Answer:
10%
Explanation:
Since the bond is selling at a discount, it means that the coupon rate is blow the market rate, so the actual rate must be higher. Since there is only one option with an interest rate above 9%, we must check to see if it works.
10% yearly interest rate = 5% semiannual interest rate
we must determine the PV of the 20 coupons paid and the face value at maturity.
to calculate the PV of the 20 coupons ($45 each) we can use an excel spreadsheet and the NPV function with a 5% discount rate: PV of the coupons = $560.80
the PV of the face value in 10 years = $1,000 / 1.05²⁰ = $376.89
the present value of the coupons and the bond at maturity = $560.80 + $376.89 = $937.69. The PV using a 5% semiannual rate is very similar to $937.75, and since the question asked us to round up to the nearest whole percent, we can assume it is correct.
Answer:
$1,600
Explanation:
Best deals incorporation has a total of 10 units in the ending merchandise inventory on December 31
The units were bought in the month of November at a price of $160 for each unit
The replacement cost of the item is $162
Inventory is always recorded when the cost is low
Therefore, the amount that is to be reported as the merchandise inventory can be calculated as follows
=10 units × $160
= $1,600
Hence the amount reported as the merchandise inventory on the balance sheet is $1,600
Answer:
The semi annual rate is 4.88%
Explanation:
semi annual rate = [((1+r)^(1/n)) -1]
= [((1+10%)^(1/2)) -1]
= 4.88%
Therefore, the semi-annual rate (i.e. periodic return per six months) do you require (i.e. need to earn such that this implies 10% earned per year when you get to compound semi-annually) is 4.88%.
Answer:
Explanation:
Step 1. Given information.
- City of 200 people
- 100 rich, 100 poor.
Step 2. Formulas needed to solve the exercise.
- P(poor) = 0.9x^2
- P(rich)= 35x-0.1x^2
Step 3. Calculation and step 4. Solution.
P(poor) = p (rich)
0.9x2 = 35x - 0.1x2
1x2 = 35x
x = 35
x is the percentage of rich above 50%, thus there are 35% rich people above 50%.
P (poor) = 1102.5
P (rich) = 1102.5
The equilibrium premium is $1,102.5
