Answer:
B; it offers an expected excess return of 1.8%
Explanation:
Here are the options :
A; it offers an expected excess return of .2%A; it offers an expected excess return of 2.2%B; it offers an expected excess return of 1.8%B; it offers an expected return of 2.4%
to determine which stock is the better buy, we have to calculate the expected return of the stocks using CAPM
According to the capital asset price model: Expected rate of return = risk free + beta x (market rate of return - risk free rate of return)
Stock A = 5% + 1.2(9% - 5%) = 9.8%
Stock B = 5% + 1.8(9% - 5%) = 12.20%
The next step is to determine the excess return
stated expected return - calculated expected return = excess return
Stock A's excess return = 10% - 9.8% - 0.2%
Stock B's excess return = 14 - 12.20 = 1.8%
Security B would be considered because it has a higher excess return
The answer base on the given scenario would be letter a,
Roger would gain benefits as he was protected from a financial loss as this
insurance covers him financially as the insurance of which premiums he has paid
and were to gain would only make him the person of having to have the benefit
as he is the one who has the insurance covered for him, which is entitled to
his name and that the benefits and offers would be his gain.
Answer:
10.16%
Explanation:
The computation of the effective return for this investment is shown below:
Let us assume that we invested an amount in Australian dollars 100
The return is 8%
After one year, the amount is 108
Now the converting amount is 110.16 (108 × 102%)
Now the effective rate for this investment is
= 110.16 - 100
= 10.16%
Answer:
$92,8571.7937
Explanation:
The computation of the amount after 40 deposits is shown below:
= (((1 + interest rate)^number of years - 1) ÷ interest rate)× principal
= (((1 + 0.06)^40-1) ÷ 0.06) × $6,000
= $92,8571.7937
We simply applied the above formula and the same is to be considered
We considered all the things given in the question