Final answer:
The expected value of the investment increases proportionally with the amount invested. However, the standard deviation, which reflects investment risk, also increases as more money is borrowed and invested.
Step-by-step explanation:
We are asked to consider the effects on the expected value and standard deviation of an investment when more money is borrowed to make a larger investment. Initially, you have the option to receive either $700 or $1,400 for every $1,000 invested with equal probability. The expected value (EV) for this investment can be calculated as follows:
EV = (0.5 x $700) + (0.5 x $1,400) = $350 + $700 = $1,050.
Now, if you borrow an additional $1,000 to invest a total of $2,000, the potential outcomes double to $1,400 and $2,800, respectively, but the EV calculation method remains the same:
EV = (0.5 x $1,400) + (0.5 x $2,800) = $700 + $1,400 = $2,100.
If $2,000 is borrowed to invest a total of $3,000, the potential outcomes triple to $2,100 and $4,200:
EV = (0.5 x $2,100) + (0.5 x $4,200) = $1,050 + $2,100 = $3,150.
As you can see, the expected value increases proportionally with the amount invested. However, the standard deviation, which is a measure of risk, would also increase, indicating greater potential variability in the investment outcomes.