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不泊岸 · 2021年10月18日

EAR都是用离散复利计算吗,讲义上在哪有介绍

NO.PZ2016082402000001

问题如下:

An investor buys a Treasury bill maturing in one month for $987. On the maturity date the investor collects $1,000. Calculate effective annual rate (EAR).

选项:

A.

17.0%

B.

15.8%

C.

13.0%

D.

11.6%

解释:

ANSWER: A

The EAR is defined byFVPV=(1+EAR)T\frac{FV}{PV}={(1+EAR)}^T . So (FVPV)1T1{(\frac{FV}{PV})}^\frac1T-1  EAR =  . Here, T = 1/12. So, EAR =   (1,000987)121=17.0%\;{(\frac{1,000}{987})}^{12}-1=17.0\%


2 个答案

品职答疑小助手雍 · 2021年10月19日

这是以前的练习题,由于目前原版书和讲义里都找不到这个点了,我觉得按以前出现的例题用离散就行,而且考试时候不会有歧义选项的。

品职答疑小助手雍 · 2021年10月18日

同学你好,这个讲义里没写,原版书里也没写,应该是早期的原版书的内容,不过这种一般都是离散着来的,毕竟截取的是1/12年。用连续和用离散的误差也不会影响考试做题的。

不泊岸 · 2021年10月19日

这个题用连续算出来的是15.7% 刚好选b啊

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NO.PZ2016082402000001 问题如下 investor buys a Treasury bill maturing in one month for $987. On the maturity te the investor collects $1,000. Calculate effective annurate (EAR). A.17.0% B.15.8% C.13.0% 11.6% ANSWER: AThe Eis finebyFVPV=(1+EAR)T\frac{FV}{PV}={(1+EAR)}^TPVFV​=(1+EAR)T . So (FVPV)1T−1{(\frac{FV}{PV})}^\frac1T-1(PVFV​)T1​−1 E= . Here, T = 1/12. So, E=   (1,000987)12−1=17.0%\;{(\frac{1,000}{987})}^{12}-1=17.0\%(9871,000​)12−1=17.0% EAR和BEY在讲义的哪个地方,找不到了

2024-09-18 20:59 1 · 回答

NO.PZ2016082402000001问题如下investor buys a Treasury bill maturing in one month for $987. On the maturity te the investor collects $1,000. Calculate effective annurate (EAR).A.17.0%B.15.8%C.13.0%11.6%ANSWER: AThe Eis finebyFVPV=(1+EAR)T\frac{FV}{PV}={(1+EAR)}^TPVFV​=(1+EAR)T . So (FVPV)1T−1{(\frac{FV}{PV})}^\frac1T-1(PVFV​)T1​−1 E= . Here, T = 1/12. So, E=   (1,000987)12−1=17.0%\;{(\frac{1,000}{987})}^{12}-1=17.0\%(9871,000​)12−1=17.0%为什么不是(1+R/12)=1000/987

2023-02-24 23:11 1 · 回答

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2022-05-19 23:06 1 · 回答

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2022-05-19 22:20 1 · 回答

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2022-05-04 03:50 1 · 回答