Free zero-coupon bond calculator — compute the price from yield or yield from price for zero-coupon bonds, savings bonds, and Treasury STRIPS.
A zero-coupon bond pays no periodic interest. Instead, it is sold at a deep discount to its face value and appreciates toward par over time. The difference between face value and purchase price represents the investor's return. Treasury STRIPS, certain municipal bonds, and US savings bonds are common zero-coupon instruments.
Our Zero-Coupon Bond Calculator works in two directions: enter a yield to compute the fair price, or enter a price to derive the implied yield. It also shows accreted value over time and the annual phantom income that may be taxable even though no cash coupon is received. Zero-coupon bonds are sold at a deep discount and pay no periodic interest, instead compounding all returns into the price appreciation between purchase and maturity. This makes them ideal for targeted goals like college funding or retirement on a specific date. This calculator determines the fair price, effective yield, and annual phantom income tax liability for these unique instruments.
Zero-coupon bonds eliminate reinvestment risk because there are no coupons to reinvest. This makes them ideal for matching a known future liability. Pension funds, education savings, and bond ladders often rely on zeros. Our calculator helps you price these instruments accurately and compare them to coupon-paying alternatives by showing the equivalent annual yield.
Price = Face Value / (1 + r/n)^(n × t), where r = annual yield, n = compounding periods per year, t = years to maturity. Conversely: Yield = n × [(Face / Price)^(1/(n×t)) – 1].
Result: $610.27
A 10-year zero-coupon bond with a 5% yield (semi-annual compounding) is priced at $1,000 / (1 + 0.025)^20 = $610.27. The investor pays $610.27 today and receives $1,000 at maturity, earning $389.73 in total appreciation, which equals a 5% annualized return.
Unlike coupon bonds that pay periodic interest, a zero-coupon bond makes a single payment at maturity. Investors purchase the bond at a discount — for example, paying $610 today for a $1,000 bond that matures in 10 years. The difference represents the interest earned. This structure guarantees a known return if held to maturity, eliminating reinvestment risk.
The price of a zero is simply the present value of its face value, discounted at the required yield. As yields rise, prices fall more steeply for zeros than for comparable coupon bonds because all cash flow is concentrated at maturity. Conversely, when yields drop, zeros appreciate more aggressively. This convex price-yield relationship makes zeros popular with traders who want to express rate views with maximum leverage.
Pension funds match liabilities dollar-for-dollar using zero-coupon bond portfolios. Parents buy zeros to fund future college tuition. Corporations use zeros to defease sinking-fund obligations. In every case, the defining advantage is certainty: you know the exact future cash flow. Pair this calculator with the Bond Duration Calculator to quantify how rate changes would affect your zero-coupon position before committing capital.
A zero-coupon bond is a debt instrument that pays no periodic interest. It is issued at a discount to its face value and matures at par. The difference between the purchase price and the face value is the investor's return, effectively an implicit interest rate compounded over the life of the bond.
The IRS requires investors to pay tax on the annual accreted interest (called original issue discount or OID) even though no cash is received until maturity. This phantom income is taxed at ordinary income rates. Holding zeros in IRAs or 401(k)s can defer or eliminate this issue.
Yes. STRIPS stand for Separate Trading of Registered Interest and Principal of Securities. The Treasury strips coupons and principal into individual zero-coupon instruments that trade separately. They carry no credit risk because they are backed by the US government.
Duration measures interest-rate sensitivity. Because zeros have no coupons to shorten their duration, their duration equals their maturity. A 30-year zero has a duration of 30, far higher than a 30-year coupon bond, which amplifies price swings for a given rate change.
Absolutely. If your child will attend college in 15 years, you can buy a zero maturing in 15 years and know exactly what you will receive. This eliminates both reinvestment risk and market timing. Municipal zeros may also provide tax-exempt returns.
US Treasury zeros and most US corporate zeros use semi-annual compounding by convention. European bonds and some municipal issues use annual compounding. Match the convention of the specific instrument you are analyzing to obtain the correct price.