present value of a lump sum计算公式 present value of a lump sum计算公式 对于一次性支付的未来现金流,现值的计算公式是:PV=FV /(1+r)^n 其中:*PV是现值(Present Value)*FV是未来价值(Future Value)*r是每期的折现率(或每期利率)*n是未来现金流到来的期数(通常表示为年份)注意:这适用于折现...
aStand for the right answer 立场为正确答案 [translate] aPresent Value of a Lump Sum 总金额的现值 [translate] 英语翻译 日语翻译 韩语翻译 德语翻译 法语翻译 俄语翻译 阿拉伯语翻译 西班牙语翻译 葡萄牙语翻译 意大利语翻译 荷兰语翻译 瑞典语翻译 希腊语翻译 51La ...
= Present value of a sum one year hence
The present value of a single amount allows us to determine what the value of a lump sum to be received in the future is worth to us today. It is worth more than today due to the power of compound interest. There are five key elements in all time-value-of-money calculations.4These ...
The present value of a sum of money is the amount that must be invested now, at a given rate of interest, to produce the desired sum at a later date. $◻ Need Help? Read It Submit Answer Here’s the best way to solve it.
Present Value of a Single Sum of MoneyPresent value of a future single sum of money is the value that is obtained when the future value is discounted at a specific given rate of interest. In the other words present value of a single sum of money is the amount that, if invested on a...
Present Value = Future Value ÷ (1 + Rate of Return)Number of Periods Where: “Future Value” is a sum of money in the future. “Rate of return” is a decimal value rate of return per period (the calculator above uses a percentage). A return of “2.2%” per year would be calculat...
Present value factor is the equivalent value today of $1 in future or a series of $1 in future. A table of present value factors can be used to work out the present value of a single sum or annuity.
Present value (PV) is the current value of a future sum of money or stream of cash flows. It is determined by discounting the future value by the estimated rate of return that the money could earn if invested.
百度试题 题目 The present value (PV) of a stream of cash flows is just the sum of the present values of each individual cash flow. A.错B.对 相关知识点: 试题来源: 解析 B 反馈 收藏