Number times Recurring Part of Reciprocal gives 9-Repdigit/Mistake/First Edition

Source Work

 * The Dictionary
 * $142,857$
 * $142,857$

Mistake

 * This is a property of all the periods of repeating decimals. If the period of $n$ is multiplied by $n$, the result is as many $9$s as there are digits in $n$.

Correction
This should read:
 * This is a property of all the periods of reciprocals of (strictly) positive integers. If the period of $1 / n$ is multiplied by $n$, the result is as many $9$s as there are digits in the period of $1 / n$.

In of $1997$, this has been partially corrected to:
 * This is a property of all the periods of repeating decimals. If the period of $n$ is multiplied by $n$, the result is as many $9$s as there are digits in the period of $1 / n$.

But even then, this appears not to be true.

The number $6$, for example, does not have this property.


 * $\dfrac 1 6 = 0 \cdotp 1 \dot 6$

but:
 * $6 \times 6 = 36$

which is not equal to $9$ as the theorem states ought to be the case.

Research is ongoing as to what the theorem should actually say.