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

薛真 · 2020年04月15日

问一道题:NO.PZ2020011303000225

问题如下:

Suppose that the five-, ten-, and 30-year rates are 4%, 5%, and 6% with semiannual compounding. Calculate the duration and convexity of zero-coupon bonds with five-, ten-, and 30-years to maturity. What position in five- and 30-year bonds would have a duration equal to that of the ten-year bond? Compare the convexities of (a) the positions in the ten-year bond and (b) the position in the five- and 30-year bonds? Which of these positions will give the better return if (a) rates remain the same and (b) there are parallel shifts in the term structure?

选项:

解释:

The duration and convexities calculated by making one-basis-point changes are

We can construct a bond with a duration of 9.756 by investing β in the five-year

bond and 1β in the 30-year bond where:

4.902β+29.126(1-β)=9.756

β is 0.7996, which we round to 0.8. We therefore invest 80% in the five-year bond and 20% in the 30-year bond. The ten-year bond investment (a bullet) has a convexity of 99.941 whereas the portfolio of five- and 30-year bonds (a barbell) has a convexity of about:

0.8×26.423+ 0.2×862.472 = 193.6

If rates remain the same the bullet will provide a yield of 5%, whereas the barbell will provide a weighted average yield of 0.8 × 4 + 0.2 × 6 or 4.4%. The bullet will perform better. When there are parallel shifts to the term structure, this effect is mitigated somewhat by the barbells higher convexity, which leads to an immediate improvement in the value of the barbell position. However, the bullet will perform better for some non-parallel shifts.

零息债券的久期=5,10,30,老师,求惑

1 个答案

品职答疑小助手雍 · 2020年04月16日

同学你好,一般我们说的这个零息债久期是和平均还款期(麦考林久期)一个概念的,也就是5,10,30年的零息债的久期等于5,10,30。

但是由于平均还款期描述对利率的敏感性其实不够准确,我们就加入了修正久期的概念,而修正久期等于麦考林久期除以1+y。

这题是semiannual compound的,所以修正久期就是5/(1+2%),10/(1+2.5%),30/(1+3%)。得到本题图里的久期数值。

  • 1

    回答
  • 0

    关注
  • 406

    浏览
相关问题

NO.PZ2020011303000225问题如下 Suppose ththe five-, ten-, an30-yerates are 4%, 5%, an6% with semiannucompounng. Calculate the ration anconvexity of zero-coupon bon with five-, ten-, an30-years to maturity. Whposition in five- an30-yebon woulhave a ration equto thof the ten-yebon Compare the convexities of (the positions in the ten-yebonan(the position in the five- an30-yebon? Whiof these positions will give the better return if (rates remain the same an(there are parallel shifts in the term structure? The ration anconvexities calculatemaking one-basis-point changes are We cconstrua bonwith a ration of 9.756 investing β in the five-yearbonan1−β in the 30-yebonwhere:4.902β+29.126(1-β)=9.756β is 0.7996, whiwe rounto 0.8. We therefore invest 80% in the five-yebonan20% in the 30-yebon The ten-yeboninvestment (a bullet) ha convexity of 99.941 wherethe portfolio of five- an30-yebon (a barbell) ha convexity of about:0.8×26.423+ 0.2×862.472 = 193.6If rates remain the same the bullet will provi a yielof 5%, wherethebarbell will provi a weighteaverage yielof 0.8 × 4 + 0.2 × 6 or 4.4%. The bullet will performbetter. When there are parallel shifts to the term structure, this effeis mitigateomewhthe barbell’s higher convexity, whilea to immeateimprovement in the value of the barbell position. However, the bullet willperform better for some non-parallel shifts.题目问现在有5年、10年、30年的利率分别是4%、5%、6%,半年付息一次。(1)计算5年、10年、30年期的零息债券的ration和convexity。(2)5年期的债券和30年期的债券做组合,头寸分别为多少可以等于10年期的债券?(3)比较10年期债券的convexity,和5年期与30年期债券做组合的convexity。(4)在利率不变的情况下,和利率平行移动的情况下,哪一个头寸可以获得更好的return?回答(1)求利率上升1bp和下降1bp的债券价格,然后利用以下convexity的公式即可计算出convexity。convexity=(V+ + V--2*V0)/(V0*1bp^2)(2)5年期和30年期的债券组合,设5年期占比为x,30年期的占比为(1-x)4.902*x+29.126*(1-x)=9.756x=0.85年期的占比80%,30年期的占比20%。(现金流是barbell的形式)(3)这个组合的convexity=0.8×26.423+ 0.2×862.472 = 193.6(4)10年期债券(现金流是bullet的形式)的convexity是99.941利率平行移动时,用barbell利率非平行移动时,用bullet 最后一步,汉语是不是写反了,应该是利率平行移动时用bullet,利率非平行移动时用barbell

2023-05-01 17:29 1 · 回答

NO.PZ2020011303000225 问题如下 Suppose ththe five-, ten-, an30-yerates are 4%, 5%, an6% with semiannucompounng. Calculate the ration anconvexity of zero-coupon bon with five-, ten-, an30-years to maturity. Whposition in five- an30-yebon woulhave a ration equto thof the ten-yebon Compare the convexities of (the positions in the ten-yebonan(the position in the five- an30-yebon? Whiof these positions will give the better return if (rates remain the same an(there are parallel shifts in the term structure? The ration anconvexities calculatemaking one-basis-point changes are We cconstrua bonwith a ration of 9.756 investing β in the five-yearbonan1−β in the 30-yebonwhere:4.902β+29.126(1-β)=9.756β is 0.7996, whiwe rounto 0.8. We therefore invest 80% in the five-yebonan20% in the 30-yebon The ten-yeboninvestment (a bullet) ha convexity of 99.941 wherethe portfolio of five- an30-yebon (a barbell) ha convexity of about:0.8×26.423+ 0.2×862.472 = 193.6If rates remain the same the bullet will provi a yielof 5%, wherethebarbell will provi a weighteaverage yielof 0.8 × 4 + 0.2 × 6 or 4.4%. The bullet will performbetter. When there are parallel shifts to the term structure, this effeis mitigateomewhthe barbell’s higher convexity, whilea to immeateimprovement in the value of the barbell position. However, the bullet willperform better for some non-parallel shifts. The bullet will perform better. When there are parallel shifts to the term structure, this effeis mitigatesomewhthe barbell’s higher convexity, whilea to immeate improvement in the value of the barbell position. However, the bullet will perform better for some non-parallel shifts.

2022-07-02 11:26 1 · 回答

老师这个答案算V+和V-的时候都是用了半个bps,怎么在计算Convexity的时候,\lta y^2这里用的是1bps啊,不应该是0.005^2?

2020-07-28 16:24 1 · 回答

老师您好,图表中三个债券的c是用怎样可行的方法计算出来的?谢谢

2020-03-10 21:53 3 · 回答