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There is a 9%, 23 year note bond which has a ytm of 9%. The ytm...

There is a 9%, 23 year note bond which has a ytm of 9%. The ytm alters by one percent down. By how much does the price alter? If the ytm drops by 2%, by how much does the price change? What is the exact percentage change of the bond in the 2 cases?

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Expert Solution

Because bonds are priced at par that means original price = 1000 and YTM =coupon rate = 9%
Change in YTM =-1
Bond
                  K = Nx2
Bond Price =∑ [( Coupon)/(1 + YTM/2)^k]     +   Par value/(1 + YTM/2)^Nx2
                   k=1
                  K =23x2
Bond Price =∑ [(9*1000/200)/(1 + 8/200)^k]     +   1000/(1 + 8/200)^23x2
                   k=1
Bond Price = 1104.42
price change = New price-Old price = 1104.42-1000 = 104.42
%age change in price =(New price-Old price)*100/old price
%age change in price = (1104.42-1000)*100/1000
= 10.44%
Change in YTM =-2
Bond
                  K = Nx2
Bond Price =∑ [( Coupon)/(1 + YTM/2)^k]     +   Par value/(1 + YTM/2)^Nx2
                   k=1
                  K =23x2
Bond Price =∑ [(9*1000/200)/(1 + 7/200)^k]     +   1000/(1 + 7/200)^23x2
                   k=1
Bond Price = 1227.01
price change = New price-Old price = 1227.01-1000 = 227.01
%age change in price =(New price-Old price)*100/old price
%age change in price = (1227.01-1000)*100/1000
= 22.7%

jeff jeffy answered 9 months ago
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