Question: Given: E ( R 1 ) = 0.12 E ( R 2 ) = 0.16 E ( 1 ) = 0.04 E ( 2 )
Given:
| E(R1) = 0.12 | |
| E(R2) = 0.16 | |
| E(1) = 0.04 | |
| E(2) = 0.05 |
Calculate the expected returns and expected standard deviations of a two-stock portfolio having a correlation coefficient of 0.75 under the conditions given below. Do not round intermediate calculations. Round your answers to four decimal places.
- w1 = 0.10
Expected return of a two-stock portfolio:
Expected standard deviation of a two-stock portfolio:
Choose the correct riskreturn graph for weights from parts (a) through (e) when ri,j = -0.75; 0.00; 0.75.
The correct graph is -Select-graph A graph B graph C graph D
Graph A:
Graph B.
Graph C:
FE(R) F0.18 10.17 F0.16 E D -0.15 D D C C -0.14 . B 10.13 B -0.12 0.11 0.01 0.02.0.03 0.04 0.05 0.06 0.07 0.08 Standard Deviation of Return ) = 0.75 11.2=0.75 r. 1.2 "' 12 =0.00 FE(R) F0.18 10.17 F0.16 -0.15 E D D D -0.14 10.13 -0.12 B . . -0.11 . 0.01 0.02.0.03 0.04 0.05 0.06 0.07 0.08 Standard Deviation of Return ) = 0.75 11.2=0.75 r. 1.2 "' 12 =0.00 FE(R) F0.18 10.17 F0.16 E D -0.15 D D C -0.14 10.13 B BB -0.12 A -0.11 0.01 0.02.0.03 0.04 0.05 0.06 0.07 0.08 Standard Deviation of Return ) = 0.75 11.2=0.75 r. 1.2 "' 12 =0.00
Step by Step Solution
There are 3 Steps involved in it
Get step-by-step solutions from verified subject matter experts
Study Help