![](data:image/png;base64,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)
音色参数
29
Level Velocity
Sensitivity Curve
决定根据键盘上弹奏音符键的力度 (强度)产生实际力度的方式。
图 34: Level Velocity Sensitivity Curve
A: 柔和
B: 用力
C: 低
D: 高
X: 力度 (演奏力度)
Y: 音量
Level Key Follow
Sensitivity
决定音符 (特别指其位置或八度范围)影响所选音素振幅等级的程度,假
设 C3 为基本音高。
正值:降低低音音符的输出音量,并升高高音音符的输出音量。
负值:升高低音音符的输出音量,并降低高音音符的输出音量。
D
B
C
Y
A
X