Delay effect

Not Rated Yet

A delay effect takes a signal (the "input signal") and produces a repetition of the signal (the "output signal") with a delay in time (the "delay"). Practical delays will also change – usually reduce – the amplitude of the output signal from the amplitude of the input signal (the "decay").

A delay effect is an effect the output of which is the input signal repeated at least once with some delay in time and usually with some decay in amplitude.

The input signal, also called the "dry signal", may or may not be added to the output signal. The output signal (usually just the repeated, delayed, decayed part) is also called the "wet signal".

Feedback

Some delay effects allow the wet signal to be fed back into the output. Each time the delayed output signal is fed back into the input of the delay effect, another signal repetition is created. Such "feedback" can theoretically continue indefinitely and in effect creates an "echo", where the signal is repeated many times with ever decreasing amplitude.

Delay and decay sweeps

Some delay effects allow for a gradual change in the amount of time delay ("delay sweep") or of the decay ("decay/amplitude sweep").

Multitap delay

Some delay effects may contain more than one simple delay unit and thus the output signal may be the result of several signal repetitions with delay and decay amounts that are independent with each other. Such effects may contain delay units that work in parallel or in a chain, may allow feedback or sweeps at different places of the delay chain. Some delay chains may allow the output of each delay unit to be "tapped" and taken to the output before it is fed into the next delay unit in the chain, thus resulting in a "multi-tap delay effect".

Slapback delay

A "slapback delay" is simply a delay effect with a very short delay time. A slapback delay has a delay time of, say, 50 ms to 250 ms (different sources point to different times). A slapback delay will usually have a single repetition (no feedback) and non-varying delay and decay amounts (no sweeps).




  Rating
Rate This Page: Poor Great   |  Rate Content |
Average rating:  No Ratings Yet   
Number of Ratings : 0
  Comments
Add Comment
No Comments Yet


Copyright 2006 by Kaliopa Publishing, LLC