Answer: b. gives the firm a built-in market for new securities.
Explanation:
Rights offering are issued by companies when such companies wants to generate additional capital. This may be necessary when such company wants to meet its financial obligations and therefore need extra capital.
A rights offering gives the firm a built-in market for new securities as the security holder are already aware of the company and just buys additional securities.
Answer:
The marginal benefit from selling the vane without restoring it is $200.
Explanation:
Marginal benefits are the extra income a company can get from selling one additional unit of production.
Zane had already spent $250 in purchasing the vane and the restoration process.
Zane has two options:
- Sell the vane as it is for $200.
- Keep restoring the vane, spend $200 more and sell the vane for $500.
If Zane decides to sell the vane as it is, his marginal benefit will be $200. That would not be enough to cover his costs, this transaction will result in a $50 loss.
If Zane decides to continue the restoration, then his marginal costs will be $200 extra, but his marginal benefit would be $500. If he chose this option he could end up earning a $50 profit.
It is important trait to have as an entrepreneur, because you have to have different perceptive's of the type of people you are selling to. As in you just can't have one persons point of view.
The next step to undertake in the troubleshooting process is:
<h3>What is Troubleshooting?</h3>
This refers to the various ways through which a person assesses a problem and eliminates them.
In the troubleshooting process, we can see that there are various processes which includes: Information gathering, analysis, implementation, etc.
However, as the problem is caused by complex issues, it is best to document the incident so that it can be more carefully analysed.
Read more about troubleshooting here:
brainly.com/question/25953942
Answer:
5.4 years
Explanation:
Future value is the value of the calculated by compounding a specific present value using a specific discount rate
Payment = $1,500
Rate = 9.56%
Future value = $10,000
We will use the following formula to calculate the numbers of years.
Future Value = Payment x [ ( 1 + r)^n - 1 / r ]
$10,000 = $1,500 x [ ( 1 + 9.56%)^n - 1 / 9.56%
$10,000 x 9.56% / 1,500 = ( 1 + 9.56%)^n - 1
0.6373 +1 = 1.0956^n
1.6373 = 1.0956^n
Log 1.6373 = n log 1.0956
n = log 1.0956 / Log 1.6373
n = 5.4 years