CAGR Calculator
Use this cagr calculator calculator to understand your numbers quickly and make clearer decisions with confidence.
What Is CAGR?
CAGR (Compound Annual Growth Rate) is the rate at which an investment, revenue, or metric would have grown if it had grown at a steady, compounded rate each year over a specified time period. It represents the smoothed average annual growth rate — eliminating the noise of volatile year-to-year fluctuations to show the underlying trend.
CAGR is ubiquitous in finance and business: analysts use it to compare investments across different asset classes, CEOs cite it in earnings calls to benchmark revenue growth against peers, and individual investors use it to evaluate whether their portfolio is outperforming the S&P 500. Use the CAGR calculator above to compute the compound growth rate between any two values over any time period.
Investment Performance
Investors use CAGR to measure portfolio returns: a $10,000 investment that became $25,937 in 10 years has a CAGR of 10.0% — matching the S&P 500 historical average. Without CAGR, volatile year-to-year returns make it nearly impossible to compare strategies.
Business Revenue Growth
Companies include CAGR in investor presentations to show revenue or earnings growth trends. A SaaS company with $1M ARR in 2019 and $5M in 2024 has a revenue CAGR of 37.97% — a compelling growth narrative for investors evaluating the business.
Goal Planning
Use CAGR in reverse: if you want $1,000,000 in 20 years starting with $100,000, you need a 12.2% CAGR. This reverse-engineering approach helps you select investment vehicles, set savings targets, and make realistic financial projections.
Compound growth (CAGR) dramatically outpaces linear growth over time. See benchmark comparison table →
CAGR Formula Explained
Three formulas power all CAGR calculations: the core CAGR formula, its inverse for computing future value, and the logarithm-based formula for calculating how many years are required to reach a target.
① CAGR Formula
| Variable | Meaning | Example |
|---|---|---|
| CAGR | Compound Annual Growth Rate (the result) | → 9.60% per year |
| EV | Ending Value (final period value) | $25,000 |
| BV | Beginning Value (starting period value) | $10,000 |
| n | Number of years in the period | 10 years |
Worked example: $10,000 → $25,000 in 10 years:
CAGR = (25,000 / 10,000)1/10 − 1 = 2.50.1 − 1 = 1.09648 − 1 = 9.60%/year
② Future Value Formula (CAGR Inverse)
Example: $10,000 at 10% CAGR for 20 years:
FV = $10,000 × (1.10)20 = $10,000 × 6.7275 = $67,275
This is the power of compound growth: $10,000 becomes $67,275 — a 573% gain.
③ Years to Reach Target
Example: Growing $10,000 to $100,000 at 10% CAGR:
n = ln(10) / ln(1.10) = 2.3026 / 0.09531 = 24.16 years
④ Rule of 72 (Doubling Time Shortcut)
Mental math shortcut: At 10% CAGR → doubles in 72/10 = 7.2 years.
At 8% CAGR → 9 years. At 12% → 6 years. At 6% → 12 years. At 3.5% (inflation) → 20.6 years.
The exact formula is Years = ln(2)/ln(1+CAGR). Rule of 72 is accurate within 0.4 years for rates between 2–20%.
CAGR Benchmark Reference Table
Historical CAGR benchmarks by asset class for $10,000 invested in 2004 (20-year horizon). Use the Compare Rates mode to run any custom comparison against these benchmarks.
| Asset Class | ~CAGR | $10K → 10yr | $10K → 20yr | $10K → 30yr | Doubles in | Notes |
|---|---|---|---|---|---|---|
| S&P 500 Index | 10.5% | $27,141 | $73,664 | $199,936 | 7.0 yrs | Historical (dividends reinvested), pre-tax |
| NASDAQ Composite | 11.8% | $30,478 | $92,891 | $283,062 | 6.2 yrs | Higher growth + volatility vs S&P |
| Total World Stock | 8.5% | $22,610 | $51,120 | $115,583 | 8.5 yrs | Global diversification, lower volatility |
| US Real Estate (REITs) | 8.0% | $21,589 | $46,610 | $100,627 | 9.0 yrs | Inflation hedge, income component |
| Gold | 7.8% | $21,072 | $44,402 | $93,572 | 9.3 yrs | Volatile; no yield; inflation hedge |
| US Aggregate Bonds | 4.0% | $14,802 | $21,911 | $32,434 | 18.0 yrs | Lower risk; income; rate-sensitive |
| Treasury Bills | 2.5% | $12,801 | $16,386 | $20,976 | 28.8 yrs | Near risk-free; tracks Fed Funds rate |
| US CPI Inflation | 3.5% | $14,106 | $19,898 | $28,068 | 20.6 yrs | Purchasing power erosion benchmark |
| High-Yield Savings | 4.5% | $15,530 | $24,117 | $37,453 | 16.0 yrs | As of 2024; varies with Fed policy |
5 Key Uses of CAGR in Finance and Business
Evaluating Investment Returns
CAGR is the standard for comparing investment performance. When an advisor says "this fund returned 12.3% annually over the past 10 years," they mean CAGR. It eliminates the misleading effect of taking the simple average of annual returns (the AAGR), which overstates performance in volatile markets.
Corporate Revenue Growth Analysis
In earnings reports and pitch decks, companies report revenue CAGR as the headline growth metric. A SaaS company at 35% revenue CAGR signals hypergrowth. A consumer staples company at 5% CAGR signals stability. The 3-year and 5-year CAGR are the most commonly cited periods in investor relations materials.
Comparing Mutually Exclusive Investments
When choosing between two investments over different time horizons with different starting/ending values, CAGR provides the apples-to-apples comparison. Compare the CAGR of starting a business ($100K → $850K in 7 years = 36.3%) vs an index fund ($100K → $271K in 10 years = 10.5%) to make rational capital allocation decisions.
Technology Adoption & Market Projections
Market research reports ($3,500 each from research firms) always lead with CAGR. "The global AI market will grow at a 36.6% CAGR through 2030" means the market size compounds at that rate each year. These projections help VCs, strategists, and corporate planners assess entry timing and TAM expansion.
Personal Financial Goal Reverse-Engineering
The most powerful personal finance use of CAGR: work backward from your goal. Target $2M in 25 years with $100K today? Required CAGR = (2,000,000/100,000)^(1/25) − 1 = 13.1%/yr — above S&P 500 historical, requiring either superior stock selection or leverage. This tells you immediately whether your goal is realistic.
CAGR vs IRR, AAGR, and ROI
These four metrics are often confused. Each measures "return" differently and is appropriate for different scenarios:
| Metric | Definition | Best For | Limitation |
|---|---|---|---|
| CAGR | Steady-state annual growth from start to end value | Long-term investment comparison, business revenue trends | Ignores volatility, dividends, intermediate cash flows |
| IRR (Internal Rate of Return) | Discount rate making NPV of all cash flows = 0 | Private equity, real estate with multiple cash flows, project finance | Assumes reinvestment at IRR; multiple solutions possible |
| AAGR (Arithmetic Average) | Simple average of annual returns | Quick historical summary | Overstates performance; misleading with volatile returns |
| ROI (Return on Investment) | Total return as % of initial investment (not annualized) | One-time project evaluation, marketing campaigns | Not annualized; misleading across different time periods |
| TWR (Time-Weighted Return) | Return that eliminates effect of external cash flows | Evaluating fund manager skill independent of investor timing | Complex to compute; not useful for personal investing |
The Rule of 72 and Doubling Time
The Rule of 72 is one of the most powerful mental math shortcuts in finance. Divide 72 by your CAGR percentage to estimate how many years it takes for an investment to double. This is derived from the exact formula ln(2)/ln(1+r) but is remarkably accurate for rates between 2% and 20%.
| CAGR | Rule of 72 (approx) | Exact Doubling Years | $10K → 2× in | Context |
|---|---|---|---|---|
| 2% | 36.0 yrs | 35.0 yrs | ~2035 | Long-term T-Bills, conservative savings |
| 3.5% | 20.6 yrs | 20.1 yrs | ~2045 | US Inflation rate — your purchasing power halves in 20 years |
| 5% | 14.4 yrs | 14.2 yrs | ~2039 | Conservative balanced portfolio |
| 7% | 10.3 yrs | 10.2 yrs | ~2034 | General "real return" assumption; often used in retirement planning |
| 10% | 7.2 yrs | 7.27 yrs | ~2032 | S&P 500 historical average (nominal) |
| 12% | 6.0 yrs | 6.12 yrs | ~2031 | Aggressive equity; small-cap premium |
| 15% | 4.8 yrs | 4.96 yrs | ~2030 | Exceptional stock picker / early-stage VC |
| 20% | 3.6 yrs | 3.80 yrs | ~2028 | Venture capital target; growth-stage startups |
| 25% | 2.9 yrs | 3.11 yrs | ~2028 | High-growth SaaS / early crypto bull market |
Frequently Asked Questions
How do I calculate CAGR?
CAGR = (Ending Value / Beginning Value)^(1/n) − 1, where n is the number of years. Example: $10,000 → $25,000 in 10 years: CAGR = (25,000/10,000)^(1/10) − 1 = 2.5^0.1 − 1 = 0.0960 = 9.60%/year. The calculator above handles all variations including fractional years and reverse calculations.
What is a good CAGR for an investment?
Context is everything. For public equity portfolios, a CAGR above the S&P 500 historical average (~10.5%) is considered excellent. For a SaaS startup, investors typically want 3× ARR growth (200%+ CAGR). For a mature business, 5–10% revenue CAGR signals steady health. Compare against the relevant benchmark (use the Compare Rates mode above).
What is the difference between CAGR and annual return?
Annual return is the percentage change in any single year. CAGR is the smoothed average that tells you what consistent rate would have produced the same start-to-end result. Example: a stock returns +50%, −33%, +50% over 3 years. AAGR (arithmetic average) = +22.3%. But the actual result ($1,000 → $1,500 → $1,004 → $1,506) gives CAGR = (1,506/1,000)^(1/3)−1 = 14.7% — very different from 22.3%.
How do I use CAGR to calculate future investment value?
Future Value = Beginning Value × (1 + CAGR)^n. Example: $50,000 at 10% CAGR for 25 years = $50,000 × (1.10)^25 = $50,000 × 10.835 = $541,735. Use Mode 2 (Future Value) in the calculator above — enter your starting amount, expected CAGR, and time horizon to see the projected value and year-by-year growth table.
Can CAGR be negative?
Yes. A negative CAGR indicates the investment lost value over the period. Example: $100,000 → $60,000 in 5 years: CAGR = (60,000/100,000)^(1/5) − 1 = 0.6^0.2 − 1 = −9.45%/year. Negative CAGR is common for individual stocks, sector funds during bear markets, or commodities. The S&P 500 lost value over 10-year periods starting in 1929 (−1.7%/yr) and 1999 (−0.5%/yr).
What is the CAGR of the S&P 500?
The historical CAGR of the S&P 500 from 1926 to 2023 is approximately 10.3% nominally (including dividends reinvested, before taxes and fees). Adjusted for inflation (~3.5% CPI), the real CAGR is approximately 6.8%. Over the past 20 years (2004–2023), the S&P 500 delivered a CAGR of approximately 10.2% nominal. Individual 20-year periods ranged from 5.6% (worst) to 18.3% (best).
Related Financial Calculators
Use the CAGR Calculator with these tools for complete investment analysis:
- Compound Interest Calculator →
While CAGR measures the rate of growth, the compound interest calculator shows the effect of periodic contributions. Both use the same exponential math — compound interest adds the power of regular investments to a CAGR-driven return.
- Investment Calculator →
Model an investment portfolio with monthly contributions, different asset allocation CAGRs, and time horizons. The investment calculator applies your CAGR to project wealth accumulation toward retirement or financial independence.
- APY Calculator →
APY (Annual Percentage Yield) is CAGR for bank accounts and bonds: it accounts for compounding frequency within a year. A savings account with 4.8% APR compounded monthly actually yields 4.91% APY — effectively a 4.91% 1-year CAGR.
- Profit Margin Calculator →
For business owners, combine CAGR analysis with profit margin trends. Revenue CAGR of 25% with shrinking margin tells a very different story than 15% revenue CAGR with expanding margin — use both together for a complete business health picture.
- Annual Income Calculator →
A consistent savings rate on your annual income, invested at a specific CAGR, is the engine of wealth building. Calculate your annual income, determine a savings rate, then model CAGR growth in the compound interest calculator.
- Percentage Discount Calculator →
Understand how inflation (the negative CAGR on purchasing power) erodes discounts and real returns over time. A 10% discount today has different real value than a 10% discount in 10 years with 3.5% annual inflation eroding purchasing power.