Answer:
[tex]f(n) = (1.4)^{(n - 1)} \times 500[/tex]
The sequence is a geometric sequence.
Step-by-step explanation:
The number of leaves in the tree in the first year is 500.
And the number of leaves in the tree in the second year increases by 40% of the number in the first year.
So, it will be [tex]500(1 + \frac{40}{100}) = 1.4 \times 500[/tex]
Again, the number of leaves in the tree in the third year increases by 40% of the number in the second year and so on.
Therefore, the number of leaves in the tree in the third year will be [tex]1.4 \times 500 \times (1 + \frac{40}{100}) = (1.4)^{2} \times 500[/tex] and so on.
If we want to calculate the number of leaves in the tree in the nth year by f(n) then it will be given by
[tex]f(n) = (1.4)^{(n - 1)} \times 500[/tex]
Therefore, the sequence is a geometric sequence. (Answer)
