The ratio of intensities between two coherent soud sources is 4 : 1. The differenmce of loudness in dB between maximum and minimum intensities when

Q: The ratio of intensities between two coherent soud sources is $4 : 1$. The differenmce of loudness in $dB$ between maximum and minimum intensities when they interfere in space is:

b $\frac{I_{1}}{I_{2}}=\frac{4}{1}$ or $\sqrt{\frac{I_{2}}{I_{2}}}=\frac{2}{1}$ $\therefore \frac{I_{\max }}{I_{\min }}=\left[\frac{\sqrt{I_{1} / I_{2}}+1}{\sqrt{I_{1} / I_{2}}-1}\right]^{2}=\left[\frac{2+1}{2-1}\right]^{2}=9$ $\therefore L_{1}-L_{2}=10 \log \left(\frac{I_{\max }}{I_{\min }}\right)=10 \log 9=20 \log 3$

SECTION - A [PHYSICS - MCQ]

GSEB - English Medium

The ratio of intensities between two coherent soud sources is $4 : 1$. The differenmce of loudness in $dB$ between maximum and minimum intensities when they interfere in space is:

A$10 \,\,log\,\, 2$
B$20 \,\,log \,\,3$
C$10\,\,log\,\, 3$
D$20\,\, log \,\,2$

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STD 11 Science
NEET
STD 11 - 14. waves and sound
Physics

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