Answer: indefinitely, the pension obligation will resemble a perpetuity. Suppose, therefore, that you are managing a pension fund with obligations to make perpetual payments of $1.4 million per year to beneficiaries. The yield to maturity on all bonds is 13.0%. a. If the duration of 5-year maturity bonds with coupon rates of 9.0% (paid annually) is 4 years and the duration of 20-year maturity bonds with coupon rates of 6% (paid annually) is 11 years, how much of each of these coupon bonds (in market value) will you want to hold to both fully fund and immunize your obligation? (Do not round intermediate calculations. Enter your answers in millions rounded to 1 decimal place. Omit the "$" sign in your response.) b. What will be the par value of your holdings in the 20-year coupon bond? (Do not round intermediate calculations. Enter your answer in millions rounded to 2 decimal places. Omit the "$" sign in your response.)
Explanation:
Answer:
$8,985.17
Explanation:
We assume that there are 365 days in a year and that 1.2% interest rate is the annual rate.
N = 15 years x 365 days/year = 5475
r = 1.2% / 365 = 0.0033%
PV = $7,500
FV = ? We have to calculate the Future value
FV = PV
FV = 7500 = $8,985.17
When managers organize divisions according to the types of customer to whom they market their products, they are focusing<span> on the product structure: market structure.
</span>The market structure is an organizational structure in which each kind of customer is served by a self-contained structure.
Answer:
Effect on income= $2,500 increase
Explanation:
Giving the following information:
Contribution margin= $44
The marketing manager believes that a $6,300 increase in the monthly advertising budget would result in a 200 unit increase in monthly sales.
To calculate the effect on income, we need to use the following formula:
Effect on income= increase in total contribution margin - increase in fixed costs
Effect on income= 200*44 - 6,300
Effect on income= $2,500 increase