Answer:
There will be $92,635.42 in the account after 15 years.
Explanation:
Missing question <em>"The interest rate is fixed at 2.05%"</em>
As the employer does a 50% match on the employee’s investment, the monthly contribution to the retirement plan will be = 2 * $220 = $ 440.
The future value (F) of an annuity is given by F = (P/r)[(1+r)n-1]
P is the periodic payment
r is the rate per period
n is the number of periods.
P = 440, r = 2.05/1200 and n = 15*12 = 180.
F = (440*1200/2.05)[ (1+2.05/1200)180 -1]
F = (528000/2.05)*0.359664042
F = 92635.4215493
F = $92635.42
Thus, there will be $92,635.42 in the account after 15 years.
A perfectly competitive market helps ensure that the products produced are the goods that consumers want demonstrates the concept of allocative efficiency.
<span>Allocative efficiency defines a state of the economy in which production represents consumer preferences and it is a characteristic of an efficient market.
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Answer: Thursday December 18
Explanation:
The ex date for regular way trades will be set at Thursday December 18. The ex date for regular way trades is typically set a day before the record date.
In this case, we are told that the corporation declares a cash dividend on Friday, December 5th, which was payable to the holders of record on Friday, December 19th.
Since the record date is the question is Friday, December 19th, then the ex date for the regular way trades will be set at Thursday December 18 which is a day before the 19th.
Answer:
The answer is B. -97.7.
Explanation:
As the question gives us the spot rate, the interest rates of two countries, We can apply the covered interest parity to calculate the 90-day forward exchange rate JPY/AUD from which 90-day forward points can be derived.
F = S x ( 1+ Rjpy) / ( 1+ Raud); in which Rjpy denoted as JPY interest rate ( 0.15% per annum) while Raud is AUD interest rate ( 4.95% per annum).
F = 82.42 x (1+ 0.15% x 90/360) / ( 1 + 4.95% x 90/360) = 81.443
=> The 90-day forward points is : 100 x ( F-S) = 100 x ( 81.443 - 82.42) = -97.7