Macaulay Duration: Understanding Bond Price Volatility

What is Macaulay Duration?

Macaulay Duration is a measure of a bond's sensitivity to interest rate changes. It provides an estimate of the length of time it will take for the bond's cash flows to recoup its price. The Macaulay duration is calculated by adding up the present value of each cash flow from the bond and then dividing that number by the bond's current price.

Question:

What is Macaulay Duration?

Answer:

Macaulay Duration is a measure of a bond's sensitivity to interest rate changes. It provides an estimate of the length of time it will take for the bond's cash flows to recoup its price. The Macaulay duration is calculated by adding up the present value of each cash flow from the bond and then dividing that number by the bond's current price.

Macaulay Duration is an essential concept in bond investing. It helps investors understand how a bond's price will react to changes in interest rates. By calculating the Macaulay Duration of a bond, investors can make informed decisions about their investment strategies and risk management.

The formula for calculating the Macaulay duration of a bond is as follows:

Macaulay Duration = (C1 * T1 + C2 * T2 + ... + Cn * Tn) / V

Where:

C1, C2, ..., Cn = the cash flows in periods 1, 2, ..., n

T1, T2, ..., Tn = the time in years to each cash flow

V = the bond's price (or present value)

In the example provided, an Apple annual coupon bond has a coupon rate of 6.8%, face value of $1,000, and 4 years to maturity. If its yield to maturity is 6.8%, the Macaulay duration is equal to the maturity of the bond. This is because the bond's coupon rate and yield to maturity are equal.

By substituting the values into the formula:

Macaulay Duration = ((0.068 * 1000) * 1 + (0.068 * 1000) * 2 + (0.068 * 1000) * 3 + (0.068 * 1000 + 1000) * 4) / (1000)

Macaulay Duration = 3.824 years

Therefore, the Macaulay duration of the bond is 3.824 years (rounded to three decimal places). This calculation helps investors gauge the bond's price volatility given potential interest rate changes.

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