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 P s l A u d i o T c P C o n n e c t S u c c e s s = T C P -Nl Oޏc
gRhVbRck(WN[eޏc! 
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gRhVbR! 
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 P s l R e m o t e H e l p S t a r t =  _Y܏zOSR, [e _Yc6R`v5u! 
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 P s l R e m o t e C o n n e c t F a i l = N[eޏc1Y%ck(WBlǏ
gRhV-Nl! 
 
 p s l R e m o t e U d p C o n n e c t S e r v e r F a i l = ޏcSbm
gRhV1Y%ck(WBlǏ
gRhV-Nl! 
 
 P s l R e m o t e T c p C o n n e c t S e r v e r F a i l = T C P ܏zc6R-NlޏcSbm
gRhV1Y%! 
 
 P s l R e m o t e T c p C o n n e c t S e r v e r S u c c e s s = T C P ܏zc6R-Nl Oޏc
gRhVbRck(WN[eޏc! 
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gRhV1Y%! 
 
 P s l F i l e C r e a t e S o c k e t F a i l = R^ޏcSbm
gRhVS o c k e t 1Y%! 
 
 P s l F i l e S o c k e t C o n n c e t F a i l = S o c k e t ޏcSbm
gRhV1Y%! 
 
 P s l F i l e C r e a t e T c p S e r v e r F a i l = R^T C P S e r v e r S
gRhV1Y%! 
 
 P s l F i l e N o S e n d D i s k = 
Nte*NxvS! 
 
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T
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 P s l P l e a s e S t o p P r i o r R e m o t e = ~_gHQMRv܏zOSR! 
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 
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 
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 
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N:Nzz͑e	b
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N:Nzz
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NmR]
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 
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gRhV-Nl
 
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gRhV-Nlck(Wޏc
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zPQՋ
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 
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 
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 
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 
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N/ec͑e	b
 
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zP! 
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Ty1Y%! 
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N:Nzz! 
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 
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T
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 
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 
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 
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 
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 
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 
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 
 P s l I P M S G L i s t e n F a i l = ޘ= OfN
gRv,TzS
 
 P s l I P M S G M a y H a s S t a r t = v,T1Y%, S]~/TRޘ= OfN! 
 
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 
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 
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 
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 
 P s l F i l e H a s S a v e T o = ]OX[0R
 
 P s l I P M s g _ s _ d i s c o n n e c t = NU M 
gRhVޏc-NeN/TRޘ= OfN͑e{vU_U M 
 
 P s l S e a r c h S t a r t = d"}
 
 P s l S e a r c h i n g = d"}-N. . . 
 
 P s l l o g i n _ s _ d i s c o n n e c t 1 = NU M 
gRhVޏc1Y%͑e{vU_
 
 P s l I P M s g _ s _ d i s c o n n e c t 1 = NU M 
gRhVޏc1Y%N/TRޘ= OfN͑e{vU_U M 
 
 P s l F i l e F o r S e r v e r S e n d = y~vcS
 
 P s l R e g M a y b e E r r o r = lQOo`S
Nw[/f&T~~
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 
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 
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 
 P s l O t h e r U s e r = vQN(u7b
 
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 
 P s l O b j e c t = N
 
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 
 P s l L o g i n O u t = l 
 
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NSOo`
 
 P s l I P M s g _ N o S u p p o r t = [e/f^ޘ=U M (u7b
N/ecdkd\O
 
 P s l H a s T r a n s f e r = ] O: 
 
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 
 P s l R e m o t e E r r o r F o r N e t = ܏zOSRVQ~-Ne͑eޏc! 
 
 P s l D i s k N o S i z e = xvzz
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 
 P s l I n p u t A c c o u n t I s = ^S: 
 
 P s l H a s e x i s t = ]~X[(W/f&Tv? 
 
 P s l S e n d T o o L o n g = _SOo`Ǐ͑eeQ
 
 P s l R e m o t e P w T o o S h o r t = ܏zc6R[x\6 MO! 
 
 P s l R e m o t e N o C t r l P w = [e
NAQ[xc6R
 
 P s l R e m o t e C t r l P w E r r o r = ܏zc6R[x
 
 P s l P r a y R e m o t e C t r l P w = Bl[xc6R,g:g! 
 
 P s l N e t S h a r e = Q
NE\
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 
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 
 P s l C r e a t e U M V i d e o R o o m F a i l = SwƉO1Y%]~X[(WƉOSN3uReQ! 
 
 P s l C r e a t e U M A u d i o R o o m F a i l = SwO1Y%]~X[(WOSN3uReQ! 
 
 P s l C r e a t e U M V i d e o R o o m S u c c e s s = SwƉObR! 
 
 P s l C r e a t e U M A u d i o R o o m S u c c e s s = SwObR! 
 
 P s l P r a y J o i n V i d e o U M R o o m = BlReQƉO/f&TTa? 
 
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 
 P s l U M R o o m A d m i n = {tXT
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 P s l U M R o o m R e f u s e A V J o i n = b~`OvReQ3u! 
 
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 
 P s l S h a k e W i n d o w = [eSeg N*NzSObR! 
 
 P s l S h a k e W i n d o w L e s s F i v e = $N!k{'YN5 y! 
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 
 P s l U s e r H a s N o t S e t E t c = dkYSǏ0*NNOo`0nnFURU\:yQ[(uN*NNFURc^b*N'`cOo`0
 
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 
 P s l O p e n U M R o o = Sb _~
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 
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Ty
 
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Ty
 
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Ty
 
 P s l U M R o o m s u b j e c t = ~;N
 
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 
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 
 P s l U M R o o m c l a s s = ~{|+R
 
 P s l U M R o o m c l a s s _ T = ~{|+R
 
 P s l U M R o o m c l a s s _ V = O[{|+R
 
 
 
 [ l a n m a i n ] 
 
 r z l b l t i t l e . c a p t i o n = ޘ=U M 
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z t b t n m a x w i n . h i n t =  g'YS
 
 T b t n C o n t a c t . C a p t i o n = T|N
 
 l b l a c c o u n t . c a p t i o n = (u7b
T: 
 
 l b l p w . c a p t i o n = [x: 
 
 R z u l b l r e g . c a p t i o n = (u7blQ
 
 R z u l b l f o r g e t p w . c a p t i o n = _[x
 
 R z b t n l o g i n . c a p t i o n = {vU_
 
 c h k s a v e p w . c a p t i o n = OX[[x
 
 c h k a u t o l o g i n . c a p t i o n = ꁨR{vU_
 
 c h k l o c a l s e a r c h . c a p t i o n = ,g0Wd"}
 
 c h k i p m s g . c a p t i o n = ޘ= OfN
 
 c h k m s n . c a p t i o n = {vU_M S N 
 
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 
 R z b t n c a n c e l L o g i n . c a p t i o n = Sm{vU_
 
 l b l i n s t r u c t i o n . c a p t i o n = lOS\O 0R N<P
 
 R z b t n M e n u . c a p t i o n = ܃US
 
 p u p t o o l c a p t i o n l e f t . c a p t i o n = eW[(W]O
 
 p u p t o o l c a p t i o n r i g h t . c a p t i o n = eW[(WSO
 
 p u p t o o l c a p t i o n t o p . c a p t i o n = eW[(W
NO
 
 p u p t o o l c a p t i o n b o t t o m . c a p t i o n = eW[(WNO
 
 p u p t o o l c a p t i o n n o s h o w . c a p t i o n = 
N>f:yeW[
 
 p o p s e l s e a r c h u s e r . c a p t i o n = (u7bd"}
 
 p o p s e l s e a r c h b a i d u . c a p t i o n = B a i d u ( ~v^) 
 
 p o p s e l s e a r c h g o o g l e . c a p t i o n = G o o g l e ( 7Lk) 
 
 p o p s e l s e a r c h i n t s o . c a p t i o n = x i e s h a n g ( :dFUFUd) 
 
 N f a v o r i t e . c a p t i o n = 6eυ9Y
 
 N o p e n I E . c a p t i o n = Sb _OmȉhV
 
 p o p m u n o t e n e w . c a p t i o n = e^O:{
 
 p o p m u n o t e f i n i s h . c a p t i o n = tetO:{
 
 p o p G r p P r e s e n c e _ u n M S G . c a p t i o n = [e>f:yr`
 
 p o p G m e s s a g e _ u n M S G . c a p t i o n = SOo`
 
 p o p G r p A v a i l a b l e _ u n M S G . c a p t i o n = S
 
 p o p G r p I n v i s i b l e _ u n M S G . c a p t i o n = 
NS
 
 p o p R m e s s a g e _ u n M S G . c a p t i o n = [݋
 
 p o p R f i l e _ u n M S G . c a p t i o n = SeN
 
 p o p R d i r _ u n M S G . c a p t i o n = SeN9Y
 
 p o p R a u d i o _ u n M S G . c a p t i o n = 
 
 p o p R v e d i o _ u n M S G . c a p t i o n = Ɖ
 
 p o p R h e l p _ u n M S G . c a p t i o n = ܏zOSR
 
 p o p R c t r l _ u n M S G . c a p t i o n = ܏zc6R
 
 p o p R p r e s e n c e _ u n M S G . c a p t i o n = [e>f:yr`
 
 p o p R s e n d v i s i b l e _ u n M S G . c a p t i o n = [vQS
 
 p o p R s e n d I n v i s i b l e _ u n M S G . c a p t i o n = [vQ
NS
 
 p o p R b l o c k _ u n M S G . c a p t i o n = O\=
 
 p o p R h i s t o r y _ u n M S G . c a p t i o n = OU_
 
 p o p R u s e r i n f o _ u n M S G . c a p t i o n = (u7bOo`
 
 p o p R m e s s a g e . c a p t i o n = [݋
 
 p o p R f i l e . c a p t i o n = SeN
 
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 
 p o p R a u d i o . c a p t i o n = 
 
 p o p R v e d i o . c a p t i o n = Ɖ
 
 p o p R h e l p . c a p t i o n = ܏zOSR
 
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 
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 
 p o p R s e n d v i s i b l e . c a p t i o n = [vQS
 
 p o p R s e n d I n v i s i b l e . c a p t i o n = [vQ
NS
 
 p o p R s u b s c i b e a g a i n . c a p t i o n = ͑eBlnx
 
 p o p R r e n a m e . c a p t i o n = 9e
T
 
 p o p R b l o c k . c a p t i o n = O\=
 
 p o p R d e l e t e . c a p t i o n =  Rd
 
 p o p R h i s t o r y . c a p t i o n = OU_
 
 p o p R u s e r i n f o . c a p t i o n = (u7bOo`
 
 p o p G r p P r e s e n c e . c a p t i o n = [e>f:yr`
 
 p o p G r p A v a i l a b l e . c a p t i o n = S
 
 p o p G r p I n v i s i b l e . c a p t i o n = 
NS
 
 p o p G m e s s a g e . c a p t i o n = SOo`
 
 p o p G f i l e . c a p t i o n = SeN
 
 p o p G r e n a m e . c a p t i o n = 9e
T
 
 p o p G d e l e t e . c a p t i o n =  Rd
 
 p o p A a d d c o n t a c t . c a p t i o n = mR}YS
 
 p o p A a d d g r o u p . c a p t i o n = R^}YSR~
 
 p m u s t a t u s a v i a b l e . c a p t i o n = (W~
 
 p m u s t a t u s o n l i n e . c a p t i o n = zz
 
 p m u s t a t u s b u s y . c a p t i o n = _x
 
 p m u s t a t u s x a . c a p t i o n = y _
 
 p m u s t a t u s d n d . c a p t i o n = RSbpb
 
 p m u s t a t u s o u t . c a p t i o n = l 
 
 p m u a d d . c a p t i o n = mRR^. . . 
 
 p m u a d d g r o u p . c a p t i o n = R^}YSR~
 
 p m u a d d c o n t a c t . c a p t i o n = mR}YS
 
 p m u s t a t u s r o o m . c a p t i o n = ~
 
 p m u l a n g u a g e . c a p t i o n =  
 
 p m u e d i t s e l f . c a p t i o n = *NNn
 
 p m u e d i t s e l f i n f o . c a p t i o n = *NNn
 
 p m u u p d a t e p w . c a p t i o n = O9eSN
 
 p m u s y s t e m . c a p t i o n = |~n
 
 p m u s y s t e m s e t . c a p t i o n = |~n
 
 p m u m e s s a g e . c a p t i o n = OU_
 
 p m u u p d a t e . c a p t i o n = oNGS~
 
 p m u p l u g m a n g e . c a p t i o n = cN{t
 
 P m u t r a y t o p i c o n . c a p t i o n = >f:y`nmzSO
 
 P m u t r a y m i n . c a p t i o n =  g\Seυ
 
 P m u t r a y s h o w . c a p t i o n = υ
 
 P m u t r a y d e b u g . c a p t i o n = Ջ
 
 p o p c a n c l o s e . c a p t i o n =  Q
 
 b b t n l e a v e m . h i n t = Yu 
 
 b b t n e m a i l . h i n t = N
 
 b b t n m e s s a g e p . h i n t = wO
 
 b b t n a d v a n c e . h i n t = ^JT
 
 l b l u s e r s t a t u s . c a p t i o n = (W~
 
 R z s b t n i c o n . h i n t = )\:NVh
 
 R z s b t n l o c k . h i n t = nv
 
 R z s b t n m i n . h i n t =  g\S
 
 R z s b t n r i g h t h i d e . h i n t = TSυ
 
 R z s b t n t o p h i d e . h i n t = T
Nυ
 
 p m u s k i n s . c a p t i o n = v
 
 N m a i n l a n g u a g e . c a p t i o n =  
 
 l b l l a n g u a g e s e t . c a p t i o n =  n
 
 P m u t r a y a v i l i a b l e . c a p t i o n = (W~
 
 P m u t r a y o n l i n e . c a p t i o n = zz
 
 P m u t r a y b u s y . c a p t i o n = _x
 
 P m u t r a y x a . c a p t i o n = y _
 
 P m u t r a y d n d . c a p t i o n = RSbpb
 
 P m u t r a y a b o u t . c a p t i o n = sQN
 
 p o p s o r t o r d e r s e r v e r . c a p t i o n = 	c
gRhVz^
 
 p o p s o r t o r d e r p y r . c a p t i o n = 	cbGS^
 
 p o p s o r t o r d e r p y d . c a p t i o n = 	cbM^
 
 p o p i t e m S o r t _ u n M S G . c a p t i o n = (u7bRhc^
 
 N O n s e r v e r S o r t i t e m . c a p t i o n = 	c
gRhVz^
 
 N s o r t a s c i t e m . c a p t i o n = 	cbGS^
 
 N s o r t d e s c i t e m . c a p t i o n = 	cbM^
 
 p o p G r p S o r t _ u n M S G . c a p t i o n = (u7bRhc^
 
 N O n s e r v e r S o r t g r p . c a p t i o n = 	c
gRhVz^
 
 N s o r t a s c g r p . c a p t i o n = 	cbGS^
 
 N s o r t d e s c g r p . c a p t i o n = 	cbM^
 
 N T o p e t c l o c k . c a p t i o n = nv
 
 N T o p e t c t o p h i d e . c a p t i o n = T
Nυ
 
 N T o p e t c r i g h t h i d e . c a p t i o n = TSυ
 
 N T o p e t c i c o n . c a p t i o n = )\:NnmRVh
 
 R z b t n a d d . c a p t i o n = mRT|N
 
 p m u a b o u t . c a p t i o n = sQN. . . 
 
 p m u s t a t u s U M r o o m . c a p t i o n = R^~
 
 p m u s t a t u s U M r o o m _ t . c a p t i o n = R^~
 
 c h k R e l o g i n . c a p t i o n = c~ꁨR{vU_
 
 R z U r l L b l I P M s g . c a p t i o n = N/TRޘ= OfN
 
 T a b S h e e t U M . C a p t i o n = U M 
 
 T a b G r o u p . c a p t i o n = ~
 
 T a b S h e e t I P M s g . C a p t i o n = ޘ=
 
 T a b R e c e n t . c a p t i o n =  gя
 
 N I p m s g M e s s a g e . c a p t i o n = [݋
 
 N I p m s g F i l e . c a p t i o n = SeN
 
 N I p m s g D i r . c a p t i o n = SeN9Y
 
 N I p m s g R e f r e s h . c a p t i o n = 7ReRh
 
 N I p m s g S e t . c a p t i o n = ޘ=n
 
 N I p m s g a r r t . c a p t i o n = (u7b^\'`
 
 N I p m s g S e n d A l l . c a p t i o n = SOo`( eN) 
 
 R z T b r c l i p b d . h i n t = jR4g
 
 R z T b r n o t e p a p e r . h i n t = O:{
 
 R z B t n f a v o r i t e . h i n t = 6eυ9Y
 
 R z b t n r i g h t S h o w . h i n t = >f:y
 
 R z b t n l e f t H i d e . h i n t = υ
 
 R z b t n M a i n M e n u . c a p t i o n = ܃US
 
 R z B m p B t n a d d c o n t a c t . h i n t = mR}YS
 
 R z B m p B t n a d d c o n t a c t . c a p t i o n = mR}YS
 
 R z B m p B t n h i s t o r y l o g . c a p t i o n = OU_
 
 R z b m p b t n s e l s e a r c h . h i n t = d"}	y
 
 p o p G A C o n t a c t . c a p t i o n = mR}YS
 
 p o p G A G r o u p . c a p t i o n = R^}YSR~
 
 p o p R A C o n t a c t . c a p t i o n = mR}YS
 
 p o p R A G r o u p . c a p t i o n = R^}YSR~
 
 N I p m s g l o g . c a p t i o n = OU_
 
 N I p m s g A u d i o . c a p t i o n = 
 
 N I p m s g V i d e o . c a p t i o n = Ɖ
 
 N I p m s g H e l p . c a p t i o n = ܏zOSR
 
 N I p m s g C t r l . c a p t i o n = ܏zc6R
 
 R z B t n M e s s a g e . h i n t = wO
 
 N I p m s g C t r l o r i . c a p t i o n = nfc6R
 
 N I p m s g C t r l p w . c a p t i o n = [xc6R
 
 p o p R c t r l _ u n M S G o r i . c a p t i o n = nfc6R
 
 p o p R c t r l _ u n M S G p w . c a p t i o n = [xc6R
 
 p o p R c t r l o r i . c a p t i o n = nfc6R
 
 p o p R c t r l p w . c a p t i o n = [xc6R
 
 N R e c e n t M e s s a g e . c a p t i o n = [݋
 
 N R e c e n t F i l e . c a p t i o n = SeN
 
 N R e c e n t D i r . c a p t i o n = SeN9Y
 
 N R e c e n t A u d i o . c a p t i o n = 
 
 N R e c e n t V i d e o . c a p t i o n = Ɖ
 
 N R e c e n t H e l p . c a p t i o n = ܏zOSR
 
 N R e c e n t C t r l . c a p t i o n = ܏zc6R
 
 N R e c e n t C t r l o r i . c a p t i o n = nfc6R
 
 N R e c e n t C t r l p w . c a p t i o n = [xc6R
 
 N R e c e n t L o g . c a p t i o n = U_
 
 N R e c e n t A t t r . c a p t i o n = (u7b^\'`
 
 N R e c e n t C l e a r A l l . c a p t i o n = nzz gяT|N
 
 N R e c e n t R e m o v e . c a p t i o n = N gяT|Rh-Nyd
 
 P m u t r a y s e l f s e t . c a p t i o n = *NNn
 
 n h e l p . c a p t i o n = .^R
 
 R z t b t n m a x w i n . h i n t =  g'YS
 
 R z s b t n m i n . h i n t =  g\S
 
 N C r e a t e U M G r o u p . c a p t i o n = R^~
 
 N C r e a t e U M G r o u p _ T . c a p t i o n = R^~
 
 N C r e a t e U M G r o u p _ V . c a p t i o n = R^ƉO[
 
 p m u s t a t u s U M r o o m _ V . c a p t i o n = R^ƉO[
 
 N C r e a t e U M G r o u p _ J o i n . c a p t i o n = ReQ~
 
 n p l u g a p p l i c a t i o n . c a p t i o n = ^(ucN
 
 P m u t r a y o u t . c a p t i o n = l 
 
 p m u A d d r e s s . c a p t i o n = [eQz
 
 p m u e x i t . c a p t i o n =  Q( & E ) 
 
 l b l b u s i n e s s . c a p t i o n = FURvh
 
 l b l e t c . c a p t i o n = FURU\:y
 
 P m u t r a y s y s t e m s e t . c a p t i o n = |~n
 
 P m u t r a y s h o w M a i n . c a p t i o n = >f:y;NzSO
 
 
 
 [ c h a t w i n ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z T B t n t r a f i l e . c a p t i o n = eN
 
 R z T B t n t r a f i l e . h i n t = eNS
 
 R z T B t n t r a d i r . c a p t i o n = eN9Y
 
 R z T B t n t r a d i r . h i n t = eN9YS
 
 R z T B t n a u d i o . c a p t i o n = 
 
 R z T B t n a u d i o . h i n t = N
 
 R z T B t n v i d e o . c a p t i o n = Ɖ
 
 R z T B t n v i d e o . h i n t = ƉN
 
 R z T B t n h e l p . c a p t i o n = OSR
 
 R z T B t n h e l p . h i n t = ܏zOSRR1u[ec6R	
 
 R z T B t n c t r l . c a p t i o n = c6R
 
 R z T B t n c t r l . h i n t = ܏zc6R;NRe_c6R[e{:g	
 
 R z T b t n f a c e . c a p t i o n = h`
 
 R z T b t n f a c e . h i n t = ceQh`Vh
 
 R z T b t n f o n t . c a p t i o n = W[SO
 
 R z T b t n f o n t . h i n t = nSW[SO
 
 R z T B t n t e x t . c a p t i o n = 8^(u
 
 R z T B t n t e x t . h i n t = nb	b8^(u
 
 R z T B t n s c r e e n . c a p t i o n = *bO\
 
 R z T B t n S h a k e . h i n t = SbRzSO
 
 R z T B t n s c r e e n . h i n t = :SW*bO\( C t r l + A l t + A ) 
 
 R z T B t n s n a p . c a p t i o n = zSO
 
 R z T B t n s n a p . h i n t = Rbc0RnmRzSO
 
 R z b t n h i s t o r y . c a p t i o n = OU_
 
 R z b t n h i s t o r y . h i n t = gS_MR(u7bOU_
 
 r z b t n s e n d . c a p t i o n = S
 
 r z b t n s e n d . h i n t = SOo`A L T + S 	, pQS.	bSe_
 
 R z u l b l m o r e I n f o . c a p t i o n = ~De
 
 l b l n i c k . c a p t i o n = Y
T: 
 
 l b l o r g t i t l e . c a p t i o n = LR: 
 
 l b l o r g n a m e . c a p t i o n = USMO: 
 
 l b l w o r k s t r e e t 1 . c a p t i o n = 0W@W: 
 
 l b l w o r k v o i c e . c a p t i o n = 5u݋: 
 
 l b l h o m e v o i c e . c a p t i o n = Kb:g: 
 
 l b l w o r k f a x . c a p t i o n =  Ow: 
 
 l b l p r i e m a i l . c a p t i o n = {: 
 
 l b l w e b . c a p t i o n = Q@W: 
 
 b b t n s e a r c h _ c o m p a n y . h i n t = d"}USMO
 
 b b t n s e a r c h _ a d d r e s s . h i n t = d"}0W@W
 
 b b t n s e a r c h _ p h o n e . h i n t = Sb5u݋
 
 b b t n s e a r c h _ m o b i l e . h i n t = Sb5u݋
 
 b b t n s e a r c h _ m o b i l e m e s s a g e . h i n t = SwO
 
 b b t n s e a r c h _ f a x . h i n t = S Ow
 
 b b t n s e a r c h _ e m a i l . h i n t = SN
 
 b b t n s e a r c h _ w e b a d d r e s s . h i n t = Sb _Q@W
 
 p o p m u n s e n d e n t e r . c a p t i o n = E n t e r VfS
 
 p o p m u n s e n d c t r l . c a p t i o n = C t r l + E n t e r VfS
 
 l b l O r g U n i t . c a p t i o n = : 
 
 b t n s e a r c h _ O r g U n i t . h i n t = d"}
 
 l b l d e s c . c a p t i o n = *NNc: 
 
 R z s b t n m i n . h i n t =  g\S
 
 R z t b t n m a x w i n . h i n t =  g'YS
 
 R z t b t n s n a p w i n . h i n t = RbczSO
 
 R z b t n c u t i m a g e s t y l e . h i n t = *bO\!j_
 
 c u t i m a g e s h o w . c a p t i o n = *bO\e>f:yzSO
 
 c u t i m a g e h i d e . c a p t i o n = *bO\eυ,gzSO
 
 N V i d e o _ s e t . c a p t i o n = Ɖn
 
 N A u d i o _ s e t . c a p t i o n = 󗑘n
 
 l b l r e m o t e v i d e o . c a p t i o n = ܏zƉ
 
 l b l l o c a l v i d e o . c a p t i o n = ,g0WƉ
 
 l b l m i c v a l u e . c a p t i o n = KQΘϑ
 
 l b l s p k v a l u e . c a p t i o n = d>eϑ
 
 b t n a n s w e r . c a p t i o n = c,T
 
 r z b t n h a n g u p . c a p t i o n = ce
 
 b t n v i d e o c h a g e . h i n t = Rbc
 
 R z T B t n S e n d I m a g e . c a p t i o n = VGr
 
 R z T B t n S e n d I m a g e . h i n t = SVGr
 
 N R e m o t e L e a v e 0 . c a p t i o n = NO( 1 6 r) 
 
 N R e m o t e L e a v e 1 . c a p t i o n = -N( 2 5 6 r) 
 
 N R e m o t e L e a v e 2 . c a p t i o n = ؚ( 1 6 MOwi_r) 
 
 p m u h i s t o r y c o p y . c a p t i o n = 
Y6R( C t r l + C ) 
 
 p m u h i s t o r y s a v e a s . c a p t i o n = SX[:N
 
 p m u h i s t o r y p h o t o s a v e . c a p t i o n = VGrSX[:N
 
 p m u h i s t o r y a d d F a c e . c a p t i o n = mR0Rꁚ[INh`
 
 p m u e d i t c l e a r . c a p t i o n = nd
 
 p m u e d i t u n d o . c a p t i o n = dm( C t r l + Z ) 
 
 p m u e d i t c u t . c a p t i o n = jRR( C t r l + X ) 
 
 p m u e d i t c o p y . c a p t i o n = 
Y6R( C t r l + C ) 
 
 p m u e d i t p a s t e . c a p t i o n = |4( C t r l + V ) 
 
 p m u e d i t s a v e a s . c a p t i o n = SX[:N
 
 p m u e d i t p h o t o s a v e . c a p t i o n = VGrSX[:N
 
 p m u e d i t a d d F a c e . c a p t i o n = mR0Rꁚ[INh`
 
 R z T B t n i n f o . c a p t i o n = *NNOo`
 
 R z T B t n i n f o . h i n t = >f:yυ*NNOo`
 
 b t n v i d e o m a x . h i n t =  g'YS
 
 T a b S h e e t U s e r I n f o . c a p t i o n = *NNOo`
 
 T a b S h e e t F i l e L i s t . c a p t i o n = eN O
 
 T a b S h e e t A V i d e o . c a p t i o n = Ɖ
 
 l b l I P M s g _ N a m e . c a p t i o n = Y
T
 
 l b l I P M s g _ G r o u p . c a p t i o n = 
 
 l b l I P M s g _ I P . c a p t i o n = I P 0W@W
 
 R z u l b l R e c v A l l . c a p t i o n = hQ营c6e
 
 R z u l b l R e f u s e A l l . c a p t i o n = hQb~
 
 N R e m o t e o r i . c a p t i o n = nfc6R
 
 N R e m o t e p w . c a p t i o n = [xc6R
 
 N R e m o t e P w S e t . c a p t i o n = [xc6Rn
 
 R z b t n o p e n s h a r e . c a p t i o n = Sb _|~qQN
 
 
 
 [ N e w u s e r ] 
 
 r z l b l t i t l e . C a p t i o n = (u7blQ
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l s e r v e r . c a p t i o n = 
gRhV
 
 l b l u s e r . c a p t i o n = ^S
 
 l b l p w . c a p t i o n = [x
 
 c h k s a v e p w . c a p t i o n = OO^SS[x
 
 R z b t n r e g . c a p t i o n = lQ
 
 R z b t n c a n c e l 1 . c a p t i o n = Sm
 
 R z b t n c a n c e l 2 . c a p t i o n = Sm
 
 r R z b t n r e t r y r e g . c a p t i o n = {vU_v^kXQ*NNOo`
 
 R z b t n o k . c a p t i o n = {vU_
 
 l b l s t a t u s . c a p t i o n = ck(WlQ
zT. . . 
 
 l b l e m a i l . c a p t i o n = {
 
 l b l w r i t e i n f o . c a p t i o n = wQnxkXQ`v*NNOo`! 
 
 l b l m u s t w r i t e . c a p t i o n = &^" * " :N_kXy
 
 l b l w r i t e i p . c a p t i o n = kXQI P 0W@WbW
T
 
 l b l w r i t e a c c o u n t . c a p t i o n = kXQ`v{vU_^S
 
 l b l w r i t e e m a i l . c a p t i o n = cknxkXQ`v5uP[{
 
 l b l f a m i l i y n a m e . c a p t i o n = Y
T
 
 l b l g i v e n n a m e . c a p t i o n = 
T
 
 l b l o r g n a m e . c a p t i o n = USMO
Ty
 
 l b l o r g u n i t . c a p t i o n = 
 
 l b l o r g t i t l e . c a p t i o n = LR
 
 l b l W o r k V o i c e . c a p t i o n = V[5u݋
 
 l b l H o m e V o i c e . c a p t i o n = Kb:g
 
 l b l W o r k F a x . c a p t i o n =  Ow
 
 l b l w e b . c a p t i o n = Q@W
 
 l b l W o r k S t r e e t 1 . c a p t i o n = T|0W@W
 
 l b l i n s t r u c t i o n 1 . c a p t i o n = 1 . 
NlQvc/TRޘ= OfN[sQQNw w w . i p m s g . o r g . c n 	
 
 l b l i n s t r u c t i o n . c a p t i o n = 2 . lQTSYQNNS[s0Ɖ0܏zc6R00ƉO0Q~qQNI{ibU\R[sP C - Kb:g- Qu	Nz_NS-d^]vU M sSe
gRhV[sƖN0( w w w . u m n e t . c n ) 
 
 l b l w r i t e p w . c a p t i o n = kXQ`v{vU_[x
 
 R z b t n r e r e g . c a p t i o n = ͑elQ
 
 l b l V o c a t i o n a l . c a p t i o n = LN
 
 l b l I n d u s t r y . c a p t i o n = LN
 
 l b l A r e a _ 1 . c a p t i o n = w
 
 l b l A r e a _ 2 . c a p t i o n = ^
 
 l b l A r e a _ 3 . c a p t i o n = :S
 
 
 
 [ n e t s e t ] 
 
 r z l b l t i t l e . c a p t i o n = Q~n
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z p a g e n e t p r o x y . c a p t i o n = Ntn
 
 R z p a g e n e t c o n n e c t . c a p t i o n = ޏcn
 
 R z p a g e n e t t r a n s f e r . c a p t i o n =  On
 
 R z b t n o k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 l b l t y p e . c a p t i o n = {|W
 
 l b l h o s t . c a p t i o n = ;N:g
 
 l b l p o r t . c a p t i o n = zS
 
 c h k S o c k s A u t h . c a p t i o n =  
 
 l b l u s e r n a m e . c a p t i o n = (u7b
T
 
 l b l p w . c a p t i o n = [x
 
 c h k a u t o s e a r c h s v r . c a p t i o n = ꁨRd"}
gRhV
 
 l b l s e r v e r i p . c a p t i o n = 
gRhV0W@W
 
 l b l s e r v e r p o r t . c a p t i o n = zS
 
 R b t n n a t o r i . c a p t i o n = ؞N
gRhVvTn
 
 R b t n n a t . c a p t i o n = O(uꁚ[IN On
 
 l b l t r a n s e r v e r i p . c a p t i o n = 
gRhV0W@W
 
 l b l t r a n s e r v e r p o r t . c a p t i o n = zS
 
 
 
 [ W e b s e t ] 
 
 r z l b l t i t l e . c a p t i o n = |~n
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z g r p s y s t e m . c a p t i o n = |~n
 
 R z g r p s y s t e m . i t e m s [ 0 ] . c a p t i o n = /TRn
 
 R z g r p s y s t e m . i t e m s [ 1 ] . c a p t i o n = GS~n
 
 R z g r p s y s t e m . i t e m s [ 2 ] . c a p t i o n = ܏zc6Rn
 
 R z g r p s y s t e m . i t e m s [ 3 ] . c a p t i o n = *bVn
 
 R z g r p s y s t e m . i t e m s [ 4 ] . c a p t i o n = vQ[n
 
 R z g r p s y s t e m . i t e m s [ 5 ] . c a p t i o n = X󗾋n
 
 R z g r p s y s t e m . i t e m s [ 6 ] . c a p t i o n = p.n
 
 l b l m e s s a g e s e t . c a p t i o n = Oo`n
 
 l b l s t a r t s e t . c a p t i o n = /TRn
 
 l b l w i n d o w s s e t c a p t i o n = zSOn
 
 l b l c h a t w i n d o w . c a p t i o n = zSO
 
 G b o x m e s s a g e . c a p t i o n = Oo`
 
 c h k a u t o s t a r t . c a p t i o n =  _:g/TR
 
 c h k s t a r t m i n . c a p t i o n = /TRe g\S
 
 l b l f o r m . c a p t i o n = >f:ye_
 
 l b l f o r m a p l . c a p t i o n = zSOf^
 
 l b l m e s s a g e . c a p t i o n = Se_
 
 T a b R e m o t e _ S e r v e r . c a p t i o n = 
gRhVn
 
 T a b R e m o t e _ C l i e n t . c a p t i o n = [7bzn
 
 l b l C _ f u l l S c r e e n . c a p t i o n = /f&ThQO\
 
 l b l C _ f u l l S c r e e n _ s . c a p t i o n = n/f&TNhQO\e_>f:y[eO\U^
 
 l b l C _ f u l l C o l o u r . c a p t i o n = /f&TO(uhQri_
 
 l b l C _ f u l l C o l o u r _ s . c a p t i o n = n/f&TO(uhQri_!j_
 
 l b l C _ C o l o u r L e v e l . c a p t i o n = ri_v~+R
 
 l b l C _ C o l o u r L e v e l _ s . c a p t i o n = ri_v~+R0   =   8   c o l o u r s ,   1   =   6 4   c o l o u r s ,   2   =   2 5 6   c o l o u r s 	
 
 l b l C _ s e n d P t r E v e n t s . c a p t i o n = /f&TS hmo`
 
 l b l C _ s e n d P t r E v e n t s _ s . c a p t i o n = n/f&TS hmo`
 
 l b l C _ s e n d K e y E v e n t s . c a p t i o n = /f&TS.vmo`
 
 l b l C _ s e n d K e y E v e n t s _ s . c a p t i o n = n/f&TS.vmo`
 
 R z R b x C _ f u l l S c r e e n . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x C _ f u l l S c r e e n . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x C _ f u l l C o l o u r . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x C _ f u l l C o l o u r . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x C _ s e n d P t r E v e n t s . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x C _ s e n d P t r E v e n t s . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x C _ s e n d K e y E v e n t s . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x C _ s e n d K e y E v e n t s . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 l b l s _ r e m o v e w a l l p a p e r . c a p t i o n = /f&TydX~
 
 l b l s _ r e m o v e w a l l p a p e r _ s . c a p t i o n = n/f&T>f:y,g:gnvLhb
 
 l b l S _ D i s a b l e E f f e c t s . c a p t i o n = /f&Ty(uHeg
 
 l b l S _ D i s a b l e E f f e c t s _ s . c a p t i o n = ny(uHegkYfeW[	
 
 l b l S _ U s e C a p t u r e B l t . c a p t i o n = /f&TO(ubSfzS
 
 l b l S _ U s e C a p t u r e B l t _ s . c a p t i o n = n/f&TbSf`nmzSO
 
 l b l S _ A c c e p t K e y E v e n t s . c a p t i o n = /f&TT^.vmo`
 
 l b l S _ A c c e p t K e y E v e n t s _ s . c a p t i o n = n/f&TT^[eSegv.vOo`
 
 l b l S _ A c c e p t P o i n t e r E v e n t s . c a p t i o n = /f&TT^ hmo`
 
 l b l S _ A c c e p t P o i n t e r E v e n t s _ s . c a p t i o n = n/f&TT^[eSegv hOo`
 
 R z R b x S _ R e m o v e W a l l p a p e r . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x S _ R e m o v e W a l l p a p e r . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x S _ D i s a b l e E f f e c t s . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x S _ D i s a b l e E f f e c t s . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x S _ U s e C a p t u r e B l t . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x S _ U s e C a p t u r e B l t . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x S _ A c c e p t K e y E v e n t s . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x S _ A c c e p t K e y E v e n t s . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 R z R b x S _ A c c e p t P o i n t e r E v e n t s . b u t t o n s [ 0 ] . c a p t i o n = /f
 
 R z R b x S _ A c c e p t P o i n t e r E v e n t s . b u t t o n s [ 1 ] . c a p t i o n = &T
 
 l b l u p d a t e s e t . c a p t i o n = oNGS~
 
 l b l p l u g s e t . c a p t i o n = cNGS~
 
 R b t n u p d a t e o r i . c a p t i o n = O(uU M lQqQGS~
gRhV
 
 R b t n u p d a t e . c a p t i o n = O(u(W~{vU_
gRhV
 
 l b l u p d a t e a d d . c a p t i o n = fe0W@W
 
 R b t n p l u g o r i . c a p t i o n = O(uU M lQqQGS~
gRhV
 
 R b t n p l u g . c a p t i o n = O(u(W~{vU_
gRhV
 
 l b l p l u g a d d . c a p t i o n = fe0W@W
 
 l b l c a p p i c s e t . c a p t i o n = *bVn
 
 l b l c u t i m a g e . c a p t i o n = *bV(ϑ
 
 l b l c u t i m a g e s e t . c a p t i o n = *bVn
 
 R z R d i o g b x i m a g e s t y l e . b u t t o n s [ 0 ] . c a p t i o n = *bVe>f:y;NzSO
 
 R z R d i o g b x i m a g e s t y l e . b u t t o n s [ 1 ] . c a p t i o n = *bVeυ;NzSO
 
 l b l a d d r e s s s e t . c a p t i o n = Q@Wn
 
 l b l s h o r t s e t . c a p t i o n = _wce_
 
 c h k O p e n I e . c a p t i o n = oN/TReSb _Q@W
 
 l b l O p e n I e . c a p t i o n = cQ@W
 
 l b l l o g i n s e t . c a p t i o n = {vU_n
 
 c h k R e l o g i n . c a p t i o n = c~ꁨR{vU_
 
 l b l b a s i c s e t . c a p t i o n = W,gn
 
 l b l s e a r c h s e t . c a p t i o n = d"}n
 
 l b l n e t s e t . c a p t i o n = Qkn
 
 l b l I P M s g _ u s e r . c a p t i o n = Y
T
 
 l b l I P M s g _ g r o u p . c a p t i o n = 
 
 l b l i p m s g . c a p t i o n = ޘ= OfN
 
 R g r p I P M s g _ s t a r t t y p e . B u t t o n s [ 0 ] . c a p t i o n = /T(u
 
 R g r p I P M s g _ s t a r t t y p e . B u t t o n s [ 1 ] . c a p t i o n = y(u
 
 R g r p I P M s g _ s t a r t t y p e . B u t t o n s [ 2 ] . c a p t i o n = USr/T(u
 
 l b l I P M s g _ b r o a d c a s t . c a p t i o n = ^d!j_
 
 l b l I P M s g _ p o r t . c a p t i o n = v,TzS
 
 R g r p I P M s g _ b r o a d c a s t . B u t t o n s [ 0 ] . c a p t i o n = /T(u
 
 R g r p I P M s g _ b r o a d c a s t . B u t t o n s [ 1 ] . c a p t i o n = y(u
 
 l b l I P M s g _ i n p u t n e t . c a p t i o n = Qk0W@W
 
 l b l I P M s g _ n e t l i s t . c a p t i o n = QkRh
 
 b t n I P M s g _ a d d . c a p t i o n = mR
 
 b t n I P M s g _ d e l . c a p t i o n =  Rd
 
 l b l I P M s g _ n e t i n f o . c a p t i o n = eQQk0W@We gT NMOe kXQ0OeQ1 9 2 . 1 6 8 . 0 d"}eON1 9 2 . 1 6 8 . 0 . 1 d"}0R1 9 2 . 1 6 8 . 0 . 2 5 4 0dkR 1uhVI{Q~Y/ec
 
 R z b t n R e C L i n k . c a p t i o n = ͑^_wce_
 
 R z b t n D e l L i n k . c a p t i o n =  Rd_wce_
 
 G b o x C h a t f o r m . c a p t i o n = zSO
 
 l b l c h a t i n f o . c a p t i o n = *NNOo`
 
 R z R G r p C h a t I n f o . B u t t o n s [ 0 ] . c a p t i o n = >f:y
 
 R z R G r p C h a t I n f o . B u t t o n s [ 1 ] . c a p t i o n = υ
 
 l b l c h a t s h a k e . c a p t i o n = zSObR
 
 R z R G r p C h a t S h a k e . B u t t o n s [ 0 ] . c a p t i o n = /T(u
 
 R z R G r p C h a t S h a k e . B u t t o n s [ 1 ] . c a p t i o n = y(u
 
 l b l u s e r v e r . c a p t i o n = 
gRhV
 
 l b l p s e r v e r . c a p t i o n = 
gRhV
 
 l b l a u t o u p d a t e . c a p t i o n = ꁨRfe
 
 R g r p a u t o u p d a t e . b u t t o n s [ 0 ] . c a p t i o n = /T(u
 
 R g r p a u t o u p d a t e . b u t t o n s [ 1 ] . c a p t i o n = y(u
 
 l b l c u t i m a g e c o l o r . c a p t i o n = MOV
 
 c h k A u t o l o g i n . c a p t i o n = /TReꁨR{vU_
 
 l b l r e m o t e s e t . c a p t i o n = ܏zc6R
 
 R z c h k A l l o w C t r l P w . c a p t i o n = AQ[xc6R,g:g
 
 l b l R e m o t e P w . c a p t i o n = [x
 
 l b l I P M s g _ n e t s h a r e . c a p t i o n = Q
NE\
 
 R g r p I P M s g _ n e t s h a r e . b u t t o n s [ 0 ] . c a p t i o n = >f:y
 
 R g r p I P M s g _ n e t s h a r e . b u t t o n s [ 1 ] . c a p t i o n = υ
 
 
 
 
 
 [ f i l e o p e n ] 
 
 r z l b l t i t l e . C a p t i o n = Sb _
 
 R z b t n o p e n . c a p t i o n = Sb _eN
 
 R z b t n o p e n f o l d e r . c a p t i o n = Sb _vU_
 
 R z b t n c l o s e . c a p t i o n = sQ
 
 R z s b t n c l o s e . h i n t = sQ
 
 
 
 [ v c a r d _ n e w ] 
 
 r z l b l t i t l e . C a p t i o n = *NNOo`
 
 R z s b t n c l o s e . h i n t = sQ
 
 g b x _ B u s i n e s s . c a p t i o n = FUROo`
 
 g b x _ e t c . c a p t i o n = vQNOo`
 
 l b l _ f n a m e . c a p t i o n = Y
 
 l b l _ s n a m e . c a p t i o n = 
T
 
 l b l _ n i c k . c a p t i o n = y|T
 
 l b l _ c o m p a n y . c a p t i o n = USMO
 
 l b l _ P o s t . c a p t i o n = LR/ Ly
 
 l b l _ d e p a r t m e n t . c a p t i o n = 
 
 l b l _ a d d r e s s . c a p t i o n = 0W@W
 
 l b l _ z i p c o d e . c a p t i o n = 
 
 l b l _ p h o n e . c a p t i o n = 5u݋
 
 l b l _ f a x . c a p t i o n =  Ow
 
 l b l _ m o b i l e p h o n e . c a p t i o n = yR5u݋
 
 l b l _ p h o n e _ e t c . c a p t i o n = vQN5u݋
 
 l b l _ e m a i l . c a p t i o n = {
 
 l b l _ D e s c r i p t i o n . c a p t i o n = FURU\:y
 
 l b l _ b i r t h d a y . c a p t i o n = Qut^g
 
 l b l _ s e x . c a p t i o n = '`+R
 
 l b l _ c o l l e g e . c a p t i o n = kNb!h
 
 l b l _ E d u c a t i o n . c a p t i o n = f[S
 
 l b l _ N a t i o n a l . c a p t i o n = le
 
 l b l _ I n d u s t r y . c a p t i o n = LN
 
 l b l _ V o c a t i o n a l . c a p t i o n = LN
 
 l b l _ A r e a . c a p t i o n = 0W:S
 
 l b l _ w e b a d d r e s s . c a p t i o n = Q@W
 
 b t n o k . c a p t i o n = nx[
 
 b t n c a n c e l . c a p t i o n = Sm
 
 b t n s e l e c t i m a g e . c a p t i o n = 	b
 
 b t n c l e a r i m a g e . c a p t i o n = nd
 
 c m b B u s i n e s s . c a p t i o n = FURvh
 
 l b l _ j i d . c a p t i o n = ^S
 
 l b l _ p h o t o . c a p t i o n = b_agqGr
 
 l b l B u s i n e s s . c a p t i o n = FURvh
 
 
 
 [ a d d c o n t a c t ] 
 
 r z l b l t i t l e . c a p t i o n = mR(u7b/ ~
 
 R z s b t n c l o s e . h i n t = sQ
 
 R d b t n s e r v e r . c a p t i o n = b]d"}T|N
 
 l b l a d d _ u s e r s e r v e r . c a p t i o n = 	bU M 
gRhV
 
 l b l a d d _ u s e r a d d r e s s . c a p t i o n = (u7b0W@W
 
 l b l _ s e a r c h f n a m e . c a p t i o n = Y
T
 
 l b l _ s e a r c h s n a m e . c a p t i o n = 
T
 
 l b l _ s e a r c h n i c k . c a p t i o n = y|T
 
 l b l _ s e a r c h e m a i l . c a p t i o n = E m a i l 
 
 l b l _ B u s i n e s s . c a p t i o n = FURvh
 
 l v w u s e r . C o l u m n s [ 0 ] . c a p t i o n = ^S
 
 l v w u s e r . C o l u m n s [ 1 ] . c a p t i o n = Y
T
 
 l v w u s e r . C o l u m n s [ 2 ] . c a p t i o n = y|T
 
 l v w u s e r . C o l u m n s [ 3 ] . c a p t i o n = USMO
 
 l v w u s e r . C o l u m n s [ 4 ] . c a p t i o n = 
 
 l v w u s e r . C o l u m n s [ 5 ] . c a p t i o n = LR
 
 l v w u s e r . C o l u m n s [ 6 ] . c a p t i o n = E m a i l 
 
 l v w u s e r . C o l u m n s [ 7 ] . c a p t i o n = FURvh
 
 l b l s t a t u s . c a p t i o n = ck(Wd"}(u7b
zP. . . 
 
 c h k o n l i n e . c a p t i o n = (W~
 
 R z b t n s e a r c h . c a p t i o n = g~b
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 l b l a d d h i n t . c a p t i o n = SQ	b9_QmR(u7bzSO
 
 R z b t n F i r s t . c a p t i o n = u
 
 R z b t n p e r i o r . c a p t i o n = MR Nu
 
 R z b t n n e x t . c a p t i o n = T Nu
 
 R z b t n L a s t . c a p t i o n = +gu
 
 l b l j i d . c a p t i o n = (u7b^S
 
 l v w u s e r . h i n t = SQ	b9_QmR(u7bzSO
 
 l b l _ c o m p a n y . c a p t i o n = USMO
 
 l b l _ o r g u n i t . c a p t i o n = 
 
 l b l _ o r g t i t l e . c a p t i o n = LR
 
 R z b t n a d d . c a p t i o n = vcmR
 
 R z b t n S e a r c h S e r v e r . c a p t i o n = d"}
gRhV
 
 T a b S e a r c h U s e r . c a p t i o n = g~b(u7b
 
 T a b S e a r c h G r o u p . c a p t i o n = g~b~
 
 l b l s e a r c h _ u . c a p t i o n = g~be_
 
 R z R G r p S e l e c t _ U . B u t t o n s [ 0 ] . c a p t i o n = |nxg~b
 
 R z R G r p S e l e c t _ U . B u t t o n s [ 1 ] . c a p t i o n = ؚ~g~b
 
 R z b t n U s e r P e r . c a p t i o n = 
N Nek
 
 R z b t n A d d t o F r i e n d . c a p t i o n = R:N}YS
 
 l b l s e a r c h _ g . c a p t i o n = g~be_
 
 R z R G r p S e l e c t _ G . B u t t o n s [ 0 ] . c a p t i o n = |nxg~b
 
 R z R G r p S e l e c t _ G . B u t t o n s [ 1 ] . c a p t i o n = ؚ~g~b
 
 l b l g r o u p i d . c a p t i o n = ~I D 
 
 l b l g r o u p n a m e . c a p t i o n = ~
Ty
 
 l b l g r o u p s u b j e c t . c a p t i o n = ~;N
 
 l b l g r o u p c r e a t e i d . c a p t i o n = R^I D 
 
 R z b t n G r p P e r . c a p t i o n = 
N Nek
 
 R z b t n j o i n g r p . c a p t i o n = ReQ~
 
 R z b t n c l o s e g r p . c a p t i o n = sQ
 
 l v w r o o m l i s t . C o l u m n s [ 0 ] . c a p t i o n = ~I D 
 
 l v w r o o m l i s t . C o l u m n s [ 1 ] . c a p t i o n = ~
Ty
 
 l v w r o o m l i s t . C o l u m n s [ 2 ] . c a p t i o n = ~;N
 
 l v w r o o m l i s t . C o l u m n s [ 3 ] . c a p t i o n = R^I D 
 
 l b l a d d g r o u p . c a p t i o n = SQ	b9_QmR~zSO
 
 R z B t n f i r s t _ G . c a p t i o n = u
 
 R z B t n p e r i o r _ G . c a p t i o n = MR Nu
 
 R z B t n n e x t _ G . c a p t i o n = T Nu
 
 R z B t n l a s t _ G . c a p t i o n = +gu
 
 
 
 
 
 [ G r p M s g ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 r z l b l t i t l e . c a p t i o n = SOo`
 
 R z b t n o k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ G r p R e m o v e ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 r z l b l t i t l e . c a p t i o n =  Rd~
 
 o p t M o v e . c a p t i o n = yRT|N0RvQ[~
 
 o p t N u k e . c a p t i o n =  Rdُ*N~-Nv@b	gT|N
 
 c h k U n s u b . c a p t i o n = NbvT|NRh-N RdُNT|N
 
 c h k U n s u b e d . c a p t i o n = :_6RN[eT|NRh-N\b Rd
 
 R z b t n O K . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ j s e n d f i l e ] 
 
 r z l b l t i t l e . c a p t i o n = eNRh
 
 R z s b t n c l o s e . h i n t = sQ
 
 l i s t v i e w f i l e . C o l u m n s [ 0 ] . c a p t i o n = eN
T
 
 l i s t v i e w f i l e . C o l u m n s [ 1 ] . c a p t i o n = _
 
 R z b t n d e l e t e . c a p t i o n = yd
 
 R z b t n d e l e t e a l l . c a p t i o n = hQyd
 
 R z b t n c l o s e . c a p t i o n = sQ
 
 p m u d e l e t e . c a p t i o n =  Rd
 
 p m u d e l e t e a l l . c a p t i o n = hQ Rd
 
 
 
 [ o f t e n t e x t ] 
 
 r z l b l t i t l e . c a p t i o n = 8^(u
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l n u m l i m i t . c a p t i o n =  gY1 5 *NIlW[
 
 R z b t n o k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ R e m o v e C o n t a c t ] 
 
 r z l b l t i t l e . c a p t i o n =  RdT|N
 
 R z s b t n c l o s e . h i n t = sQ
 
 o p t M o v e . c a p t i o n = Nُ*N~-N RdT|N
 
 o p t R e m o v e . c a p t i o n = NT|NRh-N RdT|N
 
 c h k R e m o v e 1 . c a p t i o n = NRh-N RddkN
 
 c h k R e m o v e 2 . c a p t i o n = \bN[evT|NRh-N Rd
 
 R z b t n O K . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ s u b s c r i b e ] 
 
 r z l b l t i t l e . c a p t i o n = mRT|N
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l g r p . c a p t i o n = ~
 
 l b l n i c k . c a p t i o n = Yl
 
 R z b t n a g r e e . c a p t i o n = Ta
 
 R z b t n r e f u s e . c a p t i o n = b~
 
 
 
 [ u p d a t e p w ] 
 
 r z l b l t i t l e . c a p t i o n = O9eSN
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l p w . c a p t i o n = eSN
 
 l b l p w a g a i n . c a p t i o n = Q!keQ
 
 R z b t n o k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 l b l p r e p w . c a p t i o n = SSN
 
 
 
 [ s n a p t a b ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 p m u t a b s c l o s e w i n . c a p t i o n = sQS_MR(u7bzSO
 
 p m u f l o a t w i n . c a p t i o n = Rbc0RnmRzSO
 
 p m u t a b s c l o s e a l l w i n . c a p t i o n = sQhQ(u7bzSO
 
 p m u t a b s a t t r . c a p t i o n = gwS_MR(u7b^\'`
 
 R z p a g e t a b . h i n t = SQh~{sQ, bRRyzSO
 
 R z t b t n s n a p w i n . h i n t = RbczSO
 
 
 
 [ f o r g e t p w ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 r z l b l t i t l e . c a p t i o n = _[x
 
 l b l a c c o u n t . c a p t i o n = (u7b^S: 
 
 l b l i n p u t a c c o u n t . c a p t i o n = eQ_[xv(u7b^S
 
 b t n o k . c a p t i o n = nx[
 
 b t n c a n c e l . c a p t i o n = Sm
 
 b t n c a n c e l 2 . c a p t i o n = Sm
 
 b t n o k 3 . c a p t i o n = nx[
 
 b t n b a c k . c a p t i o n = Sm
 
 l b l f o r g e t i n g . c a p t i o n = ck(WS[x
zP. . . : 
 
 
 
 [ A u d i o _ s e t ] 
 
 r z l b l t i t l e . c a p t i o n = 󗑘n
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l D e v i c e I n . c a p t i o n = XUcY
 
 l b l D e v i c e O u t . c a p t i o n = Xd>eY
 
 r z b t n o k . c a p t i o n = nx[
 
 r z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ V i d e o _ S e t ] 
 
 r z l b l t i t l e . c a p t i o n = Ɖn
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l D e v i c e . c a p t i o n = ƉY
 
 b t n q u a l i t y . c a p t i o n = Ucn
 
 g b x f i r s t . c a p t i o n = OHQn
 
 R z R b x S _ V i d e o F i r s t . B u t t o n s [ 0 ] . c a p t i o n = OHQƉAmEu
 
 R z R b x S _ V i d e o F i r s t . B u t t o n s [ 1 ] . c a p t i o n = OHQƉ;u(
 
 
 
 
 
 [ a b o u t u s ] 
 
 r z l b l t i t l e . c a p t i o n = sQNU M 
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l t o p t i t l e . c a p t i o n = ޘ=U M  0[7bz
 
 l b l c o m p a n y . c a p t i o n = R\yrlKQQ~yb	gPlQS
 
 l b l c o p y r i g h t . c a p t i o n = C o p y r i g h t ( C ) 2 0 0 6 - 2 0 0 9   Q i n g d a o   I n t W o r k   C o r p . 
 
 l b l u p d a t e . c a p t i o n = zsSfe
 
 R z b t n O k . c a p t i o n = nx[
 
 l b l u s e r . c a p t i o n = cCg(u7bR\yrlKQQ~yb	gPlQS
 
 l b l u n i t . c a p t i o n = cCglQSR\yrlKQQ~yb	gPlQS
 
 
 
 [ A d d F r i e n d ] 
 
 r z l b l t i t l e . c a p t i o n = mRT|N
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l a d d n o w u s e r . c a p t i o n = dkBlS~}YS
 
 l b l a d d _ n e w g r o u p . c a p t i o n = T|NR~
 
 l b l a d d _ u s e r n i c k . c a p t i o n = T|NYl
 
 l b l a d d _ c a n n e w g r o u p . c a p t i o n = SeQe~
 
 R z b t n O k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 l b l u s e r i n f o . c a p t i o n = (u7bOo`
 
 l b l j i d . c a p t i o n = ^S
 
 l b l _ s e a r c h f n a m e . c a p t i o n = Y
T
 
 l b l _ s e a r c h s n a m e . c a p t i o n = 
T
 
 l b l _ s e a r c h n i c k . c a p t i o n = y|T
 
 l b l _ s e a r c h e m a i l . c a p t i o n = E m a i l 
 
 l b l _ c o m p a n y . c a p t i o n = USMO
 
 l b l _ d e p a r t m e n t . c a p t i o n = 
 
 l b l _ P o s t . c a p t i o n = LR
 
 l b l _ B u s i n e s s . c a p t i o n = FURvh
 
 R z u l b l m o r e I n f o . c a p t i o n = fY~De
 
 
 
 [ a d d i m g f a c e ] 
 
 r z l b l t i t l e . C a p t i o n = mRh`
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l p r e v i e w . c a p t i o n = ȉ
 
 l b l g r p . c a p t i o n = R~
 
 l b l f a c e n a m e . c a p t i o n = h`
Ty
 
 l b l a d d n e w c l a s s . c a p t i o n = mReR~
 
 R z b t n o k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ c h a t f a c e ] 
 
 R z b t n a d d f a c e . c a p t i o n = mRh`
 
 R z b t n a d d g r p . c a p t i o n = mRR~
 
 R z b t n e d i t . c a p t i o n = h`
 
 
 
 [ c l i p b d ] 
 
 r z l b l t i t l e . C a p t i o n = jR4g
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z b t n o f f t e n . c a p t i o n = 8^(u[IN
 
 N s a v e a s . c a p t i o n = X[:N8^(u
 
 p m u c l i p d e l e t e . c a p t i o n =  Rd
 
 p m u c l i p d e l e t e a l l . c a p t i o n = hQ Rd
 
 N c o n t e n t s a v e a s . c a p t i o n = X[:N8^(u
 
 N c o n t e n t c l e a r . c a p t i o n = nzz
 
 
 
 [ c l i p b d _ o f f t e n ] 
 
 r z l b l t i t l e . C a p t i o n = jR4g8^(u
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l l i s t . c a p t i o n = Rh
 
 l b l c o n t e n t . c a p t i o n = Q[
 
 R z b t n a d d . c a p t i o n = e^
 
 R z b t n u p d a t e . c a p t i o n = OX[
 
 R z b t n d e l e t e . c a p t i o n =  Rd
 
 N n e w . c a p t i o n = e^
 
 p o p d e l e t e . c a p t i o n =  Rd
 
 N d e l e t e a l l . c a p t i o n = hQ Rd
 
 
 
 [ A d m i n R e p l a y ] 
 
 r z l b l t i t l e . c a p t i o n = (u7bBl
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l r e a s o n . c a p t i o n = SV
 
 b t n o k . c a p t i o n = Ta
 
 b t n c a n c e l . c a p t i o n = b~
 
 
 
 [ j o i n u m r o o m ] 
 
 r z l b l t i t l e . c a p t i o n = R^~
 
 R z s b t n c l o s e . h i n t = sQ
 
 R g r p c r e a t e . B u t t o n s [ 0 ] . c a p t i o n = R^~
 
 R g r p c r e a t e . B u t t o n s [ 1 ] . c a p t i o n = g~bReQ]~X[(Wv~
 
 l b l n i c k . c a p t i o n = bv5fy
 
 l b l i d . c a p t i o n = ~I D 
 
 l b l n a m e . c a p t i o n = ~
Ty
 
 l b l s u b j e c t . c a p t i o n = ~;N
 
 l b l c l a s s . c a p t i o n = ~{|+R
 
 R z b t n O k . c a p t i o n = nx[
 
 R z b t n C a n c e l . c a p t i o n = Sm
 
 l b l b r o w s e n a m e . c a p t i o n = ~
Ty
 
 l b l b r o w s e t i t l e . c a p t i o n = ~;N
 
 l b l b r o w s e j i d . c a p t i o n = R^I D 
 
 l b l b r o w s e b a c k . c a p t i o n = 
N Nek
 
 l b l b r o w s e s e a r c h . c a p t i o n = d"}
 
 l b l b r o w s e c a n c e l . c a p t i o n = Sm
 
 l b l j o i n j i d . c a p t i o n = ~I D 
 
 l b l j o i n n i c k . c a p t i o n = bv5fy
 
 l b l j o i n g r p . c a p t i o n = ~R{|
 
 l b l j o i n r e a s o n . c a p t i o n = ReQSV
 
 b t n b a c k . c a p t i o n = 
N Nek
 
 b t n n e x t . c a p t i o n = ReQ
 
 b t n j o i n c a n c e l . c a p t i o n = Sm
 
 r z b t n j o i n b a c k . c a p t i o n = 
N Nek
 
 r z b t n j o i n o k . c a p t i o n = nx[
 
 r z b t n j o i n c a n c e l . c a p t i o n = Sm
 
 l b l b r o w s e j o i n n i c k . c a p t i o n = bv5fy: 
 
 l b l b r o w s e j o i n g r p . c a p t i o n = R~
 
 R z b t n b r o w s e p r i o r . c a p t i o n = 
N Nek
 
 R z b t n b r o w s e j o i n . c a p t i o n = ReQ
 
 R z b t n b r o w s e c a n c e l . c a p t i o n = Sm
 
 l v w r o o m l i s t . c o l u m n s [ 0 ] . c a p t i o n = ~I D 
 
 l v w r o o m l i s t . c o l u m n s [ 1 ] . c a p t i o n = ~
Ty
 
 l v w r o o m l i s t . c o l u m n s [ 2 ] . c a p t i o n = ;N
 
 l v w r o o m l i s t . c o l u m n s [ 3 ] . c a p t i o n = R^I D 
 
 l b l b r o w s e s t a t u s . c a p t i o n = ck(Wd"}
zP
 
 R z b t n B p r i o r . c a p t i o n = 
N Nek
 
 R z b t n B c a n c e l . c a p t i o n = Sm
 
 R g p J o i n s e l e c t . b u t t o n s [ 0 ] . c a p t i o n = vcReQ~
 
 R g p J o i n s e l e c t . b u t t o n s [ 1 ] . c a p t i o n = g~b]~X[(Wv~
 
 
 
 
 
 [ u m i n v i t e ] 
 
 r z l b l t i t l e . C a p t i o n = T|N
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l i n v i t e i n f o . c a p t i o n = T|N0Rdk~
 
 l b l r e a s o n . c a p t i o n = SV
 
 l s t J I D S . c o l u m n s [ 0 ] . c a p t i o n = 5fy
 
 l s t J I D S . c o l u m n s [ 1 ] . c a p t i o n = ^S
 
 b t n A d d . c a p t i o n = mR
 
 b t n R e m o v e . c a p t i o n =  Rd
 
 b t n O K . c a p t i o n = nx[
 
 b t n C a n c e l . c a p t i o n = Sm
 
 
 
 [ U M R o o m ] 
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z T B t n t r a f i l e . c a p t i o n = eN
 
 R z T B t n t r a f i l e . h i n t = eNS
 
 R z T B t n t r a d i r . c a p t i o n = eN9Y
 
 R z T B t n t r a d i r . h i n t = eN9YS
 
 R z T B t n a u d i o . c a p t i o n = 
 
 R z T B t n a u d i o . h i n t = N
 
 R z T B t n v i d e o . c a p t i o n = Ɖ
 
 R z T B t n v i d e o . h i n t = ƉN
 
 R z T B t n h e l p . c a p t i o n = OSR
 
 R z T B t n h e l p . h i n t = ܏zOSRR1u[ec6R	
 
 R z T B t n c t r l . c a p t i o n = c6R
 
 R z T B t n c t r l . h i n t = ܏zc6R;NRe_c6R[e{:g	
 
 R z T b t n f a c e . c a p t i o n = h`
 
 R z T b t n f a c e . h i n t = ceQh`Vh
 
 R z T b t n f o n t . c a p t i o n = W[SO
 
 R z T b t n f o n t . h i n t = nSW[SO
 
 R z T B t n t e x t . c a p t i o n = 8^(u
 
 R z T B t n t e x t . h i n t = nb	b8^(u
 
 R z T B t n s c r e e n . c a p t i o n = *bO\
 
 R z T B t n s c r e e n . h i n t = :SW*bO\( C t r l + A l t + A ) 
 
 R z T B t n s n a p . c a p t i o n = zSO
 
 R z T B t n s n a p . h i n t = Rbc0RnmRzSO
 
 R z b t n h i s t o r y . c a p t i o n = OU_
 
 R z b t n h i s t o r y . h i n t = gS_MR(u7bOU_
 
 r z b t n s e n d . c a p t i o n = S
 
 r z b t n s e n d . h i n t = SOo`A L T + S 	, pQS.	bSe_
 
 p o p m u n s e n d e n t e r . c a p t i o n = E n t e r VfS
 
 p o p m u n s e n d c t r l . c a p t i o n = C t r l + E n t e r VfS
 
 R z s b t n m i n . h i n t =  g\S
 
 R z t b t n m a x w i n . h i n t =  g'YS
 
 R z t b t n s n a p w i n . h i n t = RbczSO
 
 R z b t n c u t i m a g e s t y l e . h i n t = *bO\!j_
 
 c u t i m a g e s h o w . c a p t i o n = *bO\e>f:yzSO
 
 c u t i m a g e h i d e . c a p t i o n = *bO\eυ,gzSO
 
 p m u h i s t o r y c o p y . c a p t i o n = 
Y6R( C t r l + C ) 
 
 p m u h i s t o r y s a v e a s . c a p t i o n = SX[:N
 
 p m u h i s t o r y p h o t o s a v e . c a p t i o n = VGrSX[:N
 
 p m u h i s t o r y a d d F a c e . c a p t i o n = mR0Rꁚ[INh`
 
 p m u e d i t c l e a r . c a p t i o n = nd
 
 p m u e d i t u n d o . c a p t i o n = dm( C t r l + Z ) 
 
 p m u e d i t c u t . c a p t i o n = jRR( C t r l + X ) 
 
 p m u e d i t c o p y . c a p t i o n = 
Y6R( C t r l + C ) 
 
 p m u e d i t p a s t e . c a p t i o n = |4( C t r l + V ) 
 
 p m u e d i t s a v e a s . c a p t i o n = SX[:N
 
 p m u e d i t p h o t o s a v e . c a p t i o n = VGrSX[:N
 
 p m u e d i t a d d F a c e . c a p t i o n = mR0Rꁚ[INh`
 
 p o p R o s t e r C h a t . c a p t i o n = [݋
 
 p o p R o s t e r V C a r d . c a p t i o n = (u7bOo`
 
 p o p N i c k . c a p t i o n = O9e]v5fy
 
 p o p e x i t r o o m . c a p t i o n =  QO[
 
 p o p A d m i n . c a p t i o n = {tXT
 
 p o p K i c k . c a p t i o n = "d
 
 p o p B a n . c a p t i o n = ybk
 
 p o p A d m i n i s t r a t o r . c a p t i o n = b{tXT
 
 p o p C a n c e l A d m i n i s t r a t o r . c a p t i o n = Sm{tXT
 
 p o p i n v i t e . c a p t i o n = (u7b
 
 p o p B a n L i s t . c a p t i o n = ybkRh
 
 p o p A d m i n L i s t . c a p t i o n = {tXTRh
 
 p o p C o n f i g u r e . c a p t i o n = nO[
Ty
 
 p o p C o n f i g u r e C a p t i o n . c a p t i o n = nO[;N
 
 N D e s t r o y R o o m . c a p t i o n = dmO[
 
 t a b l e f t t e x t . c a p t i o n = J)YzSO
 
 T a b S h e e t R o o m I n f o . c a p t i o n = (u7bRh
 
 N R E x c u t e . c a p t i o n = d\O      
 
 N R U p d a t e N i c k . c a p t i o n = O9e]v5fy
 
 N R E x i t R o o m . c a p t i o n =  QO[
 
 N R A u d i o . c a p t i o n = 
 
 N R C r e a t e A u d i o . c a p t i o n = SwO
 
 N R A u d i o _ S e t . c a p t i o n = 󗾋n
 
 N R V i d e o . c a p t i o n = Ɖ
 
 N R C r e a t e V i d e o . c a p t i o n = SwƉO
 
 N R V i d e o _ S e t . c a p t i o n = Ɖn
 
 N R M a n a g e . c a p t i o n = {t
 
 N R I n v i t e . c a p t i o n = (u7b
 
 N R B a n L i s t . c a p t i o n = ybkRh
 
 N R A d m i n L i s t . c a p t i o n = {tXTRh
 
 N R S e t N a m e . c a p t i o n = nO[
Ty
 
 N R S e t T i t l e . c a p t i o n = nO[;N
 
 N R D e s t r o y . c a p t i o n = dmO[
 
 l v w R o s t e r . C o l u m n s [ 0 ] . c a p t i o n = O[bXT
 
 l v w R o s t e r . C o l u m n s [ 1 ] . c a p t i o n = r`
 
 l v w R o s t e r . C o l u m n s [ 2 ] . c a p t i o n = 
 
 l v w R o s t e r . C o l u m n s [ 3 ] . c a p t i o n = Ɖ
 
 l b l m i c v a l u e . c a p t i o n = KQΘϑ
 
 l b l s p k v a l u e . c a p t i o n = d>eϑ
 
 b t n A a n s w e r . c a p t i o n = ReQ
 
 b t n A h a n g u p . c a p t i o n = ce
 
 
 
 
 
 [ U M R o o m P r a y ] 
 
 l b l r e a s o n . c a p t i o n = SV: 
 
 R z s b t n c l o s e . h i n t = sQ
 
 b t n o k . c a p t i o n = Ta
 
 b t n c a n c e l . c a p t i o n = b~
 
 
 
 [ s i m p l e s e a r c h ] 
 
 R z l b l t i t l e . C a p t i o n = g~b
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l t i t l e . c a p t i o n = ;N
 
 l v w b j . c o l u m n s [ 0 ] . c a p t i o n = r+R
 
 l v w b j . c o l u m n s [ 1 ] . c a p t i o n = ;N
 
 l v w b j . c o l u m n s [ 2 ] . c a p t i o n = e
 
 b t n s t a r t . c a p t i o n =  _Yg~b
 
 b t n c l o s e . c a p t i o n = sQ
 
 b t n c l e a r . c a p t i o n = nzz
 
 R z b t n d e l e t e . c a p t i o n =  Rd
 
 b t n c a t e g o r y . c a p t i o n = gw
 
 p o p v i e w . c a p t i o n = gw
 
 p o p d e l e t e . c a p t i o n =  Rd
 
 
 
 [ U n t F i n d ] 
 
 R z l b l t i t l e . C a p t i o n = g~b
 
 R z s b t n c l o s e . h i n t = sQ
 
 l v w b j . C o l u m n s [ 0 ] . c a p t i o n = r+R
 
 l v w b j . C o l u m n s [ 1 ] . c a p t i o n = ;N
 
 l v w b j . C o l u m n s [ 2 ] . c a p t i o n = e
 
 l b l c a s e . c a p t i o n = agN
 
 l b l t i t l e . c a p t i o n = ;N
 
 l b l t i m e . c a p t i o n = e
 
 b t n s t a r t . c a p t i o n =  _Yg~b
 
 b t n c l e a r . c a p t i o n = nzz
 
 b t n c l o s e . c a p t i o n = sQ
 
 b t n c a t e g o r y . c a p t i o n = ^\'`
 
 
 
 [ U n t m a i n ] 
 
 R z l b l t i t l e . C a p t i o n = tetO:{
 
 R z s b t n c l o s e . h i n t = sQ
 
 F 1 . c a p t i o n = eN
 
 V 1 . c a p t i o n = gw
 
 T 1 . c a p t i o n = ]wQ
 
 m n i k a p i a n . c a p t i o n = e^O:{( & N ) 
 
 m n i g r o u p . c a p t i o n = e^{|+R( & S ) 
 
 D 1 . c a p t i o n =  Rd
 
 I 1 . c a p t i o n = g~b
 
 N 1 . c a p t i o n = Q[
 
 T 3 . c a p t i o n = ]wQag
 
 R 1 . c a p t i o n = 7Re
 
 M n u i n e x c e l . c a p t i o n = [eQ
 
 M n u o u t e x c e l . c a p t i o n = [Q
 
 p m n i n e w . c a p t i o n = e^O:{( & N ) 
 
 p m n i k a n . c a p t i o n = gw( & V ) 
 
 p m n i d e l . c a p t i o n =  Rd( & D ) 
 
 p m n i s e a r c h . c a p t i o n = g~b( & F ) 
 
 p m n i s o r t . c a p t i o n = e^{|+R( & S ) 
 
 p m n i b j . c a p t i o n = e^O:{( & N ) 
 
 p m n i d e l e t e . c a p t i o n =  Rd( & D ) 
 
 p m n f i n d . c a p t i o n = g~b( & F ) 
 
 p m n i c a t e g o r y . c a p t i o n = ^\'`
 
 b t n b j . c a p t i o n = e^O:{( & N ) 
 
 b t n s o r t . c a p t i o n = e^{|+R( & S ) 
 
 b t n v i e w . c a p t i o n = ^\'`( & V ) 
 
 b t n d e l e t e . c a p t i o n =  Rd( & D ) 
 
 b t n f i n d . c a p t i o n = g~b( & F ) 
 
 l v w n o t e . c o l u m n s [ 0 ] . c a p t i o n = r+R
 
 l v w n o t e . c o l u m n s [ 1 ] . c a p t i o n = ;N
 
 l v w n o t e . c o l u m n s [ 2 ] . c a p t i o n = e
 
 l v w n o t e . c o l u m n s [ 3 ] . c a p t i o n = {|+R
 
 
 
 [ U n t n o t e p a p e r ] 
 
 r z l b l t i t l e . C a p t i o n = O:{
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z B b t n f i r s t . h i n t = ,{ Nag
 
 R z b m p b t n p i r o r . h i n t = MR Nag
 
 R z b m p b t n n e x t . h i n t = T Nag
 
 R z B b t n l a s t . h i n t =  gT Nag
 
 R z B b t n s e a r c h . h i n t = g~b
 
 R z B b t n d e l e t e . h i n t =  Rd
 
 R z B b t n n e w . h i n t = e^
 
 R z B b t n s a v e . h i n t = OX[
 
 P o p u p M n s a v e . c a p t i o n = OX[e^
 
 p m n c u t . c a p t i o n = jRR    C t r l + X 
 
 p m n c o p y . c a p t i o n = 
Y6R    C t r l + C 
 
 p m n p a s t e . c a p t i o n = |4    C t r l + V 
 
 P o p u p M n w r i t e . c a p t i o n = ̀of:Nppr
 
 P o p u p M n r e d . c a p t i o n = ̀of:N~r
 
 P o p u p M n y e l l o w . c a p t i o n = ̀of:NĞr
 
 P o p u p M n b l u e . c a p t i o n = ̀of:N݄r
 
 P o p u p M n g r e e n . c a p t i o n = ̀of:N~r
 
 
 
 [ U n t s o r t ] 
 
 R z l b l t i t l e . C a p t i o n = e^{|+R
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l n e w c l a s s . c a p t i o n = eQe^{|+R
Ty
 
 b t n o k . c a p t i o n = nx[
 
 b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ R e m o t e C M e s s a g e ] 
 
 b t n h o t k e y . c a p t i o n = Sp.
 
 b t n h o t k e y . h i n t = Sp.
 
 b t n 4 b i t . h i n t = 1 6 r( 4 MO) !j_c6R
 
 b t n 4 b i t . c a p t i o n = 1 6 r( 4 MO) 
 
 b t n 8 b i t . h i n t = 2 5 6 r( 8 MO) !j_c6R
 
 b t n 8 b i t . c a p t i o n = 2 5 6 r( 8 MO) 
 
 b t n 1 6 b i t . h i n t = 6 5 5 3 6 r( 1 6 MO) !j_c6R
 
 b t n 1 6 b i t . c a p t i o n = 6 5 5 3 6 r( 1 6 MO) 
 
 b t n r e f r e s h . c a p t i o n = 7Re
 
 b t n r e f r e s h . h i n t = O\U^7Re
 
 b t n f i l e . c a p t i o n = eN
 
 b t n f i l e . h i n t = SeN
 
 b t n d i r . c a p t i o n = eN9Y
 
 b t n d i r . h i n t = SeN9Y
 
 b t n a u d i o . c a p t i o n = 
 
 b t n a u d i o . h i n t = 
 
 b t n w i n c h a n g e . c a p t i o n = zSORbc( F 1 2 ) 
 
 b t n w i n c h a n g e . h i n t = zSO!j_Rbc( F 1 2 ) 
 
 b t n c l o s e . c a p t i o n = sQ
 
 b t n c l o s e . h i n t = sQ܏zc6R
 
 b t n t e x t . c a p t i o n = eW[
 
 b t n t e x t . h i n t = SeW[Oo`
 
 
 
 [ D o w n D l l ] 
 
 r z l b l t i t l e . C a p t i o n = eNN}
 
 R z b t n S t o p . c a p t i o n = -Nbk
 
 R z s b t n c l o s e . h i n t = sQ
 
 
 
 [ I P M s g A t t r ] 
 
 r z l b l t i t l e . C a p t i o n = (u7b^\'`
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l I P M s g _ u s e r . c a p t i o n = Y
T
 
 l b l I P M s g _ g r o u p . c a p t i o n = 
 
 l b l I P M s g _ I P . c a p t i o n = I P 0W@W
 
 
 
 [ U M _ A u t o U p d a t e ] 
 
 r z l b l t i t l e . C a p t i o n = ꁨRfe
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l c V e r s i o n . c a p t i o n = S_MRHr,g
 
 l b l N e w V e r s i o n . c a p t i o n =  geHr,g
 
 l b l i n f o . c a p t i o n = :NOoNck8^ЏLzsSGS~0R geHr,g
 
 b t n n o a l a r t . c a p t i o n = 
NQc
 
 b t n c l o s e . c a p t i o n = sQ
 
 
 
 [ M e s s a g e M a n a g e r ] 
 
 r z l b l t i t l e . C a p t i o n = mo`{t
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z t b t n m a x w i n . h i n t =  g'YS
 
 R z s b t n m i n . h i n t =  g\S
 
 b t R e f r e s h . c a p t i o n = 7Re
 
 b t D e l . c a p t i o n =  RdS_MR(u7bU_
 
 l b l a r e a . c a p t i o n = V
 
 l b l k e y . c a p t i o n = sQ.W[
 
 b t S e a r c h . c a p t i o n = g~b
 
 l b l d a t e . c a p t i o n = eg
 
 l b l p a g e c o u n t . c a p t i o n = u/ ag
 
 b t F i r s t . c a p t i o n = u
 
 b t P r e v . c a p t i o n = 
Nu
 
 b t N e x t . c a p t i o n = Nu
 
 b t L a s t . c a p t i o n = >\u
 
 l v C o n t e n t s . C o l u m n s [ 0 ] . c a p t i o n = Se5fy( ^S) 
 
 l v C o n t e n t s . C o l u m n s [ 1 ] . c a p t i o n = e
 
 l v C o n t e n t s . C o l u m n s [ 2 ] . c a p t i o n = Xd
 
 R z G r p U M . c a p t i o n = U M mo`U_
 
 R z G r p I P M s g . c a p t i o n = ޘ=mo`U_
 
 m i D e l M e s s a g e H i s t o r y _ i p m s g . c a p t o n =  Rd(u7bU_
 
 m i D e l a l l M e s s a g e H i s t o r y _ i p m s g . c a p t i o n =  Rd@b	g(u7bU_
 
 m i D e l M e s s a g e H i s t o r y . c a p t i o n =  Rd(u7bU_
 
 m i D e l a l l M e s s a g e H i s t o r y . c a p t i o n =  RdhQ(u7bU_
 
 N d e l L v w S e l e c t e d . c a p t i o n =  Rd]	U_
 
 
 
 [ I n p u t P w ] 
 
 r z l b l t i t l e . C a p t i o n = eQ[x
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l p w . c a p t i o n = c6R[x
 
 r z b t n o k . c a p t i o n = nx[
 
 r z b t n c a n c e l . c a p t i o n = Sm
 
 
 
 [ S e a r c h S e r v e r ] 
 
 r z l b l t i t l e . C a p t i o n = d"}
gRhV
 
 R z s b t n c l o s e . h i n t = sQ
 
 R z b t n s e a r c h . c a p t i o n = d"}
 
 r z b t n c a n c e l . c a p t i o n = Sm
 
 l b l j i d . c a p t i o n = 
gRhV0W@W
 
 l b l _ s e a r c h f n a m e . c a p t i o n = 
gRhVcOFU
 
 l b l a d d h i n t . c a p t i o n = SQ	bd"}v
gRhV
 
 l v w s e r v e r . c o l u m n s [ 0 ] . c a p t i o n = 
gRhV0W@W
 
 l v w s e r v e r . c o l u m n s [ 1 ] . c a p t i o n = 
gRhVcOFU
 
 l v w s e r v e r . h i n t = SQ	bd"}v
gRhV
 
 
 
 [ j o i n U M R ] 
 
 r z l b l t i t l e . C a p t i o n = ReQ~
 
 R z s b t n c l o s e . h i n t = sQ
 
 l b l u s e r i n f o . c a p t i o n = ~i d 
 
 l b l j i d . c a p t i o n = bv5fy
 
 l b l _ s e a r c h f n a m e . c a p t i o n = ,g0WR~
 
 l b l _ s e a r c h s n a m e . c a p t i o n = ReQSV
 
 R z b t n O k . c a p t i o n = nx[
 
 R z b t n c a n c e l . c a p t i o n = Sm