Millionaire Dream!

Bob dougler

Rob Berger - Dough Roller

Here is where we calculate how long it will take you to be a millionaire. Let’s start with the Rule of 1.5, also known as Felix’s Corollary. This rule states that for a stream of investments (we’ll assume annual investments) where the number of years times the interest equals 72 (the Rule of 72 is back!), the ending value will equal approximately 1.5 times the amount invested. For example, investing $10,000 per year for 8 years at 9% interest (8 * 9 = 72), the value of the investments at the end of year 8 will equal about $120,000 ($10,000 * 8 * 1.5).

We can now use this information to create a How Long Will It Take You To Be A Millionaire calculator (the Rule of 1,080,000). Using Felix’s Corollary, all we need to do is figure out how long it will take you to save $720,000 at a given interest rate. Why $720,000? Because 720,000 times 1.5 equals 1,080,000 (which explains why I didn’t use 1,000,000). Trust me, this is easier than it looks.

For example, over 8 years to save $720,000 you need to save $90,000 per year. And at 9% annual interest, you would accumulate $1,080,000 over this 8 year period. Now I know must of us don’t have $90,000 per year to save, which is why most of us won’t accumulate a million dollars in 8 years. So let’s stretch it out to 16 years. Now what do we need to save to be a millionaire, again assuming a 9% rate of return? Well, using our friend the Rule of 72, we know that whatever we have saved over the first 8 years will double over the next 8 years because 72 divided by our interest rate of 9% equals 8.

So we can break the 16 year savings period into 3 equal portions: (1) what we save the first 8 years; (2) the doubling of this amount over the next 8 years; and (3) what we save the second 8 years. So 720,000 divided by 3 equals 240,000, which is what needs to be saved each of the two 8 year periods, or $30,000 per year. That comes out to $2,500 per month, which is doable for some.

If you want to estimate what it will take to be a millionaire in 24 years, just divide 720,000 by 7 (a question about this 7 comes at the end) and then again by 8. So, 720,000 divided by 8 equals 90,000 divided by 7 equals about $12,800. Thus, investing just over $1,000 per month at 9% interest over 24 years will make you a millionaire.

So the question for this last example is where does the number 7 come from? For 16 years we divided by 3, so why for 24 years are we dividing by 7? Leave a comment to let us know what you think. And finally, if the Rules of 1.5 and 1,080,000 on a Monday morning are just too much to take, you can always check out this Millionaire Calculator.

Formula

 Compound interest, or 'interest on interest', is calculated with the compound interest formula. The formula for compound interest is P (1 + r/n)^(nt), where P is the initial principal balance, r is the interest rate, n is the number of times interest is compounded per time period and t is the number of time 

Rule of 70

 How inflation erodes your investment

Rule of 144

 Four times

Advertiser Disclosure

Nifty Tricks with the Rule of 72, 71, 70, 69.3, 114, 144 and My Favorites, 1.5 and 1,080,000

Written by

Rob Berger

Modified date: November 11, 2020

Editor's note - You can trust the integrity of our balanced, independent financial advice. We may, however, receive compensation from the issuers of some products mentioned in this article. Opinions are the author's alone. This content has not been provided by, reviewed, approved or endorsed by any advertiser, unless otherwise noted below.

If you read my article, Can You Solve this Math Problem, than you know I enjoy math. Numbers have always been my friend, and I have a few to share with you today. So let’s get to it.

Rule of 72

Many of you have heard of the Rule of 72, but let’s review just in case. To estimate the time it will take to double your money, divide 72 by the expected growth rate, expressed as a percentage. For example, if you expect to earn 10% per year on a $10,000 investment, it will double to $20,000 in about 7.2 years (72 / 10).

Now here is a neat way to use the Rule of 72 to determine annual growth rate. Let’s assume that in year 1 a company earned $2 per share, and by year 8 it was earning $8 per share. What was the annual EPS growth rate? Using the Rule of 72 makes answering this question easy. First, how many times did the EPS double over the eight year period? It doubled once from $2 to $4 and a second time from $4 to $8. Doubling twice in eight years means that the EPS doubled once every four years. Using the Rule of 72, we know that to double in 4 years the EPS must have grown at an annual compound rate of 18 (72 / 4). So the company’s EPS have grown at an annual rate of 18% over the past 8 years.

By the way, you can do the same thing to determine the growth rate of your salary (if that’s your thing). And you can use the Rule of 72 to determine, at a given inflation rate, how long it will take for your money to buy half of what it can by today (depressing).

The Rules of 71, 70 and 69.3

These rules are for us math geeks. They do the same thing as the Rule of 72, but are considered more accurate depending on the interest rate and compounding period (e.g., continuous, daily, annually). The rule of 71 is the most accurate when dealing with annual compounding. And the rule of 69.3 is more accurate for continuous or daily compounding. The Rule of 70 comes in because who wants to divide an interest rate into a number like 69.3? Ok, some do, but many don’t.

The Rules of 114 and 144

The Rules of 114 and 144 take the Rule of 72 to the next level. Rule of 114 can be used to determine how long it will take an investment to triple, and the Rule of 144 will tell you how long it will take an investment to quadruple. For example, at 10% an investment will triple in about 11 years (114 / 10) and quadruple in about 14.5 years (144 /10).

There is an important implication to the Rules of 72, 114 and 144. Notice that the numbers don’t double? That is, while it takes the interest rate divided into 72 to double, the interest rate divided into 144 doesn’t triple, it quadruples! That’s the power of compounding. And what’s the moral of this story–Save early and save often.

Rule of 114

 Three times

MONEY MATTERS-7

 POWER OF COMPOUNDING

The basic formula for compounding is

FV = PV × (1+r)ⁿ

where FV = Future Value
PV = Present Value
r = annual interest rate
n = number of periods

For example if PV is 1000,

Annual interest rate is 10%

Compounding for 5 years

The Future value will be  RS.1610.50

Compare this with simple interest. 

The future value on simple interest basis is Rs.1500 only

In other words, interest earned is higher by 22.1% at end of 5 years!

Here is how Rs.100000 multiplies when compounded at 6, 8 & 10 per cent p.a over

5,10& 15 year periods.

Years/int rate       6        8        10

5 yes                  1.34    1.47   1.61

10 yrs                 1.79     2.15   2.59

15 yrs                 2.40      3.17   4.18

(Rs. in lacs)

This shows that even a small difference of 

2 per cent makes a big difference in earnings over a period!

Also longer the period of compounding higher is the total amount at the end!

So, it is clear now one should start early to sav 

and even a small difference in rate of interest increases the final savings significantly.

Keep this in mind and more important teach your children to START SAVING EARLY and REGULARLY. 

People should start saving right from the first pay check. 

Remember to save a minimum per cent of your salary. Savings should be the first expense!

I said ‘ a per cent’ . This will imply that the absolute amount of savings increase with rising salary levels. See for yourself how the compounding would make greater impact on final amount, using the above formula. 

Interesting, Isn’t it? Compound Interest is interesting!

 MONEY MATTERS-6

Rule of 72

When interest is compounded periodically, it is added to the principal for the next period and so on until maturity. Before we study about the power of compounding, let us see the Rule of 72 as a first step.

This rule is the rule of thumb to know the interest rate or the period of compounding, given one of them for DOUBLING a principal.

As per this Rule, a principal doubles approximately, when the product of interest rate and the duration (in years) is 72. This ‘72’ is constant. For example, where a deposit carries interest rate of 12 per cent, it doubles in 6 years. Similarly, a deposit doubles in 2 years when interest rate is 36 per cent; in 3 years when interest rate is 24 per cent;

in 4 years when interest rate is 18 per cent; in 5 years when interest rate is 14.4 per cent; and in 6 years when interest rate is 12 per cent.

This rule is useful to know approximately when an amount doubles at a given interest rate or to know the implied interest rate when the period in which the amount doubles is known. Test it and understand the basic of compounding. You can show yourself off as a wizard to those who’s ready new to this Rule.

We are now ready to devolve deeply into understanding the power of compounding. Wait for the next write up!