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金融民工阿聪 · 2022年02月23日

关于计算

NO.PZ2019010402000022

问题如下:

Based on the following information, the value of the European-style interest rate call option is:

Assume the notional amount of the option is $1,000,000, the exercise rate is 2.6% and the RN probability is 50%.

选项:

A.

2,368

B.

2,529

C.

3,675

解释:

B is correct.

考点:interest rate option估值

解析:

T=2:

c++ = Max(0,S++ – X) = Max[0,0.029833– 0.026] = 0.003833

c+– = Max(0,S+– – X) = Max[0,0.029378 – 0.026] = 0.003378

c  = Max(0,S  – X) = Max[0,0.015712 – 0.026] = 0.0

T=1:

c+=0.5×0.003833+0.5×0.0033781+2.9156%=0.003503c^+=\frac{0.5\times0.003833+0.5\times0.003378}{1+2.9156\%}=0.003503

c=0.5×0.003378+01+1.7632%=0.001660c^-=\frac{0.5\times0.003378+0}{1+1.7632\%}=0.001660

T=0:

c0=0.003503×0.5+0.001660×0.51+2.0689%=0.002529{\text{c}}_0=\frac{0.003503\times0.5+0.001660\times0.5}{1+2.0689\%}=0.002529

因为NP=1,000,000,所以call value=0.002529×1,000,000=2,529.17

在计算interest rate option value的时候,一定要特别注意折现率的选取。

这个利率两期看涨期权二叉树,给出来的话,是什么意思,我分不清这个现金流的问题,我算的话是

算出C++=2.9833%-2.6%=0.3833%,然后拿0.3833%/(1+2.9833%)=0.3722%,认为c++在t2时刻是=0.3722%,

但我这样算是错的,

答案是直接c++在t2==2.9833%-2.6%=0.3833%

疑问→为什么算c++不需要用t2的折现率去折现

1 个答案

Lucky_品职助教 · 2022年02月23日

嗨,爱思考的PZer你好:


给出来的话,是什么意思?答:RN是risk neutral的意思,原版书中有11处出现这个表述,同学在考试时遇到要认识哦~

利率二叉树,每个节点利率决定了后一期的利率,这是个两期的二叉树,c++在t2==2.9833%-2.6%=0.3833%就是我们平时算期权行权value的方法,结合概率往前折现,就是为期权二叉树定价的过程,所以算1时点的期权价值才需要折现,在2时点只是考虑是否行权,行权后value是多少,不需要折现。

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NO.PZ2019010402000022问题如下 Baseon the following information, the value of the European-style interest rate call option is:Assume the notionamount of the option is $1,000,000, the exercise rate is 2.6% anthe RN probability is 50%.A.2,368B.2,529C.3,675B is correct.考点interest rate option估值解析T=2:c++ = Max(0,S++ – X) = Max[0,0.029833– 0.026] = 0.003833c+– = Max(0,S+– – X) = Max[0,0.029378 – 0.026] = 0.003378– = Max(0,S– – – X) = Max[0,0.015712 – 0.026] = 0.0T=1:c+=0.5×0.003833+0.5×0.0033781+2.9156%=0.003503c^+=\frac{0.5\times0.003833+0.5\times0.003378}{1+2.9156\%}=0.003503c+=1+2.9156%0.5×0.003833+0.5×0.003378​=0.003503c−=0.5×0.003378+01+1.7632%=0.001660c^-=\frac{0.5\times0.003378+0}{1+1.7632\%}=0.001660c−=1+1.7632%0.5×0.003378+0​=0.001660T=0c0=0.003503×0.5+0.001660×0.51+2.0689%=0.002529{\text{c}}_0=\frac{0.003503\times0.5+0.001660\times0.5}{1+2.0689\%}=0.002529c0​=1+2.0689%0.003503×0.5+0.001660×0.5​=0.002529因为NP=1,000,000,所以call value=0.002529×1,000,000=2,529.17在计算interest rate option value的时候,一定要特别注意折现率的选取。这题我和另外一种题型混淆了 我是假设notional为100的浮动利率债券 从T2往前折现的 结果差很远 为什么不能用那个方法呢?

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NO.PZ2019010402000022 问题如下 Baseon the following information, the value of the European-style interest rate call option is:Assume the notionamount of the option is $1,000,000, the exercise rate is 2.6% anthe RN probability is 50%. A.2,368 B.2,529 C.3,675 B is correct.考点interest rate option估值解析T=2:c++ = Max(0,S++ – X) = Max[0,0.029833– 0.026] = 0.003833c+– = Max(0,S+– – X) = Max[0,0.029378 – 0.026] = 0.003378– = Max(0,S– – – X) = Max[0,0.015712 – 0.026] = 0.0T=1:c+=0.5×0.003833+0.5×0.0033781+2.9156%=0.003503c^+=\frac{0.5\times0.003833+0.5\times0.003378}{1+2.9156\%}=0.003503c+=1+2.9156%0.5×0.003833+0.5×0.003378​=0.003503c−=0.5×0.003378+01+1.7632%=0.001660c^-=\frac{0.5\times0.003378+0}{1+1.7632\%}=0.001660c−=1+1.7632%0.5×0.003378+0​=0.001660T=0c0=0.003503×0.5+0.001660×0.51+2.0689%=0.002529{\text{c}}_0=\frac{0.003503\times0.5+0.001660\times0.5}{1+2.0689\%}=0.002529c0​=1+2.0689%0.003503×0.5+0.001660×0.5​=0.002529因为NP=1,000,000,所以call value=0.002529×1,000,000=2,529.17在计算interest rate option value的时候,一定要特别注意折现率的选取。 请问这个call或者put行权与否怎么判断的?

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