Answer:
utmost good faith
Explanation:
The utmost good faith refers to the principle in which both the parties are acted honestly i.e it disclosed all the information related to the insurance and does not misguide anything to gain a benefit in term of profit
Therefore in the given case, there is a contract made between the two parties where they trust each other and hope that they treated each one in a honest manner
So this situation represent the utmost good faith
Answer: d. eliminating the discharge of anything into any water.
Explanation:
The Clean Water Act aims to clean up and restore the integrity of water sources in the United States and it hopes to do so by preventing and completely eliminating the discharge of anything into any water that could result in the water being polluted.
It is a Federal statute and is enforceable by the Environmental Protection Agency.
Answer:
a. - $3,100
b. $17,300
Explanation:
Changes in working capital = (ending balance of current assets - ending balance of current liabilities) - (beginning balance of current assets - beginning balance of current liabilities)
where,
Beginning current assets = Account receivable + inventory
= $25,200 + $12,600
= $37,800
Ending current assets = Account receivable + inventory
= $23,600 + $13,700
= $37,300
And, the current liabilities is given
= ($37,300 - $17,700) - ($37,800 - $15,100)
= $19,600 - $22,700
= - $3,100
b. The computation of the cash flow is shown below:
= Sales - costs + decrease in accounts receivable - increase in inventory + increase in accounts payable
= $36,600 - $24,600 + $1,600 - $1,100 + $2,600
= $17,300
The decrease and increase in current assets and liabilities shows a difference between the beginning and ending year amounts
Answer:
Project A is more valuable than Project B given a positive discount rate.
Explanation:
Let us assume the Discount Rate be r and cash flow for year n be CFn
Also
Let us assume initial Investment be X
So,
NPV = ΣCFn ÷ (1+r)^n
NPVA = - X + 6500 ÷ (1 + r) + 4500 ÷ (1+r)^2 + 2500 ÷ (1+r)^3
NPVB = - X + 2500 ÷ (1+r) + 4500 ÷ (1+r)^2 + 6500 ÷ (1+r)^3
NPVA - NPVB = - X + 6500 ÷ (1+r) + 4500 ÷ (1+r)^2 + 2500 ÷ (1+r)^3 - (- X + 2500 ÷ (1+r) + 4500 ÷ (1+r)^2 + 6500 ÷ (1+r)^3)
= 4000 ÷ (1+r) - 4000 ÷ (1+r)^3 = 4000(1 ÷ (1+r) - 1 ÷ (1+r)^3)
In the case when
Ir > 0, 1 ÷ (1+r) > 1 ÷ (1+r)^3
So,
NPVA - NPVB > 0 => NPVA > NPVB