Travian said:
Intensity level = 10log(2000x20 / 0.0000000000001)
Intensity level = 10log(400000000000000000)
Intensity level = 17.602dB.
Is this correct?
Sorry, not quite correct.
I is not equal to 20 dB.
I is in units of W/m
2, not dB.
Don't mix up the sound intensity level with the power flux. Like I said before, they are different expressions for the same thing, but they are not the same number.
Let me give you a start, doing it the long way (you can solve the problem the easier way too, but I think it's important to understand how to do it this way, at least in concept).
20 \ [\mbox{dB}] = 10 \log \left( \frac{I}{1 \times 10^{-12} \left[ \frac{\mbox{W}}{\mbox{m}^2} \right]}\right)
Divide both sides of the equation by 10.
2 = \log \left( \frac{I}{1 \times 10^{-12} \left[ \frac{\mbox{W}}{\mbox{m}^2} \right]}\right)
Bring each side to the power of 10.
10^2 = 10^{\log \left( \frac{I}{1 \times 10^{-12} \left[ \frac{\mbox{W}}{\mbox{m}^2} \right]}\right)}
Simplify the right side,
10^2 = \frac{I}{1 \times 10^{-12} \left[ \frac{\mbox{W}}{\mbox{m}^2} \right]}
Multiply each side by 1 x 10
-12 [W/m
2]
(10^2) \left(1 \times 10^{-12} \left[\frac{\mbox{W}}{\mbox{m}^2} \right] \right) = I
Simplify the left side,
1 \times 10^{-10} \left[ \frac{\mbox{W}}{\mbox{m}^2} \right] = I
Now multiply
I times 2000 and convert to dB.
Alternately, Like I mentioned before, there is an easier way to do this problem, where you don't even need to even know that
I0 is 1 x 10
-12 [W/m
2]. You should do it that way too to double check your answer. (Hint: Use the clue I gave in post# 9.)
