Answer:
7.76%
Explanation:
In this question, we use the PMT formula which is shown in the spreadsheet.
The NPER represents the time period.
Given that,
Present value = $969
Future value = $1,000
Rate of interest = 8.1%
NPER = 17 years
The formula is shown below:
= PMT(Rate;NPER;-PV;FV;type)
The present value come in negative
So, after solving this, The PMT would be $77.58
The coupon rate is shown below:
= (Coupon payment ÷ par value) × 100
= ($77.58 ÷ $1,000) × 100
= 7.76%
Answer:
1. Form 8-K : A unique or significant happening.
2. Form 10-K: Annual information required by Regulation S-X.
3. Form 8-K: Changes in control of the registrant.
4. Form 10-Q: Interim financial statements.
5. Not required: Fourth quarter income statement.
6. Form 8-K: Bankruptcy.
7. Form 10-K: Annual information required by Regulation S-K.
8. Form 10-Q: Income statement for the current quarter, year-to-date, and comparative periods in the previous year.
9. Not required: Changes in bookkeeping staff.
10. Form 8-K: Changes in the registrant's independent auditor.
Explanation:
The SEC, an acronym for Securities and Exchange Commission was created under the Securities Exchange Act of 1934. The Act empowered the SEC to require registration of securities, security exchanges, and reporting by publicly owned firms.
Some of the forms to be filled as required by the United States of America, Securities and Exchange Commission (SEC) includes;
1. Form 10-K.
2. Form 10-Q.
3. Form 8-K.
Answer:
The correct answer is C: $4300
Explanation:
Giving the following information:
They will invest an equal amount each month for 5 years.
This account will earn 6% per year(0.5% per month)and will have $300,000 at the end of the 5-year term
We need to use the following formula:
final value= {A[(1+i)^n-1]}/r
A= cuota
i= monthly interest
n= 60 months
Isolating A:
A= (FV*i)/[(1+i)^n-1]
A= (300000*0.005)/[(1.005^60)-1]
A= 1500/0.34885= 4300
Answer:
a) 60,000
Explanation:
The Current Population Survey(CPS) contacts a representative sample of 60,000 people of age 15 and above every month in order to make an inferential assumption about the US population as a whole.
I think it would be impact