Respuesta :
Answer:
The answers to the question are
- How long did it take the population to double? Answer = one week
- How long did it take the population to triple? Answer = 1.58 weeks
- When were there 10, 000 ants on board? Answer = 5.06 weeks
- How long into the voyage were there 200 ants per anteater? Answer = 11.38 weeks
Step-by-step explanation:
To solve the question we use a similar analogy of half life calculation
Therefore we have
[tex]N_{(t)} =N_{(0)}(2 )^{\frac{1}{t} }[/tex] where
[tex]N_{(t)} =[/tex] Number of ants after time t
[tex]N_{(0)} =[/tex] Starting number of ants
Therefore
600 = 300 × [tex]2^{\frac{1}{t} }[/tex]
[tex]2^{\frac{1}{t} }[/tex] = 2
㏑ [tex]2^{\frac{1}{t} }[/tex] = ㏑2
[tex]\frac{1}{t}[/tex]㏑2 = ㏑2
[tex]\frac{1}{t}[/tex] = 1 and t = 1 week
It took one week for the population of the ants to double
For the population to triple, we have
3×300 = 300× [tex]2^{\frac{x}{1} }[/tex]
900 = 300× [tex]2^{\frac{x}{1} }[/tex]
[tex]2^{\frac{x}{1} }[/tex] =3
x㏑2 =㏑3 or x = [tex]\frac{ln3}{ln2}[/tex] = 1.58 weeks
There were 10000 ants onboard after
10000 = 300× [tex]2^{x }[/tex]
or [tex]2^{x }[/tex] = [tex]\frac{100}{3}[/tex] and x = (㏑[tex]\frac{100}{3}[/tex] )/㏑2 = 5.06 weeks
For the anteaters we have
Time for the anteaters to double = 3.2 weeks
Therefore t in the equation [tex]N_{(t)} =N_{(0)}(2 )^{\frac{1}{t} }[/tex] = 3.2 weeks
and the length of time it took for the population of ant eaters to grow to 200 is given by
200 = 17×[tex]2^{\frac{x}{t} }[/tex] =17×[tex]2^{\frac{x}{3.2} }[/tex]
From which we have
[tex]\frac{x}{3.2}[/tex] ㏑2 = ㏑(200/17)
x = 3.2×3.56 = 11.38 weeks
