contestada

The bonds in our model have a maturity close to zero; they just pay the current interest rate, i, as a flow over time. We could consider, instead, a discount bond, such as a U.S. Treasury Bill. This type of asset has no explicit interest payments (called coupons) but pays a principal of, say, $1000 at a fixed date in the future. A Bill with one- year maturity pays off one year from the issue date, and similarly for 3-month or 6-month Bills. Let PB be the price of a discount bond with one-year maturity and principal of $1000. a. Is PB greater than or less than $1000.

a. Is P^B greater than or less than $1000?
b. What is the one-year interest rate on these discount bonds?
c. If prises, what happens to the interest rate on these bonds?
d. Suppose that, instead of paying $1000 in one year, the bond pays $1000 in two years. What is the interest rate per year on this two-year discount bond?

Respuesta :

Answer:

Answer is explained in the explanation section below.

Explanation:

Part a.

[tex]P^{B}[/tex] will be less than $1000.

Reason: [tex]P^{B}[/tex] + interest = $1000, since interest >0 (Cannot be negative)

Hence,  

[tex]P^{B}[/tex] < $1000

Part b.

Assuming the amount of interest to be i, [tex]P^{B}[/tex] would be $1000 - I

Rate of interest would be:

($1000 - ($1000-i)) / ($1000 - i) = i / ($1000 - i)

Rate of interest = i / ($1000 - i)

Part c.

If [tex]P^{B}[/tex] rises, the interest rate on these bonds would come down. Going back to a. [tex]P^{B}[/tex] = $1000 - i, and if [tex]P^{B}[/tex] rises, it implies that i reduces, which means that rate of interest will be reduced.

Part d.

If $1000 is a payment two years later, it implies that i (refer to b.) is the interest for two years. Assuming annual compounding, let's calculate rate of interest as follows:

Interest for two year (i) = $1000 - [tex]P^{B}[/tex] at the rate of i per year

= [tex]P^{B}[/tex] X i / 100 + ([tex]P^{B}[/tex] X (1+i/100))X i/100

We can solve for i to get annual rate of interest.

Otras preguntas