Category:Balanced Ternary Representation
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This category contains results about Balanced Ternary Representation.
Let $n \in \Z$ be an integer.
Balanced ternary representation is the unique representation of $n$ in the form:
- $\sqbrk {r_m r_{m - 1} \ldots r_2 r_1 r_0}$
such that:
- $\ds n = \sum_{j \mathop = 0}^m r_j 3^j$
where:
- $m \in \Z_{>0}$ is a strictly positive integer such that $3^m \le \size n < 3^{m + 1}$
- all the $r_j$ are such that $r_j \in \set {\underline 1, 0, 1}$, where $\underline 1 := -1$.
Pages in category "Balanced Ternary Representation"
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