Answer:
b. The market value will increase
Explanation:
In the case when the rate of the interest decrease so the market value of the bond would be increased. As the market value of the bond and the rate of interest has an inverse relationship between them. In the case when the rate of interest increased than the market value of the bond decreased and vice versa
Therefore option b is correct
Answer:
the budgeted direct labor cost is $441,000
Explanation:
The computation of the budgeted direct labor cost is shown below:
Budgeted direct labor cost
= Budgeted production × hours per unit × rate per hour
= 28,000 units × 1.5 × $10.50
= $441,000
Hence, the budgeted direct labor cost is $441,000
So the correct option is B.
Answer: Four times.
Explanation:
Based on the information given, the government expenditure multiplier in this case goes thus:
K = ∆Y/∆G = 1/1-MPC = 1/MPS
For the first country with a MPS of 0.05, K = 1/MPS = 1/0.05 = 20
For the first country with a MPS of 0.2, K = 1/MPS = 1/0.2 = 5
Therefore, 20/5 = 4.
Therefore, the answer is four times.
Answer:
A) NPV= - $428,888.89 B) Company would break Even if g = 5.68%
Explanation:
Hi, we have to bring to present value all the inflows and outflows of cash, this is the formula to use and the math of it.
The question says that "at what constant growth rate would the company just break even..." and well, a NPV=0 is not precisely break even, actually, it means that the company is obtaining exactly what is asking for any investment, but let´s assume that the question was, what should the growth rate be for the company to accept this project?. So we have to solve the first equation for "g", that is:
So the constant growth rate has to be at least 5.68% for the company to accept this project (NPV=0)
Best of luck
Answer:
$14,887.5
Explanation:
Carrying Value of the bond is the net of Face value and any amortised discount on the bond.
Face Value of the bond = $19,000
Issuance Value = $14,300
Discount Value = $19,000 - $14,300 = $4,700
This Discount will be amortized over the bond's life until the maturity on straight line basis.
Amortization in each period = $4,700 / (8x2) = $293.75 semiannually
Until December 31, 2017 two payment have been made and $587.5 is amortized in the two semiannual periods.
Un-amortized Discount = $4,700 - $587.5 = $4,112.5
Carrying value of the bond = Face value - Un-amortized Discount = $19,000 - $4,112.5 = $14,887.5
