Answer:
As a result of an increase in the YTM, the price of the bond will fall $4677.19 from to $4593.67
Explanation:
The bonds are valued or priced based on the present value of annuity of interest payments and the present value of the principal. Based on the YTM of 7.8% the bonds are priced at,
coupon payment = 5000 * 0.067 *1/2 = $167.5
Semiannual YTM = 7.8 *0.5 = 3.9%
Semi annual periods to maturity = 8 * 2 = 16 periods
Old Price = 167.5 * [( 1 - (1 + 0.039)^-16 + 5000 / (1+0.039)^16
Old Price = $4677.19
New semiannual YTM = 8.1% / 2 = 4.05%
New Price = 167.5 * [( 1 - (1+0.0405)^-16) / 0.0405] + 5000 / 1.0405^16
New Price = $4593.67
Answer:
"Ordering" is the correct solution.
Explanation:
- Ordering expenses are incurred in purchasing a new shipment of manufactured goods. This would include expenditures for the attempting to place of a purchase agreement, cost savings for the evaluation including its batches expected to receive, ends up costing for documentary evidence, etc.
- The cost of ordering correlated negatively with either the cost of transport. This appears to mean because the much more purchases a business location including its providers, the significantly higher the ordering costs will indeed be.
Answer:
Inventory cost will be $3
So option (b) is correct option
Explanation:
We have given that carrying and setup cost is $600
So carrying and setup cost = $600
And EOQ = 200 units
We have to find the inventory carrying cost per year
We know that inventory carrying cost is given by
inventory carrying cost 
So option (b) will be correct option
Answer:
1. None of the above
2. Using tools and equipment for safety or maybe it's exit if there's a fire of any emergency concern
3. Computer
Answer:
To calculate the Federal Unemployment Tax Act (FUTA) taxes that the employer must pay we have to multiply Aaron's salary times FUTA tax rate:
$24,900 x 0.6% = $149.40
To calculate the State Unemployment Tax Act (SUTA) taxes that the employer must pay we have to multiply Aaron's salary times SUTA tax rate:
$9,900 x 4.7% = $465.30