Chapter 9 Risk and the Cost of Capital 237bre44380_ch09_221-248.indd 236 10/09/15 09:59 PM bre44380_ch09_221-248.indd 237 10/09/15 09:59 PM
When to Use a Single Risk-Adjusted Discount Rate
for Long-Lived Assets
We are now in a position to examine what is implied when a constant risk-adjusted discount
rate is used to calculate a present value.
Consider two simple projects. Project A is expected to produce a cash flow of $100 mil-
lion for each of three years. The risk-free interest rate is 6%, the market risk premium is 8%,
and project A’s beta is .75. You therefore calculate A’s opportunity cost of capital as follows:r = rf + β(rm − rf)= 6 + .75(8) = 12%Discounting at 12% gives the following present value for each cash flow:◗ FIGURE 9.3
Two ways to calculate
present value. “Hair-
cut for risk” is finan-
cial slang referring to
the reduction of the
cash flow from its
forecasted value to its
certainty equivalent.Risk-Adjusted Discount Rate MethodCertainty-Equivalent MethodDiscount for time and riskPresent
valueFuture
cash
flow
C 1Discount for time
value of moneyHaircut
for riskProject A
Year Cash Flow PV at 12%
1 100 89.3
2 100 79.7
3 100 71.2
Total PV 240.2Project B
Year Cash Flow PV at 6%
1 94.6 89.3
2 89.6 79.7
3 84.8^ 71.2
Total PV 240.2Now compare these figures with the cash flows of project B. Notice that B’s cash flows are
lower than A’s; but B’s flows are safe, and therefore they are discounted at the risk-free inter-
est rate. The present value of each year’s cash flow is identical for the two projects.