# Problem D

Dance Recital

The Production Manager of a dance company has been tasked with determining the cost for the seasonal dance recital. Because of their exceptional skills, many dancers will perform in more than one routine, but this presents a problem; each dance routine incorporates a unique costume, so between routines, dancers must report backstage to a Wardrobe Specialist, who can change the dancerâ€™s costume in time to begin their next scheduled routine.

A Wardrobe Specialist does a *normal
change* on a dancer when the dancer performs in two routines
that are not consecutive, but when a dancer is required to
perform in two consecutive routines, a *quick
change* is necessary. A Wardrobe Specialist charges a flat
rate per recital that covers all normal changes, but charges an
exorbitant amount for each quick change. The Production Manager
is responsible for keeping the show under budget, and has hired
you to write a program to report the minimum number of quick
changes needed for a given recital, given that the order of the
dance routines could be changed.

To describe the cast of dancers that are to perform during a
recital, each dancer is assigned an identifying uppercase
letter. (Fortunately, there are never more than 26 dancers, so
characters from `A` to `Z`
suffice.) To describe a full recital, a list of individual
routines is given, with a string of characters defining which
dancers appear in a routine. For example, consider the
following recital description:

ABC ABEF DEF ABCDE FGH

The above list describes a recital with 5 dance routines,
including a total of 8 individual performers (dancers
`A` through `H`). The first
routine listed includes dancers {`A`, `B`, and
`C`}. The second routine includes
dancers {`A`, `B`, `E`, and
`F`}. Notice that if these first two
routines are performed in the above order, dancers `A` and `B` will require a quick
change between the routines. In fact, if these five routines
are scheduled in the order given above, a total of six quick
changes are required. However, the schedule can be rearranged
as follows:

ABEF DEF ABC FGH ABCDE

In this case, only two quick changes are required (those for
`E` and `F` between the
first two dances).

## Input

The first line contains a single integer $R$, with $2 \leq R \leq 10$, that indicates the number of routines in the recital. Following that will be $R$ additional lines, each describing the dancers for one routine in the form of a nonempty string of up to 26 non-repeating, lexicographically sorted uppercase alphabetic characters identifying the dancers who perform in that routine. Although a dancerâ€™s letter will not appear more than once in a single routine, that dancer may appear in many different routines, and it may be that two or more routines have the identical set of dancers.

## Output

Output a single integer designating the minimum number of quick changes required for the recital.

Sample Input 1 | Sample Output 1 |
---|---|

5 ABC ABEF DEF ABCDE FGH |
2 |

Sample Input 2 | Sample Output 2 |
---|---|

6 BDE FGH DEF ABC BDE ABEF |
3 |

Sample Input 3 | Sample Output 3 |
---|---|

4 XYZ XYZ ABYZ Z |
4 |