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quietvivian · 2019年04月14日

问一道题:NO.PZ2016062402000020 [ FRM I ]

为什么残差E的标准差就是投资项目而不是市场投资的标准差呢?不知道分子分母分别带入哪个

问题如下图:

选项:

A.

B.

C.

D.

解释:

1 个答案

品职答疑小助手雍 · 2019年04月14日

同学你好,这里只是个回归公式,先不管投资项目和市场投资的事,当然也可以理解成他俩是Y和X,看公式,e在等式右边,是Y的一部分,所以它的标准差也是Y的标准差的一部分。这题解析有点复杂,没必要把b去掉再加上。

可以直接通过anova分析来解决,Y的方差等于BX的方差+E的方差(A是常数,方差为0),题目给了Y和E的标准差,可以由此得到BX的标准差=0.24。ρ直接等于解释变量的标准差除以Y的标准差,也就是BX+A的标准差除以Y的标准差,0.24/0.26=0.923。

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NO.PZ2016062402000020问题如下Consir the following lineregression mol: Y=a+bX+e. Suppose a=0.05, b=1.2, SY) = 0.26, anSe) = 0.1. Whis the correlation between X anY?A.0.923B.0.852C.0.7010.462We cfinthe volatility of X from the variancomposition, Equation: V(y)=β2V(x)+V(e)V(y)=\beta^2V(x)+V(e)V(y)=β2V(x)+V(e). This gives V(x)=V(y)−V(e)β2=0.26∧2−0.10∧21.22=0.04V(x)=\frac{V(y)-V(e)}{\beta^2}=\frac{0.26^\wee2-0.10^\wee2}{1.2^2}=0.04V(x)=β2V(y)−V(e)​=1.220.26∧2−0.10∧2​=0.04. Then SX) = 0.2, anp=SX)∗bSY)=1.2×0.20.26=0.923p=\frac{S(X)^\ast b}}{S(Y)}}=\frac{1.2\times0.2}{0.26}=0.923p=SY)SX)∗b​=0.261.2×0.2​=0.923.有点奇怪啊,看了答案也没在讲义找到,相关例题,我这个是刚学完Quant Section2 筛选题库的题看到的

2024-08-29 16:40 1 · 回答

NO.PZ2016062402000020 问题如下 Consir the following lineregression mol: Y=a+bX+e. Suppose a=0.05, b=1.2, SY) = 0.26, anSe) = 0.1. Whis the correlation between X anY? A.0.923 B.0.852 C.0.701 0.462 We cfinthe volatility of X from the variancomposition, Equation: V(y)=β2V(x)+V(e)V(y)=\beta^2V(x)+V(e)V(y)=β2V(x)+V(e). This gives V(x)=V(y)−V(e)β2=0.26∧2−0.10∧21.22=0.04V(x)=\frac{V(y)-V(e)}{\beta^2}=\frac{0.26^\wee2-0.10^\wee2}{1.2^2}=0.04V(x)=β2V(y)−V(e)​=1.220.26∧2−0.10∧2​=0.04. Then SX) = 0.2, anp=SX)∗bSY)=1.2×0.20.26=0.923p=\frac{S(X)^\ast b}}{S(Y)}}=\frac{1.2\times0.2}{0.26}=0.923p=SY)SX)∗b​=0.261.2×0.2​=0.923. 第一步求Sx)V(y)=0.26^2 = 1.2^2 x Sx)^2 + 0.1^2Sx) = 0.2第二利用Beta公式求correlationBeta = correlation x Sy)/Sx)b = Beta = 1.21.2 = correlation x 0.26/0.2correlation = 0.923

2024-04-05 12:01 1 · 回答

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2024-04-05 11:54 1 · 回答

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2023-07-07 17:40 1 · 回答

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2022-05-11 20:28 1 · 回答