investment returns
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Investment returnsTRANSCRIPT
What are investment returns?
Investment returns measure the financial results of an investment.
Returns may be historical or prospective (anticipated).
Returns can be expressed in:
Dollar terms.
Percentage terms.
What is the return on an investment that costs $1,000 and is sold
after 1 year for $1,100?
Dollar return:
Percentage return:
$ Received - $ Invested $1,100 - $1,000 = $100.
$ Return/$ Invested $100/$1,000 = 0.10 = 10%.
What is investment risk?
Typically, investment returns are not known with certainty.
Investment risk pertains to the probability of earning a return less than that expected.
The greater the chance of a return far below the expected return, the greater the risk.
Assume the FollowingInvestment Alternatives
Economy Prob. T-Bill HT Coll USR MP
Recession 0.10 8.0% -22.0% 28.0% 10.0% -13.0%
Below avg. 0.20 8.0 -2.0 14.7 -10.0 1.0
Average 0.40 8.0 20.0 0.0 7.0 15.0
Above avg. 0.20 8.0 35.0 -10.0 45.0 29.0
Boom 0.10 8.0 50.0 -20.0 30.0 43.0
1.00
What is unique about the T-bill return?
The T-bill will return 8% regardless of the state of the economy.
Is the T-bill riskless? Explain.
Calculate the expected rate of return on each alternative.
.k = k Pi i
i=1
n
k = expected rate of return.
kHT = 0.10(-22%) + 0.20(-2%) + 0.40(20%) + 0.20(35%) + 0.10(50%) = 17.4%.
^
^
HT has the highest rate of return. Does that make it best?
k
HT 17.4%
Market 15.0
USR 13.8
T-bill 8.0
Collections 1.7
^
What is the standard deviationof returns for each alternative?
.Pk̂k
Variance
deviation Standard
n
1ii
2
i
2
T-bills = 0.0%.HT = 20.0%.
Coll = 13.4%.USR = 18.8%. M = 15.3%.
.Pk̂kn
1ii
2
i
HT:
= ((-22 - 17.4)20.10 + (-2 - 17.4)20.20 + (20 - 17.4)20.40 + (35 - 17.4)20.20 + (50 - 17.4)20.10)1/2 = 20.0%.
Expected Return versus Risk
Which alternative is best?
Expected
Security return Risk, HT 17.4% 20.0%
Market 15.0 15.3
USR 13.8 18.8
T-bills 8.0 0.0
Collections
1.7 13.4
Portfolio Risk and Return
Assume a two-stock portfolio with $50,000 in HT and $50,000 in Collections.
Calculate kp and p.^
Portfolio Return, kp
kp is a weighted average:
kp = 0.5(17.4%) + 0.5(1.7%) = 9.6%.
kp is between kHT and kColl.
^
^
^
^
^ ^
^ ^
kp = wikin
i = 1
Alternative Method
kp = (3.0%)0.10 + (6.4%)0.20 + (10.0%)0.40 + (12.5%)0.20 + (15.0%)0.10 = 9.6%.
^
Estimated Return
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Economy Prob. HT Coll. Port.
Recession 0.10 -22.0% 28.0% 3.0%
Below avg. 0.20 -2.0 14.7 6.4
Average 0.40 20.0 0.0 10.0
Above avg. 0.20 35.0 -10.0 12.5
Boom 0.10 50.0 -20.0 15.0
p = ((3.0 - 9.6)20.10 + (6.4 - 9.6)20.20 + (10.0 - 9.6)20.40 + (12.5 - 9.6)20.20 + (15.0 - 9.6)20.10)1/2 = 3.3%.
p is much lower than: either stock (20% and 13.4%). average of HT and Coll (16.7%).
The portfolio provides average return but much lower risk. The key here is negative correlation.
Risk1.Unsystematic Risk : Ex. Business Risk, Financial Risk : Managed by Diversification2.Systematic Risk : Ex. Market Risk , Interest Rate Risk , Purchasing Power Risk Measurement by Beta which is calculated by :2.1 Regression Analysis2.2 Slope of Regression Lineค่�าเบต้�า แสดงถึ งการเปลี่��ยนแปลี่งของอ�ต้ราผลี่ต้อบแทนของหลี่�กทร�พย�
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How are betas calculated?
Run a regression with returns on the stock in question plotted on the Y axis and returns on the market portfolio plotted on the X axis.
The slope of the regression line, which measures relative volatility, is defined as the stock’s beta coefficient, or b.
If b = 1.0, stock has average risk. If b > 1.0, stock is riskier than average. If b < 1.0, stock is less risky than average. Most stocks have betas in the range of 0.5 to
1.5. Can a stock have a negative beta?
How is beta interpreted?
Expected Return versus Market Risk
Which of the alternatives is best?
Expected
Security return Risk, b
HT 17.4% 1.29
Market 15.0 1.00
USR 13.8 0.68
T-bills 8.0 0.00
Collections
1.7 -0.86
Use the SML to calculate eachalternative’s required return.
The Security Market Line (SML) is part of the Capital Asset Pricing Model (CAPM).
SML: ki = kRF + (RPM)bi . Assume kRF = 8%; kM = kM = 15%. RPM = (kM - kRF) = 15% - 8% = 7%.
^
Required Rates of Return
kHT = 8.0% + (7%)(1.29)= 8.0% + 9.0% = 17.0%.
kM = 8.0% + (7%)(1.00) = 15.0%.
kUSR = 8.0% + (7%)(0.68) = 12.8%.
kT-bill = 8.0% + (7%)(0.00) = 8.0%.
kColl = 8.0% + (7%)(-0.86) = 2.0%.
Calculate beta for a portfolio with 50% HT and 50% Collections
bp = Weighted average= 0.5(bHT) + 0.5(bColl)= 0.5(1.29) + 0.5(-0.86)= 0.22.
What is the required rate of returnon the HT/Collections portfolio?
kp = Weighted average k = 0.5(17%) + 0.5(2%) = 9.5%.
Or use SML:
kp = kRF + (RPM) bp
= 8.0% + 7%(0.22) = 9.5%.