4.27 MUSIC (511)
4.27.1 Music Paper 2 (511/2)
1 RHYTHM ON MONOTONE
(a) DRUM RHYTHM
1 mark for each correct bar (correct note values) (2 marks)
1 mark for correct time signature (1 mark)
1 1
1
Total = (4 marks)
Award full marks (4) for correct rhythm without bar lines
For wrong time signature, penalize time signature and bar lines then treat rhythm (note
values) as bars and award.
(b) RHYTHM OF A MELODY IN SIMPLE TIME
1 mark for each correct bar (correct note values) (4 marks)
1 mark for correct time signature (1 mark)
1
1
Total = (8 marks)
(c) RHYTHM OF A MELODY IN COMPOUND TIME
1 mark for each correct bar (correct note values) (2 marks)
1 mark for correct time signature (1 mark)
1 1
1
Total = (8 marks)
2 MELODY
(a) Melody in a major key.
588
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) 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Deduct 2 mark per bar for wrong not values.
All pitches correct with wrong values - award of the total marks - 4 marks
mark for each correct note (pitch and value) (8 marks)
mark for each correct note (pitch and value) 17 notes (8 marks)
(ii) Perfect Octave (1 2 marks)
1
2
Correct key signature (1 mark)
Time signature (1 mark)
Total = (10 marks)
1
1
2
(b) Share with your friends: |