Understanding Inflation and Its Impact on Forest Investments
Inflation affects the pricing of goods and services, making investments like timberland more complex. This analysis provides insights into the types of inflation—demand-pull, cost-push, and monetary—and defines key terms such as nominal, real, and annual inflation rates. It discusses the importance of converting asset values from nominal to real terms, using examples from timberland investments. Additionally, it highlights the methodology for calculating net present value (NPV) and after-tax implications in the context of inflation-adjusted values, ensuring informed investment decisions.
Understanding Inflation and Its Impact on Forest Investments
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Presentation Transcript
Inflation and Forest Investment Analysis What’s real?
What’s Inflation • An increase in prices that makes a “market basket” of goods and services more expensive over time. • Basket costs $1,400 in 2003 and $1,550 in 2004, a one year period. • Increase in cost is $150 • % increase, the annual rate of inflation, is • $150/$1,400 = 10.7%, or • ($1,550/$1,400)1/1 – 1 =1.107 – 1 = 10.7%
Causes of Inflation • Demand-pull inflation • Too many people chasing too few goods and services • Cost-push inflation • Costs of factors of production rise, pushing up prices of goods and services • Monetary inflation • Government “prints” more money, leading to demand pull inflation
Terminology • Price with inflation included • Nominal • Current dollar • Inflated • Actual • Price with inflation not included • Real • Constant dollar • Deflated • Relative
Nomenclature • f = annual inflation rate • r = real interest rate • i = inflated or nominal interest rate i = (r + f + rf) • In = inflated or nominal dollar value in year n • Vn = future value in year n, in constant dollars of year 0
154 155.4 PPI 3.3% Trend line 5.0% 32.5 15.0
Average Annual Rate of Inflation • Rate of inflation between two points in time more than one year apart. • Calculate as, f = (Vn/V0)1/n -1 = (155.4/32.5)1/48 – 1 = 4.780.02083 – 1 = 1.0331 – 1 = 3.31% per annum
Converting the value of an asset from its nominal to its real value • Vn = In/(1+f)n • Example – Timberland is purchased for $500 per acre in 1957. In 2005 it’s sold for $3,500 per acre. If average annual inflation over this period is 3.31%, what is the sale price of the land in terms of 1982 values? V2005 = $3,500/1.033148 = $733.22 • What is the real rate of return on the land? r = ($733.22/$500)1/48 – 1 = 0.008
Indiana Forest Products Price Report and Trend Analysis • See FNR-177-W, Table 8 • PPI for finished goods • Avg. Stand • Nominal • Index number • Real price • Quality Stand • Nominal • Index number • Real price
Nominal and Real ROR’s Loan $100 now to be returned in one year. You want a 5% real rate of return, r, i.e. 5% more than inflation. If inflation will be 4% over the year you need $104 back just to keep same purchasing power of $100. $100 (1+f)n = 100 (1.04)1 = $104 To get 5% return need to multiply $104 by (1+r)n, $104 (1.05)1 = $109.20
Nominal and Real ROR’s Combining the steps, Calculate current or inflated value is, In = V0 (1+r)n (1+f)n = V0 (1+ r + f + rf)n = V0 (1+i)n, therefore, i = r + f + rf = 0.05 + 0.04 + 0.05*0.04 = 0.09 + 0.002 = 0.092, or, i = (1 + r) (1 + f) -1
Nominal and Real ROR’s If you know the nominal rate of return and inflation rate, solve for the real rate of return, (1 + r) (1 + f) = 1 + i 1 + r = (1 + i) / (1 + f) r = [(1 + i) / (1 + f)] - 1
Calculating Inflation Adjusted PV’s PV0 = In/(1+i)n = [Vn (1+f)n] / (1+r+f+rf)n = [Vn(1+f)n]/[(1+r)n(1+f)n] = [Vn(1+f)n]/[(1+r)n(1+f)n] = Vn/(1+r)n
Calculating Inflation Adjusted PV’s • Guidelines for computing net present value (NPV) • If future cash flows are in constant dollars compute NPV with a real interest rate, r • If future cash flows are in current dollars compute NPV with a nominal interest rate. Use same inflation rate in the cash flows and nominal interest rate
Warning • Never mix real dollars and nominal dollars in the same equation
Recommendation • It’s usually easier to work in real terms, that is adjust all cash flows to real values, and discount with real interest rate, r • However, have to use nominal values for after-tax calculations, • Tax laws generally don’t adjust rates for inflation, and never adjust basis of assets for inflation
Income tax on gain from disposal of assets C = basis of asset In = nominal value in year n Ti = tax rate (5% or 15%) Tax due = Ti (In – C)
Example George buys timberland in 1975 for $120,000 of which $80,000 is attributable to merchantable timber. In 1980 he sells 20% of the merchant-able timber for $50,000. What is the tax on the sale? C = 0.2 * $80,000 = $16,000 I80 = $50,000 Ti = 15% Tax due = 0.15 ($50,000 - $16,000) = 0.15 * $34,000 = $5,100 After-tax gain = $50,000 - $5,100 = $44,900
Tax Basis • Used to determine gain or loss on the “disposal” of an asset • How’s basis determined? • Purchased assets – acquisition cost • Gift – basis of donor used by donee (carryover basis) • Inheritance – fair market value on deceased date of death (stepped-up basis)
After-Tax NPV Vn – Ti [Vn – C/(1+f)n] NPV = (1+r)n Vn – Ti Vn+ Ti (C/(1+f)n NPV = (1+r)n
After-Tax NPV, Example Buy an asset for $2,000 and sell it 8 years for $8,000. Annual inflation rate is 9.05%. f = 0.0905, r = 0.05 Ti = 0.30 I8 = $4,000*1.09058= $8,000 $4,000 – 0.30[4,000 – 2,000/(1.09058)] NPV = (1.05)8 = $2,098
Nominal and real gain In = $8,000 $8,000 $6,000 Capital gain = $6,000 Vn = $4,000 $4,000 Real gain = $2,000 $2,000 Basis = $2,000 nominal 4 8 Years
After-Tax NPV With No Inflation $4,000 – 0.30 ($4,000 – $2,000) NPV = (1.05)8 = $2,301 Decrease in after-tax NPV due to inflation is, $2,301 - $2,098 = $203
Affect of Inflation on Series Payment Formulas – annual and periodic • Basic formulas assume fixed payments • If payments are fixed in nominal terms must use nominal interest rate, i, in series payment formulas. • If nominal payments rise at exactly the inflation rate, they are fixed in real terms and must use real interest rate in formulas.
