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Just saw this old thread. I think the OP misunderstood a few crucial points:
1) Just as the value of your assets are impacted by inflation so to will the real value of your debts shrink over time due to inflation.
2) Interest costs are tax deductible against the dividends
3) franking credits which in some instances can be used to offset income taxes from other sources.
Let use as an example of a hypothetical company who over a 10 year period gives a return which is in line with long-term market averages of around 10 or 11% per annum (nominal/gross). Let us assume that the tax payer is on the 32.5% marginal tax bracket (for incomes between $37,001 and $90,000). The below example assumes income is spent rather than reinvested.
Lets say you buy shares in ABC corporation at $10 per share. You buy 1000 shares ($10,000). You use $6500 of your own money and borrow $3500 on a margin loan. You pay 5.8% interest on your margin loan (a readily available current market rate for a one year fixed margin loan). We assume interest rates (and margin loan rates) remain the same over the ten year period.
Over a 10 year period you get annually 4% fully franked dividends plus 6% capital growth. Let us assume that dividends increase due to earnings growth at the same rate as share price growth of 6% per annum. Note: all figures are rounded down to the nearest dollar.
So here is what the cashflow situation will look like when geared:
Year 1: dividends received: $400. Franking Credits received: $171. Interest paid: $203.
Therefore cash flow situation is: $400 dividend - $203 interest = $197. 32% Tax payable on $197 is $63.
$197 in net dividends - $63 tax plus $171 franking credits = net cashflow $305.
Year 2: dividends received: $424. Franking Credits received:$181. Interest paid: $203. Tax payable on $221 is $70.
$424 - $203 interest = $221 - $70 = $151 + $181 (franking credits) = $332 net cash flow.
Year 3: net cashflow = ($449 + $193) - ($203 + $78)= $361 net cash flow.
Year 4: net cash flow = ($476 + $204) - ($203 + $87) = $390 net cash flow.
Year 5 net cash flow = ($504 + $216) - ($203 + $96) = $421 net cash flow.
Year 6 net cash flow= ($535 + $229) - ($203 + 106) = $455 net cash flow.
year 7 net cash flow= ($567 + $243) - ($203 + $116) = $491 net cash flow.
Year 8 net cash flow= ($601 + $257) - (203 + $127) = $528 net cashlow.
Year 9 net cash flow= ($637 + $273) - ($203 + $138)= $569 net cash flow.
Year 10 net cash flow= ($675 + $290) - ($203 + $151) = $611 net cash flow.
Initial investment: $10,000. $10,000 compounded at 6% per annum for 10 years = $17908 - $3500 margin loan = $14,408 in equity (compared to starting equity of $6500)
Scenario 2 is you buy $6500 worth of shares without borrowing any money:
Year 1 net cash flow= $260 dividend + $111 franking credits - $83 tax = $288 net cash flow.
Year 2 = $275 dividend + $118 franking credits - $88 tax = $305 net cash flow.
So you can see compared to the first example of buying shares on margin produces more cash flow than buying shares un-geared (when interest rates are low). Also capital growth in the example is higher when gearing is used. Ending equity after 10 years when gearing is used is $14,408. Without gearing starting equity is also $6500 but ending equity is only $11,640.
In the example I have given the total return over a ten year period (equity growth plus cash flow) will be more than 50% (on the initial $6500 investment) higher using the geared strategy.
Of course my example is simplified and real life is a bit more complicated than that but its a good overall illustration of the general principle. So basically to summarize when interest rates are low as they currently are it is very easy to enhance both cash flow and capital gains using leverage. Obviously the strategy generally does not work when interest rates are high.
1) Just as the value of your assets are impacted by inflation so to will the real value of your debts shrink over time due to inflation.
2) Interest costs are tax deductible against the dividends
3) franking credits which in some instances can be used to offset income taxes from other sources.
Let use as an example of a hypothetical company who over a 10 year period gives a return which is in line with long-term market averages of around 10 or 11% per annum (nominal/gross). Let us assume that the tax payer is on the 32.5% marginal tax bracket (for incomes between $37,001 and $90,000). The below example assumes income is spent rather than reinvested.
Lets say you buy shares in ABC corporation at $10 per share. You buy 1000 shares ($10,000). You use $6500 of your own money and borrow $3500 on a margin loan. You pay 5.8% interest on your margin loan (a readily available current market rate for a one year fixed margin loan). We assume interest rates (and margin loan rates) remain the same over the ten year period.
Over a 10 year period you get annually 4% fully franked dividends plus 6% capital growth. Let us assume that dividends increase due to earnings growth at the same rate as share price growth of 6% per annum. Note: all figures are rounded down to the nearest dollar.
So here is what the cashflow situation will look like when geared:
Year 1: dividends received: $400. Franking Credits received: $171. Interest paid: $203.
Therefore cash flow situation is: $400 dividend - $203 interest = $197. 32% Tax payable on $197 is $63.
$197 in net dividends - $63 tax plus $171 franking credits = net cashflow $305.
Year 2: dividends received: $424. Franking Credits received:$181. Interest paid: $203. Tax payable on $221 is $70.
$424 - $203 interest = $221 - $70 = $151 + $181 (franking credits) = $332 net cash flow.
Year 3: net cashflow = ($449 + $193) - ($203 + $78)= $361 net cash flow.
Year 4: net cash flow = ($476 + $204) - ($203 + $87) = $390 net cash flow.
Year 5 net cash flow = ($504 + $216) - ($203 + $96) = $421 net cash flow.
Year 6 net cash flow= ($535 + $229) - ($203 + 106) = $455 net cash flow.
year 7 net cash flow= ($567 + $243) - ($203 + $116) = $491 net cash flow.
Year 8 net cash flow= ($601 + $257) - (203 + $127) = $528 net cashlow.
Year 9 net cash flow= ($637 + $273) - ($203 + $138)= $569 net cash flow.
Year 10 net cash flow= ($675 + $290) - ($203 + $151) = $611 net cash flow.
Initial investment: $10,000. $10,000 compounded at 6% per annum for 10 years = $17908 - $3500 margin loan = $14,408 in equity (compared to starting equity of $6500)
Scenario 2 is you buy $6500 worth of shares without borrowing any money:
Year 1 net cash flow= $260 dividend + $111 franking credits - $83 tax = $288 net cash flow.
Year 2 = $275 dividend + $118 franking credits - $88 tax = $305 net cash flow.
So you can see compared to the first example of buying shares on margin produces more cash flow than buying shares un-geared (when interest rates are low). Also capital growth in the example is higher when gearing is used. Ending equity after 10 years when gearing is used is $14,408. Without gearing starting equity is also $6500 but ending equity is only $11,640.
In the example I have given the total return over a ten year period (equity growth plus cash flow) will be more than 50% (on the initial $6500 investment) higher using the geared strategy.
Of course my example is simplified and real life is a bit more complicated than that but its a good overall illustration of the general principle. So basically to summarize when interest rates are low as they currently are it is very easy to enhance both cash flow and capital gains using leverage. Obviously the strategy generally does not work when interest rates are high.
