Answer:
Dividens paid in 2015: $85.000
Explanation:
TOTAL ASSETS 972.500
TOTAL LIABILITIES 450.000
Common Stock $ 370.000
Retained Earnings $ 152.500
TOTAL EQUITY $ 522.500
Retained Earnings Report
Opening retained earnings $ 0
Add: Net Income $ 237.500
Subtotal $ 237.500
Less: Dividens -$ 85.000
Total $ 152.500
Answer:
Option C: substitution effect will tend to reduce the demand for labor
Explanation:
Capital is simply anything man made that is used in the production of goods and service. It is that which is used by man to start any business venture or produce goods and services e.g. money(currency),machinery, buildings, stock etc. Labor is mans effort put into work.
Since capital is readily substitutable for labor and when the price of capital falls. We can say that the substitution effect will tend to reduce the demand for labor. If also capital and labor are used in rigidly fixed proportions and the price of capital falls, it can be concluded the substitution and output effects will work.
Answer:
The correct answer is c. 80%
Explanation:
How to calculate the quality of fill.
Quality of fill= (Job Performance + acceptable time frame + Engagement score)/N
Job Performance we use it en percentage , so is 80% (4.0/5.0)
Engagement score is the percentage of new hires retained after one year
Replacing,
Quality of fill= 0.8+0.7+0.9 /3= 0.8
Answer:
The present Value of my winnings = $4,578,716.35
Explanation:
An annuity is a series od annual cash outflows or inflows which payable or receivable for a certain number of periods. If the annual cash flow is expected to increase by a certain percentage yearly, it is called a growing annuity.
To work out the the present value of a growing annuity,
we the formula:
PV = A/(r-g) × (1- (1+g/1+r)^n)
I will break out the formula into two parts to make the workings very clear to follow. So applying this formula, we can work out the present value of the growing annuity (winnings) as follows.
A/(r-g)
= 460,000/(12%-3%)
= $5,111,111.11
(1- (1+g/1+r)^n
1 - (1+3%)/(1+12%)^(27)
=0.8958
PV = A/(r-g) × (1- (1+g/1+r)^n)
$5,111,111.11 × $0.8958
= $4,578,716.35
The present Value of my winnings = $4,578,716.35
