|
|
| ¿¬¼¼´ë ¼±Çü´ë¼öÇÐ Á·º¸ 2Çбâ-¼±´ë½ÃÇè-2Â÷Áß°£-¸ð¹ü´ä¾È / Problem 1. Indicate whether the statement is true(T) or (5) If A is an n¡¿n matrix, and if the linear system Ax = b is consistent for every vector b in Rn , then TA : Rn ¡æ false(F). Justify your answer. [each 3pt] (1) If T1 : R ¡æ R (F) 2 3 n m and T2 : R m ¡æ R are linear trans- k formations, a¡¦ |
|
|
|
|
|
|
|
| ¿¬¼¼´ë ¼±Çü´ë¼öÇÐ Á·º¸ 2Çбâ-¼±´ë½ÃÇè-3Â÷±â¸»-¸ð¹ü´ä¾È / Problem 1. Indicate whether the statement is true(T) or (5) If A is a symmetric matrix, then eigenvectors from dierent eigenspaces are orthogonal. (T) false(F). Justify your answer. [each 3pt] (1) If T : Rn ¡æ Rn is a linear operator, and if [T ]B = [T ]B with respect to two bases B and B for Rn , the¡¦ |
|
|
|
|
|
|
|
| ½Åȣ󸮱⸻.pdf / Question 1 [20%]: Determine all possible signals x[n] associated with the z-transform X(z) = (1 5z 1 2z 1 )(3 z 1) . Question 2 [25%]: Determine the coe cients {h[n]} of a high-pass linear-phase FIR lter of length L = M + 1 = 4 which has an antisymmetric impulse response, i.e. h[n] = h[M n], and a frequency response H(e|! ) that satises t¡¦ |
|
|
|
|
|
|
|
| ÇѾç´ë °ø¾÷¼öÇÐ Áß°£ ¹®Á¦ / 1. Solve the equation xdy( yxyxy 2 )dx 2. y1 ( x)e x is one of homogeneous solutions for the following ODE(ordinary differential equation) : ( x1) y `` xy ` y0 Find the other homogeneous solution. 3. Solve the equation dx( x x3)dy0 y 4. Solve the equation xy ``` 3 y ``e x 5. Solve the equation y `` 4 4 y ` 2 yx 21 ,¡¦ |
|
|
|
|
|
|
|
| ¡¥he following properties: (a) Linearity property. If c1 and c2 are constants, then Tn(c1f + c2g) = c1Tn(f) + c2Tn(g) (b) Differentiation property. The derivative of a Taylor polynomial of f is a Taylor polynomial of f`; in fact, we have (Tnf)` = Tn-1(f`). / 7. Polynomial Approximations to Functions. Theorem 7.1. Let f be a function with derivatives of |
|
|
|
|
|
|
|
| °æÁ¦Çпø·Ð ÇÙ½É Á¤¸® ¹× ±â¸»·¹Æ÷Æ® ¹®Á¦Á¤¸® ÀÚ·áÀÔ´Ï´Ù. ¿©·¯¸ð·Î È°¿ëÀÌ µÇ±æ ¹Ù¶ó¸ç, ¸ðµÎ ÁÁÀº °á°ú ÀÖÀ¸½Ã±æ ¹Ù¶ø´Ï´Ù. °æÁ¦Çпø·ÐÇÙ½ÉÁ¤¸®¹×±â¸»·¹Æ÷Æ®¹®Á¦Á¤¸® / 1. KeynesÀÇ Àý´ë¼Òµæ°¡¼³°ú ¸ð¼øµÇ´Â ÇÑ ½ÇÁõÀû Áõ°Å´Â, ´Ü±âÀûÀ¸·Î´Â Æò±Õ¼Òºñ¼ºÇâ(APC)ÀÌ ¼Òµæ Áõ°¡¿¡ µû¶ó °¨¼ÒÇÏÁö¸¸ Àå±âÀûÀ¸·Î´Â ÀÏÁ¤ÇÏ´Ù´Â Á¡ÀÌ´Ù. 2. ÄÉÀÎÁîÀÇ ±¹¹Î¼Òµæ °áÁ¤À̷п¡ ´ëÇÑ ´ÙÀ½ Áú¹®¿¡¡¦ |
|
|
|
|
|
|
|
| [ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö ±â¸»°í»ç / Final Exam: Linear Algebra Final Exam Solution Instructor: Jun Moon Time: June 9, Wed, 2021, 13:00 - 14:30 Name / Student ID: Note: Write your name and student ID on both the Exam sheet and the answer sheet. Cheating is not allowed. Please DO NOT DISCUSS.Please box your answer.The point value of each sub-proble¡¦ |
|
|
|
|
|
|
|
| [ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö Áß°£°í»ç / Midterm II: Linear Algebra Midterm II Solution Instructor: Jun Moon May 10, 2021 Time: May 10, 2021, 14:30 - 15:45 Name / Student ID: Note: Write your name and student ID on both the Exam sheet and the answer sheet. Cheating is not allowed. DO NOT DISCUSS.Show all your work. You cannot write down your solution ¡¦ |
|
|
|
|
|
|
|
| [¼±Çü´ë¼ö] 2020³â Áß°£°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï / FINAL EXAM LINEAR ALGEBRA Professor Chung Choo Chung June. 22 (MON), 2020 16:00-17:30 ON-LINE Student Name:Student No.: . Using printed exam notes as answer sheets are strongly recommended. . Either scanned images or photocopies of the exam notes are acceptable for uploading. . In the exam, ɲ ÉåÉ¡and ɲ ÉåÉ¡¡¦ |
|
|
|
|
|
|
|
| [¼±Çü´ë¼ö] 2020³â ±â¸»°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï / MIDTERM EXAM LINEAR ALGEBRA Professor Chung Choo Chung April. 29 (Wed), 2020 14:30-16:00 ON-LINE Student Name:Student No.: . No answer sheet uploaded after the due time (Wed. 29 April, 4 PM) is accepted. . Students should use A4 format papers for answer sheets. . Students may use the printed midterm answer s¡¦ |
|
|
|
|
|
 "¹Ì¸®º¸±â"){kind=small}
 "¹Ì¸®º¸±â"){kind=small}
 "¹Ì¸®º¸±â"){kind=small}
 "¹Ì¸®º¸±â"){kind=small}
![[¹ÌÀûºÐ]´ÙÇ×½ÄÀÇ ÃßÁ¤°ª(polynomial appoximation to functions)](/View/7_Polynomial_Approximations_to_Functions_hwp_01_.gif)
 "¹Ì¸®º¸±â"){kind=small}
 "¹Ì¸®º¸±â"){kind=small}
![[ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö ±â¸»°í»ç](/View/[ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö ±â¸»°í»ç_pdf_01_.gif)
 "¹Ì¸®º¸±â"){kind=small}
![[ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö Áß°£°í»ç](/View/[ÇѾç´ëÇб³ Á·º¸] 2021 ¼±Çü´ë¼ö Áß°£°í»ç_pdf_01_.gif)
 "¹Ì¸®º¸±â"){kind=small}
![[¼±Çü´ë¼ö] 2020³â Áß°£°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï](/View/[¼±Çü´ë¼ö] 2020³â Áß°£°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï_pdf_01_.gif)
 "¹Ì¸®º¸±â"){kind=small}
![[¼±Çü´ë¼ö] 2020³â ±â¸»°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï](/View/[¼±Çü´ë¼ö] 2020³â ±â¸»°í»ç ±âÃâ ÇѾç´ëÇб³ ¼¿ï_pdf_01_.gif)
 "¹Ì¸®º¸±â"){kind=small}
Àå¹Ù±¸´Ï
