Wordfeud League of Honour

Welcome

Welcome to Wordfeud League of Honour! We arrange tournaments in Wordfeud and several other games. Read the details under 'Rules', and join us under 'Sign up'!

The latest news

Wordfeud Nynorsk
CemKaraca vinner sin 135. tittel: Et eksepsjonelt mesterskap i sesong 344! Les mer

Ordly Norsk
SigrunM sikrer sin fjerde mestertittel – overgår forventningene med suveren seier! Les mer

Quizkampen Norsk
Cox Clavicula sikrer sitt 191. mesterskap - En ustoppelig legende i ligaen! Les mer

League: Season: Division: Group: Player:

Plass	Navn	Spilt	Seier	Tap	Score for-mot	Margin	Poeng	Fra
1	gizzter47	7	5	2	3012 - 2751	261	10	Canada
2	phelimk	7	5	2	3179 - 2974	205	10	Ireland
3	Polynomial	7	5	2	2920 - 2989	-69	10	kenya
4	GMav	7	4	3	2721 - 2608	113	8
5	SAMellor	7	3	4	2820 - 2882	-62	6
6	Rach179	7	3	4	2085 - 2385	-300	6
7	CantersNick	7	2	5	2828 - 2776	52	4	England
8	Alcoda	7	1	6	2403 - 2603	-200	2	England

1gizzter47+26110

Spilt: 7

Seier: 5

Uavgjort: 0

Tap: 2

Score: 3012 - 2751

Fra: Canada

2phelimk+20510

Spilt: 7

Seier: 5

Uavgjort: 0

Tap: 2

Score: 3179 - 2974

Fra: Ireland

3Polynomial-6910

Spilt: 7

Seier: 5

Uavgjort: 0

Tap: 2

Score: 2920 - 2989

Fra: kenya

4GMav+1138

Spilt: 7

Seier: 4

Uavgjort: 0

Tap: 3

Score: 2721 - 2608

5SAMellor-626

Spilt: 7

Seier: 3

Uavgjort: 0

Tap: 4

Score: 2820 - 2882

6Rach179-3006

Spilt: 7

Seier: 3

Uavgjort: 0

Tap: 4

Score: 2085 - 2385

7CantersNick+524

Spilt: 7

Seier: 2

Uavgjort: 0

Tap: 5

Score: 2828 - 2776

Fra: England

8Alcoda-2002

Spilt: 7

Seier: 1

Uavgjort: 0

Tap: 6

Score: 2403 - 2603

Fra: England

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Comments

The secret link
your last comment.

Navn	Melding	Tid
LoBot	Unbelievably, gizzter47 won Season 236, Div 7, Group 59! This is highly surprising, gizzter47 did nothing the last season to warn us of this marvellous performance. Greetings and salutations!	19/06 2021 00:41:38
Judge Wloh int	GMav thank you for your screenshot. Interim score has been entered	18/06 2021 23:55:59
US Umpire	GMav thank you for letting us know but there are too many tiles remaining for the judge to be able to intervene. We appreciate your sense of fair play for informing us as of a result in which you are losing.	18/06 2021 22:50:32
GMav	My game against Rach 179 is 235-233 to her with 25 tiles remaining	18/06 2021 22:39:48
WLoH Int Official	GMAV. If that game is still incomplete a couple of hours before the deadline please send the judge a screenshot and include your division and group number. The address is wlohintjudge@gmail.com. Thanks	18/06 2021 19:59:49
GMav	I’m leading Allcoda 427 - 382 All tiles are out	18/06 2021 19:53:49
LoBot	The season is close to its end, and gizzter47 is ahead. But if the last games are not finished, I will set some automatic results at deadline, and as it looks right now, phelimk may get the victory. The rules say that if you don´t finish the games, you may lose your promotion, the table judge may edit this group and may give the promotion to gizzter47 anyway. If you are phelimk and care about the promotion, I recommend either finish all games, or, if impossible, report current score in this comment field before deadline.	17/06 2021 15:34:21
Judge Wloh int	Gizzter47 I have deleted your comments. If you have suspicions about an opponent´s game you should send me screenshots of the board and an explanation of your concerns. My address is wlohintjudge@gmail.com	14/06 2021 01:38:50
LoBot	Wow. Seriously. I don´t think I have ever seen such a talented group! SAMELLOR is the Yoda of the pack, with 146 seasons in the league. ALCODA is a clever player who finished as number 5 in this level in the 234th season. GMAV is the player here who has won most groups, with a total of 26 victories. RACH179 is a virtuoso player who has been number 6 in division 5 in season 144. PHELIMK is a marvellous multitalent and does also torture opponents in division 6 in Wordfeud US English while playing here. POLYNOMIAL is the most frequent winner in the selection in the last 10 seasons, with a frequency of 2.48 victories per loss. GIZZTER47 is a magic opponent who was number 5 on this level last season. CANTERSNICK is the tactically strongest player of the last 10 seasons, the opponents have merely scored the humble average of 286 points per game. PHELIMK is one of those rare candles in the dark who donates and keeps this web site running. The winner gets promoted, the two last players will be relegated. We have so many magnificent players here that it is difficult to pick a winner, but my guess is that GMav wins the season.	5/06 2021 01:03:12
LoBot	Yes! I love it when we gather such a wicked selection! SAMELLOR is the greatest veteran here, with 1157 games in this tournament. ALCODA is a intelligent player who has been number 2 in division 6 in season 115. RACH179 is a fine player who recently was number 6 in division 7 in season 233. GMAV is the player here who has won most groups, with a total of 26 victories. PHELIMK is a superb opponent who was number 4 on this level last season. POLYNOMIAL is the one who most recently won a group on a decent level, the player won division 7 back in season 233. GIZZTER47 is a supernatural opponent who was number 5 on this level last season. CANTERSNICK is the player here who most recently went undefeated through an entire season, it happened in 8. division in season 235. PHELIMK is one of those rare candles in the dark who donates and keeps this web site running. The winner gets promoted, the two last players will be relegated. With this many fine players it is hard to tell you who wins, but I guess GMav will top the table at the end of the season.	5/06 2021 01:03:03

We have some bills to pay. If you help us with that, you get a lot more statistics, you get training tools and a wordfeud course at the Improve page, and the Player page starts to work. And you get rid of the commercial banner on the top of the page. A donation of $15, 12 euro, 10 £ or 90 kroner gives you access for a year. Click the donate button for PayPal donation. You can also click here and donate directly to the WLoH bank account.

Matches

Kamp	Resultat
GMAV
GMav – Polynomial	394 – 429
GMav – phelimk	475 – 478
GMav – SAMellor	394 – 495
GMav – CantersNick	414 – 396
GMav – Alcoda	427 – 382
GMav – Rach179	160 – 0
GMav – gizzter47	457 – 428

POLYNOMIAL
Polynomial – GMav	429 – 394
Polynomial – phelimk	372 – 529
Polynomial – SAMellor	416 – 396
Polynomial – CantersNick	408 – 375
Polynomial – Alcoda	458 – 421
Polynomial – Rach179	419 – 467
Polynomial – gizzter47	418 – 407

PHELIMK
phelimk – GMav	478 – 475
phelimk – Polynomial	529 – 372
phelimk – SAMellor	451 – 399
phelimk – CantersNick	368 – 470
phelimk – Alcoda	454 – 415
phelimk – Rach179	488 – 419
phelimk – gizzter47	411 – 424

SAMELLOR
SAMellor – GMav	495 – 394
SAMellor – Polynomial	396 – 416
SAMellor – phelimk	399 – 451
SAMellor – CantersNick	438 – 406
SAMellor – Alcoda	395 – 361
SAMellor – Rach179	338 – 428
SAMellor – gizzter47	359 – 426

CANTERSNICK
CantersNick – GMav	396 – 414
CantersNick – Polynomial	375 – 408
CantersNick – phelimk	470 – 368
CantersNick – SAMellor	406 – 438
CantersNick – Alcoda	419 – 282
CantersNick – Rach179	393 – 416
CantersNick – gizzter47	369 – 450

ALCODA
Alcoda – GMav	382 – 427
Alcoda – Polynomial	421 – 458
Alcoda – phelimk	415 – 454
Alcoda – SAMellor	361 – 395
Alcoda – CantersNick	282 – 419
Alcoda – Rach179	160 – 0
Alcoda – gizzter47	382 – 450

RACH179
Rach179 – GMav	0 – 160
Rach179 – Polynomial	467 – 419
Rach179 – phelimk	419 – 488
Rach179 – SAMellor	428 – 338
Rach179 – CantersNick	416 – 393
Rach179 – Alcoda	0 – 160
Rach179 – gizzter47	355 – 427

GIZZTER47
gizzter47 – GMav	428 – 457
gizzter47 – Polynomial	407 – 418
gizzter47 – phelimk	424 – 411
gizzter47 – SAMellor	426 – 359
gizzter47 – CantersNick	450 – 369
gizzter47 – Alcoda	450 – 382
gizzter47 – Rach179	427 – 355

GMAV

GMav394

Polynomial429

GMav475

phelimk478

GMav394

SAMellor495

GMav414

CantersNick396

GMav427

Alcoda382

GMav160

Rach1790

GMav457

gizzter47428

POLYNOMIAL

Polynomial429

GMav394

Polynomial372

phelimk529

Polynomial416

SAMellor396

Polynomial408

CantersNick375

Polynomial458

Alcoda421

Polynomial419

Rach179467

Polynomial418

gizzter47407

PHELIMK

phelimk478

GMav475

phelimk529

Polynomial372

phelimk451

SAMellor399

phelimk368

CantersNick470

phelimk454

Alcoda415

phelimk488

Rach179419

phelimk411

gizzter47424

SAMELLOR

SAMellor495

GMav394

SAMellor396

Polynomial416

SAMellor399

phelimk451

SAMellor438

CantersNick406

SAMellor395

Alcoda361

SAMellor338

Rach179428

SAMellor359

gizzter47426

CANTERSNICK

CantersNick396

GMav414

CantersNick375

Polynomial408

CantersNick470

phelimk368

CantersNick406

SAMellor438

CantersNick419

Alcoda282

CantersNick393

Rach179416

CantersNick369

gizzter47450

ALCODA

Alcoda382

GMav427

Alcoda421

Polynomial458

Alcoda415

phelimk454

Alcoda361

SAMellor395

Alcoda282

CantersNick419

Alcoda160

Rach1790

Alcoda382

gizzter47450

RACH179

Rach1790

GMav160

Rach179467

Polynomial419

Rach179419

phelimk488

Rach179428

SAMellor338

Rach179416

CantersNick393

Rach1790

Alcoda160

Rach179355

gizzter47427

GIZZTER47

gizzter47428

GMav457

gizzter47407

Polynomial418

gizzter47424

phelimk411

gizzter47426

SAMellor359

gizzter47450

CantersNick369

gizzter47450

Alcoda382

gizzter47427

Rach179355