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潘吖吖 · 2022年03月04日

Expected return为什么要去调整YTM?

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NO.PZ201812310200000105

问题如下:

Bond B3 will have a modified duration of 2.75 at the end of the year. Based on the representative one-year corporate transition matrix in Exhibit 7 of the reading and assuming no default, how should the analyst adjust the bond’s yield to maturity (YTM) to assess the expected return on the bond over the next year?

选项:

A.

Add 7.7 bps to YTM.

B.

Subtract 7.7 bps from YTM.

C.

Subtract 9.0 bps from YTM.

解释:

B is correct. For each possible transition, the expected percentage price change, computed as the product of the modified duration and the change in the spread as per Exhibit 7 of the reading, is calculated as follows:

From AA to AAA: –2.75 × (0.60% – 0.90%) = +0.83%

From AA to A: –2.75 × (1.10% – 0.90%) = –0.55%

From AA to BBB: –2.75 × (1.50% – 0.90%) = –1.65%

From AA to BB: –2.75 × (3.40% – 0.90%) = –6.88%

From AA to B: –2.75 × (6.50% – 0.90%) = –15.40%

From AA to C: –2.75 × (9.50% – 0.90%) = –23.65%

The expected percentage change in the value of the AA rated bond is computed by multiplying each expected percentage price change for a possible credit transition by its respective transition probability given in Exhibit 7 of the reading, and summing the products:

(0.0150 × 0.83%) + (0.8800 × 0%) + (0.0950 × –0.55%) + (0.0075 × –1.65%) + (0.0015 × –6.88%) + (0.0005 × –15.40%) + (0.0003 × –23.65%)= –0.0774%.

Therefore, the expected return on the bond over the next year is its YTM minus 0.0774%, assuming no default.

我理解算出来的答案是expected return of price change,但它和调整YTM有什么关系?我转不过来了…

1 个答案

pzqa015 · 2022年03月06日

嗨,爱思考的PZer你好:


信用迁徙矩阵的计算公式是-∑P*mod*△y,这就是债券价格变动率的公式△P/P=-md*△y,所以,信用迁徙矩阵计算得到的结果是△P/P,也就是收益率。

Ytm是期初买入债券时,假定期间收益率不发生任何变动时的expected return,而信用迁徙矩阵计算的是期间收益率发生各种变化的可能性加权得到的价格变动率,代表的是期间收益变化对expected return的影响。所以,用期初ytm+price change(信用迁徙矩阵结果)就是实际的expected return。

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虽然现在很辛苦,但努力过的感觉真的很好,加油!

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NO.PZ201812310200000105问题如下Bonwill have a mofieration of 2.75 the enof the year. Baseon the representative one-yecorporate transition matrix in Exhibit 7 of the reang anassuming no fault, how shoulthe analyst aust the bons yielto maturity (YTM) to assess the expectereturn on the bonover the next year?A 7.7 bps to YTM. Subtra7.7 bps from YTM. Subtra9.0 bps from YTM. B is correct. For eapossible transition, the expectepercentage prichange, computeas the proof the mofieration anthe change in the spreper Exhibit 7 of the reang, is calculateas follows: From to AAA: –2.75 × (0.60% – 0.90%) = +0.83% From to –2.75 × (1.10% – 0.90%) = –0.55% From to BBB: –2.75 × (1.50% – 0.90%) = –1.65% From to B–2.75 × (3.40% – 0.90%) = –6.88% From to –2.75 × (6.50% – 0.90%) = –15.40% From to –2.75 × (9.50% – 0.90%) = –23.65% The expected percentage change in the value of the ratebonis computemultiplying eaexpectepercentage prichange for a possible cret transition its respective transition probability given in Exhibit 7 of the reang, ansumming the procts: (0.0150 × 0.83%) + (0.8800 × 0%) + (0.0950 × –0.55%) + (0.0075 × –1.65%) + (0.0015 × –6.88%) + (0.0005 × –15.40%) + (0.0003 × –23.65%)= –0.0774%. Therefore, the expectereturn on the bonover the next yeis its YTM minus 0.0774%, assuming no fault. 可答案以bona 作为初始sprea 难道ration 对于不同评级的债券都是一样的?

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NO.PZ201812310200000105 Subtra7.7 bps from YTM. Subtra9.0 bps from YTM. B is correct. For eapossible transition, the expectepercentage prichange, computethe proof the mofieration anthe change in the spreper Exhibit 7 of the reang, is calculatefollows: From to AA–2.75 × (0.60% – 0.90%) = +0.83% From to –2.75 × (1.10% – 0.90%) = –0.55% From to BB–2.75 × (1.50% – 0.90%) = –1.65% From to B–2.75 × (3.40% – 0.90%) = –6.88% From to –2.75 × (6.50% – 0.90%) = –15.40% From to –2.75 × (9.50% – 0.90%) = –23.65% The expectepercentage change in the value of the ratebonis computemultiplying eaexpectepercentage prichange for a possible cret transition its respective transition probability given in Exhibit 7 of the reang, ansumming the procts: (0.0150 × 0.83%) + (0.8800 × 0%) + (0.0950 × –0.55%) + (0.0075 × –1.65%) + (0.0015 × –6.88%) + (0.0005 × –15.40%) + (0.0003 × –23.65%)= –0.0774%. Therefore, the expectereturn on the bonover the next yeis its YTM minus 0.0774%, assuming no fault. 0.015 0.095 0.0075……是怎么来的呢

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