continuous growth is given by the exponential equation
y = a(e)^kt
let a=1 then for doubling y = 2
2 = e^37k
37k = ln 2
k = ln 2/37
so y = a(e)^(ln2/37)t
so now you want y to be 3
3 = e^(ln2/37)t
(ln2/37)t = ln3
t = 37ln3/ln2 = 58.6 years
You titled your post "exponential" but totally ignored that important property.
You treated the relationship as "linear"
If an account that earns interest compounded continuously takes 37 years to double in value, how long will it take to triple in value?
Here's what I think...I divided 37 with 2 and multiplied that value with 3 and so my answer is 55.5 years. Am I correct? If not, please help me get the right answer! Thanks in advance.
3 answers
thanks! this tells me i need to review the chapter...
921
1 answer