Rate of Return
|
|||||
Scenario
|
Probability
|
Stocks
|
Bonds
|
||
Recession
|
.20
|
−7
|
%
|
+20
|
%
|
Normal economy
|
.60
|
+22
|
+11
|
||
Boom
|
.20
|
+33
|
+7
|
||
Consider a portfolio with weights
of .7 in stocks and .3 in bonds.
|
a.
|
What is the rate of return on the
portfolio in each scenario? (Do not round
intermediate calculations. Round your answers to 1 decimal place.)
|
Scenario
|
Rate
of Return
|
Recession
|
%
|
Normal economy
|
%
|
Boom
|
%
|
b.
|
What are the expected rate of
return and standard deviation of the portfolio? (Do
not round intermediate calculations. Round your answers to 2 decimal places.)
|
Expected rate of
return
|
%
|
Standard deviation
|
%
|
c.
|
Which investment would you prefer?
|
Portfolio
|
Explanation:
Some
values below may show as rounded for display purposes, though unrounded
numbers should be used for the actual calculations.
|
a.
Recession: (−7%
× 0.7) + (20% × 0.3) = 1.1%
|
Normal economy: (22%
× 0.7) + (11% × 0.3) = 18.7%
|
Boom:
(33%
× 0.7) + (7% × 0.3) = 25.2%
|
b.
Expected return = (0.2
× 1.1%) + (0.6 × 18.7%) + (0.2 × 25.2%) = 16.48%
|
Variance = [0.2 × (1.1 − 16.48)2]
+ [0.6 × (18.7 − 16.48)2] + [0.2 × (25.2 − 16.48)2]
= 65.47
|
Standard deviation = = 8.09%
|
c.
rstock = [0.2 × (−7%)] + (0.6 × 22%) + (0.2 × 33%) = 18.40%
|
rbonds = (0.2 × 20%) + (0.6 × 11%) + (0.2 × 7%) = 12.00%
|
Variance (stocks) = [0.2 × (−7 −
18.40)2] + [0.6 × (22 − 18.40)2] + [0.2 × (33 − 18.40)2]
= 179.44
|
Standard deviation = = 13.40%
|
Variance (bonds) = [0.2 × (20 −
12.00)2] + [0.6 × (11 − 12.00)2] + [0.2 × (7 − 12.00)2]
= 18.40
|
Standard deviation = = 4.29%
|
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