Technical Info

Sound Pressure Levels

A word about sound pressure levels (SPL) - in simple terms how loud will it be? PA speakers usually have an SPL rating quoted in decibels (dB) at a reference power level of 1W at a distance (from the speaker) of 1metre. For a typical PA speaker the SPL at 1m for 1W is usually between 96dB and 102dB with a typical value being 100dB. To give you an idea of how loud this is, it's often quoted as being the same as if you were standing 2m from a pneumatic drill - i.e. pretty damn loud! So 100dB is quite a good reference level for working out how loud it will be at a given distance from a PA speaker at a given power level. The other thing to note is that SPL decreases in inverse proportion to the distance from the speaker. So at 10m from the speaker, the SPL will have reduced by a tenth (1/10) which is equivalent to a 20dB reduction. It's possible to calculate SPL levels at various distances for different amplifier power levels.

The Pascal (Pa) is the unit of pressure, defined as 1 Pa = 1 N/m2. 0dB(SPL) is defined as 20 micropascals (µPa) = 2 x 10-5 Pa, the quietest sound a human can hear. One Pascal is equal to 94 dB(SPL). This level is used to specify microphone sensitivity. For example, a Shure SM58 microphone has a sensitivity of -54.5dBV/Pa, equivalent to 1.85mV.

The following table shows the amplifier power required to achieve 100dB and 95dB at various distances, based on PA speakers with a sensitivity rated at 100dB for 1W @ 1m.

Power100dB95dB
1W1m2m
10W3m6m
100W10m18m
300W17m30m
600W25m44m
1000W32m56m
3000W55m98m
10,000W100m178m

These figures ignore any contribution from the on-stage amplifiers, which will, of course, add to the overall SPL. The actual SPL in any given situation or venue will depend on a lot of factors, so these figures can only be used as a guide. The only real way of determining the (average) SPL is to measure it with a meter!

We always try to provide a sound level appropriate to the venue. We would normally expect to achieve a listening level at the back of the room (i.e. furthest from the stage) of between 90dB and 95dB. The volume will, of course, be greater nearer the stage and will vary within the room depending on the size and shape of the room and many other factors such as the size of the audience (people absorb sound!), the height of the ceiling, the floor covering and if the windows have curtains.

Calculator

You can use the calculator below to find out the amplifier power required to produce a desired Sound Pressure Level db at a given distance. It's usual to allow 3dB of "headroom" to keep the amp out of clip.

Input Parameters
Distance from Stage
m
Listening Level Required
dB(A)
Sensitivity
(1W @ 1m)

dB
Amplifier Output (exc. headroom)
W
Amplifier Headroom
dB
Calculated Parameters


Power required inc. headroom
PwW
SPL output at rated power
SPLmax
SPL reduction due to distance
dBdist
Max Listening Level Achieved
SPLout

Example: If the furthest listening position from the stage is 50 meters, and the desired Sound Pressure Level is 95 dB SPL, and the loudspeaker has a sensitivity rating of 98 dB. With the minimum recommended amplifier headroom of 3 dB, then the amplifier will need to supply at least 2,500 watts.

Note: if the Max Listening Level Achieved is less than the Level Required, the amplifier output needs to be higher. The results above also, in effect, show the SPL which can be achieved for a given amplifier power at a given distance.

Equations used to calculate the data:

dB = Lspl - Lsens + 20 * Log (Dist/Dref) + Ahrm

Pw = 10 to the power of (dB/10)

SPLmax = Lsens + 10 * Log (Amp)

dBdist = 20 * Log (Dist)

SPLout = SPLmax - dBdist

Where:
Lspl = required SPL at listener
Lsens = loudspeaker sensitivity (1W @ 1m)
Dist = loudspeaker-to-listener distance
Dref = reference distance (1m)
Ahrm = desired amplifier headroom
dB = ratio of power referenced to 1 watt
Pw = power required

Click here to view example calculations for listening levels for a typical small venue.

The Lenard Audio Institute has a very comprehensive web site dealing with all aspects of sound systems.