The given repeating decimal is $0.237237237 ...$

The repeating decimal as a geometric series can be expressed as

$$\begin{gathered} 0.237237237 ... \\ =0.237\left(1+0.001+{\left(0.001\right)}^2+{\left(0.001\right)}^3+{\left(0.001\right)}^4....\right) \\ =\sum _{k=0}^{\infty }0.237{\left(0.001\right)}^k \end{gathered}$$

The given repeating decimal as the quotient of two integers reduced to the lowest terms can be expressed as

$$\begin{gathered} 0.237237237 ... \\ =0.237\left(1+0.001+{\left(0.001\right)}^2+{\left(0.001\right)}^3+{\left(0.001\right)}^4....\right) \\ =\sum _{k=0}^{\infty }0.237{\left(0.001\right)}^k \\ \mathrm{Use}\left[ S_{\infty }=\frac{a}{1-r}\right] \\ =\frac{0.237}{1-0.001} \\ =\frac{0.237}{0.999} \\ =\frac{237}{999} \\ =\frac{79}{333} \end{gathered}$$