Answer: it will take 24.6467 min to lower the radon concentration to an acceptable level of 0.15Bq.L^-1
Step-by-step explanation:
To calculate the required time, we make use of the formula
Cout = Coexp [ - ( 1/θ + k ) t ] .........lets call this equation 1
where Co is the concentration of radon( 1.5Bq.L^-1 ), Cout id the allowable radon concentration( 0.15Bq.L^-1), k is the radon decay rate constant( 2.09 * 10^-6 s^-1 ), θ is the theoretical detention time and t is the time required to lower the radon concentration.
first we find θ which is the theoretical detention time using the expression
θ = _V / Q
_V is the volume of basement (90 m^3) and Q is the rate of free air (0.14 m^3.s^-1)
so we substitute
θ = 90 / 0.14
θ = 642.857 s
Now we substitute all our values into equation 1
Cout = Coexp [ - ( 1/θ + k ) t ]
0.15 = 1.5exp [ - ( 1/642.857 + (2.09 * 10^-6) ) t ]
divide both LHS and RHS by 1.5
0.15/1.5 = exp [ - ( 0.001555 + 0.00000209)t ]
0.1 = exp[ - ( 0.001557)t ]
next we take the natural log of both sides
In 0.1 = In [ exp( -0.001557t )]
-2.3025 = - 0.001557t
t = 2.3025 / 0.001557
t = 1478.8053 sec
so we convert to minutes
t = 1478.8053 / 60
t = 24.6467 min
therefore it will take 24.6467 min to lower the radon concentration to an acceptable level of 0.15Bq.L^-1