Financial Mathematics HONG KONG (Assignment 3) (Bài tập môn Toán tài chính)
Tài liệu là lời giải cho bài tập số 3 môn Financial Mathematics, gồm các câu hỏi về vẽ biểu đồ lợi nhuận hết hạn của các danh mục quyền chọn và các bài tập liên quan đến mô hình Black-Scholes.
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THE CHINESE UNIVERSITY OF HONG KONG Department of Mathematics MATH4210 (2016/17 Term 1) Financial Mathematics Assignment 3 solution Note: If you have any questions about the solution or assignment score, please let me know by sending an Email to kckchan@math.cuhk.edu.hk 1. ([2;p55]) Draw the expiry payoff diagrams for each of the following portfolios: (a) Short one share, long two calls with exercise price E (this combination is called a straddle); (b) Long one call and one put, both with exercise price E (this is also a straddle: why?); (c) Long one call and two puts, all with exercise price E (a strip); (d) Long one put and two calls, all with exercise price E (a strap); (e) Long one call with exercise price E1 and one put with exercise E2 . Compare the three cases E1 > E2 (known as a strangle), E1 = E2 , E1 < E2 . (f) As (e) but also short one call and one put with exercise price E (when E1 < E < E2 , this is called a butterfly spread). Solution: ( −S (a) Λ = S − 2E S≤E S>E (b) Λ = |E − S| 1 ( 2(E − S) S ≤ E (c) Λ = S−E S>E ( E−S S≤E (d) Λ = 2(S − E) S > E 2 E2 − S S ≤ E2 (e) (i) If E1 > E2 , Λ = 0 E2 < S < E1 S − E1 S > E1 (ii) If E1 = E2 = E, Λ = |E − S| 3 E2 − S S ≤ E1 (iii) If E1 > E2 , Λ = E2 − E1 E2 < S < E1 S − E1 S > E2 (f) We have Λ = max(S − E1 , 0) + max(E2 − S, 0) − max(S − E, 0) − max(E − S, 0) Here we have 9 cases: (a) E1 > E2 > E (b) E1 > E2 = E (c) E1 > E > E2 (d) E2 > E1 > E (e) E2 > E1 = E 4 (f) E2 > E > E1 (g) E > E2 > E1 (h) E > E2 = E1 (i) E > E1 > E2 By explicitly writing down the equation, we can obtain the 9 graphs. Remark: When you are asked to draw a diagram, please don’t just show me the line without indicating any information. You have to do more than stating the equation of the graph. Please state additional information, such as x-intercept, y-intercept and slope, to let people know what you are drawing. This time marks are given to you, but please make sure you draw a graph with sufficient informati
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- ドキュメント名
- Financial Mathematics HONG KONG (Assignment 3) (Bài tập môn Toán tài chính)
- 学校 / コース
- Đại học Trung Văn Hồng Kông · Toán tài chính
- 内容
- Tài liệu cung cấp lời giải chi tiết cho Bài tập về nhà số 3 môn Toán Tài chính, bao gồm các bài toán về biểu đồ lợi nhuận, suy luận công thức giá quyền chọn Châu Âu, chứng minh định lý Put-Call Parity và giải phương trình Black-Scholes.
- 目次
- 1. ([2;p55]) Draw the expiry payoff diagrams for each of the following portfolios:
- (a) Short one share, long two calls with exercise price E (this combination is called a straddle);
- (b) Long one call and one put, both with exercise price E (this is also a straddle: why?);
- (c) Long one call and two puts, all with exercise price E (a strip);
- (d) Long one put and two calls, all with exercise price E (a strap);
- (e) Long one call with exercise price E1 and one put with exercise E2 . Compare the three cases E1 > E2 (known as a strangle), E1 = E2 , E1 < E2 .
- (f) As (e) but also short one call and one put with exercise price E (when E1 < E < E2 , this is called a butterfly spread).
- Solution:
- 2. Derive the price formula of an European put based on the Black-Scholes model.
- Solution:
- 3. Show that the payoff function of a portfolio c − p is S − E. From this and the Black-Scholes formula, show the formula of the put-call parity.
- Solution:
- 4. ([6;p56]) Find the most general solution of the Black-Scholes equation that has the special form
- (a) V = V (S)
- (b) V = A(t)B(S)
- Solution:
- ページ数
- 9 ページ
- アップロード者
- Giang Le
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