits after the decimal point.
The last line of input is END. This is not a test case.
Output
For each test case, output MEMBER if $x$ is in the Cantor set, and NON-MEMBER if $x$ is not in the Cantor set.
Sample Input 1 | Sample Output 1 |
---|---|
0 1 0.875 END |
MEMBER MEMBER NON-MEMBER |