When considering investments, consider the power of compounding. Compound interest is where the interest you have earned is added to the investment and it itself generates more interest : The formula is as follows :
A = P(1 + r/q)nq
The nq outside the brackets above does not mean "multiplied by nq" but "to the power of nq".
P is the principal (the money you start with, your first deposit)
r is the annual rate of interest as a decimal (5% means r = 0.05)
n is the number of years you leave it on deposit
A is how much money you've accumulated after n years, including interest.
If the interest is compounded once a year:
A = P(1 + r)n
If the interest is compounded q times a year:
A = P(1 + r/q)nq
As a good exercise you should work out dozens of examples comparing the returns when interest is compounded and when it is just simple interest (SI = PRT/100).
Formula for the present value (discounted value) of a future amount
P = the present value of amount A, due n years from now
r = the rate of interest
For example, someone contracts to pay you $100,000 in ten years. What's that worth right now, if they changed their mind and decided to paid you upfront? Say the interest rate is 5%.
At simple interest:
P = A/(1 + nr)
If A = 100,000 and n = 10 and r = 0.05 (which is to say, 5%), then
P = 100,000/(1 + 10x0.05) = 100,000/1.5 = 66,667
At interest compounded annually:
P = A/(1 + r)n
Using the same example as for simple interest, this gives
P = 100,000/(1 + .05)10 = 100,000/1.62889 = 61,391
At interest compounded q times a year:
P = A/(1 + r/q)nq
Or in the same example but compounding monthly (q = 12)
P = 100,000/(1 + 0.05/12)120 = 100,000/1.64701 = 60716
Saturday, September 11, 2010
Subscribe to:
Post Comments (Atom)
No comments:
Post a Comment