Final answer:
To raise the necessary funds, Setrakian Industries needs to sell 67,553 bonds. Correct option is B 67,553 bonds
Step-by-step explanation:
To calculate the number of bonds that need to be sold to raise the necessary funds, we can use the formula:
Number of bonds = Total funds needed / Price per bond
To find the price per bond, we need to calculate the present value of the bond's cash flows, which include the coupon payments and the face value. Using the formula:
Price per bond = Coupon payment * ((1 - (1 + YTM/2)^(-2*n))/(YTM/2)) + Face value * (1 + YTM/2)^(-2n)
Where YTM is the yield to maturity, n is the number of periods until maturity, and Coupon payment is the annual coupon payment divided by 2 to account for semiannual payments.
Plugging in the given values:
YTM = 6.76% = 0.0676, Coupon payment = $2000 * 5.98% / 2= $59.80, Face value = $2000, n = 15 years * 2 = 30 periods
We find:
Price per bond = $59.80 * ((1 - (1 + 0.0676/2)^(-2*30))/(0.0676/2)) + $2000 * (1 + 0.0676/2)^(-2*30) = $1,404.09
Finally, substituting the calculated price per bond and the total funds needed into the first formula:
Number of bonds = $94.8 million / $1,404.09 = 67,553 bonds