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<math> | <math> | ||
- | Minimize | + | Minimize Var(x_A R_A+x_BR_B) |
subject to x_A+x_B=1 | subject to x_A+x_B=1 | ||
</math> | </math> |
Revision as of 04:25, 3 August 2008
Portfolio theory
An investor has a certain amount of dollars to invest into two stocks (IBM and TEXACO. A portion of the available funds will be invested into IBM (denote this portion of the funds with xA and the remaining funds into TEXACO (denote it with xB) - so xA + xB = 1$. The resulting portfolio will be $x_A R_A+x_B R_B$, where $R_A$ is the monthly return of $IBM$ and $R_B$ is the monthly return of $TEXACO$. The goal here is to find the most efficient portfolios given a certain amount of risk. Using market data from January 1980 until February 2001 we compute that $E(R_A)=0.010$, $E(R_B)=0.013$, $Var(R_A)=0.0061$, $Var(R_B)=0.0046$, and $Cov(R_A,R_B)=0.00062$. \\ We first want to minimize the variance of the portfolio. This will be:
MinimizeVar(xARA + xBRB)subjecttoxA + xB = 1
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