Devil Take The Hindmost.pdf

Devil Take The Hindmost Written by Allan Holdsworth A Intro  = 160 Fast Transcribed by Jeffrey Thomasson    

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Devil Take The Hindmost Written by Allan Holdsworth

A Intro

 = 160

Fast

Transcribed by Jeffrey Thomasson

                 0  5 9 9 1312   97 1210 1210 12

Gtr

(chorused) A‹9 FŒ„Š13

 

 

0 13 14 15

0 13 14 15

C('9)/E D‹9

  

2nd x

  



A13(“4) D('9)/A

7 7 12 12



0 10 11 11



0 10 11 11

  

9

   

A‹('9)



7 7 12 12

  

  

0 10 11 11

11

   

 

3

12 13 16

12 13 16

14 15 18

D13(“4)

5

12 13 16

  

3 5 4

 5 6 5

7 7 12 12



   

 

7 9 8

9 10 9

10 12 11

5

 

3

3

3

3

13 12 15 14

12 14 13

11

7

7

6

12 13 12

10 12 11

   ø        8 9 8

B‹7 CŒ„Š7

1. E‹/B B‹('9) B‹7 A‹('9) D‹('9)/A

   

  





3 3 8 10 9

6

                      9 9 5 5 5 2 3 10 10 7 7 7 3 5  9 9 6 6 6 2 4 

10 12 11

D‹7 C©‹/F© C/G B‹/G A‹ B¨13(“4)

5 6 5

0 10 11 11

D('9)/A A('9)

F©‹/A G©‹/AF©‹7 B‹/F© B‹/F© F©‹7B13(“4) B9(“4)

       13                     F

               0 2 2 0 0 10 2 2 0 0 11  7 7 6 6

A13(“4) D('9)/A



3 3



 

D('9)/A A‹('9)

          0 0 0 5 10 0 0 7 11  5 5  6

A13(“4) D('9)/A

B D('9)/A D('9)/A A('9) @ A13(“4)                 7 0 0 2  127 1011 1011  27 227 006 006 7 7 6 6  12 11 11

 

8 9 9

7 7 11

7 7

 

5 5 9

7 8

2

         9  5

A‹9

18

  

7 8

9 7



5 9 7

9 12 10

F('9)

12 10

             

23

A‹9 FŒ„Š13

          2 2

C('9)

5 3

 

 

0 13 14 15

0 13 14 15

C('9)/E D‹9

0 13 12 12

9 12 10

2. E‹



4 6 9

4

6 6 10

6



2 3 6





2

 

6 8 11



3 3

3 2 3

  

9 11 13

7

4

4

D('9)         

  

10 11 14

10

11



10

11

8 11 12

6

    

 

 

6 6 10

3

5 6 9

8 11

4 4 8

6 8 11

11

9

         

3 6 7

  

6

6

4

         C‹('9)



8

9 11 13

8

8 12

11

7 10

9

8

B¨('9)

11



G('9)

6 7

8

8

    46

  

                   6 C('9)

8 11 12

6

D¨('9)/B

6 8 11

6

2 2 1

 

   

  

2 2

G¨('9)

38

 

 

2 1

A('9)

B¨‹('9)

F©('9)

3



             

6 8 11

6

              

33



B¨‹('9)/E G©‹('9)/E

D¨('9)/B

   

6

       2

B¨Œ„Š7(b5)

            89  66   44 44 10 8 8  9

C B('9)/A B¨‹('9)              4 6 9

       0 05   5 

5 3

28

3 3

A‹9

           3 3   6

6

6 7

8

8

7 10

D  

 



3 6

6



8 5 7

6

  

                 6

7

 

 

3 5 3

3 5 3



 

1 3 3

1 3 3

3





8 5 7

3

         6 3 5



ø

6 3 5

          

 

6 3 5

13 15 14

    

    

3 3



51

  

E‹/B B‹('9) B‹7

8 9 9

A‹9

7 7 11

7 7

  



  







7 7

47

56

 



3     

G‹9

43

0 5 5

13 15 14

A‹('9)

 

5 5 9

2 1

2 2 1

D.S. al Coda



 











12 13 12



A‹9

7 8

C('9)

9 7

A‹9

  1 4 5 5



12 10

     

FŒ„Š13

9 12 10

9 12 10

 



 



                  9   2 2 5

     

7 8

 



D‹('9)/A



B¨Œ„Š7(b5)

      2

10 11 10

G‹9

F('9)

5 3

 

 

0 13 12 12

0 13 14 15

C('9)/E D‹9

5 3

  

8 10 10 14

   



0