Answer:
[tex]10^{8} times[/tex]
Explanation:
Sound intensity level in terms of dB is define by the formula in terms of intensity I as,
[tex]\beta=10log_{10}\frac{I}{I_{0} }[/tex]
Given that, the sound levels are given as,
[tex]\beta_{1}=70dB[/tex] and
[tex]\beta_{2}=150dB[/tex]
Therefore,
[tex]\beta_{2}-\beta_{1}=10log_{10}\frac{I_{2} }{I_{0} }-10log_{10}\frac{I_{1} }{I_{0} }\\\beta_{2}-\beta_{1}=10log_{10}\frac{I_{2} }{I_{1} }[/tex]
Put the values of all variables in the above equation,
[tex]150dB-70dB=10log_{10}\frac{I_{2} }{I_{1} }\\log_{10}\frac{I_{2} }{I_{1} }=\frac{80}{10}\\ \frac{I_{2} }{I_{1} }=10^{8}\\I_{2}=10^{8} I_{1}[/tex]
Therefore the 150 dB is [tex]10^{8}[/tex] times louder than 70 dB sound.
