NO.PZ2017092702000019问题如下A client invests €20,000 in a four-yecertificate of posit (C thannually pays interest of 3.5%. The annuinterest payments are automatically reinvestein a separate savings account a stateannuinterest rate of 2% compounmonthly. maturity, the value of the combineasset is closest to:A.€21,670.B.€22,890.C.€22,950. B is correct, the following cash flows show:The four annuinterest payments are baseon the Cs 3.5% annurate. The first payment grows 2.0% compounmonthly for three years (where FV is future value): FVN = €700(1 +0.02/12 )3×12 FVN = 743.25 The seconpayment grows 2.0% compounmonthly for two years: FVN = €700(1 +0.02/12 )2×12 FVN = 728.54 The thirpayment grows 2.0% compounmonthly for one year: FVN = €700(1 +0.02/12 )1×12 FVN=714.13The fourth payment is paithe enof Ye4. Its future value is €700. The sum of all future value payments is follows:根据EAR的公式(1+2%/12)^12=1+EAR,得到EAR=2.0184%。然后1. 首先按照年金的方式来计算利息再投资的终值N=4,I/Y=2.0184,PV=0,PMT=700,CPT FV=-2885.9208;其中700是20,000每年按照3.5%产生的利息,I/Y是转化的EAR,因为利息(PMT)的频率也是一年一付的。2. 然后把期初的这20,000再加回去,得到22,885.92。(和B有写出入是因为四舍五入的问题,但不影响选出答案) 老师,2/12这个不是把月计的利率转成年计吗,和E的区别在哪?谢谢
NO.PZ2017092702000019 问题如下 A client invests €20,000 in a four-yecertificate of posit (C thannually pays interest of 3.5%. The annuinterest payments are automatically reinvestein a separate savings account a stateannuinterest rate of 2% compounmonthly. maturity, the value of the combineasset is closest to: A.€21,670. B.€22,890. C.€22,950. B is correct, the following cash flows show:The four annuinterest payments are baseon the Cs 3.5% annurate. The first payment grows 2.0% compounmonthly for three years (where FV is future value): FVN = €700(1 +0.02/12 )3×12 FVN = 743.25 The seconpayment grows 2.0% compounmonthly for two years: FVN = €700(1 +0.02/12 )2×12 FVN = 728.54 The thirpayment grows 2.0% compounmonthly for one year: FVN = €700(1 +0.02/12 )1×12 FVN=714.13The fourth payment is paithe enof Ye4. Its future value is €700. The sum of all future value payments is follows:根据EAR的公式(1+2%/12)^12=1+EAR,得到EAR=2.0184%。然后1. 首先按照年金的方式来计算利息再投资的终值N=4,I/Y=2.0184,PV=0,PMT=700,CPT FV=-2885.9208;其中700是20,000每年按照3.5%产生的利息,I/Y是转化的EAR,因为利息(PMT)的频率也是一年一付的。2. 然后把期初的这20,000再加回去,得到22,885.92。(和B有写出入是因为四舍五入的问题,但不影响选出答案) 这道题第一年的利息是700, 第二年的不应该是20700*0.035 = 724.5吗?这样的话,每一年的PMT就不是固定的700了。这个地方没太搞懂,希望老师解析一下,谢谢
NO.PZ2017092702000019 问题如下 A client invests €20,000 in a four-yecertificate of posit (C thannually pays interest of 3.5%. The annuinterest payments are automatically reinvestein a separate savings account a stateannuinterest rate of 2% compounmonthly. maturity, the value of the combineasset is closest to: A.€21,670. B.€22,890. C.€22,950. B is correct, the following cash flows show:The four annuinterest payments are baseon the Cs 3.5% annurate. The first payment grows 2.0% compounmonthly for three years (where FV is future value): FVN = €700(1 +0.02/12 )3×12 FVN = 743.25 The seconpayment grows 2.0% compounmonthly for two years: FVN = €700(1 +0.02/12 )2×12 FVN = 728.54 The thirpayment grows 2.0% compounmonthly for one year: FVN = €700(1 +0.02/12 )1×12 FVN=714.13The fourth payment is paithe enof Ye4. Its future value is €700. The sum of all future value payments is follows:根据EAR的公式(1+2%/12)^12=1+EAR,得到EAR=2.0184%。然后1. 首先按照年金的方式来计算利息再投资的终值N=4,I/Y=2.0184,PV=0,PMT=700,CPT FV=-2885.9208;其中700是20,000每年按照3.5%产生的利息,I/Y是转化的EAR,因为利息(PMT)的频率也是一年一付的。2. 然后把期初的这20,000再加回去,得到22,885.92。(和B有写出入是因为四舍五入的问题,但不影响选出答案) 我理解可以将利息的再投资作为年金来计算,但是我算的时候我直接使用的I/Y是2%/12因为是以一个月为期复利的,为什么不能用这个作为I/Y而是需要算它的EAR在带入计算器去算?
NO.PZ2017092702000019问题如下A client invests €20,000 in a four-yecertificate of posit (C thannually pays interest of 3.5%. The annuinterest payments are automatically reinvestein a separate savings account a stateannuinterest rate of 2% compounmonthly. maturity, the value of the combineasset is closest to:A.€21,670.B.€22,890.C.€22,950. B is correct, the following cash flows show:The four annuinterest payments are baseon the Cs 3.5% annurate. The first payment grows 2.0% compounmonthly for three years (where FV is future value): FVN = €700(1 +0.02/12 )3×12 FVN = 743.25 The seconpayment grows 2.0% compounmonthly for two years: FVN = €700(1 +0.02/12 )2×12 FVN = 728.54 The thirpayment grows 2.0% compounmonthly for one year: FVN = €700(1 +0.02/12 )1×12 FVN=714.13The fourth payment is paithe enof Ye4. Its future value is €700. The sum of all future value payments is follows:根据EAR的公式(1+2%/12)^12=1+EAR,得到EAR=2.0184%。然后1. 首先按照年金的方式来计算利息再投资的终值N=4,I/Y=2.0184,PV=0,PMT=700,CPT FV=-2885.9208;其中700是20,000每年按照3.5%产生的利息,I/Y是转化的EAR,因为利息(PMT)的频率也是一年一付的。2. 然后把期初的这20,000再加回去,得到22,885.92。(和B有写出入是因为四舍五入的问题,但不影响选出答案) 这题为什么不是把前三笔700求他们的FV PMT=700 PV=0 I/Y=2%/12 n=3*12 求FV 之后加20000+700 为啥这样不对呢
NO.PZ2017092702000019 问题如下 A client invests €20,000 in a four-yecertificate of posit (C thannually pays interest of 3.5%. The annuinterest payments are automatically reinvestein a separate savings account a stateannuinterest rate of 2% compounmonthly. maturity, the value of the combineasset is closest to: A.€21,670. B.€22,890. C.€22,950. B is correct, the following cash flows show:The four annuinterest payments are baseon the Cs 3.5% annurate. The first payment grows 2.0% compounmonthly for three years (where FV is future value): FVN = €700(1 +0.02/12 )3×12 FVN = 743.25 The seconpayment grows 2.0% compounmonthly for two years: FVN = €700(1 +0.02/12 )2×12 FVN = 728.54 The thirpayment grows 2.0% compounmonthly for one year: FVN = €700(1 +0.02/12 )1×12 FVN=714.13The fourth payment is paithe enof Ye4. Its future value is €700. The sum of all future value payments is follows:根据EAR的公式(1+2%/12)^12=1+EAR,得到EAR=2.0184%。然后1. 首先按照年金的方式来计算利息再投资的终值N=4,I/Y=2.0184,PV=0,PMT=700,CPT FV=-2885.9208;其中700是20,000每年按照3.5%产生的利息,I/Y是转化的EAR,因为利息(PMT)的频率也是一年一付的。2. 然后把期初的这20,000再加回去,得到22,885.92。(和B有写出入是因为四舍五入的问题,但不影响选出答案) 如题。