Answer:
$1,500
Explanation:
Given the compounding formula 
And given an investment (P), made at 16% compounded annually (r), and an ending amount of $1,740 (A) at the end of the year (n = 1 year), the original amount invested (P) can be computed as follows.
= P = 1,740/1.16 = 1,500.
Therefore, the original investment was $1,500.
Answer:
Select the answer that best describes the strategies in this game.
- Both companies dominant strategy is to add the train.
Does a Nash equilibrium exist in this game?
- A Nash equilibrium exists where both companies add a train. (Since I'm not sure how your matrix is set up I do not know the specific location).
Explanation:
we can prepare a matrix to determine the best strategy:
Swiss Rails
add train do not add train
$1,500 / $2,000 /
add train $4,000 $7,500
EuroRail
do not add train $4,000 / $3,000 /
$2,000 $3,000
Swiss Rails' dominant strategy is to add the train = $1,500 + $4,000 = $5,500. The additional revenue generated by not adding = $5,000.
EuroRail's dominant strategy is to add the train = $4,000 + $7,500 = $11,500. The additional revenue generated by not adding = $5,000.
A Nash equilibrium exists because both companies' dominant strategy is to add a train.
Answer:
$69.41
Explanation:
Given that
D1 = 4.75
D2 = 5.25
D3 = 5.75
D4 = 7
g = 7% or 0.07
R = 15% or 0.15
Therefore,
D5 = D4 (1 + g)
= 7 × 1.07
= 7.49
Also,
P4 = D5/g × R
= 7.49/0.15 × 0.07
= 93,625
Thus,
P0 = 4.75/1.15 + 5.25/(1.15)^2 + 5.75/(1.15)^3 + 7/(1.15)^4 + 93.625/(1.15)^4
= $ 69.41357
Approximately
= $ 69.41
In this report, there are three variables being
mentioned. These are:
1st variable = 19 minutes
2nd variable = 7 jumps
3rd variable = 79%
In this problem, I believe what we are asked to do is to
identify the type of variable the 2nd variable is. We are given that
the 2nd variable is “7 jumps”.
This means that the 2nd variable is quantitative because it
refers to or relating to a measurement of something rather than the quality. We
also know that jumps can only take whole numbers, not decimal. Therefore it is
also discrete. Hence, the 2nd variable is:
quantitative and discrete
Answer:
Term bond $725,000
Debenture bonds $775,000
Explanation:
Calculation to determine the total amounts of term bonds and debenture bonds
TERM BONDS
6.5% unsecured convertible bonds of $225,000
Add 4.875% guaranty secured bonds of $500,000
TOTAL term bond total $725,000
($225,000+$500,00
DEBENTURE BONDS
5.375% registered bonds of $550,000
Add 6.5% convertible bonds of $225,000,
TOTAL Debenture bonds $775,000
($550,000+$225,000)
Therefore the total amounts of term bonds will be $725,000 and debenture bonds will be $775,000
