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广超 · 2024年09月30日

这道题波动那个条件是不是用不上?

  1. CFA II
  2. Derivative

NO.PZ2019010402000025

问题如下:

Stock of ABC is currently trading at $48.6. Suppose that volatility is 30% and the continuously compounded risk-free rate is 0.3%. Assume X=45, T=0.25, N(d1) =0.6352 and N(d2)=0.5486. Based on the BSM model, the value of put option is:

选项:

A.

$3.586

B.

$6.202

C.

$2.568

解释:

C is correct.

考点:用BSM模型估值

解析:

公式:BSM price of a put option is p = ert XN(–d2) – SN(–d1).

其中N(–d1) = 1 – N(d1) = 1 – 0.6352 , and N(–d2) = 1 – N(d2) = 1 – 0.5486.

Put option = 45e0.003×0.25 (1 – 0.5486) - 48.6(1 – 0.6352) = $2.568

如题

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1 个答案

李坏_品职助教 · 2024年09月30日

嗨,从没放弃的小努力你好:


对,波动本来是用于求出d1和d2的,但是题目已经告诉了,N(d1) =0.6352,就不需要再用波动率这个条件了。

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NO.PZ2019010402000025 问题如下 Stoof Ais currently trang $48.6. Suppose thvolatility is 30% anthe continuously compounrisk-free rate is 0.3%. Assume X=45, T=0.25, N() =0.6352 anN()=0.5486. Baseon the BSM mol, the value of put option is: $3.586 $6.202 $2.568 C is correct.考点用BSM模型估值解析公式BSM priof a put option is p = e–rt XN(–) – SN(–).其中N(–) = 1 – N() = 1 – 0.6352 , anN(–) = 1 – N() = 1 – 0.5486.Put option = 45e−0.003×0.25 (1 – 0.5486) - 48.6(1 – 0.6352) = $2.568 如题

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