Sentences with phrase «nominal dividend amounts»
My investigation S&P 500 Dividend Growth shows that nominal dividend amounts (i.e., before adjusting for inflation) have behaved very well since the middle of the twentieth century.
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Nominal dividend amounts have not fallen more than 5 % since then.
Keep in mind that these are growth rates of the NOMINAL dividend amount.
The Dow Jones Utilities Average nominal dividend amount is almost entirely unrelated to the earnings yield 100E10 / P of the S&P 500.
This is because the growth rate in the nominal dividend amount is usually steady, but inflation jumps around considerably.
Not exact matches
The faster I can build my capital, the greater the nominal amounts of dividends I will receive when I convert back into a dividend portfolio.
While the yield looks good, the nominal amount of dividends I actually received is rather bad.
Judging from the S&P 500 index during stagflation, you can always expect the (nominal) dividend amount to grow, but not necessarily as fast as inflation.
The formula for the real income of an investment at year N is: Inflation adjusted dividend income = (initial dividend amount) * -LCB-[1 + (nominal dividend growth rate)-RSB- ^ N -RCB- / -LCB-[1 + (inflation rate)-RSB- ^ N -RCB- Typically, you would use a nominal dividend growth rate of 5.5 % per year in the absence of other information and 3 % per year inflation.
If so, the formula becomes: Inflation adjusted dividend income = (initial dividend amount) * (1.055 ^ N) / (1.03 ^ N) With preferred stock and / or bond income, use a nominal dividend growth rate of 0 %.
Dividend amounts rise steadily in terms of NOMINAL (without adjustments for inflation) dollars.
You should be able to construct a highly diversified portfolio with an initial dividend yield above 4 % that grows its dividend amount at least as fast as 5.5 % per year (nominal).
Judging from the S&P 500 index during stagflation, you can always expect the (nominal) dividend amount to grow.
Using a final dividend amount of $ 20.00 and an initial dividend amount of $ 1.4867, the rate is 5.03 % per year (nominal).
Similarly, at 5.5 % nominal growth, the dividend amount increases to 3.0 % * (1.307) = 3.92 % of the original balance at Year 5 and 3.0 % * (1.708) = 5.12 % of the original balance at Year 10.
At 4 % nominal growth, the dividend amount increases to 3.0 % * (1.217) = 3.65 % of the original balance at Year 5 and 3.0 % * (1.480) = 4.44 % of the original balance at Year 10.
I multiplied dividend yields and prices to calculate (nominal) dividend amounts.
The initial dividend yield is the same, regardless of whether you are using nominal or real dollar amounts.