Financial Resources Formulary: Unterschied zwischen den Versionen
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== Present values, perpetuities and annuities == | == Present values, perpetuities and annuities == | ||
'''Present value PV:''' value of a future payment C<sub>t</sub> (in year t), discounted to year 0: [[Datei: | '''Present value PV:''' value of a future payment C<sub>t</sub> (in year t), discounted to year 0: [[Datei:Form_PV.png]] | ||
'''Future value FV<sub>t</sub>:''' value of a present payment (in year 0), calculated by compounding to year t: [[Datei: | '''Future value FV<sub>t</sub>:''' value of a present payment (in year 0), calculated by compounding to year t: [[Datei:Form_FV.png]]<br/> | ||
: t year<br/> | : t year<br/> | ||
: r [[Kalkulationszinssatz|discount rate]] (interest rate)<br/> | : r [[Kalkulationszinssatz|discount rate]] (interest rate)<br/> | ||
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'''Equivalent annual cash flow (EAC):''' cash flow per year with the same present value as the actual cash flow of the project: [[Datei:Form_EAC.png]] | '''Equivalent annual cash flow (EAC):''' cash flow per year with the same present value as the actual cash flow of the project: [[Datei:Form_EAC.png]] | ||
== Interest and discount rates == | == Interest and discount rates == |
Version vom 4. Dezember 2011, 13:52 Uhr
by Clemens Werkmeister
Present values, perpetuities and annuities
Present value PV: value of a future payment Ct (in year t), discounted to year 0:
Future value FVt: value of a present payment (in year 0), calculated by compounding to year t:
- t year
- r discount rate (interest rate)
- discount factor with discount rate (interest rate) r for t years
- Ct cash flow in year t
- C0 initial investment of a project (for normal investment projects: C0 < 0)
- T number of years of the project
The sum of several present values is a PV, too (additivity of present values):
Net present value NPV: PV of future payments (of a project or a company) plus the - usually negative - initial investment C0:
Perpetuity (console): a periodic (annual) payment C that is received or paid forever (beginning with the first payment at the end of year 1):
Annuity: a payment of a level cash flow C during a specified number of years (from year 1 to n). Its present value can be calculated as difference between two perpetuities:
Annuity (recovery) factor: average payment at the end of n periods, corresponding to a present value PV and considering for interest rate r:
Annuity present value factor: factor for the PV of n equal payments at the end of years 1 to n:
The annuity C for years 1 to n corresponding to a present value PV and discount rate r is:
Growing perpetuity: a perpetuity starting with cash flow C1 in year 1 and increasing by the annual growth rate g forever: (for t = 1, 2, …, ∞ ;g < r) and
Growing annuity: an annuity starting with cash flow C1 in year 1 and increasing by the annual growth rate g for n years: (with t = 1, 2, …, n)
Internal rate of return (IRR): discount rate that results in NPV = 0:
Profitability index: ratio of NPV to investment of a project:
Equivalent annual cash flow (EAC): cash flow per year with the same present value as the actual cash flow of the project:
Interest and discount rates
Effective annual rate (EAR): annualized rate of shorter period interest rates (monthly, daily rates) using compound interest:
- - EAR for a monthly rate m: EAR = (1+m)12 – 1
- - EAR for a daily rate d: EAR = (1+d)360 – 1 (for 360 days per year)
Annual percentage rate (APR) or simple rate: annualized rate of shorter period interest rates (monthly, daily rates) using simple interest.
- - APR for a monthly rate m: APR = 12 * m
Given an annual percentage rate (APR) of r, the corresponding EAR with respect to n shorter periods of equal length is:
Effective annual rate with continuous compounding: effective annual rate for n → ∞ shorter periods: (being r the simple annual rate)
Real rate of return: rate of return adjusted for inflation: → (being i the inflation rate)
Valuing bonds
- Ct annual coupon interest payment
- F face value (or principal)
- r discount rate (yield to maturity)
- N maturity
Duration of a bond with maturity N: weighted average period of bond payments:
Modified duration: a measure of volatility (elasticity) of bond prices:
Valuing stocks
(Expected) Stock return r (equity cost of capital):
Stock price P0 in the single-period case:
Dividend discount model for the stock price P0 in the multi-period case until time horizon H:
Stock price P0 with specific dividends until time horizon H and growing dividends after H:
Stock price for a perpetual stream of dividends:
Stock price for a perpetual stream of growing dividends:
Return (Equity cost of capital) of a perpetual stream of dividends with growth:
Return on Equity with market values:
Payout ratio: fraction of earnings paid out as dividends:
Plowback ratio: fraction of earnings retained by the firm:
Present value of growth opportunities (PVGO): net present value of a firm's future investments.
Sustainable growth rate: rate at which a firm can steadily grow:
Discounted cash flow (DCF): value of the free cash flows that are available to investors plus company value at the planning horizon, all discounted to present:
Risk and return
Risk premium of an asset: asset return – return of risk-free asset.
Variance: expected value of squared deviations of observations from their expected value (mean): (based on j observations)
Standard deviation: a measure of volatility of expected stock returns:
Expected portfolio return (with two assets):
Expected portfolio return (with j = 1, …, n assets):
- xj weight of asset j in the portfolio
- rj (expected) return of asset j
Variance of portfolio return (portfolio variance) in the case of two assets:
Covariance between asset i and j with
Correlation coefficient between asset i and j:
Variance of portfolio return (portfolio variance) in the case of n assets:
Beta of the return of asset j to the market return (return of market portfolio m):
Expected return following the security market line equation (SML):
Expected return of a stock in event studies:
Abnormal return = actual return – expected return =
Capital Structure and Return
Weighted average cost of capital (WACC):
- rD interest rate on debt resp. debt cost of capital
- rE return on equity resp. equity cost of capital
- Tc corporate tax rate
Weighted average cost of capital (WACC) with a zero-tax rate:
Leverage-formula for return on equity: return on equity increases with debt/equity-ratio:
Leverage-formula for equity beta: risk increases with debt/equity-ratio: