⚠️ SPOILER ALERT⚠️ - The code contains solution for the whole task. Try first to solve it yourself. 🔗 https://adventofcode.com/2019/day/6
Run iex with mix iex -S mix
# Run part 1 and 2
Day6.run
You've landed at the Universal Orbit Map facility on Mercury. Because navigation in space often involves transferring between orbits, the orbit maps here are useful for finding efficient routes between, for example, you and Santa. You download a map of the local orbits (your puzzle input).
Except for the universal Center of Mass (COM
), every object in space is in orbit around exactly one other object. An orbit looks roughly like this:
\
\
|
|
AAA--> o o <--BBB
|
|
/
/
In this diagram, the object BBB
is in orbit around AAA
. The path that BBB
takes around AAA
(drawn with lines) is only partly shown. In the map data, this orbital relationship is written AAA)BBB
, which means "BBB
is in orbit around AAA
".
Before you use your map data to plot a course, you need to make sure it wasn't corrupted during the download. To verify maps, the Universal Orbit Map facility uses orbit count checksums - the total number of direct orbits (like the one shown above) and indirect orbits.
Whenever A
orbits B
and B
orbits C
, then A
indirectly orbits C
. This chain can be any number of objects long: if A
orbits B
, B
orbits C
, and C
orbits D
, then A
indirectly orbits D
.
For example, suppose you have the following map:
COM)B
B)C
C)D
D)E
E)F
B)G
G)H
D)I
E)J
J)K
K)L
Visually, the above map of orbits looks like this:
G - H J - K - L
/ /
COM - B - C - D - E - F
\
I
In this visual representation, when two objects are connected by a line, the one on the right directly orbits the one on the left.
Here, we can count the total number of orbits as follows:
D
directly orbitsC
and indirectly orbitsB
andCOM
, a total of3
orbits.L
directly orbitsK
and indirectly orbitsJ
,E
,D
,C
,B
, andCOM
, a total of7
orbits.COM
orbits nothing.
The total number of direct and indirect orbits in this example is 42
.
What is the total number of direct and indirect orbits in your map data?
Now, you just need to figure out how many orbital transfers you (YOU
) need to take to get to Santa (SAN
).
You start at the object YOU
are orbiting; your destination is the object SAN
is orbiting. An orbital transfer lets you move from any object to an object orbiting or orbited by that object.
For example, suppose you have the following map:
COM)B
B)C
C)D
D)E
E)F
B)G
G)H
D)I
E)J
J)K
K)L
K)YOU
I)SAN
Visually, the above map of orbits looks like this:
YOU
/
G - H J - K - L
/ /
COM - B - C - D - E - F
\
I - SAN
In this example, YOU
are in orbit around K
, and SAN
is in orbit around I
. To move from K
to I
, a minimum of 4
orbital transfers are required:
K
toJ
J
toE
E
toD
D
toI
Afterward, the map of orbits looks like this:
G - H J - K - L
/ /
COM - B - C - D - E - F
\
I - SAN
\
YOU
What is the minimum number of orbital transfers required to move from the object YOU
are orbiting to the object SAN
is orbiting? (Between the objects they are orbiting - not between YOU
and SAN
.)