Answer:
Explanation:
In order to calculate he present value or worth of this bond we woulñd have to make the following calculations:
Face value (FV) $ 1,000.00
Coupon rate 8.50%
Number of compounding periods per year 2
Interest per period (PMT) $ 42.50
Number of years to maturity 8
Number of compounding periods till maturity (NPER) 16
Market rate of return/Required rate of return per period (RATE) 5.00%
Therefore, Bond price= PV(RATE,NPER,PMT,FV)*-1
Bond present worth=$918.72
The present value or worth of this bond is $918.72
Convenience products like Coke are available almost everywhere in the United States. Thus, Coke uses intensive distribution, which is related to the strategy of making the product available at many different retailers.
This is a marketing strategy widely used by companies that supply non-durable consumer goods, which are those that are consumed quickly, such as food, beverages and medications.
Therefore, non-durable goods such as Coke need to be replenished quickly, justifying the company's intensive distribution strategy, which makes its products easily available to consumers, increasing its profitability and positioning.
Learn more here:
brainly.com/question/3520708
Given the following:
Sigma =
17.8
E =
44 points
Confidence interval = 99% - 2.58
Confidence interval = 95% - 1.96
In order to get the sample size,
use the formula:
For 99% confidence level
n =
[ (z value x s) / E ]2
n =
[ (2.58 x 17.8) / 44]2
n =
1. 089 or 1 (rounded up)
For 95% confidence level
n =
[ (z value x s) / E ]2
n =
[ (1.96 x 17.8) / 44]2
n =
0.628 or 1 (rounded up)
As we decrease the confidence
level, from 99% to 95%, our confidence interval gets smaller. In additional, to
be more confident that our interval actually comprises the population mean we
have to increase the size of the interval. To ease that trade off between level
of confidence and the precision of our interval is to primarily increase the
sample size.
