[tex]{N(t)(1-0.0004N(t)=0.9996e^t[/tex]
Step-by-step explanation:
[tex]\frac{dN}{dt}=N(1- 0.0004N)[/tex]
[tex]\Leftrightarrow\frac{dN}{N(1-0.0004N)}=dt[/tex]
[tex]\Leftrightarrow (\frac{1}{N} +\frac{0.0004}{(1-0.0004N)} )dN = dt[/tex]
Integrating both sides
[tex]log N-log(1-0.0004N)=t +C[/tex] [ where C integrating constant]
[tex]\Leftrightarrow logN(1-0.0004N) =t +C[/tex]
Given condition N=1 when t=0
[tex]log1(1-0.0004)=0+C[/tex]
[tex]\therefore C = log(0.9996)[/tex]
Therefore [tex]logN(1-0.0004N)-log 0.9996=t[/tex]
[tex]\Leftrightarrow {N(t)(1-0.0004N(t)=0.9996e^t[/tex]
