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Par Yield Calculator

Calculate the theoretical Par Rate from Zero-Coupon Spot Rates.

Enter the annual Zero-Coupon Spot Rates (%) for consecutive years to calculate the Par Rate for the final maturity year.

Year 1 Spot Rate (%):

Year 2 Spot Rate (%):

Year 3 Spot Rate (%):

Year 4 Spot Rate (%):

Year 5 Spot Rate (%):

Calculated Par Rate

0.00%

How to Calculate Par Rate

The Par Rate (or Par Yield) is the coupon rate at which a bond's price equals its nominal face value (par value). In financial markets, specifically within fixed income analytics, calculating the par rate is essential for constructing the par yield curve from the theoretical zero-coupon spot rate curve.

This calculation determines what the coupon payment should be for a bond of a specific maturity so that it trades at exactly 100% of its face value today, assuming the current term structure of interest rates.

The Par Rate Formula

To calculate the Par Rate for a maturity of n years, we use the Discount Factors derived from the Spot Rates. The formula relates the sum of the present value of future coupon payments and the principal repayment to the current par price.

The mathematical formula is:

Par Rate = (1 – DF_n) / Σ(DF₁…DF_n)

Where:

DF_n is the Discount Factor for year n.
Σ(DF) is the sum of all Discount Factors from year 1 to year n.
Discount Factor (DF_t) = 1 / (1 + r_t)^t, where r_t is the spot rate for year t.

Example Calculation

Suppose you have the following Zero-Coupon Spot Rates:

Year 1: 3.0%
Year 2: 4.0%

Step 1: Calculate Discount Factors
DF₁ = 1 / (1 + 0.03)¹ = 0.9709
DF₂ = 1 / (1 + 0.04)² = 0.9246

Step 2: Apply Par Formula
Numerator = 1 – 0.9246 = 0.0754
Denominator = 0.9709 + 0.9246 = 1.8955
Par Rate = 0.0754 / 1.8955 = 0.03977 or 3.98%

Why is the Par Rate Important?

The Par Rate is crucial for valuing Interest Rate Swaps and determining the nominal yield of Treasury bonds. When banks or financial institutions quote a "yield curve," they are often referring to the Par Yield Curve. It represents the rate a high-quality issuer would pay on new bonds issued at par value today.