Dividend Discount Model: Difference between revisions
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The '''Dividend Discount Model''' (DDM) is a widely used approach to value common stocks. Financial theory | The '''Dividend Discount Model''' (DDM) is a widely used approach to value common stocks. Financial theory states that the value of any securities is worth the present value of all future cash flow the owner will receive. If we assume that stock investor receive all their cash fow in the form of dividend, a DDM will give the intrinsic value for a stock. | ||
A [[common stock]] can be tough as the right to receive future [[dividend]]s. A stock's intrincic value can be defined as the value of all future dividends discounted at the appropriate discount rate. In its simpliest form, the DDM uses, as [[discount rate]], the investor's required rate of return. | A [[common stock]] can be tough as the right to receive future [[dividend]]s. A stock's intrincic value can be defined as the value of all future dividends discounted at the appropriate discount rate. In its simpliest form, the DDM uses, as [[discount rate]], the investor's required rate of return. | ||
Mathematically, it can be expressed as: | |||
<math>V_0=\sum_{t=1}^{N} \frac{D_t}{(1+k)^n}</math>, | |||
where <math>D_t</math> is the expected dividend in period <math>t</math> and <math>k</math> is the required rate of return for the investor. | |||
From this formula, one can deduct that the most important components of the value of a stock are likely to be the size and the timing of the expected dividend. The larger it is, and the more quick the shareholder receive it, the higher the share value will be. | |||
==Assumptions of the model== | ==Assumptions of the model== | ||
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In that case, the price of the stock would be equal to: | In that case, the price of the stock would be equal to: | ||
<math>P_0=\frac{D}{1+k}+\frac{D(1+g)}{(1+k)^2}+\frac{D(1+g)^2}{(1+k)^3}+...=\frac{ | <math>P_0=\frac{D}{1+k}+\frac{D}{(1+k)^2}+\frac{D}{(1+k)^3}+...=\frac{D}{k}</math>, | ||
where <math>D</math> is the expected constant dividend and <math>k</math> is the required rate of return for the investor. | |||
==Constant growth of the dividend== | |||
In the case where the dividend is expected to grow at a definite constant growth rate <math>g</math>, the value of the stock will be equal to | |||
<math>P_0=\frac{D}{1+k}+\frac{D(1+g)}{(1+k)^2}+\frac{D(1+g)^2}{(1+k)^3}+...</math> | |||
<math>P_0=\frac{D_1}{(k-g)}</math>. | |||
It is also known as the [[Gordon Model]] for evaluating stocks. | |||
==Supernormal growth model== | |||
==See Also== | ==See Also== |
Revision as of 07:27, 9 November 2006
The Dividend Discount Model (DDM) is a widely used approach to value common stocks. Financial theory states that the value of any securities is worth the present value of all future cash flow the owner will receive. If we assume that stock investor receive all their cash fow in the form of dividend, a DDM will give the intrinsic value for a stock.
A common stock can be tough as the right to receive future dividends. A stock's intrincic value can be defined as the value of all future dividends discounted at the appropriate discount rate. In its simpliest form, the DDM uses, as discount rate, the investor's required rate of return.
Mathematically, it can be expressed as: ,
where is the expected dividend in period and is the required rate of return for the investor.
From this formula, one can deduct that the most important components of the value of a stock are likely to be the size and the timing of the expected dividend. The larger it is, and the more quick the shareholder receive it, the higher the share value will be.
Assumptions of the model
- The future value of dividend is know by the investor.
- Dividends are expected to be distributed at the end of each year until infinity.
- Dividends are the only way inversors get money back from the company. This implies that any share buyback would be ignored.
Inputs to the model
To estimate the value of a common share, one must know at least:
- : the expected dividend to be received in one year;
- : the required rate of return on the investment. There are many methods to estimate this required rate of return, the most common is the Nobel-prize reward Capital Asset Pricing Model;
- : the expected growth rate in dividends.
If no growth in dividends
In the case where the dividend is not expected to growth in the future (), then the stock is also known as a perpetuity.
In that case, the price of the stock would be equal to:
,
where is the expected constant dividend and is the required rate of return for the investor.
Constant growth of the dividend
In the case where the dividend is expected to grow at a definite constant growth rate , the value of the stock will be equal to
.
It is also known as the Gordon Model for evaluating stocks.