Formula for the monthly payment:
M = P * r * ( 1 + r )^n / (( 1 + r )^n + 1 )
where: P = $100,000 r = 0.12 : 12 = 0.01 n =12 * 5 = 60
M = 100,000 * 0.01 * ( 1 + 0.01 )^60 / (( 1 + 0.01 )^60 + 1 ) =
= 1,000 * ( 1.01 )^60 / (( 1.01 )^60 + 1 ) =
= 1,000 * 1.8167 / 0.8167 = 1,000 * 2.22444 =
= $2,224.44
The monthly payment is $2,224.44.
Answer:
$38, 288.718
Explanation:
The amount to be withdrawn at the end of each year, for 30 years
The amount of $500,000 represents the present value while yearly withdraws the annuities.
We use a revised formula for calculating annuities.
Applicable formula is
P = PV × r/( 1 − (1+r)−n
P = annual withdrawals
PV = $500,000
r = 6.5%
n 30
P = 500,000 x( 0.065/ ( 1- (1 + 0.065) -30)}
p = 500,000 x (0.065/ (1-1+.065)-30)
p= 500,000 x (0.065 / 1-0.1511860661)
P =500,000 x (0.065 /0.848814)
P= 500,000 x 0.076577436
Yearly withdrawals = $38, 288.718
Answer: 15.35%
Explanation:
The total nominal return over the two years if inflation is 2.4% in the first year and 4.4% in the second year will be calculated thus:
= (1+Interest rate)² -1
= (1 + 7.4%) - 1
= (1 + 0.074)² - 1
= 1.074² - 1
= 1.153476 - 1
= 0.153476
= 15.35% over the two years
Answer:
B. Expert power
Explanation:
Based on the information provided regarding this scenario it can be said that the faculty member was using Expert Power. Expert Power is defined as the use of expert knowledge in order to get a subordinate to follow an instruction or order. Which in this specific scenario, the faculty members unique knowledge and experiences regarding Costa Rica allowed the other faculty members to look to him for guidance when dealing with topics revolving around Costa Rica.
Answer:
<u>the World Bank</u>
<u>Explanation:</u>
The <u>World Bank</u> is an international financial institution that monitors the financial activities of most countries. Regional economic data collection is done by means of a World Bank initiative called the International Comparison Program.
An example of this economic data collected is the gross domestic product (GDP) of the regions.