Occam Industrial Machines issued 145,000 zero coupon bonds 7 years ago. The bonds originally had 30 years to maturity with a yield to maturity of 6.2 percent. Interest rates have recently decreased, and the bonds now have a yield to maturity of 5.3 percent. The bonds have a par value of $2,000 and semiannual compounding. If the company has a $81 million market value of equity, what weight should it use for debt when calculating the cost of capital? Note: Do not round intermediate calculations and round your answer to 4 decimal places, e.9., 1616.

To calculate the weight of debt, we first need to find the present value of the bonds.

The present value of the bonds can be calculated using the formula:

PV = (C / (1 + r)^n) + (F / (1 + r)^n)

Where:
PV = Present Value
C = Coupon payment
r = Yield to maturity / 2 (semiannual compounding)
n = Number of years remaining until maturity / 2 (semiannual compounding)
F = Face value of the bond

First, let's calculate the coupon payment:
Coupon payment = (Par value x Yield to maturity) / 2
Coupon payment = ($2,000 x 6.2%) / 2 = $62

Next, let's calculate the present value of the bonds:
PV = ($62 / (1 + 0.053/2)^(30*2)) + ($2,000 / (1 + 0.053/2)^(30*2))
PV = $981.5474 + $298.4026
PV = $1,279.95

Now, let's calculate the weight of debt:
Weight of debt = (Present value of bonds) / (Present value of bonds + Market value of equity)
Weight of debt = $1,279.95 / ($1,279.95 + $81,000,000)
Weight of debt = $1,279.95 / $81,001,279.95
Weight of debt = 0.000015801

Therefore, the weight of debt should be equal to 0.000015801 when calculating the cost of capital.