The pitch....for a sales and marketing item or scam.
Answer:
$256,284
Explanation:
The computation is shown below:
First, Calculate the predetermined overhead rate per hour which equals to
= (Estimated manufacturing Overhead cost ÷ estimated machine hours)
= ($235,900 ÷ 20,800 hours)
= $11.34 per hour
So, the applied overhead or manufacturing overhead allocated equals to
= Predetermined overhead rate per hour × actual machine hours
= $11.34 per hour × 22,600 hours
= $256,284
This is often referred to as the clinical approach. The clinical approach is also known as the threshold approach to clinical decision making. This approach combines rational and quantitative information with a general approach to decision making. In this situation, say you were hiring a new employee, a person using the clinical approach would look at their resume in how they match up with numbers and on paper to the candidate their looking for but also who they are as a person in a general sense.
Answer:
(b) 1440
Explanation:
As the coupon rate of 8% is greater than the yield to maturity (YTM) of 6% annually, the bond is selling at a premium. Hence, the bond will be called at the earliest i.e. 15 years.
Coupon = Call Price * Semi-annual coupon rate = X * [0.08 / 2] = X * 0.04
Yield to call = 6% annually = 3% semi-annually
Time = 15 years * 2 = 30
We know that,
Current Price of bond = Coupon * [1 - (1 + YTC)-call date] / YTC + Call Price / (1 + YTC)call date
- 1,722.25 = [X * 0.04] * [1 - (1 + 0.03)-30] / 0.03 + [X / (1 + 0.03)30]
- 1,722.25 = [X * 0.04] * 19.60 + [X * 0.41]
- 1,722.25 = X * [(0.04 * 19.60) + 0.41]
- X = 1,722.25 / 1.194
-
X=$ 1,442.42 \approx $ 1,440
Answer:
The market price of this bond is: $1,069.8.
Explanation:
To calculate the market price of the bond, we have to use the following formula:
Bond Price= C*((1-(1+r)^-n)/r)+(F/(1+r)^n)
C= periodic coupon payments: $1,000*7%= $70
F= Face value: $1,000
r= Yield to maturity: 5.85%
n= No. of periods until maturity: 8 years
Bond Price= 70*((1-(1+0.0585)^-8)/0.0585)+(1,000/(1+0.0585)^8)
Bond Price= 70*((1-0.635)/0.0585)+(1,000/1.58)
Bond Price= 70*6.24+633
Bond Price= 436.8+633
Bond Price= 1,069.8
