1. Last Study Topics Portfolio Risk Market Risk Is Measured by Beta
Beta as a Portfolio Risk Measurement

2. Today’s Study Topics Markowitz Portfolio Theory
Risk and Return Relationship
Efficient Portfolio

3. Explain
a. “Risk is not variability. If I know a stock is going to fluctuate between $10 and $20, I can make myself a bundle.”
To the extent that the investor is interested in the variation of possible future outcomes, risk is indeed variability. If returns are random, then the greater the period-by-period variability, the greater the variation of possible future outcomes. Also, the comment seems to imply that any rise to $20 or fall to $10 will inevitably be reversed; this is not true.

4. Continue
b. “There are all sorts of risk in addition to beta risk. There’s the risk that we’ll have a down turn in demand, there’s the risk that my best plant manager will drop dead, there’s the risk of a hike in steel prices. You’ve got to take all these things into consideration.”

5. Continue
Solution: A stock’s variability may be due to many uncertainties, such as unexpected changes in demand, plant manager mortality or changes in costs. However, the risks that are not measured by beta are the risks that can be diversified away by the investor so that they are not relevant for investment decisions.

6. Continue c. “Risk to me is the probability of loss.”
Given the expected return, the probability of loss increases with the standard deviation. Therefore, portfolios that minimize the standard deviation for any level of expected return also minimize the probability of loss.

7. Continue
d. “Those guys who suggest beta is a measure of risk make the big assumption that betas don’t change.”
Beta is the sensitivity of an investment’s returns to market returns. In order to estimate beta, it is often helpful to analyze past returns. When we do this, we are indeed assuming betas do not change. If they are liable to change, we must allow for this in our estimation. But this does not affect the idea that some risks cannot be diversified away.

8. Explain
e. How many variance terms and how many covariance terms do you need to calculate the risk of a 100-share portfolio?
Refer to Figure on the next slide. With 100 securities, the box is 100 by 100. The variance terms are the diagonal terms, and thus there are 100 variance terms. The rest are the covariance terms.
Because the box has (100 times 100) terms altogether, the number of covariance terms is:
(100) = 9,900
Half of these terms (i.e., 4,950) are different.

9. Portfolio Risk To calculate portfolio variance add up the boxes
The shaded boxes contain variance terms; the remainder contain covariance terms. 1 2 3 4 5 6 N
To calculate portfolio variance add up the boxes
STOCK
STOCK

10. Continue
f. Suppose all stocks had a standard deviation of 30 percent and a correlation with each other of .4. What is the standard deviation of the returns on a portfolio that has equal holdings in 50 stocks?
Once again, it is easiest to think of this in terms of Figure on the previous slide – With 50 stocks, all with the same standard deviation (0.30), the same weight in the portfolio (0.02), and all pairs having the same correlation coefficient (0.4);

11. Continue The portfolio variance is: = 19.3%
=0.0371
Standard deviation = 0.193
= 19.3%

12. Continue
g. What is the standard deviation of a fully diversified portfolio of such stocks?
For a completely diversified portfolio, portfolio variance equals the average covariance:
Variance = (0.30)(0.30)(0.40) = 0.036
Standard deviation = = 19.0%

13. Principles of Corporate Finance
Sixth Edition
Richard A. Brealey
Stewart C. Myers
Chapter 8
Risk and Return
Lu Yurong
McGraw Hill/Irwin

14. Risk and Return
The stock market is risky because there is a spread of possible outcomes.
The usual measure of this spread is the standard deviation or variance.
The risk of any stock can be broken down into two parts.
Unique Risk and Market Risk

15. Continue
There is the unique risk that is peculiar to that stock, and there is the market risk that is associated with market wide variations.
Investors can eliminate unique risk by holding a well diversified portfolio, but they cannot eliminate market risk.
All the risk of a fully diversified portfolio is market risk.

16. Markowitz Portfolio Theory
Combining stocks into portfolios can reduce standard deviation, below the level obtained from a simple weighted average calculation.
Correlation coefficients make this possible.
The various weighted combinations of stocks that create this standard deviations constitute the set of efficient portfolios.

17. Birth of Portfolio Theory
But Markowitz did not stop there; he went on to work out the basic principles of portfolio construction.
These principles are the foundation for much of what has been written about the relation-ship between risk and return.

18. Histogram-Normal Distribution
We begin with 1st Figure on the nest slide, which shows a histogram of the daily returns on Microsoft stock from 1990 to 2001.
On this histogram we have superimposed a bell shaped normal distribution.
The result is typical: When measured over some fairly short interval, the past rates of return on any stock conform closely to a normal distribution.

19. Markowitz Portfolio Theory
Price changes vs. Normal distribution
Microsoft - Daily % change
Proportion of Days
Daily % Change

20. Continue
Normal distributions can be completely defined by two numbers.
One is the average or expected return; the other is the variance or standard deviation.
They are not just arbitrary measures: If returns are normally distributed, they are the only two measures that an investor need consider.

21. Investments-A & B
Figure 2&3 pictures the distribution of possible returns from two investments.
Both offer an expected return of 10%, but A has much the wider spread of possible outcomes.
Its standard deviation is 15%; the standard deviation of B is 7.5%.
Most investors dislike uncertainty and would therefore prefer B to A.

22. Markowitz Portfolio Theory
Standard Deviation VS. Expected Return
Investment A
% probability
% return

23. Markowitz Portfolio Theory
Standard Deviation VS. Expected Return
Investment B
% probability
% return

24. Investments-C & D
Figure 4&5 pictures the distribution of returns from two other investments.
This time both have the same standard deviation, but the expected return is 20% from stock C and only 10% from stock D.
Most investors like high expected return and would therefore prefer C to D.

25. Markowitz Portfolio Theory
Standard Deviation VS. Expected Return
Investment C
% probability
% return

26. Markowitz Portfolio Theory
Standard Deviation VS. Expected Return
Investment D
% probability
% return

27. Combining Stocks into Portfolio
Suppose that you are wondering whether to invest in shares of Coca-Cola or Reebok.
You decide that Reebok offers an expected return of 20% and Coca-Cola offers an expected return of 10%.
You also decide that the standard deviation of returns is31.5% for Coca-Cola and 58.5% for Reebok.
Reebok offers the higher expected return, but it is considerably more risky.

28. Continue
In Figure 6 we have plotted the expected return and risk that you could achieve by different combinations of the two stocks.
Which of these combinations is best? That depends on your stomach.
If you want to stake all on getting rich quickly, you will do best to put all your money in Reebok.

29. Markowitz Portfolio Theory
Expected Returns and Standard Deviations vary given different weighted combinations of the stocks
Expected Return (%)
Reebok
35% in Reebok
Coca Cola
Standard Deviation

30. Continue
If you want a more peaceful life, you should invest most of your money in Coca-Cola; to minimize risk you should keep a small investment in Reebok.
In practice, you are not limited to investing in only two stocks.
How about portfolios of 10, 100, 1000 stocks?

31. Choose a Portfolio
Suppose that we can choose a portfolio from any of the stocks listed in the first column of Table 1.

32. Continue
Now Figure 7 tells that each diamond marks the combination of risk and return offered by a different individual security.
For example, Amazon.com has the highest standard deviation; it also offers the highest expected return.
It is represented by the diamond at the upper right of Figure 7 on the next slide.

33. Portfolios

34. Continue Portfolio A: Amazon.com Portfolio B & C:
Entirely invested in one Stock with highest returns
Portfolio B & C:
Intermediate levels of risk and return
Portfolio D: Exxon Mobile
This Stock having the lowest Risk i.e. S.D

35. Selection of best portfolio
By mixing investment in individual securities, you can obtain an even wider selection of risk and return.
In fact, anywhere in the shaded area in Figure 7.
But where in the shaded area is best? Well, what is your goal? Which direction do you want to go?

36. Efficient Portfolios
The answer should be obvious: You want to go up (to increase expected return) and to the left (to reduce risk).
Go as far as you can, and you will end up with one of the portfolios that lies along the heavy solid line.
Markowitz called them efficient portfolios.
These portfolios are clearly better than any in the interior of the shaded area.

37. Summary Markowitz Portfolio Theory Risk and Return Relationship
Efficient Portfolio