Answer:
a. The Geometric average return is 1.72%
b. The Arithmetic average return is 1.75%
c. The Dollar weighted average return is 2.61%
Explanation:
a) In order to calculate the time-weighted geometric average return we would have to calculate first the Holding period return as follows:
Holding period return = (200 - 190) / 190 = 5.263%
Hence, Geometric average return = (1 + .05263)^(1/3) - 1 = 1.72%
b) To calculate time-weighted arithmetic average return we have to make the following calculation:
Arithmetic average return = 5.263% / 3 = 1.75%
c) To calculate time-weighted arithmetic average return we would have to make the following calculation:
Dollar weighted average return=-190*3 + 200/(1+r) + 200/(1+r)^2 + 200 / (1+r)^3 = 0
= 2.61%
Answer:
D. $37.11
Explanation:
Given that
Price of grocery bag in 1970 = 8
Price index in 1970 = 38.8
Price index in 2006 = 180
Thus,
Price if grocery bag in 2006
= price in 1970 × (Price index 2006 ÷ price index 1970)
= 8 × (180 ÷ 38.8)
= 8 × 4.639
= 37.112
= $37.11
Answer: 1.54
Explanation:
Based on the information given in the question, the company’s target debt-equity ratio will be:
The total costs will be:
= $14.5 million + $775000
= $15.275 million
Since amount needed = amount raised × (1-fT)
Therefore, 15.275 × (1-f) = 14.5
15.275 - 15.275f = 14.5
f = floatation costs = 5.074%
Therefore, 5.074% × (1 + D/E) = 7.5% + (D/E) × 3.5%
Solving for debt-equity ratio, the value will be = 1.54
Answer:
The amount of manufacturing overhead that would have been applied to all jobs during the period is $1,289,340.00
Explanation:
For computing the manufacturing overhead, first, we have to compute the predetermined overhead rate which is shown below:
Predetermined overhead rate = (Total estimated manufacturing overhead) ÷ (estimated direct labor-hours)
= $684,000 ÷ 20,000 hours
= $34.20
Now the applied overhead would be equal to
= Actual direct labor-hours × predetermined overhead rate
= 37,700 hours × $34.20
= $1,289,340.00
