Answer:
Your shared monthly living expenses (rent + utilities) have been $750 per month, living with three other students. One of your roommates has to suddenly move out! How much will your share of the expenses increase to, until you can find a new roommate?
if $750= 1 month
?= 12 months
then we have; $9000 per year shared by 4 friends
9000/4= $2250 per person in a year and
2250/12= $187.5 per person in a month
If someone left, then we have
$750= 1 month
?= 12 months
$9000/3= $3000 per person in a year
$3000/12= $250 per person in a month
So therefore, the share of expenses monthly increases from $187.5 to $250
Explanation:
Explanation:
I think it might be 5455$
Answer:
Demand for plastic sprinklers for year 1 Year 2 Year 3 and Year 4 is 98 (33 + 14 + 51) , 111 , 133, 136.
Explanation:
The Production line capacity requirement for the next four years will be equal to the demand for the next four years. The production line needs to meet the annual demand for the plastic sprinklers. The production line is extended and economies of scale is introduced with helps the company save additional cost of extension in the production line.
Answer:
The 1-year HPR for the second stock is <u>12.84</u>%. The stock that will provide the better annualized holding period return is <u>Stock 1</u>.
Explanation:
<u>For First stock </u>
Total dividend from first stock = Dividend per share * Number quarters = $0.32 * 2 = $0.64
HPR of first stock = (Total dividend from first stock + (Selling price after six months - Initial selling price per share)) / Initial selling price = ($0.64 + ($31.72 - $27.85)) / $27.85 = 0.1619, or 16.19%
Annualized holding period return of first stock = HPR of first stock * Number 6 months in a year = 16.19% * 2 = 32.38%
<u>For Second stock </u>
Total dividend from second stock = Dividend per share * Number quarters = $0.67 * 4 = $2.68
Since you expect to sell the stock in one year, we have:
Annualized holding period return of second stock = The 1-year HPR for the second stock = (Total dividend from second stock + (Selling price after six months - Initial selling price per share)) / Initial selling price = ($2.68+ ($36.79 - $34.98)) / $34.98 = 0.1284, or 12.84%
Since the Annualized holding period return of first stock of 32.38% is higher than the Annualized holding period return of second stock of 12.84%. the first stock will provide the better annualized holding period return.
The 1-year HPR for the second stock is <u>12.84</u>%. The stock that will provide the better annualized holding period return is <u>Stock 1</u>.
Answer
The answer and procedures of the exercise are attached in the following image.
Explanation
Please consider the data provided by the exercise. If you have any question please write me back. All the exercises are solved in a single sheet with the formulas indications.
