The population of a country increases at a rate proportional to the number of inhabitants. `f` is the population which doubles in 30 years, then the population will triple in approximately. (a) 30 years (b) 45 years (c) 48 years (d) 54 years

Let population `=x`, at time t years. Given `(dx)/(dt) propto x`
or `(dx)/(dt) = kx,` where k is a constant of proportionality
or `(dx)/x=kdt`
Integrating, we get ln x `=kt+ "ln "c`
or `x/c=e^(kt)` or `x=ce^(kt)`
If initially, i.e., when time t=0, `x=x_(0)` then `x_(0)=ce^(0)=c`
`therefore x=x_(0)e^(kt)`
If initially, i.e., when time t=30, then `2x_(0)=x_(0)e^(30k)` or `2=e^(30k)`.
therefore `"ln "2=30k`..............(1)
To find t, when t triples, `x=3x_(0)`. Thus, `3x_(0)=x_(0)e^(kt)` or `3=e^(kt)`..................(2).
`therefore "ln " 3=kt`
Dividing equation (2) by (1), `t/30 = ("ln"3)/("ln"2)`
or `t=30 xx ("ln"3)/("ln"2) = 30 xx 1.5849=48` years(approx).