2002 Samsung Open – Doubles
Donald Johnson and Jared Palmer were the defending champions but lost in the final 0–6, 7–6(7–3), 6–4 against Mike Bryan and Mark Knowles.
Doubles | |
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2002 Samsung Open | |
Champions | ![]() ![]() |
Runners-up | ![]() ![]() |
Final score | 0–6, 7–6(7–3), 6–4 |
Seeds
Donald Johnson / Jared Palmer (Final) Mike Bryan / Mark Knowles (Champions) Ellis Ferreira / Rick Leach (First Round) Michaël Llodra / Fabrice Santoro (First Round)
Draw
Key
- Q = Qualifier
- WC = Wild Card
- LL = Lucky Loser
- Alt = Alternate
- SE = Special Exempt
- PR = Protected Ranking
- ITF = ITF entry
- JE = Junior Exempt
- w/o = Walkover
- r = Retired
- d = Defaulted
First Round | Quarterfinals | Semifinals | Final | ||||||||||||||||||||||||
1 | ![]() ![]() | 6 | 6 | ||||||||||||||||||||||||
![]() ![]() | 3 | 4 | 1 | ![]() ![]() | 710 | 7 | |||||||||||||||||||||
![]() ![]() | 2 | 3 | ![]() ![]() | 68 | 5 | ||||||||||||||||||||||
![]() ![]() | 6 | 6 | 1 | ![]() ![]() | 6 | 6 | |||||||||||||||||||||
4 | ![]() ![]() | 4 | 4 | ALT | ![]() ![]() | 3 | 4 | ||||||||||||||||||||
![]() ![]() | 6 | 6 | ![]() ![]() | 6 | 5 | 2 | |||||||||||||||||||||
ALT | ![]() ![]() | 3 | 6 | 6 | ALT | ![]() ![]() | 4 | 7 | 6 | ||||||||||||||||||
![]() ![]() | 6 | 3 | 3 | 1 | ![]() ![]() | 6 | 63 | 4 | |||||||||||||||||||
![]() ![]() | 65 | 60 | 2 | ![]() ![]() | 0 | 77 | 6 | ||||||||||||||||||||
![]() ![]() | 77 | 77 | ![]() ![]() | ||||||||||||||||||||||||
![]() ![]() | 4 | 6 | 6 | ![]() ![]() | w/o | ||||||||||||||||||||||
3 | ![]() ![]() | 6 | 2 | 3 | ![]() ![]() | 62 | 4 | ||||||||||||||||||||
![]() ![]() | 4 | 66 | 2 | ![]() ![]() | 77 | 6 | |||||||||||||||||||||
WC | ![]() ![]() | 6 | 78 | WC | ![]() ![]() | 4 | 6 | 65 | |||||||||||||||||||
WC | ![]() ![]() | 2 | 2 | 2 | ![]() ![]() | 6 | 4 | 77 | |||||||||||||||||||
2 | ![]() ![]() | 6 | 6 |
gollark: The numbers are perfectly manageable if you accept inbreeding and don't mind breeding for ages, or use a cheaper thing like stairstep.
gollark: So, 2 times itself 56 times in total, which is 2^56, which is 72 quadrillion or so.
gollark: In an arrowish one, the last one will have two parents, each of which will have two parents, repeated 54 or so more times.
gollark: Exponential growth!
gollark: Since you're doing a stairsteppy thing it'll only be about 100 dragons, very practical.
External links
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