Revision as of 18:02, 19 November 2023 by Admin (Created page with "'''Solution: B''' Given the price is less than the amount paid for an early call, the minimum yield rate for this callable bond is calculated based on a call at the latest possible date. Thus, for an early call, the effective yield rate per coupon period, j, must satisfy <math display = "block"> \mathrm{Price} = 1021.50=22a_{\overline{19}| j}+1200 v_{j}^{19}. </math> Using the calculator, j = 2.86%. We also must check the yield if the bond is redeemed at maturity. Th...")
Exercise
ABy Admin
Nov 19'23
Answer
Solution: B
Given the price is less than the amount paid for an early call, the minimum yield rate for this callable bond is calculated based on a call at the latest possible date. Thus, for an early call, the effective yield rate per coupon period, j, must satisfy
[[math]]
\mathrm{Price} = 1021.50=22a_{\overline{19}| j}+1200 v_{j}^{19}.
[[/math]]
Using the calculator, j = 2.86%. We also must check the yield if the bond is redeemed at maturity. The equation is
[[math]]1021.50=22a_{\overline{20}| j}+1100 v_{j}^{20}[[/math]]
. The solution is j = 2.46% Thus, the yield, expressed as a nominal annual rate of interest convertible semiannually, is twice the smaller of the two values, or 4.92%
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