VF Série Uniforme
- Created by
- Renato Passos, Eng. de Software
- Reviewed by
- Renato Passos, Eng. de Software
Last updated: Apr 18, 2026
Formula
VF série
About this calculator
The uniform series present value (PV) calculator is a useful tool to calculate the final value of a series of periodic payments with constant interest rates.
This calculator uses the formula PV = PMT·((1+r)^n − 1)/r, where PMT is the monthly payment value, r is the monthly interest rate and n is the number of periods.
The uniform series PV is especially useful when you need to calculate the total value of a debt or a series of investments with fixed interest rates.
In addition, this calculator is an important tool for making informed financial decisions and avoiding problems with compound interest.
Frequently asked questions
What is the monthly interest rate (r)?
The monthly interest rate (r) is the annual interest rate divided by 12. For example, if the annual interest rate is 12%, the monthly interest rate will be 1% (12%/12).
How do I calculate the number of periods (n)?
The number of periods (n) is the number of months in which you will receive the payments. For example, if you will receive the payments monthly for 5 years, the number of periods will be 60 (5 years x 12 months/year).
What is the monthly payment value (PMT)?
The monthly payment value (PMT) is the value of the payment that you will receive monthly. For example, if you will receive R$ 1,000.00 per month, the monthly payment value will be R$ 1,000.00.
Can I calculate the monthly payment value (PMT) with this calculator?
Yes, you can calculate the monthly payment value (PMT) using the present value (PV) calculator. Simply enter the values of the monthly interest rate (r), number of periods (n) and final value (VF) to calculate the monthly payment value (PMT).
What is the final value (VF)?
The final value (VF) is the total value that you will receive after the payment periods. For example, if you will receive R$ 1,000.00 per month for 5 years, the final value will be R$ 60,000.00 (R$ 1,000.00 x 60).