### Party Party Party

Time Limit: 1000 ms Memory Limit: 65536 KiB

#### Problem Description

Emma has just graduated high school and it is the custom for the new graduates to throw parties for themselves and invite everyone in school to attend. Naturally, Emma wishes to attend as many parties as possible. This is not such a problem on a weekday since usually there are only two or three parties in the evening. But, Saturdays are packed! Typically some parties start at 8 AM (breakfast is served) while others might end at midnight (much to the annoyance of the neighbors). Emma naturally wants to know how many parties she can attend. Each party has a starting and stopping time, which are on the hour. These are listed via a 24-hour clock. For example, a party might start at 10 AM (10) and end at 2 PM (14). The earliest a party can start is 8 AM (8) and the latest it can end is midnight (24). In order not to be rude, Emma stays at each party at least one half hour and will consider traveling time between parties to be instantaneous. If there are times during the day when there are no parties to attend, she’ll simply go home and rest.

#### Input

There will be multiple test cases. Each test case starts with a line containing an integer p (≤ 100) indicating the number of parties on the given day. (A value of p = 0 indicates end of input.) The following p lines are each of the form s e, both integers where 8 ≤ s < e ≤ 24, indicating a party that starts at times and ends at time e. Note there may be multiple parties with the same starting and ending time.

#### Output

For each input set output a line of the form

On day d Emma can attend as many as n parties.

where you determine the value of n and d is the number of the test case starting at 1.

#### Sample Input

8
12 13
13 14
12 13
9 10
9 10
12 13
12 14
9 11
3
14 15
14 15
14 15
0

#### Sample Output

On day 1 Emma can attend as many as 7 parties.
On day 2 Emma can attend as many as 2 parties.

#### Source

The 2008 ACM-ICPC East Central North America