I am currently doing maths at GCSE Level. I was revising, then I came across a question that I became stuck on:
Brian's band is playing at a concert in a hall. The loudness of a band varies inversely as the square of the distance from the band. Brian measures the normal loudness of his band as 100 Db at a distance of $5$m. He has to stop playing if the loudness is above 85Db or more at a distance of $5.4$m. Does the band have to stop playing?
I understand I have to use the formula $y = \frac{k}{x^2}$ I do not know how to apply it though.
Would I do $Db = \frac{k}{(distance)^2}$?
I would appreciate any hints, but no answers please.
Assumption: There is no rule for normal decibels that for a sound ten times more powerful than $x$Db, only $10$Db is added.
I will use different symbols for distance and loudness $ d,L$
$$ k= L d^2,\, L=\dfrac{k} {d^2}$$
To evaluate $k$ the data is given:
$$ k= 100 \, 5^2 = 2500$$
So no one can be seated at a distance less than
$$ d_{min}= \sqrt{\dfrac{2500}{85}} = 5.42 \,m $$
The band need not stop playing but ensure that first row chair distance must be more than than 5.4 m