Answer:
0.09 or 9%
Explanation:
This question has some irregularities. The correct question should be :
Elinore is asked to invest $4,900 in a friend's business with the promise that the friend will repay $5,390 in one year's time. Elinore finds her best alternative to this investment, with similar risk, is one that will pay her $ 5,341 in one year's time. U.S. securities of similar term offer a rate of return of 7%. What is the opportunity cost of capital in this case?
Solution
Given from the question
Investment (I) = $4,900
Return on investment (ROI) in one year = $5,341
Rate or opportunity cost of capital r is given by
ROI = I × (1 + r)
input the given data
$5,341 = $4,900 (1 + r)
$5,341 = $4,900 + $4,900r
$5,341 - $4,900 = $4,900r
r = ($5,341 - $4,900) / $4,900
r = 0.09
Or 9% in percentage
I would check all of those because they are all important. You need to stay clear by identifying the topic, to keep readers interested by finding things they enjoy, summarizing always leaves a clear thought in their heads, organizing and sequencing is important so that it’s easy to follow.
A similarity between mortgages and auto loans is that both are less risky for lenders.
Lenders are the ones who lend money to those who need it urgently, in the form of a mortgage, or perhaps an auto loan. This money is going to be repaid monthly, or in whatever way the contract stipulates. It is less risky for the lender because legally, this has to be repaid.
The debt ratio is calculated by dividing the Total Liabilities by Total Assets. We are asked to calculate the debt ratio at the end of the year, hence we need to take year-end values for Total Liabilities and Total Assets.
We are given the Total Liabilities at the beginning of the year $175,000 and there is no change in the liabilities given, hence we can say that Total liabilities at the end of the year shall remain same = $175,000
We are given Total Assets at the end of the year are $260,000
Debt ratio = Total Liabilities / Total Assets = 175000/260000 = 0.673
Hence debt ratio at the end of the current year shall be <u>0.673</u>
Answer:
60.11%
Explanation:
Weight of stock C = Value of stock C / total value of portfolio
225 x $42 / (225 x $42) + (190 x $33) = $9450 /15720 = 60.11%
