What is Compound Interest and How Does It Work?
Compound interest is the process where interest earned on an investment is reinvested to earn additional interest, creating exponential growth over time. Unlike simple interest, which calculates returns only on the original principal, compound interest calculates returns on both the principal and accumulated interest. Albert Einstein allegedly called compound interest "the eighth wonder of the world" and said "those who understand it, earn it; those who don't, pay it." The formula is: FV = P(1 + r/n)^(nt), where FV = future value, P = principal, r = annual interest rate, n = compounding frequency per year, and t = time in years. For example, $10,000 invested at 8% annual interest compounded annually for 30 years grows to $100,627. The same investment compounded monthly grows to $109,357—nearly $9,000 more just from more frequent compounding! The magic happens through reinvestment: in year one, you earn $800 in interest on $10,000. In year two, you earn interest on $10,800—that's $864. By year 10, you're earning $1,851 annually. By year 30, you're earning over $7,400 per year even though your rate never changed. This accelerating growth curve is why starting early is crucial. Use a compound interest calculator to model different scenarios: input your initial deposit ($5,000), regular monthly contribution ($300), expected annual return (7% for diversified stock portfolios), compounding frequency (monthly for most investment accounts), and time horizon (30 years until retirement). The calculator shows your future value, total contributions, and total interest earned—often revealing that interest earned exceeds your contributions over long periods.