Transcript Ch797
Chapter 7 Portfolio Mean And Variance ®1999 South-Western College Publishing 1 Weight Asset 1 Portfolio of Assets Weight Asset 2 Weight Asset 3 Weights Sum to 100% ®1999 South-Western College Publishing 2 Measuring Portfolio Risk • Variance • Standard Deviation • Degree of Dependency – Positive – Negative • Lower risk • Lower risk premium ®1999 South-Western College Publishing 3 What Is The Risk Premium? • Required to Compensate Investors for Risk • Higher the Variance or Standard Deviation, the Higher the Required Risk Premium • Degree of Dependency Affects the Risk Premium – The more negative the degree of dependency – The lower the risk of the portfolio – The lower the required risk premium ®1999 South-Western College Publishing 4 What Does A Risk-Averse Investor Require? • A Risk Premium – Requires a risk premium that decreases as the degree of dependency decreases – The required risk premium is a function of the asset’s variance and its dependency with other assets ®1999 South-Western College Publishing 5 Summary • One Asset – Variance is measurer of risk – Higher the variance, the higher the required risk premium • More Than One Asset – Risk is a function of both • The asset’s variance • The degree of dependency – Portfolio’s variance (Key factor) • Larger the variance • Higher the risk premium • Larger the risk premium on each asset ®1999 South-Western College Publishing 6 Expected Rate Of Return On The Portfolio E(R) • Calculate All Possible Return on the Portfolio, and Then Calculate its E(R) • Use Equation 7.2 W1 • E(R1) + W2 • E(R2) = E(Rp) • Both Methods Provide the Same Results ®1999 South-Western College Publishing 7 Covariance Expected value of the Product of Deviations From the Mean ®1999 South-Western College Publishing 8 Covariance • Measures the Degree of Dependency of 2 Assets – Positive • Rates of return moves together – Zero • Rates of return have independent movements – Negative • Rates of return move in opposite directions ®1999 South-Western College Publishing 9 Correlation Coefficient • Correlation Coefficient of 2 Stocks Cov(RA, RB) A,B = A B • Strength of Dependency – +1 perfectly positive – 0 no correlation – - 1 perfectly negative • Correlations are Directly Comparable no units or $ ®1999 South-Western College Publishing 10 Portfolio Variance • Direct Method (easy to calculate) – Calculate rate of return – Calculate variance • Indirect Method (demonstrates relationship) – Equation based on variance & covariance – Sheds light on factors affecting risk reduction ®1999 South-Western College Publishing 11 Low Correlation • Reduce Portfolio Fluctuation • Achieved by Diversification • Attractive to Risk-Averse Investors ®1999 South-Western College Publishing 12 Set 1 Bonus Questions for Ch. 1 ®1999 South-Western College Publishing 13