Answer:
n=6.77 months (exactly)
n=7 months (nearest integer, less accurate)
Step-by-step explanation:
A) The initial number of bees in a colony is 1500. Each month the number of bees decreases by 12% which means each month we must factor by (1-0.12)=0.88
So the number of bees as a function of n months is
1500*0.88*0.88...0.88 (n times)
[tex]B=1500*0.88^n[/tex]
The initial number of flowering plants is 800 and there are 25 fewer of them each month. It can be written as
[tex]P=800-25n[/tex]
B) After 6 months (n=6) there will be
[tex]B=1500*0.88^6\approx 697\ bees[/tex]
And there will be
[tex]P=800-25(6)=650[/tex]flowering plants
C) We want to know the value of n that make B = P:
[tex]1500*0.88^n=800-25n[/tex]
Rearranging
[tex]1500*0.88^n-800+25n=0[/tex]
This equation cannot be solved by exact procedures, we must approach the answer or use any numerical method to solve for n
The best value to solve the equation is n = 6.77 months in which case
[tex]B=1500*0.88^{6.77}\approx 631\ bees[/tex]
And [tex]P=800-25(6.77)\approx 631[/tex] flowering plants
If we wanted to use only integers for n, then we should use the nearest integer to our previous value, that is, n=7. In this case,
[tex]B=1500*0.88^7\approx 613\ bees[/tex]
[tex]P=800-25(7)= 625[/tex] flowering plants
