<span>Sale Proceeds of Mutual Funds = 100 Shares * $12.03 = $1203
Add: Dividend Earned on shares = 100 Shares * $0.75= $75
Less: Purchase cost of shares = 100 Shares * $10 = $1000
Less: Exit fees = $1203*5.5% = $66.17
Net Income from Investment = $211.83
Earning in %= $211.83 / $1000 = 21.18%</span>
<span> <span>Solution:
A = P(1+r)^n
where,
A = amount
P = principal
r = rate of interest
n = number of years
Putting values in the formula,
8850 = 2750(1+0.08)^n
8850/2750 = (1+0.08)^n
log will be used to solve "n" as it is in the exponent form, which gives,
log(8850/2750) = n log(1+0.08)
By solving, we get n = log(8850/2750) / log(1+0.08)
Using financial calculator, value comes as 15.187 rounded to 15.19.
So, he will have to wait for 15.19 years to take holidays as it will take 15.19 years to make $8850 from $2750 @ 8% annual compounding.</span> </span>
Answer: See explanation column for answer
Explanation:
Caroline
left Right
Anthonio left 6,6 6,3
Right 4,3 5,5
The first digits in both left and right is Anthonio's best response payoff given what Caroline chooses. Also, the second digit on both left and right is Caroline's best response payoff based on what Anthonio chooses.
When Antonio chooses left, Caroline should choose left so as to get a payoff of 6, also when Antonio chooses right, Caroline chooses right to get a payoff of 5. therefore, there is no dominant strategy for Caroline.
The dominant strategy for Antonio occurs
When Caroline chooses left, Antonio will have to choose left to get a payoff of 6, also when Caroline chooses right, Antonio should choose left to get a payoff of 6. So, the dominant strategy for Antonio is to choose left.
The only dominant strategy in this game is for Antonio, to choose left.
b). For Nash Equilibrum, Antonio will have to choose his dominant strategy, that is to choose left, which will make Caroline is to choose left so as to get a payoff of 6. So, the Nash equilibrium is for Antonio to choose <u>left </u>and caroline chooses<u> left</u> too
Answer:
The expected return and beta on the portfolio be after the purchase of the Alpha stock will be 11.20%; 1.23
Explanation:
Provided data;
90000 value portfolio with expected returns of 11% and beta of 1.20
($10 × 1000) = 10000 value Alpha Corp added with expected returns of 13% and beta of 1.50.
The new expected portfolio return =
rp = 0.1 × 13% + 0.9 × 11%
rp = 0.1 × 0.13 + 0.9 × 0.11
= 11.20%
The new expected portfolio beta =
bp = 0.1 × 1.50 + 0.9 × 1.20
bp = 1.23
