[ I N S T A L L E R ] 
 
 0 = S   t h   t 
 
 1 = K  c h   h o t   p h i  n   b n   P R O 
 
 2 = H i n   n a y   b n   c    p h i  n   b n   m i n   p h    c a   S F T T   v i   t  n h   n n g   h n   c h .   N u   b n   m u n   k  c h   h o t   t t   c   c  c   c h c   n n g   c a   c h n g   t r  n h   v    c h u y n   i   p h i  n   b n   m i n   p h    t r o n g   P R O ,   v u i   l  n g   n h p   O R D I D   d i    y . 
 
 4 = B c   1 :   C l i c k   v  o    y     m u a   p h i  n   b n   P R O 
 
 5 = K  c h   h o t 
 
 6 = H y   b 
 
 7 = N u   a i      y  u   c u   b n   k  c h   h o t   c h n g   t r  n h   n  y ,   n h n g   b n      k h  n g   m u a   c h n g   t r  n h   n  y   s   d n g   t i n   c a   m  n h   -   i u   n  y   c    n g h )a   r n g   a i      a n g   c   g n g     k t   n i   b n   n   l a   o   h  n h   s :   x   l    t h   t  n   d n g   b    n h   c p .   T r o n g   t r n g   h p   n  y ,   b m   v  o   n  t   " N O "     h y   b   k  c h   h o t   v    x i n   v u i   l  n g   b  o   c h o   c h  n g   t  i . 
 
 8 = N u   b n   t h c   s      m u a   c h n g   t r  n h   n  y   s   d n g   t i n   r i  n g   c a   b n ,   n h p   v  o   n  t   " C  "     t i n   h  n h   k  c h   h o t . 
 
 9 = X  c   m i n h   O R D I D 
 
 1 0 = K t   q u 
 
 1 2 = T h   l i 
 
 1 3 = X i n   l i ,   n h n g   m t   O R D I D   n  y      b   h y   v    t i n      c   h o  n   t r .   B n      n h n   t i n   c a   b n   t r   l i .   B n   n  n   t h c   h i n   m u a   h  n g   m i   v    c    c   m t   O R D I D   m i . 
 
 1 4 = X i n   l i ,   m u a   h  n g   c a   b n      h t   h n   g n    y .   B n   s   c n   p h i   m u a   O R D I D   m i . 
 
 1 5 = G i y   p h  p   c a   b n   k h  n g   b a o   g m   k  c h   h o t   c h o   c h n g   t r  n h   n  y .   B n      m u a   m t   c h n g   t r  n h   k h  c . 
 
 1 6 = H   s   c a   c h  n g   t  i   c h o   t h y   r n g   b n   t   s   l n g   t i   a   c h o   p h  p   m  y   t  n h   c a   b n .   C h  n g   t  i   v a   g i   m t   e m a i l   c h o   b n   v i   c  c   g i i   p h  p   c    t h ,   k i m   t r a   h p   t h   c a   b n . 
 
 1 7 = S a i   O R D I D .   K i m   t r a   t t   c   c h   s   v    c h   c  i .   B n   c    t h   s a o   c h  p   v    d  n   O R D I D   m u     n g n   c h n   l i   c h  n h   t . 
 
 1 8 = T u y t   v i !   T t   c      h o  n   t t !   C m   n   b n   r t   n h i u   v       m u a   h  n g   c a   b n !   C h n g   t r  n h   c a   b n      s n   s  n g     s   d n g   n h   l    p h i  n   b n   P R O .   C h  n g   t  i   h y   v n g   b n   s   t n   h n g   n h i u   c h c   n n g   m i ! 
 
 1 9 = K h  n g   c  i   t   t r c    .   B n   n  n   c  i   t   l i   c h n g   t r  n h   v    s a u      t h   l i . 
 
 2 0 = C n   O R D I D   m i ?   C l i c k   v  o    y     c    c   n    b  y   g i ! 
 
 2 1 = K h  n g   t h   k t   n i   n   m  y   c h   c a   c h  n g   t  i   ( h o c   k t   n i   i n t e r n e t   v    h i u   h  a ) .   C    t h   l    b c   t n g   l a   h o c   c h n g   t r  n h   c h n g   v i r u s   n g n   c h n   k t   n i   i n t e r n e t .   H  y   c   g n g   v    h i u   h  a   c h  n g   t r o n g   q u    t r  n h   k  c h   h o t . 
 
 2 2 = K  c h   h o t      c   t h c   h i n   t r c   k h i ! 
 
 2 3 = B n   s a o   c a   S F T T      c h u y n   i   t   p h i  n   b n   m i n   p h    v  o   p h i  n   b n   P R O .   K  c h   h o t      h o  n   t h  n h   t r o n g   q u    k h   v i   O R D I D :   P I 7 D .   C m   n   b n   r t   n h i u   v       m u a   h  n g   c a   b n ! 
 
 2 5 = n g   k    g i y   p h  p 
 
 2 6 = C h o   p h  p   t t   c   c  c   c h c   n n g ! 
 
 2 7 = B n   a n g   s   d n g   p h i  n   b n   m i n   p h    c a   c h n g   t r  n h   v i   c h c   n n g   h n   c h .   N h n g   c h  n g   t a   c    p h i  n   b n   P R O   c a   S F T T   t r o n g      b a o   g m   m t   s   c h c   n n g   b   s u n g   n h i u   h n   n a !   N h p   v  o   l i  n   k t   d i    y     x e m   d a n h   s  c h   c  c   l i    c h   c a   p h i  n   b n   P R O .   N g o  i   r a ,   b n g   c  c h   m u a   p h i  n   b n   P R O   b n   s   h   t r   c  n g   t y   c h  n g   t  i   v    c h  n g   t  i   s   t i p   t c   p h  t   t r i n   b n   c p   n h t   c h o   S F T T . 
 
 2 8 = L i    c h   c a   p h i  n   b n   P R O   l    g  ? 
 
 2 9 = C  ,   t  i   m u n   P R O   b  y   g i 
 
 3 0 = T  i   s   m u a   n    s a u   n  y 
 
 3 1 = T  i      c    O R D I D 
 
 3 2 = C  n g   t y   c h  n g   t  i   p h  t   t r i n   c  c   c h n g   t r  n h   k h  c   n h a u   c h o   n h    v    v n   p h  n g   k   t   n m   2 0 0 2   ( h n   1 2   n m ) .   C h  n g   t  i   c    n h i u   s n   p h m   t t ,   n h i u   n g i   t r  n   t h   g i i   b i t   n ,   m t   s   n g i    n h   g i    c a o   b i   n h i u   c h u y  n   g i a .   C h  n g   t  i   h y   v n g   b n   s   t n   h n g   b n g   c  c h   s   d n g   c  c   c h n g   t r  n h   c a   c h  n g   t  i ! 
 
 3 3 = C h n g   t r  n h   c  i   t   n  y   s   c  i   t   m t   h o c   n h i u   c h n g   t r  n h   c a   c h  n g   t  i ,   t  y   t h u c   v  o   l a   c h n   c a   b n   v   c  c   b c   t i p   t h e o .   C h n g   t r  n h   c a   c h  n g   t  i   k h  n g   b a o   g m   c  c   p h n   m m   c   h i ,   k h  n g   c    p h n   m m   q u n g   c  o ,   k h  n g   c    p h n   m m   g i  n   i p   v    k h  n g   c    v i r u s .   C h  n g   t  i   q u a n   t  m   n   d a n h   t i n g   c a   c h  n g   t  i   v    c h  n g   t  i   k h  n g   b a o   g i   l a   n g i   d  n g   c a   c h  n g   t  i .   C h  n g   t  i   k h  n g   b a o   g i   p h  n   p h i   m    c a   b  n   t h   b a   v i   c  c   s n   p h m   c a   c h  n g   t  i . 
 
 3 4 = T h n g   t h c   c  c   c h n g   t r  n h   m i   c a   b n ! 
 
 3 5 = i   h  n h   t i  u   P r i v a c y R o o t . c o m 
 
 3 6 = M i n   p h    c p   n h t 
 
 3 7 = a n g   x   l    . . . 
 
 3 8 = B c   t i p   t h e o 
 
 3 9 = a   c h   e m a i l   k h  n g   c h  n h   x  c ! 
 
 4 0 = B n   c    m u n     c    c   c  c   b n   c p   n h t   m i n   p h    c h o   S F T T ?   H u   n h   m i   t h  n g ,   c h  n g   t  i   l  m   m t   c  i   g       m i   c h o   S F T T   v    b n   k h  n g   n  n   b   l   n  !     k  c h   h o t   t h u    b a o   c  c   b n   c p   n h t   m i n   p h  ,   c h   c n   n h p   a   c h   e m a i l   c a   b n   d i    y . 
 
 4 1 = B  y   g i   b n   n  n   m   h p   t h   c a   b n .   B n   s   t  m   t h y   m t   t h   t   c h  n g   t  i   ( c in g   k i m   t r a   t h   m c   t h   r  c   c a   b n ) .   B n   n  n   b m   v  o   l i  n   k t   k  c h   h o t   t r o n g   t i n   n h n        x  c   n h n   n g   k    c a   b n .   S a u   n  y ,   b n   s   c   n g   k      n h n   c   b n   c p   n h t   m i n   p h    c h o   S F T T . 
 
 4 2 = C h  n g   t  i   t  n   t r n g   s   r i  n g   t   c a   b n ,   c h  n g   t  i   k h  n g   g i   t h   r  c !   E m a i l   c a   b n   s   k h  n g   c   c h i a   s   h o c   b  n ,   c h  n g   t  i   s   g i   n    t r o n g   b    m t .   C h  n g   t  i   s   s   d n g   n    c h   ( v    d u y   n h t )   c h o   m c    c h   c u n g   c p   c h o   b n   t h  n g   t i n   v   b n   c p   n h t   m i n   p h    c h o   c  c   s n   p h m   c a   c h  n g   t  i   ( s ) . 
 
 4 3 = T h e o   d  i 
 
 4 5 = a   c h   e m a i l   c a   b n      c   x  c   n h n   v       t n   t i   t r o n g   c   s   d   l i u   c a   c h  n g   t  i .   B n   s   n h n   c   b n   c p   n h t   m i n   p h    q u a   e m a i l   n g a y   s a u   k h i   h   s   t r   n  n   c    s n .   K h  n g   c    h  n h   n g   n  o   k h  c   l    c n   t h i t   t   b n .   C m   n   b n . 
 
 4 6 = a n g   t i   d   l i u   . . . 
 
 4 7 = P h i  n   b n   m i      c   p h  t   h  n h ! 
 
 4 8 = K h  n g   c p   n h t 
 
 4 9 = M u a   p h i  n   b n   P R O   v i   t t   c   c  c   c h c   n n g ! 
 
 5 0 = C    g    m i   t r o n g   p h i  n   b n   n  y ? 
 
 5 1 = T  i   k h  n g   m u n   p h i  n   b n   n  y ,   b   q u a   n  
 
 5 3 = C p   n h t   g i 
 
 5 4 = K h  n g   p h i   b  y   g i 
 
 5 5 = B n   a n g   s   d n g   u p - t o - d a t e   p h i  n   b n   S F T T   K L 7 S   v    i u   n  y   l    r t   t t !   N h n g   h  y   n h   r n g :   i   n g i  c  c   n h    p h  t   t r i n   l u  n   l u  n   l  m   m t   c  i   g       m i ,   v    v y ,   h  y   k i m   t r a   c  c   b n   c p   n h t   v  o   t u n   t i .   C    t h   c h  n g   t a   s   c    m t   c  i   g       m i   c h o   b n ! 
 
 5 6 = C h  n g   t  i      p h  t   h  n h   p h i  n   b n   m i   V N 8 T   n g  y   F G 5 Y .   C h  n g   t  i     n g h   b n   t i   v   v    c  i   t   p h i  n   b n   m i   n  y   n g a y   b  y   g i ,   v    n    c    t h   b a o   g m   n h n g   c i   t i n   b o   m t .   C p   n h t   l    h o  n   t o  n   m i n   p h    c h o   b n   v    n  n   c h   m t   m t   p h  t . 
 
 5 7 = C  
 
 5 9 = K h  n g 
 
 6 0 = C h n g   t r  n h      b   x  a .    n g   b u n   t h a y . 
 
 6 1 = X  a   . . . 
 
 6 2 = B n   B n   c    c h c   c h n   m u n   x  a   c h n g   t r  n h   n  y ? 
 
 6 3 = a n g   t i   d   l i u   . . . 
 
 6 4 = H o a n   n g h  n h ! 
 
 6 5 = B c   t i p   t h e o 
 
 6 6 = i u   k h o n   v    t h i t   l p 
 
 6 7 = C m   n   b n   r t   n h i u ! 
 
 6 8 = C  i   t   f i l e   c h n g   t r  n h   . . . 
 
 6 9 = C  i   t   h o  n   t t 
 
 7 0 =  n g   c a   s 
 
 7 1 = C  i   t 
 
 7 2 = N g  n   n g   m o n g   m u n   c h o   g i a o   d i n   c h n g   t r  n h 
 
 7 3 = P h i  n   b n   c a   c h n g   t r  n h   c  i   t 
 
 7 4 = L i  n   k t   I D   t r  n   m  y   t  n h   n  y 
 
 7 5 = T h a   t h u n   c p   p h  p 
 
 7 6 =  p   d n g 
 
 7 7 = T o   c  c   p h  m   t t   t r  n   m  y   t  n h     b  n 
 
 7 8 = T r   l i 
 
 7 9 = T h e o   d  i   c  c   b n   c p   n h t   m i n   p h  ? 
 
 8 0 = N u   b n   m u n   n h n   c   c p   n h t   m i n   p h    c h o   c h n g   t r  n h   n  y ,   x i n   v u i   l  n g   n g   k  .   n g   k    l    m i n   p h  .   C h   c n   n h p   a   c h   e m a i l   c a   b n   d i    y ,   v    s a u      x  c   n h n   n    b n g   c  c h   n h n   v  o   l i  n   k t   t r o n g   e m a i l   m    c h  n g   t  i   s   g i   c h o   b n .   C h  n g   t  i   k h  n g   g i   t h   r  c ,   c h   c p   n h t . 
 
 8 1 = a   c h   e m a i l   c a   b n   ( k h  n g   b t   b u c ) 
 
 8 2 =  y   l    c h n g   t r  n h   c a   c h  n g   t  i 
 
 8 3 = C h n g   t r  n h   c  i   t   c    t h   c  i   t   /   c p   n h t   c  c   c h n g   t r  n h   c a   c h  n g   t  i .   V u i   l  n g   c h n   c  c   c h n g   t r  n h   m    b n   m u n   c  i   t   /   c p   n h t . 
 
 8 4 = X i n   v u i   l  n g   c h n    t   n h t   m t   c h n g   t r  n h ! 
 
 8 8 = M i n   p h  
 
 9 0 = K h  n g   p h i   b  y   g i 
 
 9 1 = K  c h   h o t   p h i  n   b n   P R O 
 
 9 2 = T  m   k i m   c  c   b n   c p   n h t   m i n   p h  
 
 9 3 = T r a n g   w e b   c a   c h  n g   t  i 
 
 9 4 = L i  n   h   h   t r 
 
 9 5 = a   c h   e m a i l 
 
 9 6 = C h  n g   t  i   c    t h   y  u   c u   b n   d  n h   1 - 2   p h  t   v    c h o   c h  n g   t  i   b i t   l    d o   t i   s a o   b n   q u y t   n h   g   b   c  i   t   S F T T ?   C h  n g   t  i   t h c   s   m u n   b i t     l  m   c h o   c h n g   t r  n h   c a   c h  n g   t  i   t t   h n . 
 
 9 7 = H  y   c h o   c h  n g   t  i   n h n g   g    b n   k h  n g   t h  c h   t r o n g   c h n g   t r  n h   c a   c h  n g   t  i 
 
 9 8 = T t   c   c  c   c h n g   t r  n h   c   l a   c h n      c   c  i   t   t h  n h   c  n g   ( h o c   c p   n h t ) .   B n   c    t h   c h y   c h n g   t r  n h   b n g   c  c h   n h n   v  o   b i u   t n g   c a   n    t r  n   D e s k t o p .   H o c   b n   c    t h   c h y   c h n g   t r  n h   b n g   c  c h   n h n   v  o   m e n u   S t a r t ,   i u   h n g   n   p h n   " A l l   P r o g r a m s "   v    s a u    ,   t  n   c h n g   t r  n h . 
 
 9 9 = C h o   p h  p   t h u   t h p   t h n g   k    s   d n g   n   d a n h 
 
 1 0 0 = T t   k i m   t r a   c p   n h t   t   n g .   T  i   s   l  m   i u      b n   t h  n   m  n h . 
 
 1 0 1 = T  y   c h n   n  y   c h   c    s n   t r o n g   p h i  n   b n   P R O .   B n   c    m u n   n  n g   c p   S F T T   b  y   g i   v    c h o   p h  p   t t   c   c  c   c h c   n n g ? 
 
 1 0 2 = B n   c    b i t ?   i   v i   c h n g   t r  n h   l a   c h n   c h  n g   t  i   c in g   c    p h i  n   b n   P R O ,   t r o n g      b a o   g m   m t   s   c h c   n n g   b   s u n g .   B n   c    t h   m   r n g   c h c   n n g   c a   p h i  n   b n   m i n   p h    b n g   c  c h   c h u y n   n    v  o   P R O . 
 
 1 0 3 = D c h   t h u t   l    t   n g .   C l i c k   v  o    y     c h u y n   s a n g   t i n g   A n h . 
 
 1 0 4 = c  c   n g   d n g   c  i   t 
 
 1 0 5 = B c   2 :   N h p   O R D I D    y 
 
 1 0 6 = C p   n h t   c h n g   t r  n h   c  i   t 