Evaluating Your Fund’s Risk

If you're relying on quantitative risk indicators, make sure you understand their limitations.

Christopher J. Traulsen, CFA 17 September, 2007 | 11:30AM
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When investors speak of a fund’s risk, they often refer to its standard deviation of returns or its beta as their primary measures. Both indicators have their uses, but neither is a failsafe way to evaluate your fund’s risk. In this article, we'll review the usefulness of both measures and their limitations. In our next column, we’ll take a look at alternative methods that can help you better assess the risks in your portfolio.

Standard Deviation
Standard deviation is fairly intuitive: It simply measures the variability of a fund's total returns around its average total return over a given period. In most cases, one would expect that approximately 68 percent of the time, a fund’s returns will fall within one st

andard deviation of its average return, and that it would fall within two standard deviations about 95% of the time.

Take New Star European Growth’s accumulation shares as an example: A quick check on Morningstar.co.uk show the fund has an annualised return of 21.45% over the past three years, and a standard deviation of 11.93% over the same period (this information can be found on the “Ratings and Risks” tab of any fund’s QuickTake Report). Based on these figures, we would expect the fund’s return to be between 9.52% and 33.38% about 68 percent of the time, and between -2.41% and 45.31% about 95 percent of the time. Thus, it’s apparent that the fund’s returns are volatile, which makes it less suitable for cautious investors.

In contrast, Aberdeen Corporate Bond's A Inc shares have a three-year annualised return of 3.02% and a standard deviation of just 3.92% over the same period (as one would expect from a fixed-interest fund). You can rank funds by their three-year standard deviation using the "Performance" tab of the Morningstar Quickrank or Morningstar Fund Screener tools

Beta
Beta is another commonly cited risk statistic. It's a bit more complex than standard deviation, but can be summarised as the sensitivity of a fund's returns to movements in a specified benchmark. By definition, the benchmark (for example, the FTSE 100) has a Beta of 1.00.

That might not be intuitive, but it’s pretty straightforward in practice. If a fund has a beta of 1.2, this simply means that its return is expected to be 20% better than the benchmark’s in up markets, and 20% worse than the benchmark's in down markets. If it has a beta of .80, then it is expected to deliver only 80% of the benchmark's return in up markets, but is also expected to have only 80% of the benchmark's losses in down markets. A fund with a beta of one is expected to match the benchmark's movements in up and down markets. Like standard deviation, then, a higher beta implies greater risk, though in this case, the risk is that the fund’s returns will vary by an increased amount from the fund's benchmark.

Limitations of Standard Deviation and Beta
Both standard deviation and beta have one inherent limitation in common--they are statistical measures based on a fund's past performance. As such, they may well fail to capture risks that are in the fund's current portfolio that haven't impacted the fund's performance in the past. For example, a fund that has typically been well diversified across market sectors in the past, but that now has 60% of it s assets in technology stocks would be expected to behave quite differently in the future than it has in the past.

Beta is also limited by the relevance of the benchmark selected. If the fund is not highly correlated with the benchmark, than the beta calculated relative to that benchmark becomes less meaningful. One can evaluate this quickly by checking a fund's R-squared relative to the benchmark in question.* R-squared is expressed as a value between 0 and 1.00, with 1.00 indicating a strong correlation, and 0 indicating no correlation at all. If a fund’s R-squared is high, say above .80, then beta should be a relatively strong indicator of a fund's past behaviour as outlined above. As R-squared falls, however, beta loses its meaning as a risk indicator.

It's also worth emphasizing that since beta is defined relative to a market index, it is not a measure of the volatility of returns in an absolute sense. If the selected benchmark is volatile (say a sector index, for example), then a fund could have a low beta relative to that benchmark, but still have extremely volatile returns on an absolute basis.

A Real World Example: Invesco Perpetual Latin American Fund
Invesco Perpetual Latin American Fund reveals the fund has a mean three-year annualised return of 69.12% and a standard deviation over the same period of 44.74%. By this measure, the fund is very volatile, indeed. It suggests that the fund’s returns can swing in either direction by substantial amounts.

On the other hand, the fund’s beta is just 1.07, suggesting that we can expect its returns to be only slightly more variable than its benchmark index. So what is causing the apparent contradiction between the fund’s standard deviation and beta? In this case, the benchmark we have measured the fund against is the MSCI EM Latin America Index. One can see that the fund’s R-squared is 95.6%, so the index is a good fit, and the fund’s beta is therefore a meaningful representation of its movements relative to the index. However, Latin America shares in general are quite volatile: The MSCI index has a three-year standard deviation of 22.16%, compared to just 7.38% for the FTSE 100 over the same period. It’s thus clear that the fund’s beta is by no means a fair indicator of its risk in an absolute sense.

*Think of the relationship between Beta and R-squared and a fund’s returns as follows: If you plot a fund’s monthly returns as points on a scatterplot graph, then draw the straight line through the points that does the best job of reflecting their trend (the regression line), beta is the slope of that line, while R-squared is an indicator of the strength of the line’s “fit” to the pattern of the points on the graph. If the points representing the fund’s returns are scattered widely around the line (R-squared is low), the relationship is weak, and the slope of the line (beta) is a poor indicator of the fund’s risk. If the points cluster reasonably tightly around the line (R-squared is closer to 1.0) however, the slope of the line will be a stronger indicator of a fund’s risk.

The information contained within is for educational and informational purposes ONLY. It is not intended nor should it be considered an invitation or inducement to buy or sell a security or securities noted within nor should it be viewed as a communication intended to persuade or incite you to buy or sell security or securities noted within. Any commentary provided is the opinion of the author and should not be considered a personalised recommendation. The information contained within should not be a person's sole basis for making an investment decision. Please contact your financial professional before making an investment decision.

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About Author

Christopher J. Traulsen, CFA  is director of fund research, Europe and Asia, Morningstar.

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