hello can you please answer the QUESTIONS C) AND D) ONLY. it is due today, thank you so much in advance. i will give you the answers of A) and B) in case you need them to resolve the others

A) the current value is 20,000,000$ duration = 20 and convexity = 780 and the portfolio value decreases by 3,992,200$

b) the number of zero coupon bond that need to be sell = 200,00$

Problem 3 (14 points): Assume the term structure of forward rates is flat and they are equal to 5%. The factor y is the forward rate (such one-factor model is called parallel yield shift model and in class we called the duration D in this special case by Dmod, i.e., D=Dmod). Assume you own a perpetuity with $1M annual payments paid semi-annually (i.e., it pays $500,000 every six months). a) (4 points) Find the current value of this perpetuity, its DV01, Duration, and Convexity. Round your answer to the nearest cent. By how much the value of your perpetuity will change if interest | rates increase to y=5.1% (round your answer to the nearest dollar)? b) (5 points) You have decided to hedge your perpetuity using 20-year zero-coupon bonds. How many bonds you should sell (remember that the bond's face value is $100). Round your answer to the nearest integer number of bonds. c) (3 points) Given the hedge you have constructed in part (b), by how much the value of your hedged position will change if interest rates increase to y=5.1%? Use the integer number of bonds from part (b) and round your answers to the nearest dollar. d) (2 points) If, in addition to the 20-year zero-coupon bonds, you would be able to use 5-year | zero-coupon bonds, would you be able to construct a better hedge? Explain why (no calculations are necessary). Problem 3 (14 points): Assume the term structure of forward rates is flat and they are equal to 5%. The factor y is the forward rate (such one-factor model is called parallel yield shift model and in class we called the duration D in this special case by Dmod, i.e., D=Dmod). Assume you own a perpetuity with $1M annual payments paid semi-annually (i.e., it pays $500,000 every six months). a) (4 points) Find the current value of this perpetuity, its DV01, Duration, and Convexity. Round your answer to the nearest cent. By how much the value of your perpetuity will change if interest | rates increase to y=5.1% (round your answer to the nearest dollar)? b) (5 points) You have decided to hedge your perpetuity using 20-year zero-coupon bonds. How many bonds you should sell (remember that the bond's face value is $100). Round your answer to the nearest integer number of bonds. c) (3 points) Given the hedge you have constructed in part (b), by how much the value of your hedged position will change if interest rates increase to y=5.1%? Use the integer number of bonds from part (b) and round your answers to the nearest dollar. d) (2 points) If, in addition to the 20-year zero-coupon bonds, you would be able to use 5-year | zero-coupon bonds, would you be able to construct a better hedge? Explain why (no calculations are necessary)