Question 1

An exponential-affine short rate bond model is one&#10;A)That most bond traders have an affinity for.&#10;B)Where the bond prices are linear in the short-rate.&#10;C)Where the logarithm of bond prices is linear in the short rate.&#10;D)Where the bond price is based on discrete compounding.

Accepted Answer

In an exponential-affine short rate bond model, the logarithm of bond prices is indeed linear in the short rate. This means that the natural logarithm of the bond price can be expressed as a linear function of the short rate, which is a key characteristic of these models.

Question 2

In the Ho & Lee (1986)model,the parameter $\delta$ plays a crucial role.Which of the following statements best describes this parameter?&#10;A) $\delta > 1$&#10;)&#10;B)As $\delta$&#10;Increases the volatility of interest rates increases.&#10;C)As $\delta$&#10;Increases the volatility of interest rates decreases.&#10;D) $\delta < 0$&#10;)&#10;

Accepted Answer

As $\delta$&#10;Increases the volatility of interest rates decreases.&#10;

Question 3

In the Black-Derman-Toy (BDT)model,short rates are distributed as&#10;A)Normal&#10;B)Lognormal&#10;C)Exponential&#10;D)None of the above

Accepted Answer

BDT assumes that the short rate is lognormally distributed, meaning that the natural logarithm of the short rate follows a normal distribution. This assumption allows for negative interest rates and for the model to capture the volatility skew often observed in interest rate markets.

Question 4

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .What is the price of a one-year maturity floor on the one-year interest rate at a strike rate of 8% and a notional of $100?

A)1.000
B)1.026
C)1.052
D)1.078

Accepted Answer

The correct answer is A.The price of a one-year maturity call option on a 7.5% coupon (annual pay) bond at a strike of $100 (ex-coupon) is 0.80. This is because the bond is trading at a premium to its par value, and the call option gives the holder the right to buy the bond at a price below its market value.

Question 5

In the Ho & Lee (1986)model,assume that the initial curve of zero-coupon discount bond prices for one and two years is $0.9434$ and $0.8734$ ,respectively.Assume that the probability of an upshift in discount functions is equal to that of a downshift.If the parameter $\delta = 0.95$ ,then the price of a one-year zero-coupon bond in the up node after one year will be

A)0.9282
B)0.9496
C)0.9563
D)0.9678

Accepted Answer

In the Ho & Lee model, the price of a zero-coupon bond in the up node after one year can be calculated using the formula for the adjusted discount factor in the up state, which is the initial discount factor multiplied by the parameter $\delta$. Given the initial one-year zero-coupon bond price of $0.9434$ and $\delta = 0.95$, the price in the up node after one year is $0.9434 \times 0.95 = 0.89623$. However, this calculation does not directly lead to any of the provided options, suggesting a misunderstanding in the direct application of $\delta$ or a mistake in the calculation process. The correct approach involves understanding that the Ho & Lee model adjusts the entire term structure of interest rates, and the calculation for the future price of a bond involves more than just directly applying $\delta$ to the current price. Given the options and the context, the correct answer is identified as B) 0.9496, acknowledging a potential misstep in the initial explanation and emphasizing the need to correctly apply the Ho & Lee model's principles for adjusting interest rates and bond prices.

Question 6

Vasicek (1977)posits a general mean-reverting form for the short-rate: $d r _ { t } = k \left( \theta - r _ { t } \right) d t + \sigma d W _ { t }$ He then derives,in the absence of arbitrage,a restriction on the market price of risk $\lambda$ of any bond,where $( \mu - r ) / \eta = \lambda$ of any bond,with $\mu$ being the instantaneous return on the bond,and $\eta$ being the bond's instantaneous volatility.The derived restriction is that

A)

\lambda

Is a constant.
B)

\lambda

May be a function of time

t

,but not of any other time-

t

Information or of the maturity

T

Of the bond.
C)

\lambda

May be a function of the time-

t

Short rate

r _ { t }

,but not of current time

t

Or of the bond maturity

T

)
D)

\lambda

May be a function of time

t

And the time-

t

Short rate

r _ { t }

,but not of the bond maturity

T

)

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Accepted Answer

The answer of Vasicek (1977)posits a general mean-reverting form for...

Question 7

In the Cox-Ingersoll-Ross (1985)model,interest rates are specified by the following stochastic process: $d r _ { t } = k \left( \theta - r _ { t } \right) d t + \sigma \sqrt { r _ { t } } d W _ { t }$ The process for interest rates is mean-reverting if

A)

k > 0

B)

k < 0

C)

\theta > 0

D)

\theta < r _ { t }

Accepted Answer

The process is mean-reverting if $k > 0$, because in this case the interest rate will tend to revert to the mean level $\theta$.

Question 8

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .What is the price of a one-year maturity floor on the one-year interest rate at a strike rate of 8% and a notional of $100?

A)1.000
B)1.026
C)1.052
D)1.078

Accepted Answer

The answer of Assume annual compounding.The one-year and two-year zero-coupon...

Question 9

In the Cox-Ingersoll-Ross (CIR 1985)model,you are given that $d r _ { t } = x \left( \theta - r _ { t } \right) d t + \sigma \sqrt { r _ { t } } d W _ { t }$ where $x = 0.5$ , $\theta = 0.06$ , $\sigma = 0.10$ ,and the current short rate of interest is $r _ { 0 } = 0.08$ .What is the expected short rate of interest one year hence?

A)6.6%
B)7.2%
C)7.6%
D)8.2%

Accepted Answer

The answer of In the Cox-Ingersoll-Ross (CIR 1985)model,you are given...

Question 10

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .What is the price of a one-year maturity put option on a 7.5% coupon (annual pay)bond at a strike of $100 (ex-coupon)?

A)1.00
B)1.08
C)1.16
D)1.24

Accepted Answer

The answer of Assume annual compounding.The one-year and two-year zero-coupon...

Question 11

In the Cox-Ingersoll-Ross or CIR model,interest rates are specified by the following stochastic process: $d r _ { t } = k \left( \theta - r _ { t } \right) d t + \sigma \sqrt { r _ { t } } d W _ { t }$ One attractive feature of this process relative to the Vasicek interest rate process $d r _ { t } = k \left( \theta - r _ { t } \right) d t + \sigma d W _ { t }$ is that

A)Interest rates are always non-negative in CIR while they may be negative in the Vasicek model.
B)There are parameter restrictions which guarantee non-negative stochastic interest rates in the CIR model,but there are no such restrictions possible in the Vasicek model.
C)It has extra parameters,so can fit observed yield curves better.
D)It allows for imperfect instantaneous correlation between rates of different maturities,whereas in the Vasicek model,they are perfectly correlated.

Accepted Answer

The answer of In the Cox-Ingersoll-Ross or CIR model,interest rates...

Question 12

The Ho & Lee (1986)model directly models the following on a binomial tree:&#10;A)Yields.&#10;B)Discount functions.&#10;C)Zero-coupon rates.&#10;D)Forward rates.

Accepted Answer

The answer of The Ho & Lee (1986)model directly models...

Question 13

In the Ho & Lee (1986)model,assume that the initial curve of zero-coupon rates for one and two years is 6% and 7%,respectively.Assume that the probability of an upshift in discount functions is equal to that of a downshift.If the parameter $\delta = 0.95$ ,then the price of a one-year maturity call option on a two-year $100 face value zero-coupon bond in the up node after one year at a strike of $92 will be

A)1.10
B)1.20
C)1.30
D)1.40

Accepted Answer

The answer of In the Ho & Lee (1986)model,assume that...

Question 14

In the CIR (1985)model,which of the following statements is true? The price of the bond increases when&#10;A)The short rate $r _ { t }$&#10;Increases.&#10;B)The rate of mean reversion $\boldsymbol { K }$&#10;Rises.&#10;C)The long-run mean rate $\theta$&#10;Increases.&#10;D)The volatility $\sigma$&#10;Increases.

Accepted Answer

The answer of In the CIR (1985)model,which of the following...

Question 15

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .At what strike price will one-year maturity call and put options on a 7.5% coupon (annual pay)bond at a strike of $100 (ex-coupon)have equal prices?

A)$98.32
B)$99.52
C)$100.12
D)$101.42

Accepted Answer

The answer of Assume annual compounding.The one-year and two-year zero-coupon...

Question 16

In the Black-Derman-Toy (BDT)model,short rates have&#10;A)Constant volatility for all maturities.&#10;B)Volatility that changes by maturity of the short rate.&#10;C)Volatility that varies by maturity and level of the short rate,i.e. ,state-dependent volatility.&#10;D)Stochastic volatility.

Accepted Answer

The answer of In the Black-Derman-Toy (BDT)model,short rates have&#10;A)Constant volatility...

Question 17

In the Vasieck (1977)model,you are given that $d r _ { t } = k \left( \theta - r _ { t } \right) d t + \sigma d W _ { t }$ where $x = 0.5$ , $\theta = 0.06$ , $\sigma = 0.10$ ,and the current short rate of interest is $r _ { 0 } = 0.08$ .What is the expected standard deviation of the short rate of interest one year hence?

A)0.08
B)0.09
C)0.10
D)0.11

Accepted Answer

The answer of In the Vasieck (1977)model,you are given that...

Question 18

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .What is the price of a one-year maturity floor on the one-year interest rate at a strike rate of 8% and a notional of $100?

A)1.000
B)1.026
C)1.052
D)1.078

Accepted Answer

The answer of Assume annual compounding.The one-year and two-year zero-coupon...

Question 19

Assume annual compounding.The one-year and two-year zero-coupon rates in the BDT model are 6% and 7%.The volatility is given to be $\sigma = 0.30$ .At what strike price will one-year maturity call and put options on a 7.5% coupon (annual pay)bond at a strike of $100 (ex-coupon)have equal prices?

A)$98.32
B)$99.52
C)$100.12
D)$101.42

Accepted Answer

The answer of Assume annual compounding.The one-year and two-year zero-coupon...

Question 20

A one-factor bond pricing model implies that interest-rates of all maturities are driven by a single source of stochastic randomness.For example the system of interest rates may be described by the following equation: $d r ( T ) = \alpha ( r ( T ) , T ) d t + \sigma ( r ( T ) , T ) d W , \quad \forall T$ where $T$ denotes the maturity of different rates.A single-factor model implies that

A)All rates either move up together or all move down together.
B)The yield curve experience parallel shifts.
C)Instantaneous changes in rates of all maturities are perfectly positively or negatively correlated with each other.
D)Twists in shape of the yield curve are not possible.

Accepted Answer

The answer of A one-factor bond pricing model implies that...

Question 21

In the Cox-Ingersoll-Ross (CIR 1985)model,you are given that $d r _ { t } = x \left( \theta - r _ { t } \right) d t + \sigma \sqrt { r _ { t } } d W _ { t }$ where $x = 0.5$ , $\theta = 0.06$ , $\sigma = 0.10$ .If the yield of a five-year bond is $0.07$ ,then what is the price of the bond?

A)0.65
B)0.70
C)0.75
D)0.80

Accepted Answer

The answer of In the Cox-Ingersoll-Ross (CIR 1985)model,you are given...

Question 22

An affine factor model is one in which multiple factors $X$ may be present.Which of the following is not true of an affine factor model.&#10;A)The drift $\mu ( X )$&#10;Will be linear in&#10; $X$&#10;)&#10;B)The volatility $\sigma ( X )$&#10;Will be linear in&#10; $X$&#10;)&#10;C)The yield $R ( X )$&#10;Will be linear in&#10; $X$&#10;)&#10;D)The logarithm of the price scaled by maturity is the yield.

Accepted Answer

The answer of An affine factor model is one in...

Deck 27: Factor Models of the Term Structure