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Lynn🐷 · 2022年01月02日

请问用计算机怎么算的 可以演示一遍吗

NO.PZ2017092702000006

问题如下:

For a lump sum investment of ¥250,000 invested at a stated annual rate of 3% compounded daily, the number of months needed to grow the sum to ¥1,000,000 is closest to:

选项:

A.

555.

B.

563.

C.

576.

解释:

A is correct.

The effective annual rate (EAR) is calculated as follows:

EAR = (1 + Periodic interest rate)m – 1   EAR = (1 + 0.03/365)365 – 1   EAR= (1.03045) – 1 = 0.030453 ≈ 3.0453%.

Solving for N on a financial calculator results in (where FV is future value and PV is present value):

(1 + 0,030453N = FVN/PV = (¥1,000,000/¥250,000)So,N = 46.21 years, which multiplied by 12 to convert to months results in 554.5, or ≈ 555 months.

计算机用法,麻烦演示一遍,谢谢
1 个答案

星星_品职助教 · 2022年01月02日

同学你好,

本题中“a stated annual rate of 3% compounded daily”,说明3%不能直接用,需要进行转化。

1)可以选择转化为EAR得到3.0453%,此时计算器按键为:PV=-250000, I/Y=3.045,PMT=0,FV=1000000, CPT N=46.21(年),然后乘以12得到554.5月

2)也可以选择转化成日利率得到3%/365=0.0082%,此时计算器按键为:PV=-250000, I/Y=0.0082,PMT=0,FV=1000000, CPT N=16868(天),转化成16868/365=46.21年,再转化为554.5月

以上计算对于各个环节的四舍五入可能会导致结果细微差别。

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