18

Part of PEN S Problems

Problems(1)

Source:

S

the set of all primes

p

such that the decimal representation of

\frac{1}{p}

has the fundamental period of divisible by

3

p \in S

\frac{1}{p}

has the fundamental period

3r

\frac{1}{p}= 0.a_{1}a_{2}\cdots a_{3r}a_{1}a_{2}\cdots a_{3r}\cdots,

r=r(p)

p \in S

and every integer

k \ge 1

f(k, p)=a_{k}+a_{k+r(p)}+a_{k+2r(p)}.

S

is finite. [*] Find the highest value of

f(k, p)

k \ge 1

p \in S

Miscellaneous Problems