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JK_MMMM · 2022年04月14日

如果u不等于0, dt怎么求?

  1. FRM I
  2. Quantitative

NO.PZ2016062402000027

问题如下:

Suppose you simulate the price path of stock HHF using a geometric Brownian motion model with drift μ = 0, volatility σ = 0.14, and time step Δ = 0.01. Let StS_t be the price of the stock at time t. If S0S_0 = 100, and the first two simulated (randomly selected) standard normal variables are ε1\varepsilon_1 = 0.263 and ε2\varepsilon_2 = -0.475, what is the simulated stock price after the second step?

选项:

A.

96.79

B.

99.79

C.

99.97

D.

99.70

解释:

The process for the stock prices has mean of zero and volatility of σt=0.14×0.01=0.014\sigma\sqrt{\bigtriangleup t}=0.14\times\sqrt{0.01}=0.014, Hence the first step is S1=S0(1+0.014×0.263)=100.37S_1=S_0{(1+0.014\times0.263)}=100.37. The second step is S2=S1(1+0.014×0.475)=99.70S_2=S_1{(1+0.014\times-0.475)}=99.70

老师您好,


如果u不等于0,dt怎么求?


dSt = u*S*dt+Stadndard deviation * St*dz



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DD仔_品职助教 · 2022年04月14日

嗨,爱思考的PZer你好:


dt就是delta t,只不过在微分里我们把delta写成d,dt就是time step也就是题目给出来的0.01。

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NO.PZ2016062402000027问题如下 Suppose you simulate the pripath of stoHHF using a geometric Brownimotion mol with ift μ = 0, volatility σ = 0.14, antime step Δ = 0.01. Let StS_tSt​ the priof the stotime t. If S0S_0S0​ = 100, anthe first two simulate(ranmly selecte stanrnormvariables are ε1\varepsilon_1ε1​ = 0.263 anε2\varepsilon_2ε2​ = -0.475, whis the simulatestopriafter the seconstep?96.79 99.79 99.97 99.70 The process for the stoprices hmeof zero anvolatility of σ△t=0.14×0.01=0.014\sigma\sqrt{\bigtriangleup t}=0.14\times\sqrt{0.01}=0.014σ△t​=0.14×0.01​=0.014, Henthe first step is S1=S0(1+0.014×0.263)=100.37S_1=S_0{(1+0.014\times0.263)}=100.37S1​=S0​(1+0.014×0.263)=100.37. The seconstep is S2=S1(1+0.014×−0.475)=99.70S_2=S_1{(1+0.014\times-0.475)}=99.70S2​=S1​(1+0.014×−0.475)=99.70请问这道题是哪个知识点

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