Answer:
$544.265
Explanation:
Given:
FV = $1,000
Yield to maturity = 5.2%
N = 12 years
Required:
Find the value of the zero coupon bond.
Use the formula:
PV = FV * PVIF(I/Y, N)
Thus,
PV = 1000 * PVIF(5.2%, 12)
= 1000 * 0.544265
= $544.265
The value of the zero coupon bond is $544.3
Answer:
The correct answer is B. result from the political bias toward immediate benefits and deferred costs.
Explanation:
While many people run hysterically on the streets begging politicians to act in the face of the threat of climate change, many people, young and old, may be demanding the same type of action, but to fix the unfunded passive systems.
By extending eligibility and increasing the benefits of a pay-per-use system while at the same time having fewer children to finance it, previous generations have left a fearsome financial obligation. Either taxes will increase dramatically for tomorrow's workers, lowering their standard of living, or benefits will fall for tomorrow's retirees, lowering their standard of living. A group will feel very angry.
These problems were anticipated even when politicians were raising payments, but each elected government simply kicked the can and allowed things to continue as usual.
Social security systems and pension funds are actuarially not funded systems. There is no obligation for this generation to have children at the same rate as previous generations. Therefore, when those born in the 1950s reach retirement age in the next century, their stipends will feel more like a burden due to the ranks of non-active members of society that will depend on their contributions to live.
Answer:
C
Explanation:
D / V = 1000 / 4000
Dividing 1000 by 4000 gives 0.25 = 25%
E / V = 3000 / 4000
Dividing 3000 by 4000 gives 0.75 = 75%
The right answer for the question that is being asked and shown above is that: "• set marketing objectives." The first step in the process of creating a marketing plan is to <span>set marketing objectives. The group must know the goals and objectives why they are making a business or something.</span>
