Answer:
A. W = 0joule
B.W = d * w * cos (90 -ø)
Explanation:
work done is force multiplied by distance since the distance covered by the dresser is zero so automatically work done in moving the dresser is 0 (zero)
B. The component of weight of box along the inclined plane = w * cos ( 90 - ø )
Where ø is the angle of inclination to the horizontal
W = weight of body due to gravity.
Since the distance traveled by box due to gravity = d
So therefore:
W = d * w * cos (90 -ø)
W = work done
N.b
See attached sketch for comprehension
Answer:
The correct answer is $1,836,742.42.
Explanation:
According to the scenario, the given data are as follows:
EBIT = $373,000
Cost of equity = 13.2%
Tax rate = 35%
So, we can calculate the unlevered value of the firm by using following formula:
Unlevered value of the firm = EBIT × (1 - TAX RATE) ÷ COST OF EQUITY
By putting the value, we get
Unlevered value of the firm = $373,000 × ( 1 - 35%) ÷ 13.2%
= $373,000 × 0.65 ÷ 0.132
= $242,450 ÷ 0.132
= $1,836,742.42
Answer:
The equal employment opportunity commission trust me
Answer:
b. $4,908,000
Explanation:
According to the FASB GAAP, the straight line method is used in this given question which is shown below:
= (Original cost - residual value) ÷ (useful life)
= ($40,900,000 - $4,090,000) ÷ (15 years)
= ($36,810,000) ÷ (15 years)
= $2,454,000
In this method, the depreciation is same for all the remaining useful life
For two years, the accumulated depreciation would be
= Annual year depreciation × number of years
= $2,454,000 × 2 years
= $4,908,000
Answer:
$330,846
Explanation:
The computation of the the revised break even point in dollars is shown below:
= (Fixed cost ) ÷ (Profit volume ratio)
where,
Fixed cost = $163,200 + $8,840
= $
172,040
And the profit volume ratio would be
= (Contribution margin) ÷ (Sales) × 100
where Contribution margin equal to
= Selling price per unit - variable cost per unit
= $70 - $28 + $5.60
= $36.4
So, the profit volume ratio is
= ($36.40) ÷ ($70)
= 52%
So, the revised break point in dollars is
= ($172,040) ÷ (52%)
= $330,846
