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Investment Analysis and Portfolio Management. Lecture 3 Gareth Myles. FT 100 Index. £ and $. Risk. Variance The standard measure of risk is the variance of return or Its square root: the standard deviation Sample variance The value obtained from past data Population variance
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Investment Analysis and Portfolio Management Lecture 3 Gareth Myles
Risk • Variance • The standard measure of risk is the variance of return or • Its square root: the standard deviation • Sample variance • The value obtained from past data • Population variance • The value from the true model of the data
Sample Variance General Motors Stock Price 1962-2008
Sample Variance Return on General Motors Stock 1993-2003
Sample Variance Graph of return
Sample Variance • With T observations sample variance is • The standard deviation is • Both these are biased estimators • The unbiased estimators are
Sample Variance • For the returns on the General Motors stock, the mean return is 6.5 • Using this value, the deviations from the mean and their squares are given by
Sample Variance • After summing and averaging, the variance is • The standard deviation is • This information can be used to compare different securities • A security has a mean return and a variance of the return
Sample Covariance • The covariance measures the way the returns on two assets vary relative to each other • Positive: the returns on the assets tend to rise and fall together • Negative: the returns tend to change in opposite directions • Covariance has important consequences for portfolios
Sample Covariance • Mean return on each stock = 6 • Variances of the returns are • Portfolio: 1/2 of asset A and 1/2 of asset B • Return in 2001: • Return in 2002: • Variance of return on portfolio is 0
Sample Covariance • The covariance of the return is • It is always true that • i. • ii.
Sample Covariance • Example. The table provides the returns on three assets over three years • Mean returns
Sample Covariance • Covariance between A and B is • Covariance between A and C is
Variance-Covariance Matrix • Covariance between B and C is • The matrix is symmetric
Variance-Covariance Matrix • For the example the variance-covariance matrix is
Population Return and Variance • Expectations: assign probabilities to outcomes • Rolling a dice: any integer between 1 and 6 with probability 1/6 • Outcomes and probabilities are: {1,1/6}, {2,1/6}, {3,1/6}, {4,1/6}, {5,1/6}, {6,1/6} • Expected value: average outcome if experiment repeated
Population Return and Variance • Formally: M possible outcomes • Outcome j is a value xjwith probability pj • Expected value of the random variable X is • The sample mean is the best estimate of the expected value
Population Return and Variance • After market analysis of Esso an analyst determines possible returns in 2010 • The expected return on Esso stock using this data is E[rEsso] = .2(2) + .3(6) + .3(9) + .2(12) = 7.3
Population Return and Variance • The expectation can be applied to functions of X • For the dice example applied to X2 • And to X3
Population Return and Variance • The expected value of the square of the deviation from the mean is • This is the population variance
Modelling Returns • States of the world • Provide a summary of the information about future return on an asset • A way of modelling the randomness in asset returns • Not intended as a practical description
Modelling Returns • Let there be M states of the world • Return on an asset in state j is rj • Probability of state j occurring is pj • Expected return on asset i is
Modelling Returns • Example: The temperature next year may be hot, warm or cold • The return on stock in a food production company in each state • If each states occurs with probability 1/3, the expected return on the stock is
Portfolio Expected Return • N assets • M states of the world • Return on asset i in state j is rij • Probability of state j occurring is pj • Xi proportion of the portfolio in asset i • Return on the portfolio in state j
Portfolio Expected Return • The expected return on the portfolio • Using returns on individual assets • Collecting terms this is • So
Portfolio Expected Return • Example: Portfolio of asset A (20%), asset B(80%) • Returns in the 5 possible states and probabilities are:
Portfolio Expected Return • For the two assets the expected returns are • For the portfolio the expected return is
Population Variance and Covariance • Population variance • The sample variance is an estimate of this • Population covariance • The sample covariance is an estimate of this
Population Variance and Covariance • M states of the world, return in state j is rij • Probability of state j is pj • Population variance is • Population standard deviation is
Population Variance and Covariance • Example: The table details returns in five possible states and the probabilities • The population variance is
Portfolio Variance • Two assets A and B • Proportions XA and XB • Return on the portfolio rP • Mean return • Portfolio variance
Portfolio Variance • Population covariance between A and B is • For M states with probabilities pj
Portfolio Variance • The portfolio return is • So • Collecting terms
Portfolio Variance • Squaring • Separate the expectations • Hence
Portfolio Variance • Example: Portfolio consisting of • 1/3 asset A • 2/3 asset B • The variances/covariance are • The portfolio variance is
Correlation Coefficient • The correlation coefficient is defined by • Value satisfies • perfect positive correlation rB rA
Correlation Coefficient • perfect negative correlation • Variance of the return of a portfolio rB rA
Correlation Coefficient • Example: Portfolio consisting of • 1/4 asset A • 3/4 asset B • The variances/correlation are • The portfolio variance is
General Formula • N assets, proportions Xi • Portfolio variance is • But so
Effect of Diversification • Diversification: a means of reducing risk • Consider holding N assets • Proportions Xi = 1/N • Variance of portfolio
Effect of Diversification • N terms in the first summation, N[ N-1] in the second • Gives • Define • Then
Effect of Diversification • Let N tend to infinity (extreme diversification) • Then • Hence • In a well-diversified portfolio only the covariance between assets counts for portfolio variance