13-E1. There are two possible investments you are considering. Throughout this question we measure return on investment in units of percent per annum. Shares in Solid Pty. Ltd. have returns whose mean has been assessed as 5.5 with a standard deviation of 2.1. On the other hand, you could invest in Avago Co., whose shares enjoy an expected long-term return of 12.5 but with a larger standard deviation of 7.5. The correlation between the returns of the two investments is 0.098.
(a) positive correlation imply if there is increase in return on solid Pty. Ltd there will be increase in return in Avago Co and vice versa
(b) mean=9 and standard deviation=3.99 of the return of portfolio
let S=solid Pty Ltd , A=Avago Co. and P=portfolio
P=0.5S+0.5A
mean(P)=0,5*mean(S)+0.5*mean(A)=0.5*5.5+0.5*12.5=9
var(P)=var(0.5S+0.5A)=0.5*0.5var(S)+0.5*0.5var(A)+2*0.5*0.5*cov(S and A)=
=0.25*2.1*2.1+0.25*7.5*7.5+2*0.5*0.5*0.098*2.1*7.5=15.94
and standard deviation of P = sqrt(15.94)=3.99
(c)
P=0.95S+0.05A
mean=0.95*5.5+0.05*12.5=5.85
var(P)=var(0.95S+0.05A)=0.95*0.95var(S)+0.05*0.05var(A)+2*0.95*0.05*cov(S and A)=
=0.95*0.95*2.1*2.1+0.05*0.05*7.5*7.5+2*0.95*0.05*0.098*2.1*7.5=4,27
Standard deviation=sqrt(4,27)=2.07
there is more return as compared to 100 invest in solid Pty ltd
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