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德韵90 · 2020年02月15日

问一道题:NO.PZ201812310200000101 第1小题 [ CFA II ]

* 问题详情,请 查看题干

请问在exposure折现的时候使用的都是无风险利率3% 为什么不用政府债券对应的spot rate 对应的折现因子? 政府债券的spot rate 不也是无风险的吗?

问题如下图:

选项:

A.

B.

C.

解释:

1 个答案

吴昊_品职助教 · 2020年02月16日

这道题目中有两个假设的场景。这一道题基于的是Marten Koning做出的假设。用到的是我红色框里的条件。

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NO.PZ201812310200000101 问题如下 The market priof bonis€875. The bonis: fairly value overvalue unrvalue B is correct. The following table shows ththe cret valuation austment (CVfor the bonis €36.49, the sum of the present values of expecteloss. The steps taken to complete the table are follows. Step 1: Exposure te T is 1000 (1+r) 4−T , where r is 3%. This, exposure is computescounting the favalue of the bonusing the risk-free rate anthe number of years until maturity. Step 2: Recovery = Exposure × Recovery rate Step 3: Loss given fault (LG = Exposure – Recovery Step 4: Probability of fault (PO on te 1 is 1.50%, the assumehazarrate. The probability of surviv(POS) on te 1 is 98.50%. For subsequent tes, POis calculatethe hazarrate multipliethe previous te’s POS. For example, to termine the te 2 PO(1.4775%), the hazarrate of (1.50%) is multipliethe te 1 POS (98.50%). Step 5: POS in tes 2–4 = POS in the previous ye– POD (This, POS in YeT= POS in ye[ T– 1] – POin YeT.) POS calso be terminesubtracting the hazarrate from 100% anraising it to the power of the number of years: (100% – 1.5000%)1 = 98.5000% (100% – 1.5000%)2 = 97.0225% (100% – 1.5000%)3 = 95.5672% (100% – 1.5000%)4 = 94.1337% Step 6: Expecteloss = LG× POD Step 7: scount factor () for te T is 1 (1+r) T , where r is 3%. Step 8: PV of expecteloss = Expecteloss × Value of the bonif the bonwere fault free woul1,000 × for te 4 = €888.49. Fair value of the bonconsiring CVA = €888.49 – CVA = €888.49 – €36.49 = €852.00. Because the market priof the bon(€875) is greater ththe fair value of €852, B is correct. A is incorrect because the market priof the bonffers from its fair value. C is incorrebecause although the bons value if the bonwere fault free is greater ththe market price, the bond ha risk of fault, anCVA lowers its fair value to below the market price. RT

2024-08-09 15:14 1 · 回答

NO.PZ201812310200000101 问题如下 The market priof bonis€875. The bonis: fairly value overvalue unrvalue B is correct. The following table shows ththe cret valuation austment (CVfor the bonis €36.49, the sum of the present values of expecteloss. The steps taken to complete the table are follows. Step 1: Exposure te T is 1000 (1+r) 4−T , where r is 3%. This, exposure is computescounting the favalue of the bonusing the risk-free rate anthe number of years until maturity. Step 2: Recovery = Exposure × Recovery rate Step 3: Loss given fault (LG = Exposure – Recovery Step 4: Probability of fault (PO on te 1 is 1.50%, the assumehazarrate. The probability of surviv(POS) on te 1 is 98.50%. For subsequent tes, POis calculatethe hazarrate multipliethe previous te’s POS. For example, to termine the te 2 PO(1.4775%), the hazarrate of (1.50%) is multipliethe te 1 POS (98.50%). Step 5: POS in tes 2–4 = POS in the previous ye– POD (This, POS in YeT= POS in ye[ T– 1] – POin YeT.) POS calso be terminesubtracting the hazarrate from 100% anraising it to the power of the number of years: (100% – 1.5000%)1 = 98.5000% (100% – 1.5000%)2 = 97.0225% (100% – 1.5000%)3 = 95.5672% (100% – 1.5000%)4 = 94.1337% Step 6: Expecteloss = LG× POD Step 7: scount factor () for te T is 1 (1+r) T , where r is 3%. Step 8: PV of expecteloss = Expecteloss × Value of the bonif the bonwere fault free woul1,000 × for te 4 = €888.49. Fair value of the bonconsiring CVA = €888.49 – CVA = €888.49 – €36.49 = €852.00. Because the market priof the bon(€875) is greater ththe fair value of €852, B is correct. A is incorrect because the market priof the bonffers from its fair value. C is incorrebecause although the bons value if the bonwere fault free is greater ththe market price, the bond ha risk of fault, anCVA lowers its fair value to below the market price. 如题

2024-05-16 09:58 2 · 回答

NO.PZ201812310200000101问题如下 The market priof bonis€875. The bonis: fairly value overvalue unrvalue B is correct. The following table shows ththe cret valuation austment (CVfor the bonis €36.49, the sum of the present values of expecteloss. The steps taken to complete the table are follows. Step 1: Exposure te T is 1000 (1+r) 4−T , where r is 3%. This, exposure is computescounting the favalue of the bonusing the risk-free rate anthe number of years until maturity. Step 2: Recovery = Exposure × Recovery rate Step 3: Loss given fault (LG = Exposure – Recovery Step 4: Probability of fault (PO on te 1 is 1.50%, the assumehazarrate. The probability of surviv(POS) on te 1 is 98.50%. For subsequent tes, POis calculatethe hazarrate multipliethe previous te’s POS. For example, to termine the te 2 PO(1.4775%), the hazarrate of (1.50%) is multipliethe te 1 POS (98.50%). Step 5: POS in tes 2–4 = POS in the previous ye– POD (This, POS in YeT= POS in ye[ T– 1] – POin YeT.) POS calso be terminesubtracting the hazarrate from 100% anraising it to the power of the number of years: (100% – 1.5000%)1 = 98.5000% (100% – 1.5000%)2 = 97.0225% (100% – 1.5000%)3 = 95.5672% (100% – 1.5000%)4 = 94.1337% Step 6: Expecteloss = LG× POD Step 7: scount factor () for te T is 1 (1+r) T , where r is 3%. Step 8: PV of expecteloss = Expecteloss × Value of the bonif the bonwere fault free woul1,000 × for te 4 = €888.49. Fair value of the bonconsiring CVA = €888.49 – CVA = €888.49 – €36.49 = €852.00. Because the market priof the bon(€875) is greater ththe fair value of €852, B is correct. A is incorrect because the market priof the bonffers from its fair value. C is incorrebecause although the bons value if the bonwere fault free is greater ththe market price, the bond ha risk of fault, anCVA lowers its fair value to below the market price. 为什么不用下面二叉树利率折线呢

2024-04-20 16:26 1 · 回答

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2024-04-10 11:14 2 · 回答

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2023-10-06 11:48 1 · 回答