Answer:
$12,021
Explanation:
Calculation to determine what Legion should report bond interest expense for the six months ended June 30, 2021, in the amount of:
Using this formula
Interest paid =[Bonds amount*(Priced to yield/2)]
Let plug in the formula
Interest paid = $200,356*( 12%/2)
Interest paid=$200,356*6%
Interest paid =$12,021
Therefore Legion should report bond interest expense for the six months ended June 30, 2021, in the amount of:$12,021
There is not enough information in this question to answer it. You cannot determine significance with just the alpha value. You need the actual test statistic (p-value) to determine this.
If the p-value is less than the alpha value, you reject the null hypothesis (the there is no difference).
Answer:
Psychological needs
Explanation:
From the question, we are informed about the Seamus who dropped out of school as a 16-year-old and needs to support himself, though he has few skills. He is a part-time employee at a department store earning minimum wage. Seamus wants to earn more, but hasn't been able to find a better job since he is without the right qualifications. He is having a hard time paying his rent and his mounting bills. He even started to skip breakfast to save on food costs. Seamus is having trouble meeting his Psychological needs. Psychological needs can be regarded as autonomy as well as competence and relatedness which has been regarded as one that play an important role when it comes to well-being as well as motivation and life satisfaction , even vitality of people as regards their general and daily level activities. These needs could be getting needed pleasure as well as avoiding pain.
Given that: F (Future worth) = $2,500, i (nominal interest rate)
= 0.12, compounded monthly = 12 months, years of investment = 1 year, and no.
of employees = 20. Compute using the annuity formula: A=Fi/(((1+i)^n)-1).
Calculating i = 0.12/12 = 0.01, since it is compounded monthly. Calculating n
(total number of compounding) = 1 x 12 = 12, since year of investment is equal
to 1. Substituting F=2500, i=0.01 and n=12 to the annuity formula, you will get
A=$197.12. Multiply by 20, you will get $3,942.44.
It is A. So that I know whether I have identified potential barriers
