Answer:
a. Expected return = 4%
Standard deviation = 22%
b. 0%
Explanation:
a. As the return is equally likely, the expected return which is a weighted average will be:
= (0.5 * -18%) + ( 0.5 * 26%)
= 4%
Standard deviation = √Variance
Variance = (0.5 * (-18% - 4%)²) + (0.5 * (26% - 4%)²)
= 242 + 242
= 484%
Standard deviation = √484
= 22%
b. Treasury bills have no market risk attached and the stock has an expected return that is the same as the Treasury bill yield which means that the stock therefore has no market risk.
In order to set the selling price for the new shoe, the company would use fixed cost pricing.
<h3>What is a fixed cost?</h3>
It should be noted that the fixed cost simply mean the cost that's doesn't vary based on the production level.
In this case, in order to set the selling price for the new shoe, the company would use fixed cost pricing.
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Answer: A.) $1,095
Explanation:
Bond value = $30,000
Rate = 7%
Period = 10 years
Issue price = $29,100
Bond value × rate :
30,000 × 0.07 = $2100
Semi annually:
$2100 / 2 = $1050
(Bond value - issue price) ÷ (period × 2)
($30,000 - $29,100) / (10 × 2)
$900 ÷ 20 = $45
$1050 + $45 = $1,095
Answer:
Explanation:
First, we have to compute the accrued interest amount, then only the adjustment entry would be made.
So,
Accrued interest = (Borrowed amount) × (rate of interest) × (number of months ÷ total number of months in a year)
= $8,000 × 12% × 2 ÷ 12
= $160
The two months is calculated from May 1, 2018 to June 30, 2018
Now, we pass the adjustment entry which is shown below:
Accrued interest expenses A/C Dr
To Interest payable
(Being adjustment entry of accrued interest is recorded)
Answer:
Annual deposit= $7,904.78
Explanation:
Giving the following information:
Future Value (FV)= $497,000
Number of periods (n)= 22 years
Intesrest rate (i)= 9% compounded annually
<u>To calculate the annual deposit, we need to use the following formula:</u>
<u></u>
FV= {A*[(1+i)^n-1]}/i
A= annual deposit
Isolating A:
A= (FV*i)/{[(1+i)^n]-1}
A= (497,000*0.09) / [(1.09^22) - 1]
A= $7,904.78