Answer:
$637,000
Explanation:
The computation of the total investment securities reported is shown below:
= ABC Co. bonds amortization cost for year 2015 + DEF Co fair value for year 2015 + GEH Inc fair value for the year 2015 + IJK Inc fair value for the year 2015 + LMN co stock fair value for the year 2015
= $367,500 + $48,000 + $47,000 + $44,000 + $130,500
= $637,000
We simply applied the above formula
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
Management is of three levels. managerial, middle and top level management.
Explanation:
levels of management can be defined as a part of an organization that maintains responsibility for the overall productivity and the work performance of employees.
Managerial or top level management consists of board of directors. It also consists of the board of directors. Executive or middle level management consist of line or department managers and in this level mostly the managers report top the top level management. next lowest level is the operative or supervisory level management.
Thus mostly consists of supervisors, first line managers. It comes under the organisational hierarchy of a company. top management is responsible and controls the entire organisation.
Answer:
D) Situational Stress
Explanation:
It is a short term for of stress that occurs in temporary situations. It is a short term stress when the problem/concern has a solution and then the stress goes away
Answer:
A. 0.3204 B. $14.669
Explanation:
Mean = 8.9 SD = 4.5
Required probability = P (X >/= 550/50)
P(X>/=11) = 1 - P[(X - mean/SD) < (11 - mean)/SD]
= 1 - P(Z < (11-8.9)/4.5)
P(X>/=11) = 1 - P(Z < 0.4666667)
Using Excel NORMDIST(0.4666667,0,1,1)
P(X>/=11) = 1 - 0.6796 = 0.3204
The probability that she will earn at least $550 = 0.3204
b. P
(
X > x
) = 0.10
1 − P
(
X − mean)/SD ≤ (x − mean)
/SD = 0.10
P
(
Z ≤ z
) = 0.90
Where,
z = (x − mean
)/SD
Excel function for the value of z:
=NORMSINV(0.9)
=1.282
Hence (x - mean)/SD = 1.282
= (x - 8.9)/4.5 = 1.282
x = (1.282*4.5) + 8.9
x = 14.669
He earns $14.669 on the best 10% of such weekends.
