Respuesta :
Answer:
1779299.7m
Explanation:
From formulas in acoustic sound, we know that sound intensity is inversely proportional to the square of the distance away.
Thus;
I2/I1 = r2Ā²/r 1Ā²
So,
āL = 10 log (I2/I1)
Where āL is the intensity of music and r1 and r2 are distances away.
āL=10log 10(r1Ā²/r2Ā²)
āL=10log 10(r1/r2)Ā²
āL= - 20log 10(r1/r2)
r2 = r1ā¢10^(-āL/20)
āFrom the question,
āL = 116 Db
r1 = 2.82m
Thus,
r2 = 2.82 x 10^(116/20)
r2 = 2.82 x 630957.34 = 1779299.7m
Answer / Explanation:
To properly answer this question, let us first define what sound intensity is:
Sound intensity which can also be refereed to as also known as acoustic intensity can be described as the calculated power or energy needed to transmit sound waves per unit area in a direction at 90 degree to that area. We should also note that the SI unit of sound intensity is the watt per square meter.
Referring back to the question asked,
To find where the music is barely audible, we need to use the equation
Lā = Lā - 20 log rā/rā
where Ā
Lā = Sound level in decibels, as well as the
rā = Ā distance from the source that sound level is heard, and Ā
Lā = Sound level, while
rā = Ā distance at a different point.
Moving forward,
To be able to find where the sound is barely audible, we need to find the location at which the sound level is zero db (o db).
Therefore,
Lā = Lā - 20 log rā / rā
0dB Ā = Ā 116 dB Ā ā Ā 20log Ā rā / 2.82 m 20 Ā log Ā rā / 2.82 m
= 116 dB rā / 2. 82m = 10 ā§ 116 / 20
rā = (2.82m) 10 ā§ 116 / 20
rā = Ā 178.7m
