Answer:
The solution as per the given problem is provided below throughout the explanation portion below.
Explanation:
The given values are:
Debt issued,
= 120
Pretax earnings,
= 80
Tax,
= 35%
All equity firm,
= $320
Number of common stock,
= 50
(a)
Balance sheet before the debt issue's announcement will be:
<u>Assets </u><u> 320</u>
<u>Debt </u><u> 0</u>
<u>Equity </u><u> 320</u>
then,
The total will be "320".
(b)
The per share price will be:
= 
= 
= 
or,
After tax, the net income will be:
= 
= 
= 
= 
(c)
The return on equity will be:
= 
= 
= 
or,
= 
(%)
I would say FHA, from what I know.
Answer:
The labor rate variance for the month = $1890
Explanation:
Given values:
Standard labor hour per unit = 3.3 hours
Standard labor rate = $16.15 per hour
Actual hours worked = 6,300
Actual total labor cost = $103,635
Actual output = 2,000 units
Now, we calculate the labor rate variance with the help of given information. Below is the calculation of Labor rate variance.
Labor rate variance = ( Actual labor cost) – (Standard rate × Actual hours)
= 103635 – (16.15 × 6,300)
= $1890
Answer:
The value of X that gives maximum profit is <u>15.92</u>.
Explanation:
Before answering the question, Y and Revenue (R) given in the question are first correctly restated as follows:
Cost = Y = 11 + 0.4X + 0.29X^2 .......................................... (1)
Revenue = R = 16X − 0.2X^2 .............................................. (2)
Differentiating each of equations (1) and (2) with respect to X to obtain marginal cost (MC) and marginal revenue (MR), we have:
dY/dX = MC = 0.4 + 0.58X .................................................. (4)
dR/dX = MR = 16 - 0.4X ....................................................... (5)
In production theory, profit is maximized when MR = MC. Therefore, we equate equations (4) and (5) and solve for X as follows:
0.4 + 0.58X = 16 - 0.4X
0.58X + 0.4X = 16 - 0.4
0.98X = 15.6
X = 15.6 / 0.98
X = 15.92
Therefore, the value of X that gives maximum profit is <u>15.92</u>.
Answer:
the annual growth rate between 1985 and 2005 is 1.38%
Explanation:
The computation of the annual growth rate between 1985 and 2005 is shown below:
Future value = Present value × e^(rate × time period)
$145,000 = $110,000 × e^(rate, 20)
$145,000 ÷ $110,000 = e^(rate, 20)
e^(rate, 20) = 1.318
Now take the log in both the sides
In(e^(rate, 20)) = ln(1.318)
r = ln(1.318) ÷ 20
= 1.38%
Hence, the annual growth rate between 1985 and 2005 is 1.38%
