sysD Posted March 2, 2011 Posted March 2, 2011 00 Ok, so here's the provided info: A person invests $10 000 @ 3% per annum Another person invests the same amount THREE YEARS LATER @ 5% per annum. When will they be equal? Here's the equation I came up with: 10 000 (1.03)^(n+3) = 10 000 (1.05)^(n) This yields an answer of ~4.61 Here is my work: 10 000 (1.03)^(n+3) = 10 000 (1.05)^(n) (n+3)log(1.03) = n(log(1.05)) n(log(1.03)) + 3(log(1.03)) = n(log(1.05)) 3(log(1.03)) = n(log(1.05)) - n(log(1.03)) 3(log(1.03)) = n(log1.05 - log1.03) n = ( 3log1.03 ) / ( log1.05 - log1.03) n = ~4.61 Here's the issue: The book uses the equation: 10 000 (1.03)^(n) = 10 000 (1.03)^(n-3) And here is the correct work and answer: n(log(1.03)) = (n-3)(log(1.05)) n(log1.03) = n(log1.05) - 3log(1.05) n(log1.03 - log1.05) = -3log(1.05) n = (-3log(1.05)) / (log1.03 - log1.05) n = ~7.61 This makes sense, as there are three less compounding periods (n-3) in the second (1.03%/annum) amount. Why, though, is this not the same exact thing as saying the first amount has (n+3) three more compounding periods? I understand that the maths yield a different answer, but would someone kindly conceptualy explain why the two are not equivilant?
Schrödinger's hat Posted March 2, 2011 Posted March 2, 2011 There's nothing wrong with your logic, it's just what n represents. Finish this sentence. The balances will be equal 4.61 years after ________ Then this one The balances will be equal 7.61 years after ________ This is why defining our terms explicitly is important, otherwise we can be talking about two different things without noticing.
sysD Posted March 2, 2011 Author Posted March 2, 2011 Ahh, yes, I see. Defining "n" in this case as "the time, in years, it would take for the second amount to equal the first" would have circumvented this issue. Alternatively, if I were to use the book's method, "n" would be defined as: "the time, in years, it would take for the first amount to equal the second."
Recommended Posts
Create an account or sign in to comment
You need to be a member in order to leave a comment
Create an account
Sign up for a new account in our community. It's easy!
Register a new accountSign in
Already have an account? Sign in here.
Sign In Now