Tobias Rauscher Still Awake

Still Awake performing analysis Tobias Rauscher A maj7 8 - - 1341 User Defined 1=D 6 = D♯ 2 = A♯ 5=G Moderate = 120

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Citation preview

Still Awake performing analysis Tobias Rauscher A maj7 8

- - 1341

User Defined 1=D 6 = D♯ 2 = A♯ 5=G

Moderate

= 120

A maj7

1

S-Gt

A.H.

10 (8)

8

0

8

11 (8)

(8) (11) (10) (8)

(8)

A.H.

A.H.

8 10

8

0

Bend trough the nec

6

½ ¼ 1 4 3 1 3 0

(1) (4) (3) (1) (3) (0)

4 3 3

0

4 3

11 10

(11) (10)

7

8

11

10

(10)

19 19

= 150 13

T

T

8

0

0

3

0

0 8 0

8 0

7

8

7

3 0

(8)

0

11

8 10

11

X X

1/12

16

8

8

11

10

0

X X

11

0

8

8

11

10 X X

0

11

0

1

X X

1

4

3

1

4

X X

0

4

3 X X

0

21

13

13

16

15

16

X X

0

8

11

0

0

8

8

11

10 X X

11

10

0

X X

25

8 0

11

8 10

8 11 10

11

X X

10

8 11 10

0

0

1

0

4

1 3

1

4

X X

4

3 X X

0

= 110

29

13

0

16

13 15 X X

16

13

0

16

15







0

2/12

32

T

() () ()

T

0 0 0

2 3

5

4

3

0

2

7

0

8

7

3

5

3

= 110

35

T







() () ()

0 0 0

0

3

5

7

8

8

7

8

7

10

8

0

38

T

(8)

10

0

5 0

12

3 0

0 0

0

2 0

(2) (0)

0

0 0

0

2

2

9

11

3

0

0

41

10 (0)

10

10

0

10 0

10 0

0

3

3

(3)

12

12

3 0

3 0

(3) 0

12 0

12 0

12

10

12

12 0

7

7

9

0

3/12

Let Ring + N.H. - very interesting!

44

(9)

7

9

7

0

10

8

7

10 (9) 11

9

0

10 11

12

0

12

(12)

0





0

0

47

9

11

0

7

7

9

7

9

0

0

8

10

12

(12)

0

10

8

11

12

11

0

9

7

8

0

50

7

7

8

7

5

5

7

5

3

0

3

5

3

2

0





0

0

52

T

() () ()

T

0 0 0

2 3

5

4

2

3

0 0

7

8

7

3

5

3

4/12

55







() () ()

T

T

7

8

T

0 0 0

0

3

5

8

7

8

7

10

8

0

58

T

(8)

10

0

5 0

12

3 0

0

0 0

2 0

(2) (0)

0

0 0

0

2

3

2

0

0

61

10 (0)

10

10

0

10 0

10 0

0

3

3

(3) 12

12

3 0

3 0

(3) 12 0 0

12 0

12

10

12

5 0

12

3 0

0

0 0

2 0

0

64

(2) (0) 0

0 0

0

2

2

3

0

(0)

10

10

10

12

10

10

0

10 0

10 0

10 0

0

12 0

12

0

12

8

8

10 0

10 0

5/12

67

7

0

5

0

0

7

0

0

5

0

3

4

0

7

0

0

5

0

0

7

0

0

5

0

3

0

0

69

T

7 7

0 0

0

T

5 5

0 0

(0)

0

T

4 3

0 0

T

5 5

0 0

7 7

0 0

0

T

5 5

0 0

(0)

0

T

4 3

0 0

5 5

0 0

3

0

71

7

0

5

0

0

7

0

0

5

0

3

4

0

7

0

0

5

0

0

7

0

0

5

0

0

73

T

7 7 0

0 0

T

5 5

0 0

(0)

0

4 3

T

0 0

5 5

T

0 0

7 7 0

0 0

T

5 5

0 0

(0)

0

4 3

T

0 0

5 5

0 0

6/12

75

7 7 0

0 0

9 8

0

0 0

(0) (0)

0

11 10

0 0

12 12

0

0 0

11 10

0

0

= 115 77

T

5

7

5

0

5

7

5

0

3

2

9

3

2

0

1

0

2

0

3

2

79

T

5 7

5

0

5

7 5

0

9

3

0

2

T

T

5

7

3

3

0

8

5

5

7

0

82

12 7

12

10 12 15 10 8

7

0







() 2

(2)

7/12

Dip by means of machinehead or headstocks flexion

85

1









()







()

0

0

2

89









() () ()







0

0



0

92





0





0

0

0

0

0

0

0

0

95

T

0





() () ()

T

0 0 0

2 3

5

4

2

3

0 0

7

8

7

8/12

98

3

5

3





() () ()

T

T

7

8

0 0 0

0

3

5

8

7

101

T

8

T

7

10

8

(8)

10

0

5 0

12

3 0

0 0

0

0

2 0

0

104

(2) (0)

0 0

10 0

2

3

2

0

(0)

10

10

3

3

(3) 12

12

0

10 0

10 0

0

3 0

3 0

(3) 12 0 0

12 0

0

2

0

10

12

12

12

107

5 0 0

3 0

0 0 0

2 0

(2) (0) 0

0 0

2

3

0

(0) 10

10

10

12

10 0

10 0

10 0

0

0

0

9/12

110

10

10

12 0

12

12

8

8

10 0

10 0

Very ineresting trill passage, not easy)

111

8

5

0

7

5

8

5

7

0

8

7

5

8

0

5

7

0

5

8

5

7

0

8

7

5

0

112

8

5

0

7

5

8

5

7

0

8

7

5

8

0

5

7

0

5

8

5

10

0

8

0

113

12

0

8

10

0

8

12

8

10 12 10 8

12

0

0

8

10

0

8

12

8

10 12 10 8

0

10/12

114

12

8

10

0

8

12

8

0

10 12 10 8

12

0

0

8

10

8

12

8

10 12 10 8

0

0

115

8

5

7

5

8

5

7 0

8

7

5

8

5

7

5

8

5

7

8

7

5

8

7

5

0

0

0

116

8

5

7

5

8

5

7 0

8

7

5

8

5

7

5

8

5

7 0

0

0

117

12

0

8

10

8

12

8

10 12 10 8 0

12

8

10

8

12

8

10 12 10 8 0

0

11/12

= 60

118

12

8

10

8

12

8

10 12 10 8 12 8 10 8 12 8 10 8 12 8 10 8 12 0

0





0

0

4x

120

4x

0





() () ()

0

12/12