Question: Let the random variable X denote the annual return from investing in Xerox Corporation and let the random variable Y denote the annual return from

Let the random variable X denote the annual return from investing in Xerox Corporation and let the random variable Y denote the annual return from investing in Yelp Corporation.From historical data you can calculate that:

Means: mean_X = 1.10 and mean_Y = 1.10

Standard Deviations: sigma_X = 0.08 and sigma_Y = 0.04

The correlation between X and Y is r=-0.75

Suppose that we invest a fraction "alpha" of our money in Xerox Corporation and the remaining fraction (1 - alpha) in Yelp Corporation. Let Z denote the annual return of this portfolio: Z = alpha X + (1 - alpha)Y.

Which of the following value of "alpha"achieves the minimum variance for the portfolio.

A. alpha = 0.3

B. alpha = 0.6

C. alpha = 0

D. alpha = 1

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