开发者:上海品职教育科技有限公司 隐私政策详情

应用版本:4.2.11(IOS)|3.2.5(安卓)APP下载

卡布达 · 2021年03月27日

这一题里面说的是2年

NO.PZ2016082406000024

问题如下:

A two-year zero-coupon bond issued by ABC Co. is currently rated A. The market expects that one year from now the probability that the rating of ABC remains at A, is downgraded to BBB, or is upgraded to AA are, respectively, 80%, 15%, and 5%. Suppose that the risk-free rate is flat at 1% and that credit spreads for AA-, A-, and BBB-rated debt are flat at 80, 150, and 280 basis points, respectively. All rates are compounded annually. What is the best approximation of the expected value of the zero-coupon bond one year from now?

选项:

A.

97.41

B.

97.37

C.

94.89

D.

92.44

解释:

ANSWER: A

After one year, the bond becomes a one-year zero-coupon bond. The respective values are, for AA, A, and BBB, PAA=1001+0.0180=98.23P_{AA}=\frac{100}{1+0.0180}=98.23, 97.56, and 96.34. Note that prices are lower for lower ratings. The expected value is given by P=πiPi=5%×98.23+80%×97.56+15%×96.34=97.41P=\sum\pi_iP_i=5\%\times98.23+80\%\times97.56+15\%\times96.34=97.41.

答案里为什么没有折2年现值呀?

1 个答案

品职答疑小助手雍 · 2021年03月27日

嗨,爱思考的PZer你好:


因为问题问的是one year from now,也就是一年以后的价值是多少,一年以后债券就剩1年到期了。

----------------------------------------------
努力的时光都是限量版,加油!

  • 1

    回答
  • 0

    关注
  • 386

    浏览
相关问题

A two-yezero-coupon bonissueACo. is currently rateThe market expects thone yefrom now the probability ththe rating of Aremains is wngrato BBor is upgrato are, respectively, 80%, 15%, an5%. Suppose ththe risk-free rate is fl1% anthcret sprea for AA-, A-, anBBB-rateare fl80, 150, an280 basis points, respectively. All rates are compounannually. Whis the best approximation of the expectevalue of the zero-coupon bonone yefrom now? 97.41 97.37 94.89 92.44 ANSWER: A After one year, the bonbecomes a one-yezero-coupon bon The respective values are, for AanBBPAA=1001+0.0180=98.23P_{AA}=\frac{100}{1+0.0180}=98.23PAA​=1+0.0180100​=98.23, 97.56, an96.34. Note thprices are lower for lower ratings. The expectevalue is given P=∑πiPi=5%×98.23+80%×97.56+15%×96.34=97.41P=\sum\pi_iP_i=5\%\times98.23+80\%\times97.56+15\%\times96.34=97.41P=∑πi​Pi​=5%×98.23+80%×97.56+15%×96.34=97.41. 还是不明白为什么这个折现率就是1% + AA到AA-的80= 1.8%了? 不是还有其他两个sprea?

2020-10-17 11:31 1 · 回答

A two-yezero-coupon bonissueACo. is currently rateThe market expects thone yefrom now the probability ththe rating of Aremains is wngrato BBor is upgrato are, respectively, 80%, 15%, an5%. Suppose ththe risk-free rate is fl1% anthcret sprea for AA-, A-, anBBB-rateare fl80, 150, an280 basis points, respectively. All rates are compounannually. Whis the best approximation of the expectevalue of the zero-coupon bonone yefrom now? 97.41 97.37 94.89 92.44 ANSWER: A After one year, the bonbecomes a one-yezero-coupon bon The respective values are, for AanBBPAA=1001+0.0180=98.23P_{AA}=\frac{100}{1+0.0180}=98.23PAA​=1+0.0180100​=98.23, 97.56, an96.34. Note thprices are lower for lower ratings. The expectevalue is given P=∑πiPi=5%×98.23+80%×97.56+15%×96.34=97.41P=\sum\pi_iP_i=5\%\times98.23+80\%\times97.56+15\%\times96.34=97.41P=∑πi​Pi​=5%×98.23+80%×97.56+15%×96.34=97.41. PAA=100/(1+0.0180) ​=98.23, 97.56, an96.34. 0.018是怎么来的啊老师请问下 还有他是A变A,AA,BBB.和这些A-。。。这些的sprea什么关系

2020-08-20 01:32 2 · 回答

A two-yezero-coupon bonissueACo. is currently rateThe market expects thone yefrom now the probability ththe rating of Aremains is wngrato BBor is upgrato are, respectively, 80%, 15%, an5%. Suppose ththe risk-free rate is fl1% anthcret sprea for AA-, A-, anBBB-rateare fl80, 150, an280 basis points, respectively. All rates are compounannually. Whis the best approximation of the expectevalue of the zero-coupon bonone yefrom now? 97.41 97.37 94.89 92.44 ANSWER: A After one year, the bonbecomes a one-yezero-coupon bon The respective values are, for AanBBPAA=1001+0.0180=98.23P_{AA}=\frac{100}{1+0.0180}=98.23PAA​=1+0.0180100​=98.23, 97.56, an96.34. Note thprices are lower for lower ratings. The expectevalue is given P=∑πiPi=5%×98.23+80%×97.56+15%×96.34=97.41P=\sum\pi_iP_i=5\%\times98.23+80\%\times97.56+15\%\times96.34=97.41P=∑πi​Pi​=5%×98.23+80%×97.56+15%×96.34=97.41. 这里面说risk free rate is fl1%,有什么意义? “is flat”这句话是什么意思。。我还以为这是inflation rate.

2020-07-26 13:18 1 · 回答

A two-yezero-coupon bonissueACo. is currently rateThe market expects thone yefrom now the probability ththe rating of Aremains is wngrato BBor is upgrato are, respectively, 80%, 15%, an5%. Suppose ththe risk-free rate is fl1% anthcret sprea for AA-, A-, anBBB-rateare fl80, 150, an280 basis points, respectively. All rates are compounannually. Whis the best approximation of the expectevalue of the zero-coupon bonone yefrom now? 97.41 97.37 94.89 92.44 ANSWER: A After one year, the bonbecomes a one-yezero-coupon bon The respective values are, for AanBBPAA=1001+0.0180=98.23P_{AA}=\frac{100}{1+0.0180}=98.23PAA​=1+0.0180100​=98.23, 97.56, an96.34. Note thprices are lower for lower ratings. The expectevalue is given P=∑πiPi=5%×98.23+80%×97.56+15%×96.34=97.41P=\sum\pi_iP_i=5\%\times98.23+80\%\times97.56+15\%\times96.34=97.41P=∑πi​Pi​=5%×98.23+80%×97.56+15%×96.34=97.41. compounannually,不是连续复利形式吗,为什么是用单利算出来的

2020-02-16 12:25 1 · 回答