Answer: 7.12%
Explanation:
Effective Annual Interest rate is the nominal interest rate adjusted for the number of compounding periods a financial product will experience in a period of time.
To calculate the Effective Annual Rate one can use the following formula,
Effective Rate of Interest = (1+r/m)^m - 1
where r is the rate and
M is the no of compounding periods per year which in this case would be 2 because the payments are semi annual
Plugging in figures would give us,
Effective Rate of Interest = (1+0.07/2)^2 - 1
=0.0712
= 7.12%
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Answer:
$52,860
Explanation:
The computation of the ending inventory using the lower of cost or market method is shown below:
Product Cost Net realizable value Lower of cost or NRV
RSK-89013 600 × $38 = $22,800 600 × $47 = $28,800 $22,800
LKW-91247 420 × $47 = $19,740 420 × $40 = $16,800 $16,800
QEC-57429 510 × $26 = $13,260 510 × $32 = $16,320 $13,260
Carrying value of the ending inventory is $52,860
Answer:
$20,000
Explanation:
According to the given situation, the computation of stockholder equity is shown below:-
Stockholder equity = Service in cash + Sent bills
= $15,500 + $4,500
= $20,000
Therefore for computing the stockholder equity we simply applied the above formula so that the correct value could come
Hence, the stockholder equity is $20,000
Answer:
$8.078 million
Explanation:
we must use the same time periods, so instead of using an annual discount rate, we should use a quarterly rate:
effective quarterly interest = (1 + 0.16)¹/⁴ - 1 = 0.0378 = 3.78%
dividends per quarter = 0.3 million + 0.05 million = $0.35 million
terminal value of firm in quarter 4 = 0.35 / 0.0378 = $9.26 million
present value of terminal value = $9.26 / (1.0378)⁴ = $7.983 million
present value of 4 quarterly dividends = $0.3 x 3.64879 (PVIFA, 3.78%, 4 periods) = $1.095 million
NPV = -$1 + $1.095 + $7.983 = $8.078 million
Answer:
It will take 51 months.
Explanation:
As we know the constant payment of $290 monthly is the annuity payment to pay $12,000 with interest rate of 0.84% per month. The Number of Months can be calculated by following formula.
Loan amount = PV = $12,000
Rate of interest = r = 0.84 %
Monthly Payment = P = $290
PV of annuity = P x [ ( 1- ( 1+ r )^-n ) / r ]
$12,000 = $290 x [ ( 1 - ( 1 + 0.84% )^-n / 0.84% ]
$12000 x 0.84% / $290 = 1 - ( 1 + 0.84% )^-n
0.347586 = 1 - ( 1 + 0.84% )^-n
0.347586 - 1 = - ( 1 + 0.84% )^-n
-0.652414 = - ( 1 + 0.84% )^-n
1 / 0.652414 = 1.0084^n
1.532769 = 1.0084^n
Log 1.532769 = n x log 1.0084
n = Log 1.532769 / log 1.0084
n = 51
