--- id: 5900f3861000cf542c50fe99 title: 'Problem 26: Reciprocal cycles' challengeType: 5 forumTopicId: 301908 --- # --description-- A unit fraction contains 1 in the numerator. The decimal representation of the unit fractions with denominators 2 to 10 are given:

¹/₂ = 0.5

¹/₃ = 0.(3)

¹/₄ = 0.25

¹/₅ = 0.2

¹/₆ = 0.1(6)

¹/₇ = 0.(142857)

¹/₈ = 0.125

¹/₉ = 0.(1)

¹/₁₀ = 0.1

Where 0.1(6) means 0.166666..., and has a 1-digit recurring cycle. It can be seen that ¹/₇ has a 6-digit recurring cycle. Find the value of `d` < `n` for which ¹/_d contains the longest recurring cycle in its decimal fraction part. # --hints-- `reciprocalCycles(700)` should return a number. ```js assert(typeof reciprocalCycles(700) === 'number'); ``` `reciprocalCycles(700)` should return 659. ```js assert(reciprocalCycles(700) == 659); ``` `reciprocalCycles(800)` should return 743. ```js assert(reciprocalCycles(800) == 743); ``` `reciprocalCycles(900)` should return 887. ```js assert(reciprocalCycles(900) == 887); ``` `reciprocalCycles(1000)` should return 983. ```js assert(reciprocalCycles(1000) == 983); ``` # --seed-- ## --seed-contents-- ```js function reciprocalCycles(n) { return n; } reciprocalCycles(1000); ``` # --solutions-- ```js // solution required ```