HomeFacebook Scrabble League Round 175 Division 10Click any result to see the two players' history
E =
Elo Value

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undefined C
  
Elo: 4639

undefined D
  
Elo: 4548

undefined W
  
Elo: 4561

undefined P
  
Elo: 4514

undefined D
  
Elo: 4538

undefined M
  
Elo: 4571

undefined M
  
Elo: 4598

undefined M
  
Elo: 4502

undefined L
  
Elo: 4221

undefined B
  
Elo: 3926

undefined u
  
Elo: 4268

undefined B
Elo: 4609
undefined C
389
undefined B
271

E: -11
undefined B
428
undefined D
282

E: +9.9
undefined W
401
undefined B
382

E: -13.6
undefined B
360
undefined P
335

E: +8.8
undefined D
378
undefined B
283

E: -14.4
undefined B
381
undefined M
295

E: +10.7
undefined M
374
undefined B
317

E: -12.4
undefined B
323
undefined M
280

E: +8.4
undefined L
339
undefined B
277

E: -21.7
undefined B
371
undefined B
214

E: +0.5
undefined B
183
undefined u
90

E: +3
 
Personal Bests for David Brown

Top Score: 528
vs Joseph Bartram who scored 140 in round 60
 
Best Margin: 388
528 - 140 vs Joseph Bartram in round 60
 
Best Joint Score: 1101
528 - 573 with in round 62


Notes on Ratings
Under the Elo ratings system, the winner of a game gains a number of ratings points and the losing player loses the same number. The number of points won or lost depends on the difference between the ratings of the two players; a player will gain more points by beating a higher-rated player than by beating a lower-rated player.

Where games have been completed, the chart above shows the actual number of ratings points passed from the loser to the winner. Where games are unfinished, two numbers are shown in the form A/B. A is the number of points to be transferred if the player in the row wins and B is the number of points if the player in the column wins.

For example
Mildred
Elo 5051
If Joe wins he will gain 9.5 rating points from Mildred but if Mildred wins she will gain 14.5 rating points from Joe. Mildred stands to earn more than Joe from winning the game because Joe is the higher rated player and is expected to win more often.
Joe
Elo 5123
E: 9.5 / 14.5

In the case of a draw, the lower rated player wins points from the higher rated player, but fewer points than if he or she had won the game.

The value of each game is based on the players' rating at the start of each round. At the end of the round, the points won and lost on each game are added up and the players' rating are adjusted and rounded to the nearest whole number for the next round.

The difference in two players' Elo ratings implies an expectation of how often each of them will win when playing each other. Under the system we use: