1 Answer

Ashish Thukral · Answer 1 · 2020-07-14T16:53:52+0000

Step-by-step explanation:

It is given that,

Radius of sound transducer, r = 1.09 cm = 0.0109 m

Sound intensity,
$I=6.86* 10^3\ W/m^2$

Sound energy, E = 4040 J

We need to find the time required to emit 4040 J of sound energy. We know that intensity is given by power per unit area i.e.

I=(P)/(A)

$I=(P)/(\pi r^2)$

$P=I* \pi r^2$

Energy per unit time is called power i.e.

P=(E)/(t)

$t=(E)/(I\pi r^2)$

$t=(4040\ J)/(6.86* 10^3\ W/m^2* \pi (0.0109\ m)^2)$

t = 1577.80 seconds

So, 1577.80 seconds is required for the transducer to emit 4040 J of sound energy.

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