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执瑞 Zhirui · 2024年07月27日

为什么按计算器计算YTM是7.99%

NO.PZ2018123101000109

问题如下:

Lebedeva asks Kowalski to analyze a three-year bond, issued by VraiRive S.A., using an arbitrage-free framework. The bond’s coupon rate is 5%, with interest paid annually and a par value of 100. In her analysis, she makes the following three assumptions:
■ The annual interest rate volatility is 10%.
■ The recovery rate is one-third of the exposure each period.
■ The hazard rate, or conditional probability of default each year, is 2.00%.

Selected information on benchmark government bonds for the VraiRive bond is presented in Exhibit 2, and the relevant binomial interest rate tree is presented in Exhibit 3.

Based on Kowalski’s assumptions and Exhibits 2 and 3, the credit spread on the VraiRive bond is closest to:

选项:

A.

0.6949%.

B.

0.9388%.

C.

1.4082%.

解释:

C is correct. The credit spread can be calculated in three steps:
Step 1 Estimate the value of the three-year VraiRive bond assuming no default. Based on Kowalski’s assumptions and Exhibits 2 and 3, the value of the three-year VraiRive bond assuming no default is 100.0000.

Supporting calculations:
The bond value in each node is the value of next period’s cash flows discounted by the forward rate. For the three nodes on Date 2, the bond values are as follows:
105/1.081823 = 97.0584.
105/1.066991 = 98.4076.
105/1.054848 = 99.5404.
For the two nodes on Date 1, the two bond values are as follows:
[0.5 × (97.0584) + 0.5 × (98.4076) + 5.00]/1.060139 = 96.9052.
[0.5 × (98.4076) + 0.5 × (99.5404) + 5.00]/1.049238 = 99.0948.
Finally, for the node on Date 0, the bond value is
[0.5 × (96.9052) + 0.5 × (99.0948) + 5.00]/1.030000 = 100.0000.
Therefore, the VND for the VraiRive bond is 100.0000.
Step 2 Calculate the credit valuation adjustment (CVA), and then subtract the CVA from the VND from Step 1 to establish the fair value of the bond. The CVA equals the sum of the present values of each year’s expected loss and is calculated as follows:

Supporting calculations:
The expected exposures at each date are the bond values at each node, weighted by their risk-neutral probabilities, plus the coupon payment:
Date 1: 0.5 × (96.9052) + 0.5 × (99.0948) + 5.00 = 103.0000.
Date 2: 0.25 × (97.0584) + 0.5 × (98.4076) + 0.25 × (99.5404) + 5.00 = 103.3535.

Date 3: 105.0000
The loss given default (LGD) on each date is 2/3 of the expected exposure.
The probability of default (POD) on each date is as follows:
Date 1: 2%
Date 2: 2% × (100% – 2%) = 1.96%.
Date 3: 2% × (100% – 2%)2 = 1.9208%.
The discount factor on each date is 1/(1 + spot rate for the date) raised to the correct power.
Finally, the credit valuation adjustment each year is the product of the LGD times the POD times the discount factor, as shown in the last column of the table. The sum of the three annual CVAs is 3.7360.
So, the fair value of the VraiRive bond is the VND less the CVA, or VND – CVA = 100 – 3.7360 = 96.2640.
Step 3 Based on the fair value from Step 2, calculate the yield to maturity of the bond, and solve for the credit spread by subtracting the yield to maturity on the benchmark bond from the yield to maturity on the VraiRive bond. The credit spread is equal to the yield to maturity on the VraiRive bond minus the yield to maturity on the three-year benchmark bond (which is 5.0000%). Based on its fair value of 96.2640, the VraiRive bond’s yield to maturity (YTM) is
96.2640=5/(1+YTM)+5/(1+YTM)2+105/(1+YTM)3
Solving for YTM, the yield to maturity is 6.4082%. Therefore, the credit spread on the VraiRive bond is 6.4082% – 5.0000% = 1.4082%.

PV=-96.26

PMT=5

FV=105

N=3

求I/Y


哪里错了?

2 个答案
已采纳答案

品职答疑小助手雍 · 2024年07月28日

同学你好,FV应该是100,最后那个5在PMT里已经算过了。

品职答疑小助手雍 · 2024年07月29日

是的

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NO.PZ2018123101000109问题如下 Lebeva asks Kowalski to analyze a three-yebon issueVraiRive S.A., using arbitrage-free framework. The bons coupon rate is 5%, with interest paiannually ana pvalue of 100. In her analysis, she makes the following three assumptions:■ The annuinterest rate volatility is 10%.■ The recovery rate is one-thirof the exposure eaperio■ The hazarrate, or contionprobability of fault eayear, is 2.00%.Selecteinformation on benchmark government bon for the VraiRive bonis presentein Exhibit 2, anthe relevant binomiinterest rate tree is presentein Exhibit 3.Baseon Kowalski’s assumptions anExhibits 2 an3, the cret spreon the VraiRive bonis closest to:A.0.6949%. B.0.9388%. C.1.4082%. C is correct. The cret spreccalculatein three steps:Step 1 Estimate the value of the three-yeVraiRive bonassuming no fault. Baseon Kowalski’s assumptions anExhibits 2 an3, the value of the three-yeVraiRive bonassuming no fault is 100.0000.Supporting calculations:The bonvalue in eano is the value of next perios cash flows scountethe forwarrate. For the three nos on te 2, the bonvalues are follows:105/1.081823 = 97.0584.105/1.066991 = 98.4076.105/1.054848 = 99.5404.For the two nos on te 1, the two bonvalues are follows:[0.5 × (97.0584) + 0.5 × (98.4076) + 5.00]/1.060139 = 96.9052.[0.5 × (98.4076) + 0.5 × (99.5404) + 5.00]/1.049238 = 99.0948.Finally, for the no on te 0, the bonvalue is[0.5 × (96.9052) + 0.5 × (99.0948) + 5.00]/1.030000 = 100.0000.Therefore, the VNfor the VraiRive bonis 100.0000.Step 2 Calculate the cret valuation austment (CVA), anthen subtrathe CVA from the VNfrom Step 1 to establish the fair value of the bon The CVA equals the sum of the present values of eayear’s expecteloss anis calculatefollows:Supporting calculations:The expecteexposures eate are the bonvalues eano, weightetheir risk-neutrprobabilities, plus the coupon payment:te 1: 0.5 × (96.9052) + 0.5 × (99.0948) + 5.00 = 103.0000.te 2: 0.25 × (97.0584) + 0.5 × (98.4076) + 0.25 × (99.5404) + 5.00 = 103.3535.te 3: 105.0000The loss given fault (LG on eate is 2/3 of the expecteexposure.The probability of fault (PO on eate is follows:te 1: 2%te 2: 2% × (100% – 2%) = 1.96%.te 3: 2% × (100% – 2%)2 = 1.9208%.The scount factor on eate is 1/(1 + spot rate for the te) raiseto the correpower.Finally, the cret valuation austment eayeis the proof the LGtimes the POtimes the scount factor, shown in the last column of the table. The sum of the three annuCVis 3.7360.So, the fair value of the VraiRive bonis the VNless the CVor VN– CVA = 100 – 3.7360 = 96.2640.Step 3 Baseon the fair value from Step 2, calculate the yielto maturity of the bon ansolve for the cret spresubtracting the yielto maturity on the benchmark bonfrom the yielto maturity on the VraiRive bon The cret spreis equto the yielto maturity on the VraiRive bonminus the yielto maturity on the three-yebenchmark bon(whiis 5.0000%). Baseon its fair value of 96.2640, the VraiRive bons yielto maturity (YTM) is96.2640=5/(1+YTM)+5/(1+YTM)2+105/(1+YTM)3Solving for YTM, the yielto maturity is 6.4082%. Therefore, the cret spreon the VraiRive bonis 6.4082% – 5.0000% = 1.4082%.想问下求解spreaberate 用的是同期限的prate吗,为什么不用spot rate

2024-05-19 17:20 1 · 回答

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2024-05-10 17:57 1 · 回答

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2024-04-29 17:19 1 · 回答

NO.PZ2018123101000109 问题如下 Lebeva asks Kowalski to analyze a three-yebon issueVraiRive S.A., using arbitrage-free framework. The bons coupon rate is 5%, with interest paiannually ana pvalue of 100. In her analysis, she makes the following three assumptions:■ The annuinterest rate volatility is 10%.■ The recovery rate is one-thirof the exposure eaperio■ The hazarrate, or contionprobability of fault eayear, is 2.00%.Selecteinformation on benchmark government bon for the VraiRive bonis presentein Exhibit 2, anthe relevant binomiinterest rate tree is presentein Exhibit 3.Baseon Kowalski’s assumptions anExhibits 2 an3, the cret spreon the VraiRive bonis closest to: A.0.6949%. B.0.9388%. C.1.4082%. C is correct. The cret spreccalculatein three steps:Step 1 Estimate the value of the three-yeVraiRive bonassuming no fault. Baseon Kowalski’s assumptions anExhibits 2 an3, the value of the three-yeVraiRive bonassuming no fault is 100.0000.Supporting calculations:The bonvalue in eano is the value of next perios cash flows scountethe forwarrate. For the three nos on te 2, the bonvalues are follows:105/1.081823 = 97.0584.105/1.066991 = 98.4076.105/1.054848 = 99.5404.For the two nos on te 1, the two bonvalues are follows:[0.5 × (97.0584) + 0.5 × (98.4076) + 5.00]/1.060139 = 96.9052.[0.5 × (98.4076) + 0.5 × (99.5404) + 5.00]/1.049238 = 99.0948.Finally, for the no on te 0, the bonvalue is[0.5 × (96.9052) + 0.5 × (99.0948) + 5.00]/1.030000 = 100.0000.Therefore, the VNfor the VraiRive bonis 100.0000.Step 2 Calculate the cret valuation austment (CVA), anthen subtrathe CVA from the VNfrom Step 1 to establish the fair value of the bon The CVA equals the sum of the present values of eayear’s expecteloss anis calculatefollows:Supporting calculations:The expecteexposures eate are the bonvalues eano, weightetheir risk-neutrprobabilities, plus the coupon payment:te 1: 0.5 × (96.9052) + 0.5 × (99.0948) + 5.00 = 103.0000.te 2: 0.25 × (97.0584) + 0.5 × (98.4076) + 0.25 × (99.5404) + 5.00 = 103.3535.te 3: 105.0000The loss given fault (LG on eate is 2/3 of the expecteexposure.The probability of fault (PO on eate is follows:te 1: 2%te 2: 2% × (100% – 2%) = 1.96%.te 3: 2% × (100% – 2%)2 = 1.9208%.The scount factor on eate is 1/(1 + spot rate for the te) raiseto the correpower.Finally, the cret valuation austment eayeis the proof the LGtimes the POtimes the scount factor, shown in the last column of the table. The sum of the three annuCVis 3.7360.So, the fair value of the VraiRive bonis the VNless the CVor VN– CVA = 100 – 3.7360 = 96.2640.Step 3 Baseon the fair value from Step 2, calculate the yielto maturity of the bon ansolve for the cret spresubtracting the yielto maturity on the benchmark bonfrom the yielto maturity on the VraiRive bon The cret spreis equto the yielto maturity on the VraiRive bonminus the yielto maturity on the three-yebenchmark bon(whiis 5.0000%). Baseon its fair value of 96.2640, the VraiRive bons yielto maturity (YTM) is96.2640=5/(1+YTM)+5/(1+YTM)2+105/(1+YTM)3Solving for YTM, the yielto maturity is 6.4082%. Therefore, the cret spreon the VraiRive bonis 6.4082% – 5.0000% = 1.4082%. 我这边exposure和答案算的一样,LGRR都是对的,但我算的CVA是4.068呀,不知道啥原因

2024-04-08 16:50 1 · 回答