Question

Population y grows according to the equation dy/dx=ky, where k is constant and t is measured in years. If the population doubles every 10 years, then what is the value of k?

Answer 1

`K=ln2/10`

Explanation:

Standard equation for 'the law of natural growth' is `P[t]=Ce^[kt`.

Let`P[t]=1` when `t=0`, and so `1=Ce^[k[0],` ie `C=1`

So when the population has doubled to `2`,

`2=e^[10k`, taking logs of of both sides ln`2=ln[e^[10k`]

ln`2=10k` [Theory of logs] therefore `k=ln2/[10]`. Hope this was helpful.