Answer:
structurally unemployed.
Explanation:
Unemployment rate refers to the percentage of the total labor force in an economy, who are unemployed but seeking to be gainfully employed. The unemployment rate is divided into various types, these include;
1. Cyclical unemployment rate (CU).
2. Frictional unemployment rate (FU).
3. Structural unemployment rate (SU).
Structural unemployment can be defined as an involuntary unemployment that arises as a result of the incompatibility between a worker's skills set and requisite skills an employer seeks from the workers or due to technological changes.
This ultimately implies that, it describes a situation where an individual isn't able to secure a job as a result of insufficient number of jobs matching their qualifications, thus limiting their opportunities.
In this scenario, Monica Smith was unemployed because the steel company, where she worked, closed and moved overseas to a foreign country. Other steel companies have also closed. Her skills are not transferable to another industry and she is unable to get a job.
Hence, she would be classified as structurally unemployed.
A $66.50
First take the money she already has from the total.
156-23=133
Then divide this by two. She only needs to save half of this as her parents will match the half she saves.
133÷2=66.5
$66.50
Answer:
$118,860
Explanation:
Gross Margin:
= Revenue - Cost of Goods Sold
= $290,000 - $100,000
= $190,000
Profit before tax:
= Gross Margin - Salaries - Insurance payment - Interest
= $190,000 - $12,000 - $3,600 - $4,600
= $169,800
Insurance payment: Only half of 2-year payment of 7,200 is relevant for this year.
Net Income:
= Profit before tax - Tax at 30%
= $169,800 - (30% × $169,800)
= $169,800 - $50,940
= $118,860
<span>The project manager's role in a nutshell, is the overall responsibility for the successful planning, execution, monitoring, control and closure of a project.</span>
Answer:
Results are below.
Explanation:
<u>To calculate the price of each bond, we need to use the following formula:</u>
Bond Price= cupon*{[1 - (1+i)^-n] / i} + [face value/(1+i)^n]
<u>Bond X:</u>
Coupon= (0.11/2)*1,000= $55
YTM= 0.09/2= 0.045
Years to maturiy= 11 years
Bond Price= 55*{[1 - (1.045^-11)] / 0.045} + [1,000/(1.045^11)]
Bond Price= 469.1 + 616.2
Bond Price= $1,085.3
<u>Bond Y:</u>
Coupon= (0.09/2)*1,000= $45
YTM= 0.11/2= 0.055
Years to maturiy= 11 years
Bond Price= 45*{[1 - (1.055^-11)] / 0.055} + [1,000/(1.045^11)]5
Bond Price= 364.16 + 554.91
Bond price= $919.07
