NO.PZ2022122601000069
问题如下:
The United States-based CME Foundation has asked Pauline Cortez, chief investment officer, to analyze the benefit of adding U.S. real estate equities as a permanent asset class. To determine the appropriate risk premium and expected return for this new asset class, Cortez needs to determine the appropriate risk factor to apply to the international capital asset pricing model (ICAPM). Selected data from GloboStats is shown in Exhibit 1.
Using the data provided in Exhibit 1 and assuming perfect markets, the calculated beta for U.S. real estate is closest to:
选项:
A.1.08. B.0.58 C.0.38解释:
Correct Answer: B
βi = Cov (Ri,RM)/Var(RM)
Note that covariance is given as 0.0075.
Find Var(RM) by using the Sharpe ratio = RPM/σM and solve for σM
Expected return - Risk-free rate = RPM
7.2% - 3.1% = 4.1% (or 0.041)
σM = 0.041/0.36 = 0.1139
Var(RM) = (0.1139)2 = 0.0130
βi = 0.0075/0.0130 = 0.58
中文解析:
βi = Cov (Ri,RM)/Var(RM)
注意,协方差为0.0075。
用夏普比率= RPM/σM求Var(RM),求解σM
预期收益-无风险利率= RPM
7.2% - 3.1% = 4.1%(或0.041)
σm = 0.041/0.36 = 0.1139
Var(RM) = (0.1139)2 = 0.0130
βi = 0.0075/0.0130 = 0.58
这道题看了答案能理解但是有一个疑问
这道题知道要用market的variance,但是题目说了是perfectly integrated. 这种时候market sigma还是不等于integrated market sigma吗?