Answer:
The expected return-beta relationship is as follows:
E(rP) = 7% + 4.47βP1 + 11.86βP2
Step-by-step explanation:
Step 1:
Find the equation
The following equation applies here:
E(rP) = rf + βP1[E(r1) - rf] + βP2[E(r2) - rf]
Step 2:
Find the risk premium for these two factors:
y1 = [E(r1) - rf]
y2 = [E(r2) - rf]
Step 3:
Solve the above two equations with two unknowns to find the values:
40% = 7% + 1.8y1 + 2.1y2
10% = 7% + 2.0y1 + (-0.5)y2
By solving we get
y1 = 4.47%
y2 = 11.86%
Step 4:
Inputting in the equation:
The expected return-beta relationship is as follows:
E(rP) = 7% + 4.47βP1 + 11.86βP2