210 likes | 237 Views
FINANCE 3 . Present Value. Professor André Farber Solvay Business School Université Libre de Bruxelles Fall 2007. Using prices of U.S. Treasury STRIPS. Separate Trading of Registered Interest and Principal of Securities Prices of zero-coupons
E N D
FINANCE3 . Present Value Professor André Farber Solvay Business School Université Libre de Bruxelles Fall 2007
Using prices of U.S. Treasury STRIPS • Separate Trading of Registered Interest and Principal of Securities • Prices of zero-coupons • Example: Suppose you observe the following prices Maturity Price for $100 face value 1 98.03 2 94.65 3 90.44 4 86.48 5 80.00 • The market price of $1 in 5 years is DF5 = 0.80 • NPV = - 100 + 150 * 0.80 = - 100 + 120 = +20 MBA 2007 Present value
Present Value: general formula • Cash flows: C1, C2, C3, … ,Ct, … CT • Discount factors: DF1, DF2, … ,DFt, … , DFT • Present value: PV = C1×DF1 + C2×DF2 + … + CT×DFT • An example: • Year 0 1 2 3 • Cash flow -100 40 60 30 • Discount factor 1.000 0.9803 0.9465 0.9044 • Present value -100 39.21 56.79 27.13 • NPV = - 100 + 123.13 = 23.13 MBA 2007 Present value
Several periods: future value and compounding • Invests for €1,000 two years (r = 8%) with annual compounding • After one year FV1 = C0× (1+r) = 1,080 • After two years FV2 = FV1 × (1+r) = C0× (1+r) × (1+r) • = C0× (1+r)² = 1,166.40 • Decomposition of FV2 • C0 Principal amount 1,000 • C0 × 2 × r Simple interest 160 • C0 × r² Interest on interest 6.40 • Investing for t years FVt = C0 (1+r)t • Example: Invest €1,000 for 10 years with annual compounding • FV10 = 1,000 (1.08)10 = 2,158.82 Principal amount 1,000Simple interest 800Interest on interest 358.82 MBA 2007 Present value
Present value and discounting • How much would an investor pay today to receive €Ct in t years given market interest rate rt? • We know that 1 €0 => (1+rt)t €t • Hence PV (1+rt)t = Ct =>PV = Ct/(1+rt)t = Ct DFt • The process of calculating the present value of future cash flows is called discounting. • The present value of a future cash flow is obtained by multiplying this cash flow by a discount factor (or present value factor) DFt • The general formula for the t-year discount factor is: MBA 2007 Present value
Discount factors MBA 2007 Present value
Spot interest rates • Back to STRIPS. Suppose that the price of a 5-year zero-coupon with face value equal to 100 is 75. • What is the underlying interest rate? • The yield-to-maturity on a zero-coupon is the discount rate such that the market value is equal to the present value of future cash flows. • We know that 75 = 100 * DF5 and DF5 = 1/(1+r5)5 • The YTM r5 is the solution of: • The solution is: • This is the 5-year spot interest rate MBA 2007 Present value
Term structure of interest rate • Relationship between spot interest rate and maturity. • Example: • Maturity Price for €100 face value YTM (Spot rate) • 1 98.03 r1 = 2.00% • 2 94.65 r2 = 2.79% • 3 90.44 r3 = 3.41% • 4 86.48 r4 = 3.70% • 5 80.00 r5 = 4.56% • Term structure is: • Upward sloping if rt > rt-1 for all t • Flat if rt = rt-1 for all t • Downward sloping (or inverted) if rt < rt-1 for all t MBA 2007 Present value
Using one single discount rate • When analyzing risk-free cash flows, it is important to capture the current term structure of interest rates: discount rates should vary with maturity. • When dealing with risky cash flows, the term structure is often ignored. • Present value are calculated using a single discount rate r, the same for all maturities. • Remember: this discount rate represents the expected return. • = Risk-free interest rate + Risk premium • This simplifying assumption leads to a few useful formulas for: • Perpetuities (constant or growing at a constant rate) • Annuities (constant or growing at a constant rate) MBA 2007 Present value
Constant perpetuity Proof: PV = C d + C d² + C d3 + … PV(1+r) = C + C d + C d² + … PV(1+r)– PV = C PV = C/r • Ct =C for t =1, 2, 3, ..... • Examples: Preferred stock (Stock paying a fixed dividend) • Suppose r =10% Yearly dividend = 50 • Market value P0? • Note: expected price next year = • Expected return = MBA 2007 Present value
Growing perpetuity • Ct=C1 (1+g)t-1 for t=1, 2, 3, .....r>g • Example: Stock valuation based on: • Next dividend div1, long term growth of dividend g • If r = 10%, div1 = 50, g = 5% • Note: expected price next year = • Expected return = MBA 2007 Present value
Constant annuity • A level stream of cash flows for a fixed numbers of periods • C1 = C2 = … = CT = C • Examples: • Equal-payment house mortgage • Installment credit agreements • PV = C * DF1 + C * DF2 + … + C * DFT+ • = C * [DF1 + DF2 + … + DFT] • = C * Annuity Factor • Annuity Factor = present value of €1 paid at the end of each T periods. MBA 2007 Present value
Constant Annuity • Ct = C for t = 1, 2, …,T • Difference between two annuities: • Starting at t = 1 PV=C/r • Starting at t = T+1 PV = C/r ×[1/(1+r)T] • Example: 20-year mortgage Annual payment = €25,000 Borrowing rate = 10% PV =( 25,000/0.10)[1-1/(1.10)20] = 25,000 * 10 *(1 – 0.1486) = 25,000 * 8.5136 = € 212,839 MBA 2007 Present value
Annuity Factors MBA 2007 Present value
Growing annuity • Ct = C1 (1+g)t-1 for t = 1, 2, …, T r ≠ g • This is again the difference between two growing annuities: • Starting at t = 1, first cash flow = C1 • Starting at t = T+1 with first cash flow = C1 (1+g)T • Example: What is the NPV of the following project if r = 10%? Initial investment = 100, C1 = 20, g = 8%, T = 10 NPV= – 100 + [20/(10% - 8%)]*[1 – (1.08/1.10)10] = – 100 + 167.64 = + 67.64 MBA 2007 Present value
Review: general formula • Cash flows: C1, C2, C3, … ,Ct, … CT • Discount factors: DF1, DF2, … ,DFt, … , DFT • Present value: PV = C1×DF1 + C2×DF2 + … + CT×DFT If r1 = r2 = ...=r MBA 2007 Present value
Review: Shortcut formulas • Constant perpetuity: Ct = C for all t • Growing perpetuity: Ct = Ct-1(1+g) r>g t = 1 to ∞ • Constant annuity: Ct=Ct=1 to T • Growing annuity: Ct = Ct-1(1+g) t = 1 to T MBA 2007 Present value
Compounding interval • Up to now, interest paid annually • If n payments per year, compounded value after 1 year : • Example: Monthly payment : • r = 12%, n = 12 • Compounded value after 1 year : (1 + 0.12/12)12= 1.1268 • Effective Annual Interest Rate: 12.68% • Continuous compounding: • [1+(r/n)]n→er(e= 2.7183) • Example : r = 12% e12= 1.1275 • Effective Annual Interest Rate : 12.75% MBA 2007 Present value
Juggling with compounding intervals • The effective annual interest rate is 10% • Consider a perpetuity with annual cash flow C = 12 • If this cash flow is paid once a year: PV = 12 / 0.10 = 120 • Suppose know that the cash flow is paid once a month (the monthly cash flow is 12/12 = 1 each month). What is the present value? • Solution 1: • Calculate the monthly interest rate (keeping EAR constant) (1+rmonthly)12 = 1.10 → rmonthly = 0.7974% • Use perpetuity formula: PV = 1 / 0.007974 = 125.40 • Solution 2: • Calculate stated annual interest rate = 0.7974% * 12 = 9.568% • Use perpetuity formula: PV = 12 / 0.09568 = 125.40 MBA 2007 Present value
Interest rates and inflation: real interest rate • Nominal interest rate = 10% Date 0 Date 1 • Individual invests $ 1,000 • Individual receives $ 1,100 • Hamburger sells for $1 $1.06 • Inflation rate = 6% • Purchasing power (# hamburgers) H1,000 H1,038 • Real interest rate = 3.8% • (1+Nominal interest rate)=(1+Real interest rate)×(1+Inflation rate) • Approximation: • Real interest rate ≈Nominal interest rate - Inflation rate MBA 2007 Present value