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Simple finals systems [ edit ]
Match Team 1 Team 2
Week 1 A
Rank 2
v
Rank 3
Week 2 C
Rank 1
v
Winner A
Champion Winner C
Match Team 1 Team 2
Week 1 A
Rank 2
v
Rank 3
B
Rank 1
v
Rank 4
Week 2 C
Winner B
v
Winner A
Champion Winner C
Match Team 1 Team 2
Week 1 A
Rank 4
v
Rank 5
B
Rank 3
v
Rank 6
Week 2 C
Rank 2
v
Winner B
D
Rank 1
v
Winner A
Week 3 E
Winner D
v
Winner C
Champion Winner E
McIntyre finals systems [ edit ] Page-McIntyre system [ edit ]
Round
Match
Name
Team 1
Team 2
1
A
2nd Semi Final
Rank 3
v
Rank 4
B
1st Semi Final
Rank 1
v
Rank 2
2
C
Preliminary Final
Loser B
v
Winner A
3
D
Grand Final
Winner B
v
Winner C
Assuming that each team has a 50% chance of winning each match, the probability of each team will win the championship is represented in the table.
Team rank
Probability
1
37.5%
2
37.5%
3
12.5%
4
12.5%
McIntyre final five system [ edit ]
Round
Match
Name
Team 1
Team 2
1
A
Elimination Final
Rank 4
v
Rank 5
B
Qualifying Final
Rank 2
v
Rank 3
2
C
2nd Semi Final
Loser B
v
Winner A
D
1st Semi Final
Rank 1
v
Winner B
3
E
Preliminary Final
Loser D
v
Winner C
4
F
Grand Final
Winner D
v
Winner E
Team rank
Probability
1
37.5%
2
25.0%
3
25.0%
4
6.25%
5
6.25%
First McIntyre final six system [ edit ]
Round
Match
Name
Team 1
Team 2
1
A
2nd Elimination Final
Rank 5
v
Rank 6
B
1st Elimination Final
Rank 3
v
Rank 4
C
Qualifying Final
Rank 1
v
Rank 2
2
D
2nd Semi Final
Loser C
v
Winner A
E
1st Semi Final
Winner C
v
Winner B
3
F
Preliminary Final
Loser E
v
Winner D
4
G
Grand Final
Winner E
v
Winner F
Team rank
Probability
1
25.00%
2
25.00%
3
18.75%
4
18.75%
5
6.25%
6
6.25%
Second McIntyre final six system [ edit ]
Round
Match
Name
Team 1
Team 2
1
A
2nd Elimination Final
Rank 4
v
Rank 5
B
1st Elimination Final
Rank 3
v
Rank 6
C
Qualifying Final
Rank 1
v
Rank 2
2
D
2nd Semi Final
Loser C
v
2nd highest ranked winner from A, B
E
1st Semi Final
Winner C
v
1st highest ranked winner from A, B
3
F
Preliminary Final
Loser E
v
Winner D
4
G
Grand Final
Winner E
v
Winner F
Team rank
Probability
1
25.00%
2
25.00%
3
18.75%
4
12.50%
5
12.50%
6
6.25%
McIntyre final eight system [ edit ]
Round
Match
Name
Team 1
Team 2
1
A
2nd Elimination Final
Rank 4
v
Rank 5
B
1st Elimination Final
Rank 3
v
Rank 6
C
2nd Qualifying Final
Rank 2
v
Rank 7
D
1st Qualifying Final
Rank 1
v
Rank 8
2
E
2nd Semi Final
4th highest ranked winner from A, B, C, D
v
2nd highest ranked loser from A, B, C, D
F
1st Semi Final
3rd highest ranked winner from A, B, C, D
v
1st highest ranked loser from A, B, C, D
3
G
2nd Preliminary Final
2nd highest ranked winner from A, B, C, D
v
Winner F
H
1st Preliminary Final
1st highest ranked winner from A, B, C, D
v
Winner E
4
I
Grand Final
Winner G
v
Winner H
Team rank
Probability
1
18.750%
2
18.750%
3
15.625%
4
12.500%
5
12.500%
6
9.375%
7
6.250%
8
6.250%
Other finals systems [ edit ] [ edit ] This is the top six play-offs system used in Super League (Europe) . It is basically the McIntyre final four system with an extra week at the beginning to reduce the bottom four teams to two.
Match Team 1 Team 2
Week 1 A
Rank 4
v
Rank 5
B
Rank 3
v
Rank 6
Week 2 C
Winner B
v
Winner A
D
Rank 1
v
Rank 2
Week 3 E
Loser D
v
Winner C
Week 4 F
Winner D
v
Winner E
Champion Winner F
Team rank
Probability
1
37.50%
2
37.50%
3
6.25%
4
6.25%
5
6.25%
6
6.25%
Match Team 1 Team 2
Week 1 A
Rank 2
v
Rank 3
B
Rank 4
v
Rank 5
C
Rank 6
v
Rank 7
Week 2 D
Rank 1
v
Winner A
E
Loser A
v
Loser B
F
Winner B
v
Winner C
Week 3 G
Winner D
v
Winner F
H
Winner E
v
Loser D
Week 4 I
Winner G
v
Winner H
Champion Winner I
According to Matthew O'Neill (http://www.rleague.com/article.php?id=19486 ), "Back in 1996 the ARL had the perfect Finals setup, which has since been adopted by the AFL with great success. The ARL used a similar model in 1995 but was better in 1996 due to the swapover pool to avoid teams playing each other twice during the Finals, which could have been the case in 1995 except both Brisbane and Cronulla went out the back door."
This is what actually happened in 1995 rather than the system.
Match Team 1 Team 2
Week 1 A
Rank 1
v
Rank 4
B
Rank 2
v
Rank 3
C
Rank 5
v
Rank 8
D
Rank 6
v
Rank 7
Week 2 E
Loser A
v
Winner C
F
Loser B
v
Winner D
Week 3 G
Winner A
v
Winner E
H
Winner B
v
Winner F
Week 4 I
Winner G
v
Winner H
Champion Winner I
Match Team 1 Team 2
Week 1 A
Rank 1
v
Rank 4
B
Rank 2
v
Rank 3
C
Rank 5
v
Rank 8
D
Rank 6
v
Rank 7
Week 2 E
Loser A
v
Winner D
F
Loser B
v
Winner C
Week 3 G
Winner A
v
Winner F
H
Winner B
v
Winner E
Week 4 I
Winner G
v
Winner H
Champion Winner I
[ edit ]
Match Team 1 Team 2
Week 1 A
Rank 1
v
Rank 4
B
Rank 2
v
Rank 3
C
Rank 5
v
Rank 8
D
Rank 6
v
Rank 7
Week 2 E
Loser A
v
Winner C
F
Loser B
v
Winner D
Week 3 G
Winner A
v
Winner F
H
Winner B
v
Winner E
Week 4 I
Winner G
v
Winner H
Champion Winner I
Team rank
Probability
1
18.75%
2
18.75%
3
18.75%
4
18.75%
5
6.25%
6
6.25%
7
6.25%
8
6.25%
[1] [ edit ]
Match Team 1 Team 2
Round 1 A
Rank 5
v
Rank 8
B
Rank 6
v
Rank 7
Round 2 C
Rank 4
v
Winner A
D
Rank 3
v
Winner B
Round 3 E
Rank 1
v
Winner C
F
Rank 2
v
Winner D
Round 4 G
Winner E
v
Winner F
Champion Winner G
Match Team 1 Team 2
Week 1 A
Rank 3
v
Rank 6
B
Rank 4
v
Rank 5
C
Rank 7
v
Rank 10
D
Rank 8
v
Rank 9
Week 2 E
Rank 1
v
Winner A
F
Rank 2
v
Winner B
G
Loser A
v
Winner C
H
Loser B
v
Winner D
Week 3 I
Loser E
v
Winner G
J
Loser F
v
Winner H
Week 4 K
Winner E
v
Winner I
L
Winner F
v
Winner J
Week 5 M
Winner K
v
Winner L
Champion Winner M
AFL finals system explained (1931-1999) The McIntyre systems used in the Australian Football League [dead link]
