Reciprocals of Prime Numbers

Theorem
The deximal representations of the reciprocals of the first few prime numbers are as follows:


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! align="right" style = "padding: 2px 10px" | $n$ ! align="left" style = "padding: 2px 10px" | $1 / n$ ! style = "padding: 2px 10px" | Also see
 * align="right" style = "padding: 2px 10px" | $2$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp 5$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $3$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 3$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $5$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp 2$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $7$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 14285 \, \dot 7$
 * style = "padding: 2px 10px" | Period of Reciprocal of 7 is of Maximal Length
 * align="right" style = "padding: 2px 10px" | $11$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 0 \dot 9$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $13$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 07692 \dot 3$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $17$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 05882 \, 35294 \, 11764 \, \dot 7$
 * style = "padding: 2px 10px" | Period of Reciprocal of 17 is of Maximal Length
 * }
 * align="right" style = "padding: 2px 10px" | $13$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 07692 \dot 3$
 * style = "padding: 2px 10px" |
 * align="right" style = "padding: 2px 10px" | $17$
 * align="left" style = "padding: 2px 10px" | $0 \cdotp \dot 05882 \, 35294 \, 11764 \, \dot 7$
 * style = "padding: 2px 10px" | Period of Reciprocal of 17 is of Maximal Length
 * }
 * style = "padding: 2px 10px" | Period of Reciprocal of 17 is of Maximal Length
 * }