Answer:
PV=?
N=3
FV= 47,700
PMT= 17,000
I= 5%
Put values in financial calculator
Pv=$87,500
Now use this value to calculate residual value at the end of year 4
PV= 87,500
N=4
Fv=?
PMT= -17,000
I=5
$33,084= residual value in 4 years.
Explanation:
I may be wrong but I believe it was copper that’s why some america coins are still made out of it today
Answer:
Government spending would have to change by <u>$1.6 billion</u>
Explanation:
The marginal propensity to consume (MPC) refers to the proportion of an increase in aggregate income that is spent on consumption of commodities by a consumer.
Since from the question, we have:
MPC = Marginal propensity to consume = 0.75
The MPC can therefore be used to calculate the fiscal multiplier which measures the effect of government spending on real GDP as follows:
Fiscal multiplier = 1 / (1 - MPC) = 1 / (1 - 0.75) = 1 / 0.25 = 4.0
Therefore, we have:
Change in government spending = Fiscal multiplier * Amount of targeted increase real GDP = 4.0 * $400 million = $1.6 billion
Therefore, government spending would have to change by <u>$1.6 billion</u> to generate $400 million increase in real GDP.
Answer:
$50 billion.
Explanation:
Current Account represents the balance of Trade (Imports & Exports) plus net income and direct payments. Countries strive to maintain their current account surplus which is an indicator that the country is producing and exporting more than its consumption and imports. In this case, it is clearly stated that there are no other factors like income or transfers, so we just have to compare exports and imports. The formula for Current Account in this case is:
Exports - Imports
⇒ 150 - 100 = $50 billion.
Answer:
$532.24
Explanation:
Since Mr. Wise will be making monthly payments for the period of 25 years in order to accumulated the $1,000,000 at the end of 25 years, therefore, the future value of annuity shall be used to determine the monthly payments to be deposited by Mr Wise. The formula of future value of annuity is given as follows:
Future value of annuity=R[((1+i)^n-1)/i]
In the given scenario:
Future value of annuity=amount after 25 years=$1,000.000
R=monthly payments to be deposited by Mr Wise=?
i=interest rate per month=12/12=1%
n=number of payments involved=25*12=300
$1,000,000=R[((1+1%)^300-1)/1%]
R=$532.24
