In discounted cash flow (DCF) valuation techniques the value of the stock is estimated based upon present value of some measure of cash flow. Free cash flow to equity (FCFE) is generally described as cash flows available to the equity holder after payments to debt holders and after allowing for expenditures to maintain the company asset base.
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Delta Air Lines Inc. pages available for free this week:
- Income Statement
- Common-Size Balance Sheet: Assets
- Analysis of Liquidity Ratios
- Analysis of Solvency Ratios
- Analysis of Short-term (Operating) Activity Ratios
- Enterprise Value (EV)
- Enterprise Value to EBITDA (EV/EBITDA)
- Selected Financial Data since 2007
- Net Profit Margin since 2007
- Total Asset Turnover since 2007
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Intrinsic Stock Value (Valuation Summary)
Delta Air Lines Inc., free cash flow to equity (FCFE) forecast
US$ in millions, except per share data
Year | Value | FCFE_{t} or Terminal value (TV_{t}) | Calculation | Present value at |
---|---|---|---|---|
0^{1} | FCFE_{0} | |||
1 | FCFE_{1} | = × (1 + ) | ||
2 | FCFE_{2} | = × (1 + ) | ||
3 | FCFE_{3} | = × (1 + ) | ||
4 | FCFE_{4} | = × (1 + ) | ||
5 | FCFE_{5} | = × (1 + ) | ||
5 | Terminal value (TV_{5}) | = × (1 + ) ÷ ( – ) | ||
Intrinsic value of Delta Air Lines Inc. common stock | ||||
Intrinsic value of Delta Air Lines Inc. common stock (per share) | ||||
Current share price |
Based on: 10-K (reporting date: 2021-12-31).
^{1} See details »
Disclaimer!
Valuation is based on standard assumptions. There may exist specific factors relevant to stock value and omitted here. In such a case, the real stock value may differ significantly form the estimated. If you want to use the estimated intrinsic stock value in investment decision making process, do so at your own risk.
Required Rate of Return (r)
Assumptions | ||
Rate of return on LT Treasury Composite^{1} | R_{F} | |
Expected rate of return on market portfolio^{2} | E(R_{M}) | |
Systematic risk of Delta Air Lines Inc. common stock | β_{DAL} | |
Required rate of return on Delta Air Lines Inc. common stock^{3} | r_{DAL} |
^{1} Unweighted average of bid yields on all outstanding fixed-coupon U.S. Treasury bonds neither due or callable in less than 10 years (risk-free rate of return proxy).
^{2} See details »
^{3} r_{DAL} = R_{F} + β_{DAL} [E(R_{M}) – R_{F}]
= + [ – ]
=
FCFE Growth Rate (g)
Based on: 10-K (reporting date: 2021-12-31), 10-K (reporting date: 2020-12-31), 10-K (reporting date: 2019-12-31), 10-K (reporting date: 2018-12-31), 10-K (reporting date: 2017-12-31).
2021 Calculations
^{1} Retention rate = (Net income (loss) – Dividends declared) ÷ Net income (loss)
= ( – ) ÷
=
^{2} Profit margin = 100 × Net income (loss) ÷ Operating revenue
= 100 × ÷
=
^{3} Asset turnover = Operating revenue ÷ Total assets
= ÷
=
^{4} Financial leverage = Total assets ÷ Stockholders’ equity
= ÷
=
^{5} g = Retention rate × Profit margin × Asset turnover × Financial leverage
= × × ×
=
Year | Value | g_{t} |
---|---|---|
1 | g_{1} | |
2 | g_{2} | |
3 | g_{3} | |
4 | g_{4} | |
5 and thereafter | g_{5} |
where:
g_{1} is implied by PRAT model
g_{5} is implied by single-stage model
g_{2}, g_{3} and g_{4} are calculated using linear interpoltion between g_{1} and g_{5}
Calculations
g_{2} = g_{1} + (g_{5} – g_{1}) × (2 – 1) ÷ (5 – 1)
= + ( – ) × (2 – 1) ÷ (5 – 1)
=
g_{3} = g_{1} + (g_{5} – g_{1}) × (3 – 1) ÷ (5 – 1)
= + ( – ) × (3 – 1) ÷ (5 – 1)
=
g_{4} = g_{1} + (g_{5} – g_{1}) × (4 – 1) ÷ (5 – 1)
= + ( – ) × (4 – 1) ÷ (5 – 1)
=