Long Period Prime/Examples/97

Theorem
The prime number $97$ is a long period prime:
 * $\dfrac 1 {97} = 0 \cdotp \dot 01030 \, 92783 \, 50515 \, 46391 \, 75257 \, 73195 \, 87628 \, 86597 \, 93814 \, 43298 \, 96907 \, 21649 \, 48453 \, 60824 \, 74226 \, 80412 \, 37113 \, 40206 \, 18556 \, \dot 7$

Proof
From Reciprocal of $97$:

Counting the digits, it is seen that this has a period of recurrence of $96$.

Hence the result.