Answer:
Borrowed amount = $5417
Explanation:
Discount note = 4%
This means that Kaylee has 100 - 4 = 96% of the borrowed amount at hand
Cash at hand = $5,200
Let the borrowed amount = X
Cash at hand = 96% of X
5200 = (96/100) * X
X = (5200 * 100)/96
X = $5417
Borrowed amount = $5417
Answer
The answer and procedures of the exercise are attached in the following archives.
Explanation
You will find the procedures, formulas or necessary explanations in the archive attached below. If you have any question ask and I will aclare your doubts kindly.
Answer:
500,000
explanation of the answers
by using the formula of simple interest
which is principal x rate x time divided by 100.
Ans=50,000,000 x 10 x 1 then ➗ by 100
which Ans=500,000
Answer:
The explanation is given as follows.
Explanation:
<u>Task 1: </u>
<u>The higher the percentage of assets a bank holds as loans, the higher the capital requirement.</u>
When the owners of the bank borrow $100 to supplement their existing reserves , both reserves and debt increase by $100 , therefore increase in debt as in any balance sheet , the total value of accounts on the left hand should be equal to the right hand , so when there is increase in reserves , there will be increase in debt.
<u>Task 2:</u>
<u>It specifies a minimum leverage ratio for all banks
</u>
leverage ratio initially = total assets / capital = 1750 / 125 = 14
leverage ratio new value = total assets / capital = 1850 / 125 = 14.8 ( the assets increase by $100 with increase in reserves)
<u>Task 3</u>
<u>Its intended goal is to protect the interests of those who hold equity in the bank.</u>
Capital requirement are there to ensure that bank have enough capital to repay the depositors and debtors and if a bank holds a higher percent of risky assets , capital requirements will be higher so that the bank remains solvent hence option a is right answer.
Answer:
PV= $1,006,512.21
Explanation:
Giving the following information:
Annual payments= $150,000
Discount rate= 8%
Number of periods= 10 years
<u>First, we need to calculate the future value using the following formula:</u>
FV= {A*[(1+i)^n-1]}/i
A= annual payment
FV= {150,000*[(1.08^10) - 1]} / 0.08
FV= $2,172,984.37
<u>Now, we can determine the present value:</u>
PV= FV/(1+i)^n
PV= 2,172,984.37/(1.08^10)
PV= $1,006,512.21
