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Money, Banking & Finance Lecture 3. Risk, Return and Portfolio Theory. Aims. Explain the principles of portfolio diversification Demonstrate the construction of the efficient frontier Show the trade-off between risk and return Derive the Capital Market Line (CML)
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Money, Banking & FinanceLecture 3 Risk, Return and Portfolio Theory
Aims • Explain the principles of portfolio diversification • Demonstrate the construction of the efficient frontier • Show the trade-off between risk and return • Derive the Capital Market Line (CML) • Show the calculation of the optimal portfolio choice based on the mean and variance of portfolio returns.
Overview • Investors choose a set of risky assets (stocks) plus a risk-free asset. • The risk-free asset is a term deposit or government Treasury bill. • Investors can borrow or lend as much as they like at the risk-free rate of interest. • Investors like return but dislike risk (risk averse).
Preferences of Expected return and risk • We have seen how expected return is defined in Lecture 2. • The investor faces a number of stocks with different expected returns and differ from each other in terms of risk. • The expected return on the portfolio is the weighted mean return of all stocks. First moment. • Risk is measured in terms of the variance of returns or standard deviation. Second moment. • Investor preferences are in terms of the first and second moments of the distribution of returns.
E(Rp) Expected return U2 U0 σp Risk Preference Function
Return and risk • How do return and risk vary relative to each other as the investor alters the proportion of each of the assets in the portfolio? • Assume that returns, risk and the covariance are fixed and simply vary the weights in the portfolio. • Let E(R1)=8.75% and E(R2)=21.25 • Let w1=0.75 and w2=0.25 • E(Rp)=.75x8.75+.25x21.25=11.88 • σ1=10.83, σ2=19.80, ρ1,2=-.9549
Portfolio Risk • σ2p=(0.75)2x(10.83)2+(0.25)2x(19.80)2+2x(0.75)x(0.25)x(-0.95)x(10.83)x(19.80) • =13.7 • σp=√13.7=3.7 • Calculate risk and return for different weights
Locus of risk-return points Expected return (0,1) (.5,.5) (.75,.25) (1,0) Risk=standard deviation
Risk – return locus • Can see that the locus of risk and returns vary according to the proportions of the equity held in the portfolio. • The proportion (0.75,0.25) is the lowest risk point with highest return. • The other points are either higher risk and higher return or low return and high risk. • The locus of points vary with the correlation coefficient and is called the efficient frontier
Choice of weights • How does the portfolio manager choose the weights? • That will depend on preferences of the investor. • What happens if the number of assets grows to a large number. • If n is the number of assets then will need n(n-1)/2 covariances - becomes intractable • A short-cut is the Single Index Model (SIM) where each asset return is assumed to vary only with the return of the whole market (FTSE100, DJ, etc). • For ‘n’ assets the efficient frontier defines a ‘bundle’ of risky assets.
How is the efficient frontier derived? • The shape of the efficient frontier will depend on the correlation between the asset returns of the two assets. • If the correlation is ρ = +1 then the portfolio risk is the weighted average of the risk of the portfolio components. • If the correlation is ρ = -1 then the portfolio risk can be diversified away to zero • When ρ < +1 then not all the total risk of each investment is non-diversifiable. Some of it can be diversified away
Efficient frontier E(Rp) Ρ= -1 -1 < Ρ < +1 Ρ= +1 σp
Efficient Frontier E(Rp) X Y σp
Risk-free asset • Lets introduce a risk-free asset that pays a rate of interest Rf. • The rate Rfis known with certainty and has zero variance and therefore no covariance with the portfolio. • Such a rate could be a short-term government bill or commercial bank deposit.
One bundle of risky assets • Take one bundle of risky assets and allow the investor to lend or borrow at the safe rate of interest. The investor can; • Invest all his wealth in the risky bundle and undertake no lending or borrowing. • Invest less than his total wealth in the single risky bundle and the rest in the risk-free asset. • Invest more than his total wealth in the risky bundle by borrowing at the risk-free rate and hold a levered portfolio. • These choices are shown by the transformation line that relates the return on the portfolio with one risk-free asset and risk.
Linear Opportunity set • Let the risk-free rate Rf= 10% and the return on the bundle of assets RN = 22.5%. • The standard deviation of the returns on the bundle σN = 24.87%. • The weights on the risky bundle and the risk-free asset can be varied to produce a range of new portfolio returns.
Transformation line • The transformation line describes the linear risk-return relationship for any portfolio consisting of a combination of investment in one safe asset and one ‘bundle’ of risky assets. • At every point on a given transformation line the investor holds the risky assets in the same fixed proportions of the risky portfolio ωi.
Transformation line E(Rp) -0.5 borrowing + 1.5 in risky bundle 0.5 lending + 0.5 in risky bundle No lending all investment in bundle Rf All lending σp
A riskless asset and a risky portfolio • An investor faces many bundles of risky assets (eg from the London Stock Exchange). • The efficient frontier defines the boundary of efficient portfolios. • The single risky asset is replaced by a risky portfolio. • We can find a dominant portfolio with the riskless asset that will be superior to all other combinations.
Combining risk-free and risky portfolios E(Rp) C B A Rf σp
Borrowing and Lending • The investor can lend or borrow at the risk-free rate of interest rate. • The risk-free rate of interest Rf represents the rate on Treasury Bills or some other risk-free asset. • The efficiency boundary is redefined to include borrowing.
Borrowing and lending frontier C E(Rp) B Rf A σp
Combined borrowing and lending at different rates of interest • The investor can borrow at the rate of interest Rb • Lend at the rate of interest Rf • The borrowing rate is greater than the risk-free rate. Rb > Rf • Preferences determine the proportions of lending or borrowing,
Combining borrowing and lending D E(Rp) Q C B Rb P Rf A σp
Separation Principle • Investor makes 2 separate decisions • Given knowledge of expected returns, variances and covariances the investor determines the efficient frontier. The point M is located with reference to Rf. • The investor determines the combination of the risky portfolio and the safe asset (lending) or a leveraged portfolio (borrowing).
Market portfolio and risk reduction Portfolio risk Diversifiable risk Non-diversifiable risk Number of securities 20
Summary • We have examine the theory of portfolio diversification • We have seen how the efficient frontier is constructed. • We have seen that portfolio diversification reduces risk to the non-diversifiable component.