| Average annual return for any investment over any time period should be:
% gain or loss over the investment period
__________________________________________ X 365
nr of days invested
i.e., calculate the % gain or loss for one day, then multiply for a
full year.
For your example, there would be no gain from 6/1 to 8/28, and a
gain of $245 from 12/1 to 12/5. The two investment periods total
around 90 days, so average annual return works out to be about
245/1466
____________ X 365 = 68%
90
|
| re: <<< Note 354.2 by NOVA::FINNERTY >>>
> -< 1+ >-
>
> it should probably also factor in the effect of compounding.
I am wondering about this. Say, for example, you buy $1000 of stock. The
stock goes up each year for 5 years. After 5 years, the stock is up 50%
(it's value would be $1500). What is the average annual return?
Let x = average annual return (for example, 3% = 0.03)
after 1 year: 1000 * (1+x)
after 2 years: 1000 * (1+x) * (1+x)
after 3 years: 1000 * (1+x) * (1+x) * (1+x)
after 4 years: 1000 * (1+x) * (1+x) * (1+x) * (1+x)
after 5 years: 1000 * (1+x) * (1+x) * (1+x) * (1+x) * (1+x)
so after 5 years, 1000 * (1+x)^5 = 1500
Solving for x, we get x = 8.4472% This is *not* simply 50% divided by 5
years, which would be 10% a year. Due to compunding, the average annual
return is 8.4472%
Is this correct?
thanks,
adam
|