; ; 
 
 N a m e = ݄r&{
 
 A u t h o r = l a o b u b u 
 
 I n f o = L P l a y e r &^vKN N\ n Te_N/f؞v
 
 C o n t a c t = l a o b u b u @ g m a i l . c o m 
 
 b g C o l o r = 4 0 3 2 4 4 5 
 
 
 
 A l p h a B o x = 0 , 0 , R 0 , 2 0 , 0 , 1 0 0 
 
 
 
 I c o n F i r s t = R - 1 , 0 , 2 4 | 0 , 0 , 2 0 , 2 0 |   | B 1 
 
 I c o n F i r s t = R - 2 1 , 0 , 2 4 | 2 0 , 0 , 2 0 , 2 0 |   | B 1 
 
 I c o n F i r s t = R - 4 1 , 0 , 2 4 | 4 0 , 0 , 2 0 , 2 0 |   | B 1 
 
 I c o n F i r s t = 1 , B - 7 8 , 2 0 | 0 , 2 6 , 2 , 5 |   | B 1 
 
 I c o n F i r s t = R - 3 , B - 7 8 , 2 0 | 3 , 2 6 , 2 , 5 |   | B 1 
 
 I c o n F i r s t = 1 , B - 7 5 , 2 0 | 0 , 2 7 , 2 , 5 |   | B 1 
 
 I c o n F i r s t = R - 3 , B - 7 5 , 2 0 | 3 , 2 7 , 2 , 5 |   | B 1 
 
 
 
 I c o n B a r _ c = 1 5 
 
 I c o n B a r _ 0 = R - 1 , 0 , 2 4 | 0 , 0 , 2 0 , 2 0 | S L E E P | L 1 
 
 I c o n B a r _ 1 = 0 , B - 7 5 , 3 3 | 0 , 2 0 , 5 , 6 | R E P E A T 1 | L 1 
 
 I c o n B a r _ 2 = 0 , B - 7 5 , 3 3 | 0 , 2 0 , 5 , 6 | R E P E A T 2 | L 1 
 
 I c o n B a r _ 3 = R - 2 1 , 0 , 2 4 | 2 0 , 0 , 2 0 , 2 0 | R E P E A T | L 1 
 
 I c o n B a r _ 4 = 0 , B - 7 8 , 1 7 | 0 , 5 2 , 8 , 8 | N O W P O I N T | L 1 
 
 I c o n B a r _ 5 = 0 , B 0 , 3 6 | 7 9 , 0 , 2 0 , 6 7 | C T R L = 0 0 | B G 
 
 I c o n B a r _ 6 = R 0 , B 0 , 4 0 | 9 9 , 0 , 2 0 , 6 7 | C T R L = 1 0 | B G 
 
 I c o n B a r _ 7 = H 0 , B 0 , 3 3 | 1 1 9 , 0 , 2 0 , 6 7 | C T R L = 2 0 | B G 
 
 I c o n B a r _ 8 = 3 , B - 1 3 , 3 6 | 6 5 , 2 0 , 1 4 , 3 5 | C T R L = 0 1 | B G 
 
 I c o n B a r _ 9 = R - 3 , B - 1 3 , 4 0 | 6 5 , 2 0 , 1 4 , 3 5 | C T R L = 1 1 | B G 
 
 I c o n B a r _ 1 0 = H 0 , B - 1 3 , 3 3 | 6 5 , 2 0 , 1 4 , 3 5 | C T R L = 2 1 | B G 
 
 I c o n B a r _ 1 1 = H 0 , B - 1 0 , 3 3 | 5 , 2 0 , 6 0 , 3 2 |   | L 1 
 
 I c o n B a r _ 1 2 = 0 , 0 , 3 6 | 0 , 3 2 , 1 , 1 0 | L R C = 2 | G Q | 2 , R 0 
 
 I c o n B a r _ 1 3 = 0 , 0 , 2 0 | 1 , 3 2 , 1 , 1 0 | L R C = 1 | G Q | 2 , R 0 
 
 I c o n B a r _ 1 4 = R - 4 1 , 0 , 2 4 | 4 0 , 0 , 2 0 , 2 0 | V I D E O | L 1 
 
 
 
 T O U C H c = 5 
 
 T O U C H 0 = H - 1 2 , B - 3 9 , H 1 2 , B - 1 0 , 1 
 
 T O U C H 1 = H - 2 9 , B - 3 2 , H - 1 2 , B - 1 4 , 4 
 
 T O U C H 2 = H 1 2 , B - 3 2 , H 2 9 , B - 1 4 , 5 
 
 T O U C H 3 = R - 2 0 , 0 , R 0 , 2 0 , 1 7 
 
 T O U C H 4 = R - 4 0 , 0 , R - 2 0 , 2 0 , 2 1 
 
 ; T O U C H 5 = R - 6 0 , 0 , R - 4 0 , 2 0 , 1 6 
 
 
 
 T C S C R c = 3 
 
 T C S C R 0 = 3 , B - 4 8 , 1 7 , B - 1 3 , 1 , 0 
 
 T C S C R 1 = R - 1 7 , B - 4 8 , R - 3 , B - 1 3 , 1 , 1 
 
 T C S C R 2 = H - 7 , B - 4 8 , H 7 , B - 1 3 , 1 , 2 
 
 
 
 T i t l e B o x = 0 , 2 0 , 2 , 0 , 2 0 , 1 , 0 
 
 T i m e B o x = 0 , 0 , 0 , 1 6 7 7 7 2 1 5 , 2 0 , 0 , 0 
 
 I t e m B o x = R - 6 2 , 0 , 0 , 1 6 7 7 7 2 1 5 , 2 4 , 0 , 0 
 
 V i d e o B o x = 1 , 2 0 , R - 2 , B - 2 6 
 
 N o w P o s = 2 , B - 7 8 , R - 4 
 
 N o w T i m e B o x = R 0 , B - 7 8 , 0 , 1 6 7 7 7 2 1 5 , 4 0 , 0 , 0 
 
 S e e k T i m e B o x = 0 , B - 7 8 , 0 , 1 6 7 7 7 2 1 5 , 3 6 , 0 , 0 
 
 L R C B o x = 0 , 3 0 , R 0 , 0 , 0 , 3 5 5 5 9 4 1 , 7 8 5 1 5 1 9 , 7 8 5 1 5 1 9 , - 1 , - 1 
 
 
 
 ; ; 