What Is the Compound Annual Growth Rate (CAGR)?
The compound annual growth rate (CAGR) is the rate of return (RoR) that would be required for an investment to grow from its beginning balance to its ending balance, assuming the profits were reinvested at the end of each period of the investment’s life span.
- The compounded annual growth rate (CAGR) is one of the most accurate ways to calculate and determine returns for anything that can rise or fall in value over time.
- Investors can compare the CAGR of two alternatives to evaluate how well one stock performed against other stocks in a peer group or a market index.
- The CAGR does not reflect investment risk.
Formula and Calculation of the Compound Annual Growth Rate (CAGR)
CAGR=(BVEV)n1−1×100where:EV=Ending valueBV=Beginning valuen=Number of years
To calculate the CAGR of an investment:
- Divide the value of an investment at the end of the period by its value at the beginning of that period.
- Raise the result to an exponent of one divided by the number of years.
- Subtract one from the subsequent result.
- Multiply by 100 to convert the answer into a percentage.
What the CAGR Can Tell You
The compound annual growth rate isn’t a true return rate, but rather a representational figure. It is essentially a number that describes the rate at which an investment would have grown if it had grown at the same rate every year and the profits were reinvested at the end of each year.
In reality, this sort of performance is unlikely. However, the CAGR can be used to smooth returns so that they may be more easily understood compared to alternative methods.
Example of How to Use CAGR
Imagine you invested $10,000 in a portfolio with the returns outlined below:
- From Jan. 1, 2018, to Jan. 1, 2019, your portfolio grew to $13,000 (or 30% in year one).
- On Jan. 1, 2020, the portfolio was $14,000 (or 7.69% from January 2019 to January 2020).
- On Jan. 1, 2021, the portfolio ended with $19,000 (or 35.71% from January 2020 to January 2021).
We can see that on an annual basis, the year-to-year growth rates of the investment portfolio were quite different as shown in the parentheses.
On the other hand, the compound annual growth rate smooths the investment’s performance and ignores the fact that 2018 and 2020 were vastly different from 2019. The CAGR over that period was 23.86% and can be calculated as follows:
The CAGR of 23.86% over the three-year investment period can help an investor compare alternatives for their capital or make forecasts of future values. For example, imagine an investor is comparing the performance of two uncorrelated investments.
In any given year during the period, one investment may be rising while the other falls. This could be the case when comparing high-yield bonds to stocks, or a real estate investment to emerging markets. Using CAGR would smooth the annual return over the period so the two alternatives would be easier to compare.
As another example, let’s say an investor bought 55 shares of Amazon.com (AMZN) stock in December 2017 at $1,180 per share, for a total investment of $64,900. After three years, in December 2020, the stock has risen to $3,200 per share, and the investor’s investment is now worth $176,000. What is the CAGR?
Using the CAGR formula, we know that we need the:
- Ending Balance: $176,000
- Beginning Balance: $64,900
- Number of Years: 3
So to calculate the CAGR for this simple example, we would enter that data into the formula as follows: [($176,000 / $64,900) ^ (1/3)] - 1 = 39.5%.
Additional CAGR Uses
The CAGR can be used to calculate the average growth of a single investment. As we saw in our example above, due to market volatility, the year-to-year growth of an investment will likely appear erratic and uneven.
For example, an investment may increase in value by 8% in one year, decrease in value by -2% the following year, and increase in value by 5% in the next. CAGR helps smooth returns when growth rates are expected to be volatile and inconsistent.
The CAGR can be used to compare different investment types with one another. For example, suppose that in 2015, an investor placed $10,000 into an account for five years with a fixed annual interest rate of 1% and another $10,000 into a stock mutual fund. The rate of return in the stock fund will be uneven over the next few years, so a comparison between the two investments would be difficult.
Assume that at the end of the five-year period, the savings account’s balance is $10,510.10 and, although the other investment has grown unevenly, the ending balance in the stock fund was $15,348.52. Using the CAGR to compare the two investments can help an investor understand the difference in returns:
Savings Account CAGR=($10,000$10,510.10)51−1×100=1.00%
Stock fund CAGR=($10,000$15,348.52)51−1×100=8.95%
On the surface, the stock fund may look like a better investment, with nearly nine times the return of the savings account. On the other hand, one of the drawbacks of the CAGR is that by smoothing the returns, The CAGR cannot tell an investor how volatile or risky the stock fund was.
The CAGR can also be used to track the performance of various business measures of one or multiple companies alongside one another. For example, over a five-year period, Big-Sale Stores’ market share CAGR was 1.82%, but its customer satisfaction CAGR over the same period was -0.58%. In this way, comparing the CAGRs of measures within a company reveals strengths and weaknesses.
Detect Weaknesses and Strengths
Comparing the CAGRs of business activities across similar companies will help evaluate competitive weaknesses and strengths. For example, Big-Sale’s customer satisfaction CAGR might not seem so low compared with SuperFast Cable’s customer satisfaction CAGR of -6.31% during the same period.
How Investors Use the CAGR
Understanding the formula used to calculate CAGR is an introduction to many other ways that investors evaluate past returns or estimate future profits. The formula can be manipulated algebraically into a formula to find the present value or future value of money, or to calculate a hurdle rate of return.
For example, imagine that an investor knows that they need $50,000 for a child’s college education in 18 years and they have $15,000 to invest today. How much does the average rate of return need to be to reach that objective? The CAGR calculation can be used to find the answer to this question as follows:
This version of the CAGR formula is just a rearranged present value and future value equation. For example, if an investor knew that they needed $50,000 and they felt it was reasonable to expect an 8% annual return on their investment, they could use this formula to find out how much they needed to invest to meet their goal.
Modifying the CAGR Formula
An investment is rarely made on the first day of the year and then sold on the last day of the year. Imagine an investor who wants to evaluate the CAGR of a $10,000 investment that was entered on June 1, 2013, and sold for $16,897.14 on Sept. 9, 2018.
Before the CAGR calculation can be performed, the investor will need to know the fractional remainder of the holding period. They held the position for 213 days in 2013, a full year in 2014, 2015, 2016, and 2017, and 251 days in 2018. This investment was held for 5.271 years, which is calculated by the following:
- 2013 = 213 days
- 2014 = 365
- 2015 = 365
- 2016 = 365
- 2017 = 365
- 2018 = 251
The total number of days that the investment was held was 1,924 days. To calculate the number of years, divide the total number of days by 365 (1,924/365), which equals 5.271 years.
The total number of years that the investment was held can be placed in the denominator of the exponent inside CAGR’s formula as follows:
Smooth Rate of Growth Limitation
The most important limitation of the CAGR is that because it calculates a smoothed rate of growth over a period, it ignores volatility and implies that the growth during that time was steady. Returns on investments are uneven over time, except bonds that are held to maturity, deposits, and similar investments.
Also, the CAGR does not account for when an investor adds funds to a portfolio or withdraws funds from the portfolio over the period being measured.
For example, if an investor had a portfolio for five years and injected funds into the portfolio during the five-year period, then the CAGR would be inflated. The CAGR would calculate the rate of return based on the beginning and ending balances over the five years, and would essentially count the deposited funds as part of the annual growth rate, which would be inaccurate.
Other CAGR Limitations
Besides the smoothed rate of growth, the CAGR has other limitations. A second limitation when assessing investments is that no matter how steady the growth of a company or investment has been in the past, investors cannot assume that the rate will remain the same in the future. The shorter the time frame used in the analysis, the less likely it will be for the realized CAGR to meet the expected CAGR when relying on historical results.
A third limitation of the CAGR is a limitation of representation. Say that an investment fund was worth $100,000 in 2016, $71,000 in 2017, $44,000 in 2018, $81,000 in 2019, and $126,000 in 2020. If the fund managers represented in 2021 that their CAGR was a whopping 42.01% over the past three years, they would be technically correct. They would, however, be omitting some very important information about the fund’s history, including the fact that the fund’s CAGR over the past five years was a modest 4.73%.
CAGR vs. IRR
The CAGR measures the return on an investment over a certain period of time. The internal rate of return (IRR) also measures investment performance but is more flexible than the CAGR.
The most important distinction is that the CAGR is straightforward enough that it can be calculated by hand. In contrast, more complicated investments and projects, or those that have many different cash inflows and outflows, are best evaluated using IRR. To back into the IRR, a financial calculator, Excel, or portfolio accounting system is ideal.
Those interested in learning more about CAGR and other financial topics may want to consider enrolling in one of the best investing courses currently available.
What Is an Example of Compound Annual Growth Rate (CAGR)?
The CAGR is a measurement used by investors to calculate the rate at which a quantity grew over time. The word “compound” denotes the fact that the CAGR takes into account the effects of compounding, or reinvestment, over time. For example, suppose you have a company with revenue that grew from $3 million to $30 million over a span of 10 years. In that scenario, the CAGR would be approximately 25.89%.
What Is Considered a Good CAGR?
What counts as a good CAGR will depend on the context. But generally speaking, investors will evaluate this by thinking about their opportunity cost as well as the riskiness of the investment. For example, if a company grew by 25% in an industry with an average CAGR closer to 30%, then its results might seem lackluster by comparison. But if the industry-wide growth rates were lower, such as 10% or 15%, then its CAGR might be very impressive.
What Is the Difference Between the CAGR and a Growth rate?
The main difference between the CAGR and a growth rate is that the CAGR assumes the growth rate was repeated, or “compounded,” each year, whereas a traditional growth rate does not. Many investors prefer the CAGR because it smooths out the volatile nature of year-by-year growth rates. For instance, even a highly profitable and successful company will likely have several years of poor performance during its life. These bad years could have a large effect on individual years’ growth rates but would have a relatively small impact on the company’s CAGR.
Can the CAGR be Negative?
Yes. A negative CAGR would indicate losses over time rather than gains.
What Is Risk-Adjusted CAGR?
To compare the performance and risk characteristics among various investment alternatives, investors can use a risk-adjusted CAGR. A simple method for calculating a risk-adjusted CAGR is to multiply the CAGR by one minus the investment’s standard deviation. If the standard deviation (i.e., its risk) is zero, then the risk-adjusted CAGR is unaffected. The larger the standard deviation, the lower the risk-adjusted CAGR will be.