开发者:上海品职教育科技有限公司 隐私政策详情

应用版本:4.2.11(IOS)|3.2.5(安卓)APP下载

ccling · 2018年12月08日

问一道题:NO.PZ2017092702000012 [ CFA I ]

问题如下图:

选项:

A.

B.

C.

老师,麻烦详细解释一下这道题 解释:

1 个答案

菲菲_品职助教 · 2018年12月08日

同学你好,这题就是计算永续年金的现值并将其和一次性拿到一笔35万的钱进行比较。

永续年金的现金流A为2000每个月,r=6%/12(把年利率转化为月利率),

根据公式PV=A/r可以得到PV=40万,这笔钱是大于一次性拿到一笔35万的钱的,所以选择C。

  • 1

    回答
  • 3

    关注
  • 463

    浏览
相关问题

NO.PZ2017092702000012 问题如下 A sweepstakes winner mseleeither a perpetuity of £2,000 a month beginning with the first payment in one month or immeate lump sum payment of £350,000. If the annuscount rate is 6% compounmonthly, the present value of the perpetuity is: A.less ththe lump sum. B.equto the lump sum. C.greater ththe lump sum. C is correct.shown below, the present value (PV) of a £2,000 per month perpetuity is worth approximately £400,000 a 6% annurate compounmonthly. Thus, the present value of the annuity (is worth more ththe lump sum offer. A = £2,000 r = (6%/12) = 0.005 PV = (A/r) PV = (£2,000/0.005) PV = £400,000the present value of the“perpetuity”--永续年金,带入永续年金的公式 PV=A/r即可A=2,000, r=(6%/12)=0.005, PV=A/r=400,000

2023-07-19 00:03 2 · 回答

NO.PZ2017092702000012 问题如下 A sweepstakes winner mseleeither a perpetuity of £2,000 a month beginning with the first payment in one month or immeate lump sum payment of £350,000. If the annuscount rate is 6% compounmonthly, the present value of the perpetuity is: A.less ththe lump sum. B.equto the lump sum. C.greater ththe lump sum. C is correct.shown below, the present value (PV) of a £2,000 per month perpetuity is worth approximately £400,000 a 6% annurate compounmonthly. Thus, the present value of the annuity (is worth more ththe lump sum offer. A = £2,000 r = (6%/12) = 0.005 PV = (A/r) PV = (£2,000/0.005) PV = £400,000the present value of the“perpetuity”--永续年金,带入永续年金的公式 PV=A/r即可A=2,000, r=(6%/12)=0.005, PV=A/r=400,000 6% compounmonthly每期是一个月,利率是每月复利。为啥需要除以12呢

2022-12-16 18:31 1 · 回答

NO.PZ2017092702000012问题如下A sweepstakes winner mseleeither a perpetuity of £2,000 a month beginning with the first payment in one month or immeate lump sum payment of £350,000. If the annuscount rate is 6% compounmonthly, the present value of the perpetuity is:A.less ththe lump sum.B.equto the lump sum.C.greater ththe lump sum. C is correct.shown below, the present value (PV) of a £2,000 per month perpetuity is worth approximately £400,000 a 6% annurate compounmonthly. Thus, the present value of the annuity (is worth more ththe lump sum offer. A = £2,000 r = (6%/12) = 0.005 PV = (A/r) PV = (£2,000/0.005) PV = £400,000the present value of the“perpetuity”--永续年金,带入永续年金的公式 PV=A/r即可A=2,000, r=(6%/12)=0.005, PV=A/r=400,000 英文版的没看懂,想问下题目的中文翻译和中文解答

2022-12-08 23:02 1 · 回答

NO.PZ2017092702000012 问题如下 A sweepstakes winner mseleeither a perpetuity of £2,000 a month beginning with the first payment in one month or immeate lump sum payment of £350,000. If the annuscount rate is 6% compounmonthly, the present value of the perpetuity is: A.less ththe lump sum. B.equto the lump sum. C.greater ththe lump sum. C is correct.shown below, the present value (PV) of a £2,000 per month perpetuity is worth approximately £400,000 a 6% annurate compounmonthly. Thus, the present value of the annuity (is worth more ththe lump sum offer. A = £2,000 r = (6%/12) = 0.005 PV = (A/r) PV = (£2,000/0.005) PV = £400,000the present value of the“perpetuity”--永续年金,带入永续年金的公式 PV=A/r即可A=2,000, r=(6%/12)=0.005, PV=A/r=400,000 为什么不用(1+6%/12)^1的EAR公式计算有效年利率呢,不是每月复利一次吗,然后再用这个利率算年金的PV

2022-06-05 11:50 3 · 回答

NO.PZ2017092702000012问题如下A sweepstakes winner mseleeither a perpetuity of £2,000 a month beginning with the first payment in one month or immeate lump sum payment of £350,000. If the annuscount rate is 6% compounmonthly, the present value of the perpetuity is:A.less ththe lump sum.B.equto the lump sum.C.greater ththe lump sum. C is correct.shown below, the present value (PV) of a £2,000 per month perpetuity is worth approximately £400,000 a 6% annurate compounmonthly. Thus, the present value of the annuity (is worth more ththe lump sum offer. A = £2,000 r = (6%/12) = 0.005 PV = (A/r) PV = (£2,000/0.005) PV = £400,000the present value of the“perpetuity”--永续年金,带入永续年金的公式 PV=A/r即可A=2,000, r=(6%/12)=0.005, PV=A/r=400,000 请问什么时候需要从T1折现到T0,什么时候不需要?

2022-04-18 17:23 1 · 回答