@g_nakamoto, for a given load impedance the ratio of two power levels is expressed in db by the following formula:
db = 10 x log(P1/P2)
where "log" is the base-10 logarithm.
From that it can be calculated that a 3 db increase corresponds to a doubling (not tripling) of power. Or more precisely, a doubling of power corresponds to an increase of 3.0103 db, which is usually rounded off to 3 db.
And a 3 db increase in the amount of power delivered to a speaker will result in a 3 db increase in the volume that is produced by that speaker, at a given distance, assuming that the speaker is not being driven so hard that "thermal compression" or other factors cause its behavior to become significantly non-linear.
Mr. Hirsch might also have referred at times to a commonly stated rule of thumb guideline that a **subjective** perception of "twice as loud" requires ten times as much power, which is an increase of 10 db.
I have no idea why or if he might have referred to a tripling of power.
Regards,
-- Al
db = 10 x log(P1/P2)
where "log" is the base-10 logarithm.
From that it can be calculated that a 3 db increase corresponds to a doubling (not tripling) of power. Or more precisely, a doubling of power corresponds to an increase of 3.0103 db, which is usually rounded off to 3 db.
And a 3 db increase in the amount of power delivered to a speaker will result in a 3 db increase in the volume that is produced by that speaker, at a given distance, assuming that the speaker is not being driven so hard that "thermal compression" or other factors cause its behavior to become significantly non-linear.
Mr. Hirsch might also have referred at times to a commonly stated rule of thumb guideline that a **subjective** perception of "twice as loud" requires ten times as much power, which is an increase of 10 db.
I have no idea why or if he might have referred to a tripling of power.
Regards,
-- Al