sleepybird
Active Member
Hi David,
Why "short a coupon bond is equivalent to long effect duration and short effective convexity?" I think bonds have positive durations, so shorting bond = shorting duration?
Also, for the below question, why am I getting 2 different duration and convexity using different method? What did I do wrong?
What are the duration and convexity of a two-year bond that pays an annual coupon of 10% and whose current yield to maturity is 14%? Use 1,000 as the face value.
Method 1:
PMT 100 100 100
I/Y 14% 15% 13%
FV 1,000 1,000 1,000
PV $934.13 $918.71 $949.96
Duration 1.6723 =(949.96-918.71)/(2*1%*934.13)
Convexity 4.3283 =(949.96+918.71-2*934.13)/(934.13*1%^2)
Method 2:
t CF PV Wt t*wt t^2*wt
1 100 87.71929825 0.093904448 0.093904448 0.093904448
2 1100 846.4142813 0.906095552 1.812191104 3.624382208
Duration
Thank you very much for your help.
Sleepybird
Why "short a coupon bond is equivalent to long effect duration and short effective convexity?" I think bonds have positive durations, so shorting bond = shorting duration?
Also, for the below question, why am I getting 2 different duration and convexity using different method? What did I do wrong?
What are the duration and convexity of a two-year bond that pays an annual coupon of 10% and whose current yield to maturity is 14%? Use 1,000 as the face value.
Method 1:
BV0
BV+
BV-
N 2 2 2 PMT 100 100 100
I/Y 14% 15% 13%
FV 1,000 1,000 1,000
PV $934.13 $918.71 $949.96
Duration 1.6723 =(949.96-918.71)/(2*1%*934.13)
Convexity 4.3283 =(949.96+918.71-2*934.13)/(934.13*1%^2)
Method 2:
t CF PV Wt t*wt t^2*wt
1 100 87.71929825 0.093904448 0.093904448 0.093904448
2 1100 846.4142813 0.906095552 1.812191104 3.624382208
934.1335796
1.000000
1.906095552
3.718286656Duration
Convexity
Thank you very much for your help.
Sleepybird
