\--- Day 20: Infinite Elves and Infinite Houses --- ---------- To keep the Elves busy, Santa has them deliver some presents by hand, door-to-door. He sends them down a street with infinite houses numbered sequentially: `1`, `2`, `3`, `4`, `5`, and so on. Each Elf is assigned a number, too, and delivers presents to houses based on that number: * The first Elf (number `1`) delivers presents to every house: `1`, `2`, `3`, `4`, `5`, .... * The second Elf (number `2`) delivers presents to every second house: `2`, `4`, `6`, `8`, `10`, .... * Elf number `3` delivers presents to every third house: `3`, `6`, `9`, `12`, `15`, .... There are infinitely many Elves, numbered starting with `1`. Each Elf delivers presents equal to *ten times* his or her number at each house. So, the first nine houses on the street end up like this: ``` House 1 got 10 presents. House 2 got 30 presents. House 3 got 40 presents. House 4 got 70 presents. House 5 got 60 presents. House 6 got 120 presents. House 7 got 80 presents. House 8 got 150 presents. House 9 got 130 presents. ``` The first house gets `10` presents: it is visited only by Elf `1`, which delivers `1 * 10 = 10` presents. The fourth house gets `70` presents, because it is visited by Elves `1`, `2`, and `4`, for a total of `10 + 20 + 40 = 70` presents. What is the *lowest house number* of the house to get at least as many presents as the number in your puzzle input? Your puzzle answer was `665280`. \--- Part Two --- ---------- The Elves decide they don't want to visit an infinite number of houses. Instead, each Elf will stop after delivering presents to `50` houses. To make up for it, they decide to deliver presents equal to *eleven times* their number at each house. With these changes, what is the new *lowest house number* of the house to get at least as many presents as the number in your puzzle input? Your puzzle answer was `705600`. Both parts of this puzzle are complete! They provide two gold stars: \*\* At this point, all that is left is for you to [admire your Advent calendar](/2015). Your puzzle input was `29000000`.