Ending capital for the month = The month's beginning capital + Additional capital inflow for the month - additional capital outflow for the month
For example: if had $500 at the beginning of a month, you got a dividend of $100 during the month and also spend $50 on entertainment during the month, the ending capital would be 500 + 100 -50 = $550
Answer:
$2,100
Explanation:
Particulars Fair market value Basis Differences
Inventory $60,000 $30,000 $30,000
Account receivables $40,000 $40,000 $0
Equipment $60,000 $80,000 <u> ($20,000)</u>
Taxable gain $10,000
Tax rate <u> 21% </u>
Built in gains tax <u>$2,100 </u>
So therefore, the built-in-gains tax that Clampett (Incorporated) will pay in 2021 is $2,100.
An issue disturbing the continuation of an activity
Answer:
The correct answer is B.
Explanation:
Giving the following information:
The current price of a market basket of goods is $2,500 and the base year price of the same market basket is $2,000.
To calculate the price index we need to make a simple division:
Price index= P1/P0
PI= 2,500/2,000= 1.25*100= 125%
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.
