132 Part 2 Fundamental Concepts in Financial Management
The top section of Table 5-2 calculates the PV using the step-by-step approach.
When we found the future value in the previous section, we worked from left to
right, multiplying the initial amount and each subsequent amount by (1 # I). To
! nd present values, we work backward, or from right to left, dividing the future
value and each subsequent amount by (1 # I). This procedure shows exactly what’s
happening, which can be quite useful when you are working complex problems.
However, it’s inef! cient, especially when you are dealing with a number of years.
With the formula approach, we use Equation 5-2, simply dividing the future
value by (1 # I)N. This is more ef! cient than the step-by-step approach, and it gives
the same result. Equation 5-2 is built into! nancial calculators; and as shown in
Table 5-2, we can! nd the PV by entering values for N, I/YR, PMT, and FV and
then pressing the PV key. Finally, spreadsheets have a function that’s essentially
the same as the calculator, which also solves Equation 5-2.
The fundamental goal of! nancial management is to maximize the! rm’s
value, and the value of a business (or any asset, including stocks and bonds) is the
present value of its expected future cash " ows. Because present value lies at the
heart of the valuation process, we will have much more to say about it in the re-
mainder of this chapter and throughout the book.5-3a Graphic View of the Discounting Process
Figure 5-2 shows that the present value of a sum to be received in the future
decreases and approaches zero as the payment date is extended further into the
future and that the present value falls faster at higher interest rates. At relatively
high rates, funds due in the future are worth very little today; and even at rela-
tively low rates, present values of sums due in the very distant future are quite
small. For example, at a 20% discount rate, $1 million due in 100 years would be
worth only $0.0121 today. This is because $0.0121 would grow to $1 million in 100
years when compounded at 20%.Present Value of $110 20 30 40 500.2000.400.600.801.00I = 20%I = 10%I = 5%I = 0%PeriodsPresent Value of $1 at Various Interest Rates and Time Periods
F I G U R E 5! 2