Answer:
C. $13,700
Explanation:
Given that;
Beginning retained earnings = $4,000
Net income during the period = $10,000
Dividends = $300
Computation of Ending balance in the retained earnings account
= Beginning retained earnings + Net income during the period - Dividends
= $4,000 + $10,000 - $300
= $13,700
Therefore, the ending balance in the retained earnings account is $13,700
No not if Donald Trump becomes president he is sending all imagrants back and he wants all white schools so
Answer:
The correct answer is the option B: someone who is in the mindset to buy.
Explanation:
To begin with, the term of <em>''in-market audiences''</em> refers to the potential consumers that a business may want to target regarding the fact that those consumers are searching and browsing about topics that are related to the business' products that are being offered at that time. Moreover, this tool helps the business to connect with those buyers who are already comparing products across the Google Display Network publisher and more. It is clearly stated that with this tool the company will find the person who has an intereset in the business' products and are in the mindset to buy.
Answer:
Project Management Office is the correct answer.
Explanation:
Project Management Office is a department that focuses on and maintains the quality and overview of project management throughout the organization.
The objective of the Project Management Office is to give a platform that supports all the project teams to achieve and improve the chances of successful outcomes.
Answer:
The money should be invested in bank = $137,639.05
Explanation:
Given annually withdrawal money (annuity ) = $12000
Number of years (n ) = 20 years
Interest rate = 6 percent.
Since a person withdraw money annually for next 20 years with 6 percent interest rate. Now we have to calculate the amount that have been invested in the account today. So below is the calculation for invested money.
![\text{Present value of annuity} = \frac{Annuity [1-(1 + r)^{-n}]}{rate} \\= \frac{12000 [1-(1 + 0.06)^{-20}]}{0.06} \\=12000 \times 11.46992122 \\=137,639.05](https://tex.z-dn.net/?f=%5Ctext%7BPresent%20value%20of%20annuity%7D%20%3D%20%5Cfrac%7BAnnuity%20%5B1-%281%20%2B%20r%29%5E%7B-n%7D%5D%7D%7Brate%7D%20%5C%5C%3D%20%5Cfrac%7B12000%20%5B1-%281%20%2B%200.06%29%5E%7B-20%7D%5D%7D%7B0.06%7D%20%5C%5C%3D12000%20%5Ctimes%2011.46992122%20%5C%5C%3D137%2C639.05)