Answer:
The answer is $1,042.65
Explanation:
Coupon payment being done semiannually means it is paid twice in a year
N(Number of periods) = 10 periods ( 5 years x 2)
I/Y(Yield to maturity) = 3 percent( 6 percent ÷ 2)
PV(present value or market price) = ?
PMT( coupon payment) = $35 ( [7 percent÷ 2] x $1,000)
FV( Future value or par value) = $1,000.
We are using a Financial calculator for this.
N= 10; I/Y = 3; PMT = 35; FV= $1,000; CPT PV= -1,042.65
Therefore, the market price of the bond is $1,042.65
Answer:
Option C is correct one.
expected return of 38 percent; standard deviation of 38 percent
Explanation:
Expected return of 38 % and Standard deviation of 38%. this will be optimum return and not an efficient frontier.
Answer:
hello your question is incomplete attached below is the complete question
answer : attached below
Explanation:
<u>A) develop the from-to chart based on expected weekly production </u>
Firstly we calculate the production quantity processed
i) Qab = 960 + 1200 + 720 + 2400 + 480 + 2400 + 3000 + 960 + 1200 = 13320
ii) Qbd = 2400 + 3000 + 1200 = 6600
<u>B) calculate the values to be entered in cells of table attached below (develop a block layout using SLP )</u>
Cell bc = 11400 + 6600 = 18000
Cell bd = 6600 + 3000 = 9600
Cell be = 4920 + 5400 = 10320
Cell cd = 2400 + 1200 = 3600
Cell ce = 4200 + 7800 = 12000
Cell df = 960 + 1200 = 2160
An increase in the price of coffee beans can be expected to increase the demand for pie.
So, in the market if the price of coffee beans increases, quantity demanded for coffee will decrease. As, the coffee in turn is a complement to pie the consumers using coffee will now shift themselves to pie, unless the price decreases for coffee. Thus, the demand for pie is expected to increase now.
Several events could lead to such a change, an increase in population , an increase in incomes, or an increase in the price likely to increase the quantity of coffee demanded at each price.
Hence, this represents the Law of Demand.
To learn more about the Law of Demand here:
brainly.com/question/10782448
#SPJ4