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12 February, 21:50

The market price of a security is $50. Its expected rate of return is 14%. The risk-free rate is 6% and the market risk premium is 8.5%. What will be the market price of the security if its correlation coefficient with the market portfolio doubles (and all other variables remain unchanged) ? Assume that the stock is expected to pay a constant dividend in perpetuity

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  1. 13 February, 00:06
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    The market price of the security is $31.81

    Explanation:

    In order to calculate the market price of the security if its correlation coefficient with the market portfolio doubles we would have to calculate first the following:

    First, calculate the dividend expected after one year with the following formula:

    D=P*E (ri)

    D=$50*0.14

    D=$7

    Next, we would have to calculate the beta of the security using the CAAPM Equation:

    βi = E (ri) - rf/E (rm) - rf

    =0.14-0.06/0.085

    =0.9412

    Next, we have to calculate the new beta due to the change in the correlation coefficient with the following formula:

    β=correlation coefficient/σm*σs

    =2*0.941

    =1.882

    Next, Calculate the new expected return as follows:

    E (ri) = rf+βi (E (rm) - rf)

    =0.06 + (1.882) (0.085)

    =0.22

    Finally we calculate the new piece of the security as follows:

    P=D/E (ri)

    =$7/0.22

    =$31.81

    The market price of the security is $31.81
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