In: Finance
Bond J has a coupon of 7.2 percent. Bond K has a coupon of 11.2 percent. Both bonds have 12 years to maturity and have a YTM of 8.4 percent.
a. If interest rates suddenly rise by 1.8 percent, what is the percentage price change of these bonds? (A negative value should be indicated by a minus sign. Do not round intermediate calculations. Enter your answers as a percent rounded to 2 decimal places.)
%Δ in Price
Bond J: %
Bond K:(11.54)%
Bond J
K = N |
Bond Price =∑ [(Annual Coupon)/(1 + YTM)^k] + Par value/(1 + YTM)^N |
k=1 |
K =12 |
Bond Price =∑ [(7.2*1000/100)/(1 + 8.4/100)^k] + 1000/(1 + 8.4/100)^12 |
k=1 |
Bond Price = 911.41 |
Bond K
K = N |
Bond Price =∑ [(Annual Coupon)/(1 + YTM)^k] + Par value/(1 + YTM)^N |
k=1 |
K =12 |
Bond Price =∑ [(11.2*1000/100)/(1 + 8.4/100)^k] + 1000/(1 + 8.4/100)^12 |
k=1 |
Bond Price = 1206.71 |
Part 1 |
Change in YTM =1.8 |
Bond J |
K = Nx2 |
Bond Price =∑ [( Coupon)/(1 + YTM/2)^k] + Par value/(1 + YTM/2)^Nx2 |
k=1 |
K =12x2 |
Bond Price =∑ [(7.2*1000/200)/(1 + 10.2/200)^k] + 1000/(1 + 10.2/200)^12x2 |
k=1 |
Bond Price = 795.02 |
%age change in price =(New price-Old price)*100/old price |
%age change in price = (795.02-911.41)*100/911.41 |
= -12.77% |
Bond K |
K = Nx2 |
Bond Price =∑ [( Coupon)/(1 + YTM/2)^k] + Par value/(1 + YTM/2)^Nx2 |
k=1 |
K =12x2 |
Bond Price =∑ [(11.2*1000/200)/(1 + 10.2/200)^k] + 1000/(1 + 10.2/200)^12x2 |
k=1 |
Bond Price = 1068.33 |
%age change in price =(New price-Old price)*100/old price |
%age change in price = (1068.33-1206.71)*100/1206.71 |
= -11.47% |