Credit, capacity, collateral, and capital
Answer:
Credit life Insurance
Explanation:
The scenario describes Credit life insurance
This is a form of insurance policy that that is designed to pay off the balance on a policy holder's outstanding loan in case of death. It is designed for the protection of lender and heirs who are co signers from loss in case of the death of the borrower.
The insurance is liable to the balance on the loan as at the time of the death of the borrower.
Answer:
A. $1,517,648 thousand
Explanation:
The computation of the cost of goods sold using the FIFO method is shown below:
= Cost of goods sold under LIFO - (Ending LIFO reserves - Beginning LIFO reserves)
= $1,517,397 - ($4,345 - $4,094)
= $1,517,648
We simply applied the above formula so that the cost of goods sold using the FIFO method could come
All other information i.e given is not relevant. Hence, ignored it
Answer:
19.50%
Explanation:
In this question, we apply the Capital Asset Pricing Model (CAPM) formula which is shown below
Expected rate of return = Risk-free rate of return + Beta × (Market rate of return - Risk-free rate of return)
For Stock R
= 3% + 2.5 × (13% - 3%)
= 3% + 2.5 × 10%
= 3% + 25%
= 28.00%
For Stock S
= 3% + 0.55 × (13% - 3%)
= 3% + 0.55 × 10%
= 3% + 5.5%
= 8.50%
The difference would be
= 28% - 8.5%
= 19.50%
Answer:
a) attached below.
b) for $x < $5000 will cause taking the drug to be part of the Nash equilibrium
c) will make the athletes feel better because the value their payoff will increase
Explanation:
<u>a) 2 * 2 payoff matrix describing the decision faced by the athletes </u>
attached below
when both players take the drug the payoff for each player = $5000 - x
when neither player takes the drug the payoff for each player = $5000
When only one player takes the drug his payoff = $10000 - x
<u>b) If we consider the value of $x to be involved in the Nash equilibrium then </u>
; $5000 - $x > 0 becomes the best response
hence for $x < $5000 will cause taking the drug to be part of the Nash equilibrium
c) Lowering the negative effect of the drug ( i.e. when the value of x is reduced )
will make the athletes feel better because the value their payoff will increase
